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stringlengths 31
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1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.util.Scanner;
public class MinimumInteger {
public static void main(String[] args) {
Scanner s = new Scanner(System.in);
int q = s.nextInt();
int l = 0, r = 0, d = 0;
for(int i = 0; i < q; i++) {
l = s.nextInt();
r = s.nextInt();
d = s.nextInt();
int x = 0;
if(l > d) x = d;
else if(d > r) x = d;
else {
int n = r / d;
x = n * d;
while(x <= r) x += d;
}
System.out.println(x);
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for x1 in range(int(input())):
l,r,d=map(int,input().split())
if d<l or d>r:
print(d)
else:
print((int(r/d)+1)*d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int t;
cin >> t;
while (t--) {
int l, r, d;
cin >> l >> r >> d;
if (d < l)
cout << d << "\n";
else if (d > r)
cout << d << "\n";
else {
r /= d;
r++;
cout << r * d << "\n";
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | # import sys
# sys.stdin=open("input.in",'r')
# sys.stdout=open("out.out",'w')
for i in range(int(input())):
l,r,d=map(int,input().split())
if d<l:
print(d)
else:
x=r//d
print((x+1)*d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int32_t main() {
long long q;
cin >> q;
while (q--) {
long long l, r, d;
cin >> l >> r >> d;
long long x = (r) / d;
if (d >= l)
cout << (x + 1) * d << endl;
else
cout << d << endl;
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | def Spider ():
a, b, c = map(int, input().split())
if c < a or c > b: print(c)
else: print((int(b / c) + 1) * c)
TIMES = 1
TIMES = int(input())
for TIME_TEMP in range(TIMES):
Spider() |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python2 | q = int(raw_input())
MAX = 1000000300
for i in range(q):
prev_ans = {}
li, ri, di = map(int, raw_input().split())
init = 0
ans = -1
if prev_ans.get((li, ri, di)) is not None:
print prev_ans[(li, ri, di)]
else:
if di == ri + 1 or (ri + 1) % di == 0 and di >= li:
ans = ri + 1
elif di >= li:
x = ri + 1
ans = x + di - (x % di)
else:
ans = di
print ans |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python2 | n = int(raw_input())
for i in range(n):
l,r,d = map(int,raw_input().split())
if d<l :
print d
else:
print ((r//d)+1)*d |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import math
n = int(input())
for i in range(n):
x = list(map(int,input().split()))
l = x[0]
r = x[1]
d = x[2]
if d < l:
print (d)
else:
print (r + d - (r % d)) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
int main() {
int l, r, d;
int x;
int q;
scanf("%d", &q);
while (q--) {
scanf("%d %d %d", &l, &r, &d);
if (d < l)
printf("%d\n", d);
else {
printf("%d\n", ((r / d) * d + d));
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q=int(input())
for j in range(q):
l,r,d=map(int,input().split())
ans=[]
if(d==1):
if(l-d>0):
ans.append(l-d)
ans.append(r+d)
if(l%d==0):
if(l-d>0):
ans.append(l-d)
if(r%d==0):
ans.append(r+d)
if(l%d):
if(l-l%d>0):
ans.append(l-l%d)
if(r%d):
ans.append(r+d-r%d)
if(d<l):
ans.append(d)
print(min(ans)) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
long long n, l, m, c;
int main(void) {
cin >> n;
for (long long i = 1; i <= n; ++i) {
cin >> m >> c >> l;
if (m > l) {
cout << l << endl;
} else {
long long k = c / l;
k++;
cout << k * l << endl;
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
struct InputReader {
char buf[1000001];
int p;
inline InputReader() { p = 1000001; }
inline void Flush() {
p = 0;
fread(buf, 1, 1000001, stdin);
}
inline char C() {
if (p >= 1000001) Flush();
return buf[p++];
}
inline char Readnum() {
char ch = C();
while (!isdigit(ch) && ch != '-') ch = C();
return ch;
}
inline void Readalpha(char &c) {
c = C();
while (!isalpha(c)) c = C();
}
int operator()() {
int ans = 0, fu = 1;
char ch = Readnum();
if (ch == '-') fu = -1, ch = C();
while (ch >= '0' && ch <= '9') {
ans = ans * 10 + ch - '0';
ch = C();
}
return ans * fu;
}
long long Readll() {
long long ans = 0LL, fu = 1LL;
char ch = Readnum();
if (ch == '-') fu = -1LL, ch = C();
while (ch >= '0' && ch <= '9') {
ans = ans * 10LL + ch - '0';
ch = C();
}
return ans * fu;
}
inline void Readstring(string &x) {
x.clear();
char ch = C();
while (!isdigit(ch) && !isalpha(ch) && ch != '-' && ch != '.') ch = C();
while (isdigit(ch) || isalpha(ch) || ch == '-' || ch == '.') {
x += ch;
ch = C();
}
}
inline void Readchstring(char s[]) {
int len = 0;
char ch = C();
while (!isdigit(ch) && !isalpha(ch)) ch = C();
while (isdigit(ch) || isalpha(ch)) {
s[len++] = ch;
ch = C();
}
s[len] = '\0';
}
inline void Specialread(bool &x) {
char c = C();
while (c != '#' && c != '.' && c != '=' && c != 'B') c = C();
x = c == '#';
}
} In;
inline void Read(int &x) { x = In(); }
inline void Read(int &x, int &y) {
x = In();
y = In();
}
inline void Read(int &x1, int &x2, int &x3) {
x1 = In();
x2 = In();
x3 = In();
}
inline void Read(int &x1, int &x2, int &x3, int &x4) {
x1 = In();
x2 = In();
x3 = In();
x4 = In();
}
inline void Read(long long &x) { x = In.Readll(); }
inline void Read(long long &x, long long &y) {
x = In.Readll();
y = In.Readll();
}
inline void Read(long long &x1, long long &x2, long long &x3) {
x1 = In.Readll();
x2 = In.Readll();
x3 = In.Readll();
}
inline void Read(long long &x1, long long &x2, long long &x3, long long &x4) {
x1 = In.Readll();
x2 = In.Readll();
x3 = In.Readll();
x4 = In.Readll();
}
inline void FILEIO() {}
inline void FILEIO(string pname) {
freopen((pname + ".in").c_str(), "r", stdin);
freopen((pname + ".out").c_str(), "w", stdout);
}
void Printtime() {}
void END() {
Printtime();
exit(0);
}
template <typename T>
void END(T mes) {
cout << mes << endl;
END();
}
template <typename T>
void Print(T a[], int s, int t, char sp = ' ', char ed = '\n') {
for (int i = s; i <= t; i++) cout << a[i] << sp;
cout << ed;
cout.flush();
}
template <typename T>
void Print(T a, int s = 0, int t = -1, char sp = ' ', char ed = '\n') {
if (t == -1) t = a.size() - 1;
for (int i = s; i <= t; i++) cout << a[i] << sp;
cout << ed;
cout.flush();
}
int main() {
FILEIO();
int T;
Read(T);
;
for (register int(ti) = 1; (ti) <= (T); ++(ti)) {
long long l;
Read(l);
;
long long r;
Read(r);
;
;
long long d;
Read(d);
;
;
if (d < l)
cout << d << endl;
else {
cout << r / d * d + d << endl;
}
}
END();
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | # codeforces
def main():
a = []
for _ in range(int(input())):
a.append(list(map(int, input().split())))
for q in a:
l = q[0]
r = q[1]
d = q[2]
if d < l:
print(d)
else:
print(d*(int(r/d)+1))
if __name__ == "__main__":
main()
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.util.*;
public class Iot{
public static int recur(int l,int r,int d){
int k =1;
boolean p = true;
//System.out.println("d "+d);
while(p==true){
if(k>=l && k<=r){
k=r+1;
p=true;
}
else if(k<l || k>r){
if(k>r){
if(k%d==0){
p=false;
}
else{
k=k+d-(k%d);
p=false;
}
}
else {
if(k%d==0){
p=false;
}
else{
k=k+d-(k%d);
if(k<l || k>r){
p=false;
}
else{
p=true;
///k=k+1;
}
}
//k=k+d-(k%d);
}
//p=true;
}
//System.out.println(k);
}
return(k);
}
public static void main(String[] args){
Scanner in = new Scanner(System.in);
int n = in.nextInt();
int matr[][] = new int[n][3];
for(int i=0;i<n;i++){
//String temp = in.next();
//ch arr[] = new char[3] ;
//arr = temp.split(" ");
//arr = new char[3];
for(int j=0;j<3;j++){
matr[i][j]=in.nextInt();
}
}
for(int i=0;i<n;i++){
int g = recur(matr[i][0],matr[i][1],matr[i][2]);
System.out.println(g);
}
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
int main() {
int l, r, n, t;
scanf("%d", &t);
while (t--) {
scanf("%d %d %d", &l, &r, &n);
if (l > n) {
printf("%d\n", n);
continue;
}
long long k = r / n;
printf("%lld\n", (k + 1) * n);
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q = int(input())
for i in range(q):
l, r, d = map(int, input().split())
if(d < l or d > r):
print(d)
else:
print((d*(r//d))+d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
int main() {
int a, b, c;
int t;
scanf("%d", &t);
while (t--) {
scanf("%d%d%d", &a, &b, &c);
if (a > c)
printf("%d\n", c);
else {
printf("%d\n", ((b / c) + 1) * c);
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | x = int(input())
def my_function(x, y, z):
returnable = z
if(z < x or z > y):
return returnable
else:
returnable = y - (y % z)
return returnable + z
while(x > 0):
x -= 1
querie = list(map(int, input().split()))
print(my_function(querie[0], querie[1], querie[2]))
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in range(int(input())):
left, right, d = map(int, input().split())
print(d if left > d else (right // d + 1) * d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for z in range(int(input())):
l, r, d = map(int, input().split())
if d < l:
print(d)
elif d > r:
print(d)
else:
if r // d == r / d:
print(((r//d)+1)*d)
else:
print((r//d)*d + d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java |
import java.util.Scanner;
public class MinimalNumber {
public static void main(String[] args) {
Scanner in = new Scanner(System.in);
int n = in.nextInt();
int res[] = new int[n];
for(int i = 0; i < n; i++) {
int a = in.nextInt();
int b = in.nextInt();
int c = in.nextInt();
if(a > c) {
res[i] = c;
}
else {
res[i] = (int) (c * Math.ceil(b / c)) + c;
}
}
for(int i = 0; i < n; i++) {
System.out.println(res[i]);
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int a, b, c, q;
cin >> q;
for (int i = 0; i < q; i++) {
cin >> a >> b >> c;
if (c < a) {
cout << c << endl;
} else if (a <= c && c <= b) {
cout << ((b / c) + 1) * c << endl;
} else
cout << c << endl;
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import math
n=int(input())
for i in range(0,n):
x,y,z=map(int,input().split())
# print(x,y,z)
#print(x/z)
if z<x:
print(z)
else:
if y%z==0:
print(y+z)
else:
print((y//z)*z+z)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int q, l, r, d;
cin >> q;
for (int i = 0; i < q; ++i) {
cin >> l >> r >> d;
if (d >= l && d <= r) {
cout << d - (r % d) + r << endl;
} else {
cout << d << endl;
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in range(int(input())):
l,r,d = map(int,input().split())
if d < l or d > r:
print(d)
else:
print(((r // d) + 1) * d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | t=int(input())
for i in range(t):
l,r,d=map(int,input().split())
if d<l or d>r:
print(d)
else:
print((r // d) * d + d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
const int N = 3e5 + 7;
int main() {
int q;
cin >> q;
while (q--) {
long long l, r, d;
cin >> l >> r >> d;
if (d < l) {
cout << d << endl;
} else {
cout << (r / d + 1) * d << endl;
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | /*Author: Satyajeet Singh*/
import java.io.*;
import java.util.*;
import java.text.*;
import java.lang.*;
public class Main {
static PrintWriter out=new PrintWriter(new OutputStreamWriter(System.out));
static BufferedReader br = new BufferedReader(new InputStreamReader(System.in));
public static void main (String[] args) throws Exception {
/****************************************Solutions Begins***************************************************/
String st[]=br.readLine().split(" ");
int q=Integer.parseInt(st[0]);
for(int i1=0;i1<q;i1++){
st=br.readLine().split(" ");
long l=Long.parseLong(st[0]);
long r=Long.parseLong(st[1]);
long d=Long.parseLong(st[2]);
if(d<l){
out.println(d);
continue;
}
long m2=r%d;
long a2=r-m2+d;
out.println(a2);
}
/****************************************Solutions Ends*****************************************************/
out.flush();
out.close();
}
/****************************************Template Begins***************************************************/
static class PairCompL implements Comparator<Pairl>{
public int compare(Pairl p1,Pairl p2){
if(p1.v>p2.v){
return 1;
}
else if(p1.v<p2.v){
return -1;
}
else{
return 0;
}
}
}
static class PairComp implements Comparator<Pair>{
public int compare(Pair p1,Pair p2){
if(p1.u>p2.u){
return 1;
}
else if(p1.u<p2.u){
return -1;
}
else{
return 0;
}
}
}
static class Pair implements Comparable<Pair> {
int u;
int v;
int index=-1;
public Pair(int u, int v) {
this.u = u;
this.v = v;
}
public int hashCode() {
int hu = (int) (u ^ (u >>> 32));
int hv = (int) (v ^ (v >>> 32));
return 31 * hu + hv;
}
public boolean equals(Object o) {
Pair other = (Pair) o;
return u == other.u && v == other.v;
}
public int compareTo(Pair other) {
if(index!=other.index)
return Long.compare(index, other.index);
return Long.compare(v, other.v)!=0?Long.compare(v, other.v):Long.compare(u, other.u);
}
public String toString() {
return "[u=" + u + ", v=" + v + "]";
}
}
static class Pairl implements Comparable<Pair> {
long u;
long v;
int index=-1;
public Pairl(long u, long v) {
this.u = u;
this.v = v;
}
public int hashCode() {
int hu = (int) (u ^ (u >>> 32));
int hv = (int) (v ^ (v >>> 32));
return 31 * hu + hv;
}
public boolean equals(Object o) {
Pair other = (Pair) o;
return u == other.u && v == other.v;
}
public int compareTo(Pair other) {
if(index!=other.index)
return Long.compare(index, other.index);
return Long.compare(v, other.v)!=0?Long.compare(v, other.v):Long.compare(u, other.u);
}
public String toString() {
return "[u=" + u + ", v=" + v + "]";
}
}
public static void debug(Object... o) {
System.out.println(Arrays.deepToString(o));
}
static long modulo(long a,long b,long c) {
long x=1;
long y=a;
while(b > 0){
if(b%2 == 1){
x=(x*y)%c;
}
y = (y*y)%c; // squaring the base
b /= 2;
}
return x%c;
}
static long gcd(long x, long y)
{
if(x==0)
return y;
if(y==0)
return x;
long r=0, a, b;
a = (x > y) ? x : y; // a is greater number
b = (x < y) ? x : y; // b is smaller number
r = b;
while(a % b != 0)
{
r = a % b;
a = b;
b = r;
}
return r;
}
}
/*******************************************************End***********************************************************/ |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q=int(input())
for i in range(q):
l,r,d=map(int,input().split())
if l%d==0:
a=(l//d)-1
else:
a=l//d
b=(r//d)+1
if a==0:
print(b*d)
else:
print(d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
bool isVowel(char c) {
if (c != 'a' && c != 'o' && c != 'u' && c != 'e' && c != 'i') {
return false;
} else {
return true;
}
}
bool isConst(char c) {
if (c != 'a' && c != 'o' && c != 'u' && c != 'e' && c != 'i') {
return true;
} else {
return false;
}
}
int main() {
int t;
cin >> t;
while (t--) {
long long a, b, c;
cin >> a >> b >> c;
if (a > c) {
cout << c << "\n";
continue;
}
if (c > b) {
cout << c << "\n";
continue;
}
if (c == 1) {
cout << b + 1 << "\n";
} else {
cout << (c * (b / c)) + c << "\n";
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.io.OutputStream;
import java.io.IOException;
import java.io.InputStream;
import java.io.PrintWriter;
import java.io.PrintStream;
import java.util.Scanner;
/**
* Built using CHelper plug-in
* Actual solution is at the top
*
* @author vinrar
*/
public class Main {
public static void main(String[] args) {
InputStream inputStream = System.in;
OutputStream outputStream = System.out;
Scanner in = new Scanner(inputStream);
PrintWriter out = new PrintWriter(outputStream);
AMinimumInteger solver = new AMinimumInteger();
solver.solve(1, in, out);
out.close();
}
static class AMinimumInteger {
public void solve(int testNumber, Scanner in, PrintWriter out) {
int tc = in.nextInt();
while (tc-- > 0) {
int l = in.nextInt();
int r = in.nextInt();
int d = in.nextInt();
if (d < l || d > r) {
System.out.println(d);
} else {
System.out.println(d * ((r / d) + 1));
}
}
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in range(int(input())):
l,r,d = list(map(int,input().split()))
print(d if d < l else (r // d + 1) * d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
ios::sync_with_stdio(0);
cin.tie(0);
cout.tie(0);
int t;
cin >> t;
while (t--) {
long long a, b, c;
cin >> a >> b >> c;
if (c < a) {
cout << c << "\n";
} else {
cout << (b / c + 1) * c << "\n";
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
long long l, r, x = 1, d;
int q;
cin >> q;
while (q--) {
long long i = l;
cin >> l >> r >> d;
if (l != d && l / d >= 1)
cout << d << endl;
else
cout << (r / d + 1) * d << endl;
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import math
t=int(input())
for i in range(t):
l,r,d = map(int, input().strip().split(' '))
k=d
while(True):
if k%d==0 and (k<l or k>r):
print(k)
break
else:
j=r-(k)
m=math.ceil(j/d)
k=(m+1)*d
if k==r:
print(k+d)
break
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.io.*;
import java.lang.*;
import java.util.*;
import java.math.*;
public class Solution
{
public static void main(String args[])
{
Scanner sc = new Scanner(System.in);
int q = sc.nextInt();
for(int i=0; i<q ;i++)
{
int l = sc.nextInt();
int r = sc.nextInt();
int d = sc.nextInt();
if(d<l)
System.out.println(d);
else
{
int k = (r/d)+1;
System.out.println((int)k*d);
}
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int t;
cin >> t;
while (t--) {
int l, r, d;
cin >> l >> r >> d;
if (d < l) {
cout << d << endl;
} else {
cout << (r / d + 1) * d << endl;
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | /* package codechef; // don't place package name! */
import java.util.*;
import java.lang.*;
import java.io.*;
/* Name of the class has to be "Main" only if the class is public. */
public class Codechef
{
public static void main (String[] args) throws java.lang.Exception
{
BufferedReader bf = new BufferedReader(new InputStreamReader(System.in));
int t=Integer.parseInt(bf.readLine());
while(t-->0)
{
String []s=bf.readLine().split(" ");
int l=Integer.parseInt(s[0]);
int r=Integer.parseInt(s[1]);
int d=Integer.parseInt(s[2]);
int p=(l/d)*d;
int q=(r/d)*d;
if(p!=l && p>0)
{
System.out.println(Math.min(p,d));
}
else if(p==l && p-d>0)
{
System.out.println(Math.min(p-d,d));
}
else
{
System.out.println(q+d);
}
}
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | r=[]
for _ in range(int(input())):
a,b,c=list(map(int,input().split()))
if c>=a:
r.append(b+c-(b)%c)
else:
r.append(c)
for i in r:
print(i)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in range(int(input())):
l,r,d=map(int,input().split())
if d<l:print(d)
else:print((r//d+1)*d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.util.Scanner;
public class JavaApplication61 {
public static void main(String[] args) {
Scanner input=new Scanner(System.in);
int n=input.nextInt();
for(int i=0;i<n;i++){
int l=input.nextInt();
int r=input.nextInt();
int d=input.nextInt();
System.out.println(method(l, r, d));
}
}
public static int method(int l,int r,int d){
int x=d;
if(x>=l && x<=r){
x=r+d;
x=x-(x%d);
}
return x;
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | a=int(input())
res=0
j=[]
for i in range(0,a):
x,y,z=list(map(int,input().split()))
if z<x or z>y:
res=z
else:
res=(((y//z)+1)*z)
j.append(res)
print(*j,sep="\n") |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.util.Scanner;
public class Minimum_Integer {
public static void main(String[] args) {
Scanner in=new Scanner(System.in);
int q=in.nextInt();
while (q!=0){
long l=in.nextLong();
long r=in.nextLong();
long d=in.nextLong();
System.out.println(d<l?d:(long)((r/d+1)*d));
q--;
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in [0] * int(input()):
l, r, d = map(int, input().split())
print(d if l > d else (r // d + 1) * d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python2 | for i in xrange(input()):
l,r,d = map(int, raw_input().split())
if d < l or d > r:
print d
else:
print d*(1 + r/d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in range(int(input())):
l, r, d = map(int, input().split())
if l <= d <= r:
print((r // d + 1)*d)
else:
print(d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.io.*;
import java.util.*;
import java.math.*;
import java.lang.*;
import static java.lang.Math.*;
public class fast implements Runnable {
static class InputReader {
private InputStream stream;
private byte[] buf = new byte[1024];
private int curChar;
private int numChars;
private SpaceCharFilter filter;
private BufferedReader br = new BufferedReader(new InputStreamReader(System.in));
public InputReader(InputStream stream) {
this.stream = stream;
}
public int read() {
if (numChars==-1)
throw new InputMismatchException();
if (curChar >= numChars) {
curChar = 0;
try {
numChars = stream.read(buf);
}
catch (IOException e) {
throw new InputMismatchException();
}
if(numChars <= 0)
return -1;
}
return buf[curChar++];
}
public String nextLine() {
String str = "";
try {
str = br.readLine();
}
catch (IOException e) {
e.printStackTrace();
}
return str;
}
public int nextInt() {
int c = read();
while(isSpaceChar(c))
c = read();
int sgn = 1;
if (c == '-') {
sgn = -1;
c = read();
}
int res = 0;
do {
if(c<'0'||c>'9')
throw new InputMismatchException();
res *= 10;
res += c - '0';
c = read();
}
while (!isSpaceChar(c));
return res * sgn;
}
public long nextLong() {
int c = read();
while (isSpaceChar(c))
c = read();
int sgn = 1;
if (c == '-') {
sgn = -1;
c = read();
}
long res = 0;
do {
if (c < '0' || c > '9')
throw new InputMismatchException();
res *= 10;
res += c - '0';
c = read();
}
while (!isSpaceChar(c));
return res * sgn;
}
public double nextDouble() {
int c = read();
while (isSpaceChar(c))
c = read();
int sgn = 1;
if (c == '-') {
sgn = -1;
c = read();
}
double res = 0;
while (!isSpaceChar(c) && c != '.') {
if (c == 'e' || c == 'E')
return res * Math.pow(10, nextInt());
if (c < '0' || c > '9')
throw new InputMismatchException();
res *= 10;
res += c - '0';
c = read();
}
if (c == '.') {
c = read();
double m = 1;
while (!isSpaceChar(c)) {
if (c == 'e' || c == 'E')
return res * Math.pow(10, nextInt());
if (c < '0' || c > '9')
throw new InputMismatchException();
m /= 10;
res += (c - '0') * m;
c = read();
}
}
return res * sgn;
}
public String readString() {
int c = read();
while (isSpaceChar(c))
c = read();
StringBuilder res = new StringBuilder();
do {
res.appendCodePoint(c);
c = read();
}
while (!isSpaceChar(c));
return res.toString();
}
public boolean isSpaceChar(int c) {
if (filter != null)
return filter.isSpaceChar(c);
return c == ' ' || c == '\n' || c == '\r' || c == '\t' || c == -1;
}
public String next() {
return readString();
}
public interface SpaceCharFilter {
public boolean isSpaceChar(int ch);
}
}
class pair implements Comparable<pair>{
int x;
int y;
pair(int xi, int yi){
x=xi;
y=yi;
}
@Override
public int compareTo(pair other){
int sum1=this.x+this.y, sum2=other.x+other.y;
if(sum1>sum2){ return 1;}
else if(sum1<sum2){ return -1; }
else if(this.x>other.x){ return 1; }
return 0;
}
}
class dist{
int x;
int y;
int d;
dist(int xi, int yi, int di){
x=xi;
y=yi;
d=di;
}
}
public static void main(String args[]) throws Exception {
new Thread(null, new fast(),"fast",1<<26).start();
}
public void sortbyColumn(int arr[][], final int col){
// Using built-in sort function Arrays.sort
Arrays.sort(arr, new Comparator<int[]>() {
@Override
// Compare values according to columns
public int compare(final int[] entry1,
final int[] entry2) {
// To sort in descending order revert
// the '>' Operator
if (entry1[col] > entry2[col])
return 1;
else if(entry1[col] < entry2[col])
return -1;
return 0;
}
}); // End of function call sort().
}
public void sortbyColumn(long arr[][], final int col){
// Using built-in sort function Arrays.sort
Arrays.sort(arr, new Comparator<long[]>() {
@Override
// Compare values according to columns
public int compare(final long[] entry1,
final long[] entry2) {
// To sort in descending order revert
// the '>' Operator
if (entry1[col] > entry2[col])
return 1;
else if(entry1[col] < entry2[col])
return -1;
return 0;
}
}); // End of function call sort().
}
long power(long x, long y, long p){
long res = 1;
x = x % p;
while (y > 0)
{
if((y & 1)==1)
res = (res * x) % p;
y = y >> 1;
x = (x * x) % p;
}
return res;
}
long ncr(int n, int r, long p){
long C[]=new long[r+1];
C[0] = 1;
for (int i = 1; i <= n; i++)
{
for (int j = Math.min(i, r); j > 0; j--)
C[j] = (C[j] + C[j-1])%p;
}
return C[r];
}
long gcd(long a,long b){
if(b%a==0){return a;}
else{return gcd(b%a,a);}
}
public void run(){
InputReader s = new InputReader(System.in);
PrintWriter w = new PrintWriter(System.out);
int t=s.nextInt();
while(t-->0){
long l=s.nextLong(),r=s.nextLong(),d=s.nextLong();
if(l>d){
w.println(d);
}
else{
w.println((r/d)*d+d);
}
}
w.close();
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | # import sys
# sys.stdin = open("test.in","r")
# sys.stdout = open("test.out.py","w")
for _ in range(int(input())):
l,r,d=map(int,input().split())
if d<l:
print(d)
else:
x=r//d
print((x+1)*d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n = int(input())
for i in range(n):
l, r, d = map(int, input().split())
if r < 0:
print(d)
continue
elif l > d:
print(d)
continue
else:
if r % d == 0:
print(r + d)
continue
else:
print(r // d * d + d)
continue
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | T = int(input())
for cas in range(T):
l, r, d = map(int, input().split())
if l > d:
print(d)
else:
print(r // d * d + d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | """
Author: Ove Bepari
_nnnn_
dGGGGMMb ,''''''''''''''''''''''.
@p~qp~~qMb | Promoting GNU/Linux |
M|@||@) M| _;......................'
@,----.JM| -'
JS^\__/ qKL
dZP qKRb
dZP qKKb
fZP SMMb
HZM MMMM
FqM MMMM
__| ". |\dS"qML
| `. | `' \Zq
_) \.___.,| .'
\____ )MMMMMM| .'
`-' `--' hjm
"""
for _ in range(int(input())):
l, r, d = map(int, input().split())
print((((r//d)+1)*d,d)[d<l])
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 |
t = int(input())
for i in range(t):
l,r,d = list(map(int, input().split()))
if d<l:
print(d)
elif d>r:
print(d)
else:
print(((r)//d+1)*d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | def number_list(): return list(map(int, input().split()))
def arr2d(rows, cols, v=0): return [
[v for i in range(cols)] for _ in range(rows)]
t = int(input())
for tt in range(t):
l, r, d = number_list()
ans = 0
if d < l or d > r:
ans = d
else:
res = max(r, d) % min(r, d)
# print("res = " + str(res))
if res == 0:
ans = d + r
else:
ans = r + ( d - r % d )
print(ans)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | from sys import stdin, stdout
q=int(stdin.readline())
for i in range(q):
[l,r,d]=[int(x) for x in stdin.readline().split()]
cof=d
while True:
if (d>0 and d<l) or (d>r):
stdout.write(str(d)+'\n')
break
else:
stdout.write(str(d*((r//d)+1))+'\n')
break
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int n, li, ri, di;
int main() {
while (cin >> n) {
while (n--) {
scanf("%d %d %d", &li, &ri, &di);
int x = (li - 1) / di;
if (x > 0) {
cout << di << endl;
} else {
x = ceil((double)(ri + 1) / di);
cout << 1LL * di * x << endl;
}
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n = int(input())
for i in range(n):
a = list(map(int, input().split()))
count = 1
if a[2] < a[0] or a[2] > a[1]:
print( a[2])
else:
print( (int(a[1]/a[2]) + 1) *a[2]) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int t;
cin >> t;
while (t--) {
int l, r, d;
cin >> l >> r >> d;
if (l <= d) {
int a = d - r % d;
cout << r + a << endl;
} else {
cout << d << endl;
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | def doit(d):
if(d<l):
return d
else:
if(r%d==0):
return r+d
else:
return r+d-r%d
q=int(input())
for t in range(q):
[l,r,d]=[int(i) for i in input().split()]
print(doit(d)) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | t=int(input())
for _ in range(t):
l,r,d=map(int,input().split())
if(l>d):
print(d)
else:
print(((r//d)+1)*d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | x=int(input())
l=[]
for i in range(x):
l.append(list(map(int,input().split())))
for i in l:
if (i[0]-1)/i[2]>=1:
print(i[2])
elif (i[1]+1)/i[2]<=1:
print(i[2])
else:
print((i[1]//i[2]+1)*i[2])
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
int main() {
int l, r, d, x;
int i, n;
scanf("%d", &n);
for (i = 1; i <= n; i++) {
scanf("\n%d %d %d", &l, &r, &d);
if (d < l)
printf("%d\n", d);
else {
x = r + 1;
if (x % d == 0)
printf("%d\n", x);
else
printf("%d\n", ((r / d) + 1) * d);
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | from math import ceil
q = int(input())
for i in range(q):
l, r, d = list(map(int, input().split()))
x = d
y = (r // d +1)* d
s = min(x,y)
if s >= l:
print(max(x,y))
else:
print(s) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.io.*;
import java.util.*;
public class ProgEc {
public static void main(String[] args) throws Exception {
//FileInputStream inputStream = new FileInputStream("input.txt");
//FileOutputStream outputStream = new FileOutputStream("output.txt");
InputStream inputStream = System.in;
OutputStream outputStream = System.out;
InputReader in = new InputReader(inputStream);
PrintWriter out = new PrintWriter(outputStream);
Solver solver = new Solver();
solver.solve(1, in, out);
out.close();
}
static class Solver {
public void solve(int testNumber, InputReader in, PrintWriter out) {
int n = in.nextInt();
for (int i = 0; i < n; i++) {
long l = in.nextLong();
long r = in.nextLong();
long d = in.nextLong();
if (d < l || d > r) { out. println(d); continue; }
long k = r/d;
out.println(d*(k+1));
}
}
}
static class InputReader {
public BufferedReader reader;
public StringTokenizer tokenizer;
public InputReader(InputStream stream) {
reader = new BufferedReader(new InputStreamReader(stream), 32768);
tokenizer = null;
}
public String next() {
while(tokenizer == null || !tokenizer.hasMoreTokens()) {
try {
tokenizer = new StringTokenizer(reader.readLine());
} catch (IOException e) {
throw new RuntimeException (e);
}
}
return tokenizer.nextToken();
}
public int nextInt() {
return Integer.parseInt(next());
}
public long nextLong() {
return Long.parseLong(next());
}
public double nextDouble() {
return Double.parseDouble(next());
}
public float nextFloat() {
return Float.parseFloat(next());
}
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q = int(input())
for _ in range(q):
l, r, d = list(map(int, input().split()))
if l > d:
print(d)
else:
print((r // d + 1) * d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
ios_base::sync_with_stdio(false);
cin.tie(nullptr);
cout.tie(nullptr);
int q, l, r, d, n;
cin >> q;
while (q-- > 0) {
cin >> l >> r >> d;
if (d < l)
cout << d << "\n";
else
cout << r - (r % d) + d << "\n";
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import math,string,itertools,fractions,heapq,collections,re,array,bisect,sys,random,time,copy,functools
sys.setrecursionlimit(10**7)
inf = 10**20
eps = 1.0 / 10**10
mod = 10**9+7
dd = [(-1,0),(0,1),(1,0),(0,-1)]
ddn = [(-1,0),(-1,1),(0,1),(1,1),(1,0),(1,-1),(0,-1),(-1,-1)]
def LI(): return [int(x) for x in sys.stdin.readline().split()]
def LI_(): return [int(x)-1 for x in sys.stdin.readline().split()]
def LF(): return [float(x) for x in sys.stdin.readline().split()]
def LS(): return sys.stdin.readline().split()
def I(): return int(sys.stdin.readline())
def F(): return float(sys.stdin.readline())
def S(): return input()
def pf(s): return print(s, flush=True)
def main():
n = I()
aa = [LI() for _ in range(n)]
rr = []
for l,r,d in aa:
if d < l:
rr.append(d)
else:
rr.append(r - r%d + d)
return '\n'.join(map(str, rr))
print(main())
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | for i in range(int(input())):
l , r , d = map(int,input().split())
if d<l:
print(d)
else:
a = r//d
print((a+1)*d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int q;
cin >> q;
int l[501], r[501], d[501], ans[501];
for (int i = 0; i < q; i++) {
cin >> l[i] >> r[i] >> d[i];
if (l[i] > d[i] || r[i] < d[i])
ans[i] = d[i];
else
ans[i] = (r[i] / d[i] + 1) * d[i];
}
for (int i = 0; i < q; i++) cout << ans[i] << endl;
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.util.*;
import java.io.*;
import java.util.regex.*;
public class Codeforces{
static class MyScanner{
BufferedReader br;
StringTokenizer st;
MyScanner(FileReader fileReader){
br = new BufferedReader(fileReader);
}
MyScanner(){
br = new BufferedReader(new InputStreamReader(System.in));
}
String nn(){
while(st == null || !st.hasMoreElements()){
try{
st = new StringTokenizer(br.readLine());
}catch(IOException e){
e.printStackTrace();
}
}
return st.nextToken();
}
int ni(){
return Integer.parseInt(nn());
}
long nl(){
return Long.parseLong(nn());
}
double nd(){
return Double.parseDouble(nn());
}
}
private static PrintWriter out;
public static void main(String[] args) throws FileNotFoundException{
// Input from file
// File inputFile = new File("JavaFile.txt");
// File outputFile = new File("JavaOutputFile.txt");
// FileReader fileReader = new FileReader(inputFile);
// Here it ends
MyScanner sc = new MyScanner();
// MyScanner sc = new MyScanner(fileReader);
out = new PrintWriter(new BufferedOutputStream(System.out)); // Output to console
// out = new PrintWriter(new PrintStream(outputFile)); // Output to file
getAns(sc);
out.close();
}
private static void getAns(MyScanner sc){
int q = sc.ni();
while(q-- > 0){
long l = sc.nl(), r = sc.nl(), d = sc.nl();
if(d < l) out.println(d);
else out.println((r / d + 1) * d);
}
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import com.sun.org.apache.xalan.internal.xslt.Process;
import java.io.*;
import java.util.*;
public class main {
public static void main(String[] args) throws IOException {
init();//"prizes.in", "prizes.out");
int q = nextInt();
for (int i = 0; i < q; i++) {
long l = nextLong();
long r = nextLong();
long d = nextLong();
long minRight = 0;
long minLeft = 0;
if (r % d == 0) {
minRight = r + d;
} else if (r % d != 0) {
if (d > r) {
minRight = d;
} else {
minRight = r + d - (r % d);
}
}
if (d > l) {
minLeft = -1;
} else {
if (l % d == 0) {
if (l / d <= 1) minLeft = -1;
else minLeft = l - d * (l / d - 1);
} else {
minLeft = l - (l % d) - d * (l / d - 1);
}
}
if (minLeft != -1) pw.println(minLeft);
else pw.println(minRight);
}
pw.close();
}
static StringTokenizer st;
static BufferedReader sc;
static PrintWriter pw;
static String next() throws IOException {
while (st == null || !st.hasMoreElements()) {
st = new StringTokenizer(sc.readLine());
}
return st.nextToken();
}
static int nextInt() throws IOException {
return Integer.parseInt(next());
}
static long nextLong() throws IOException {
return Long.parseLong(next());
}
static void init(String in, String out) throws IOException {
sc = new BufferedReader(new FileReader(in));
pw = new PrintWriter(out);
}
static void init() {
sc = new BufferedReader(new InputStreamReader(System.in));
pw = new PrintWriter(System.out);
}
}
class DSU {
int parent[];
public DSU(int n){
parent = new int[n];
for (int i = 0; i < n; i++) {
parent[i] = i;
}
}
int get(int i){
if (i == parent[i]){
return i;
}
int p = get(parent[i]);
parent[i] = p;
return p;
}
boolean union(int a, int b){
a = get(a);
b = get(b);
if (a == b) return false;
parent[a] = b;
return true;
}
}
class Graph{
int to;
int w;
public Graph(int to, int w){
this.to = to;
this.w = w;
}
}
class Sorted implements Comparator<Graph> {
@Override
public int compare(Graph o1, Graph o2) {
return Integer.compare(o1.w, o2.w);
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int t;
cin >> t;
for (int t1 = 0; t1 < t; t1++) {
int l, r, d;
int min = 1000000000;
cin >> l >> r >> d;
min = (d < l) ? d : r / d * d + d;
cout << min << endl;
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python2 | from math import *
q=int(raw_input())
while(q!=0):
q=q-1
l,r,d=map(int,raw_input().split())
x1=ceil(float(l)/d)
x2=floor(float(r)/d)
if(x1>1):
print int(d*1)
else:
print int(d*(x2+1))
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
int main() {
long int a, b, c, d, ans;
int T, i;
scanf("%d", &T);
for (i = 1; i <= T; i++) {
scanf("%ld %ld %ld", &a, &b, &c);
if (a > c) {
printf("%ld\n", c);
} else {
d = b / c;
d = d + 1;
ans = c * d;
printf("%ld\n", ans);
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n = int(input())
for _ in range(n):
l,r,d = map(int,input().split())
if(d<l):
print(d)
else:
k = (r%d==0) and d or d-r%d
print(r+k) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | #codeforces_1101A
gi = lambda : list(map(int,input().split()))
for k in range(gi()[0]):
l,r,d = gi()
if l <= d <= r:
ans = (r//d)*d
if r%d or (r//d)*d == r: ans += d
else:
ans = d
print(ans) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q=int(input())
while q>0:
l,r,d=input().split(" ")
l=int(l)
r=int(r)
d=int(d)
if d<l:
print(d)
else:
print((int(r/d)+1)*d)
q-=1 |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | z=input
mod = 10**9 + 7
from collections import *
from queue import *
from sys import *
from collections import *
from math import *
from heapq import *
from itertools import *
from bisect import *
from collections import Counter as cc
from math import factorial as f
def lcd(xnum1,xnum2):
return (xnum1*xnum2//gcd(xnum1,xnum2))
################################################################################
"""
n=int(z())
for _ in range(int(z())):
x=int(z())
l=list(map(int,z().split()))
n=int(z())
l=sorted(list(map(int,z().split())))[::-1]
a,b=map(int,z().split())
l=set(map(int,z().split()))
led=(6,2,5,5,4,5,6,3,7,6)
vowel={'a':0,'e':0,'i':0,'o':0,'u':0}
color-4=["G", "GB", "YGB", "YGBI", "OYGBI" ,"OYGBIV",'ROYGBIV' ]
"""
###########################---START-CODING---###############################################
for _ in range(int(z())):
a,b,c=map(int,z().split())
if c<a or c>b:
print(c)
continue
print(b+(c-(b%c)))
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n=int(input())
for q in range(n):
j,k,l=list(map(int,input().split()))
if j>l:
print(l)
else:
d=k//l
s=l*d
while s<k:
s+=l
if s==k:
s+=l
print(s)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.util.Arrays;
import java.util.Collections;
import java.util.List;
import java.util.Scanner;
/**
* @author: zhaoqing
* @date: 2018/9/9
* @time: δΈε9:37
*/
public class MinimumInteger1101A {
public static void main(String[] args) {
Scanner sc = new Scanner(System.in);
int q=sc.nextInt();
for(int i=0;i<q;i++){
int l=sc.nextInt();
int r=sc.nextInt();
int d=sc.nextInt();
if((d>=l) && (d<=r)){
System.out.println(d*(r/d+1));
}else {
System.out.println(d);
}
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n=int(input())
for i in range(n):
a,b,c=map(int,input().split())
if a>c:
print(c)
else:
print(b-b%c+c)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | from math import ceil
n=int(input())
for _ in range(n):
l,r,d=map(int,input().split())
if d<l or d>r:
print(d)
else:
print(d*int(ceil((r+1)/d)))
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int q;
cin >> q;
for (; q > 0; q--) {
int l, r, d;
cin >> l >> r >> d;
if (d < l)
cout << d << endl;
else {
l = r - (r % d) + d;
cout << l << endl;
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n=int(input())
for i in range(n):
(l,r,d)=input().split(" ")
(l,r,d)=(int(l),int(r),int(d))
checker=True
fac=1
if(r>=d>=l):
print(d*(int(r/d)+1))
else:
print(d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | #JMD
#Nagendra Jha-4096
import sys
import math
#import fractions
#import numpy
###File Operations###
fileoperation=0
if(fileoperation):
orig_stdout = sys.stdout
orig_stdin = sys.stdin
inputfile = open('W:/Competitive Programming/input.txt', 'r')
outputfile = open('W:/Competitive Programming/output.txt', 'w')
sys.stdin = inputfile
sys.stdout = outputfile
###Defines...###
mod=1000000007
###FUF's...###
def nospace(l):
ans=''.join(str(i) for i in l)
return ans
##### Main ####
t=int(input())
for tt in range(t):
l,r,d= map(int, sys.stdin.readline().split(' '))
v2=(r//d)
v2+=1
if(d<l or d>r):
print(d)
else:
print(v2*d)
#a=list(map(int,sys.stdin.readline().split(' ')))
#####File Operations#####
if(fileoperation):
sys.stdout = orig_stdout
sys.stdin = orig_stdin
inputfile.close()
outputfile.close() |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int q, i, l, r, d;
cin >> q;
for (i = 0; i < q; i++) {
cin >> l >> r >> d;
int x = r / d;
if ((d * 1) < l)
cout << d * 1 << endl;
else if ((x * d) <= r)
cout << ((x + 1) * d) << endl;
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 |
for i in range(int(input())):
a = [int(a) for a in input().split()]
j = 1
if a[2] < a[0] or a[2] > a[1]:
print(a[2])
else:
print((a[1] // a[2]) * a[2] + a[2]) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import os
import sys
from io import BytesIO, IOBase
from collections import defaultdict, deque, Counter, OrderedDict
import threading
def main():
for _ in range(int(input())):
l,r,d=map(int,input().split())
if d < l: print(d)
else:print((r//d+1)*d)
BUFSIZE = 8192
class FastIO(IOBase):
newlines = 0
def __init__(self, file):
self._fd = file.fileno()
self.buffer = BytesIO()
self.writable = "x" in file.mode or "r" not in file.mode
self.write = self.buffer.write if self.writable else None
def read(self):
while True:
b = os.read(self._fd, max(os.fstat(self._fd).st_size, BUFSIZE))
if not b:
break
ptr = self.buffer.tell()
self.buffer.seek(0, 2), self.buffer.write(b), self.buffer.seek(ptr)
self.newlines = 0
return self.buffer.read()
def readline(self):
while self.newlines == 0:
b = os.read(self._fd, max(os.fstat(self._fd).st_size, BUFSIZE))
self.newlines = b.count(b"\n") + (not b)
ptr = self.buffer.tell()
self.buffer.seek(0, 2), self.buffer.write(b), self.buffer.seek(ptr)
self.newlines -= 1
return self.buffer.readline()
def flush(self):
if self.writable:
os.write(self._fd, self.buffer.getvalue())
self.buffer.truncate(0), self.buffer.seek(0)
class IOWrapper(IOBase):
def __init__(self, file):
self.buffer = FastIO(file)
self.flush = self.buffer.flush
self.writable = self.buffer.writable
self.write = lambda s: self.buffer.write(s.encode("ascii"))
self.read = lambda: self.buffer.read().decode("ascii")
self.readline = lambda: self.buffer.readline().decode("ascii")
sys.stdin, sys.stdout = IOWrapper(sys.stdin), IOWrapper(sys.stdout)
input = lambda: sys.stdin.readline().rstrip("\r\n")
# endregion
if __name__ == "__main__":
"""sys.setrecursionlimit(400000)
threading.stack_size(40960000)
thread = threading.Thread(target=main)
thread.start()"""
main() |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | var q = readline()
for(var i=0; i<q; i++) {
line = readline().split(" ").map(Number)
l = line[0]
r = line[1]
d = line[2]
if(d < l || d > r) {
print(d)
} else {
print((Math.floor(r/d) + 1) * d)
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q=int(input())
for i in range(q):
l,r,d=map(int,input().split())
if d<l:
print(d)
else:
print(r//d*d+d)
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java | import java.io.*;
import java.util.*;
public class Main {
public void solve() {
int q = ni();
for (int i = 0; i < q; i++) {
int l = ni();
int r = ni();
int d = ni();
if ((l > d) || (r < d)) {
write(d + "\n");
} else {
int k = r / d;
if (k * d <= r) {
k++;
}
write(k * d + "\n");
}
}
}
public static void main(String[] args) {
Main m = new Main();
m.solve();
try {
m.out.close();
} catch (IOException e) {}
}
BufferedReader in;
BufferedWriter out;
StringTokenizer tokenizer;
public Main() {
in = new BufferedReader(new InputStreamReader(System.in));
out = new BufferedWriter(new OutputStreamWriter(System.out));
}
public String n() {
if (tokenizer == null || !tokenizer.hasMoreTokens()) {
try {
tokenizer = new StringTokenizer(in.readLine());
} catch (IOException e) {}
}
return tokenizer.nextToken();
}
public int ni() {
return Integer.parseInt(n());
}
public void write(String s) {
try {
out.write(s);
} catch (IOException e) {}
}
} |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | java |
import java.util.Scanner;
public class AAAA {
public static void main(String args[])
{
Scanner scan=new Scanner(System.in);
int n=scan.nextInt();
for(int i=0;i<n;i++)
{
int l=scan.nextInt();
int r=scan.nextInt();
int d=scan.nextInt();
if(d==l || d>r || (d>=l && d<=r))
{
int gg=r/d;
System.out.println(d*(gg+1));
}else if(d<l){
//searching form the left
System.out.println(d);
}
}
}
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import math
n = int(input())
while n:
l,r,d = list(map(int, input().split(" ")))
k1 = math.floor(r/d) + 1
k2 = math.ceil(l/d) - 1
if( d == 1 and l == 1):
print(1 + r)
else:
if(d < l):
print(d)
else:
if(k2 != 0):
print(k2*d)
else:
print(k1*d)
n = n - 1
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | import math
q=int(input())
for tt in range(q):
l,r,d=map(int,input().split())
if d==1:
if l>1:
print(1)
else:
print(r+1)
continue
if d>r:
print(d)
continue
if d<l:
print(d)
continue
if l>d:
xx=(r//d)
print(xx*d)
continue
yy=math.floor(l/d)
xx=math.ceil(r/d)
lx=yy*d
rx=xx*d
if lx==l:
lx=(yy-1)*d
if rx==r:
rx=(xx+1)*d
if lx<=0:
lx=1000000000000
print(min(lx,rx)) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int a;
scanf("%d", &a);
for (int rr = 1; rr <= a; rr++) {
int r1, r2, dig, res;
scanf("%d%d%d", &r1, &r2, &dig);
if (r1 > dig)
printf("%d\n", dig);
else {
res = ((r2 / dig) + 1) * dig;
printf("%d\n", res);
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | cpp | #include <bits/stdc++.h>
using namespace std;
int main() {
int t;
scanf("%d", &t);
while (t--) {
int a, b, d;
scanf("%d%d%d", &a, &b, &d);
if (d < a)
printf("%d\n", d);
else {
printf("%d\n", b + d - b % d);
}
}
return 0;
}
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | q=int(input())
while q>0:
l,r,d=map(int,input().split())
a=l/d
b=r/d
min=0
if a>1:
min=d
else:
min=(int(b)+1)*d
print(min)
q-=1
|
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n = int(input())
for i in range(n):
s = input().split(' ')
if int(s[2]) < int(s[0]):
print(int(s[2]))
else:
print(int(s[2]) * (int(s[1])//int(s[2]) + 1)) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | n = int(input())
for _ in range(n):
l, r, d = map(int, input().split())
if d < l:
print(d)
else:
i = max(r // d, 1)
while l <= i * d <= r:
i += 1
print(i * d) |
1101_A. Minimum Integer | You are given q queries in the following form:
Given three integers l_i, r_i and d_i, find minimum positive integer x_i such that it is divisible by d_i and it does not belong to the segment [l_i, r_i].
Can you answer all the queries?
Recall that a number x belongs to segment [l, r] if l β€ x β€ r.
Input
The first line contains one integer q (1 β€ q β€ 500) β the number of queries.
Then q lines follow, each containing a query given in the format l_i r_i d_i (1 β€ l_i β€ r_i β€ 10^9, 1 β€ d_i β€ 10^9). l_i, r_i and d_i are integers.
Output
For each query print one integer: the answer to this query.
Example
Input
5
2 4 2
5 10 4
3 10 1
1 2 3
4 6 5
Output
6
4
1
3
10 | {
"input": [
"5\n2 4 2\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n"
],
"output": [
"6\n4\n1\n3\n10\n"
]
} | {
"input": [
"20\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n1 1000000000 2\n",
"1\n78 79 79\n",
"1\n6 6 6\n",
"20\n1 1 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n1 999999999 1\n",
"1\n78 1000 1\n",
"1\n77 10000 1\n",
"20\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"10\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n78 80 1\n",
"20\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n1 1000000000 3\n",
"1\n1 1 123456789\n",
"1\n80 100 1\n",
"5\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n1000000000 1000000000 1\n",
"1\n78 10000 1\n",
"1\n79 80 100\n",
"5\n1 1000000000 1\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n1 999999999 2\n",
"1\n78 89 34\n",
"1\n1 1 1\n",
"1\n1 3 2\n",
"10\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n1 999999998 1\n",
"4\n1 999999999 1\n1 999999998 1\n1 999999997 1\n1 999999996 1\n",
"5\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"2\n1 1 2\n1 1 2\n",
"1\n80 100 80\n",
"25\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n1 1000000000 1\n1 1000000000 1000000000\n2 1000000000 1\n1 999999999 1000000000\n5 6 5\n",
"30\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"16\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n1 1000000000 1\n",
"1\n1 1000000000 6\n",
"1\n5 5 5\n",
"1\n2 5 6\n",
"8\n1 999999998 1\n1 999999997 1\n1 999999996 1\n1 999999995 1\n1 999999994 1\n1 999999993 1\n1 999999992 1\n1 999999991 1\n",
"5\n80 100 10\n5 10 4\n3 10 1\n1 2 3\n4 6 5\n",
"1\n1 1000000000 1017\n",
"1\n1 1000000000 2\n"
],
"output": [
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"158\n",
"12\n",
"2\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"1\n",
"1\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1\n",
"1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n1000000002\n",
"123456789\n",
"1\n",
"1\n1\n1\n1\n1\n",
"1\n",
"100\n",
"1000000001\n1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n1000000000\n",
"34\n",
"2\n",
"4\n",
"999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n999999999\n",
"1000000000\n999999999\n999999998\n999999997\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"2\n2\n",
"160\n",
"1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n1000000001\n2000000000\n1\n1000000000\n10\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n1000000001\n",
"1000000002\n",
"10\n",
"6\n",
"999999999\n999999998\n999999997\n999999996\n999999995\n999999994\n999999993\n999999992\n",
"10\n4\n1\n3\n10\n",
"1000000845\n",
"1000000002\n"
]
} | CORRECT | python3 | t = int(input())
for _ in range(t):
l,r,d = map(int,input().split())
if d>=l and d<=r:
print(((r//d)+1)*d)
else :
print(d) |
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