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\[|x+y| \geq|x|\]
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\[r= \sqrt{(x^{1})^{2}+(x^{2})^{2}+(x^{3})^{2}}\]
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\[\frac{1}x\]
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\[s^{imn}s^{qrs}s^{puw}s^{tvx}s_{mpq}s_{nst}s_{ruv}s_{w}\]
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\[y=-b^{n}+c^{n}-d^{n}\]
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\[a+xb+yb^{ \prime}\]
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\[(x^{+6})^{2}+(y^{+4})^{3}+(z^{+3})^{4}=0\]
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\[\sqrt[4]{-g}\]
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\[t_{1}(t)=-t_{2}(t)=t^{n+ \frac{1}{2}}\]
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\[\frac{1}{2}f_{bc}^{a}c^{b}\]
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\[x_{2}=x \sin \theta\]
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\[x+h\]
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\[-0.5 \leq \log r \leq 0.5\]
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\[c_{abc}y^{a}y^{b}y^{c}\]
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\[x-y\]
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\[\frac{1+ \sqrt{5}}{2}\]
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\[\int f(x)dx\]
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\[\frac{7}{1440} \sqrt{30}\]
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\[\int_{- \infty}^{ \infty}dx^{1}\]
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\[\frac{h}{2} \log h\]
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\[\sqrt{B_{ \infty}}\]
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\[(y_{3}^{5})^{4}=y_{1}^{5}y_{2}^{5}y_{4}^{5}y_{5}^{5}e^{-c_{2}}\]
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\[E=E_{E}+ \frac{1}{2}E_{C}\]
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\[R_{ab}R^{ab}- \frac{1}{3}R^{2}\]
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\[\frac{1}6n(n+1)(n+2)\]
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\[\cos 4 \alpha=-1\]
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\[-a \leq x_{1} \leq a\]
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\[x^{2j+1}+ix^{2j+2}\]
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\[\frac{u_{1}+u_{2}+1}{u_{1}u_{2}}\]
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\[T_{c}\]
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\[\frac{n}{k+n+1}\]
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\[p_{y}=p_{y}(y)\]
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\[x^{0}x^{1}x^{2}x^{3}\]
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\[\sqrt{y} \log y\]
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\[\int \sqrt{g}R=8 \pi\]
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\[\infty \times \infty\]
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\[\sum_{i}H_{i}H_{ii}=0\]
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\[\log \cos \theta\]
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\[a_{0}= \frac{1}{mv} \sqrt{ \frac{6}{11}}\]
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\[B_{n}= \frac{n}{n-2}B_{n-1}\]
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\[\sum_{i}d_{i}=d\]
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\[0 \div 4\]
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\[r=k \sqrt{x_{1}^{2}+x_{2}^{2}+x_{3}^{2}}\]
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\[\beta= \log(2 \sqrt{ \pi})=1.27\]
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\[\sum_{a}n_{a}\]
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\[- \frac{1}{24}+ \frac{a}{4}(1-a)\]
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\[w_{3}\]
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\[\int \sqrt{g}R^{2}\]
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\[yx=qxy\]
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\[z_{ab}=z_{a}-z_{b}\]
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\[x_{1}= \frac{x}{z}\]
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\[208=b_{0}+b_{2}+b_{3}+b_{4}+b_{5}+b_{7}\]
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\[\{- \frac{1}{2}y,- \frac{ \sqrt{3}}{2}y,y^{2}, \frac{5}{12}y^{2} \}\]
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\[x^{0}x^{1}x^{2}x^{3}x^{4}x^{5}\]
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\[\sin \theta=1\]
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\[A_{o^{ \prime}o^{ \prime}c}\]
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\[\sqrt{t}= \sqrt{x-4}\]
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\[X^{7}+iX^{8}\]
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\[\frac{l+m}{ \sqrt{1+ \alpha^{2}}}\]
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\[\sqrt{ \frac{11}{10}}\]
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\[\int C_{4}\]
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\[\sum_{a}X_{a}\]
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\[\int(a+b)= \int a+ \int b\]
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\[[a] \times[b]\]
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\[L_{t}(dx^{ \mu}e_{ \mu}^{a}(x))=L_{t}(dx^{ \mu})e_{ \mu}^{a}(x)+dx^{ \mu}L_{t}e_{ \mu}^{a}(x)\]
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\[f(x)=c \frac{1-e^{-x}}{1+e^{-x}}\]
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\[8 \times 8 \times 28\]
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\[8,393398582\]
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\[\Delta^{-1}= \int_{0}^{1}dxx^{ \Delta-1}\]
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\[\sum_{i}H_{i}H_{i}\]
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\[a_{bc}^{a}=a_{cb}^{a}\]
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\[y=2 \sin \frac{ \theta}{2}\]
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\[x_{ii+1}=x_{i}-x_{i+1}\]
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\[\sin(k_{n}x)\]
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\[z_{3}- \frac{1}{2} \leq z_{8} \leq z_{3}+ \frac{1}{2}\]
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\[\infty+ \infty\]
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\[\sqrt{3+ \sqrt{3}}\]
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\[(z-x)^{2}=1+u^{2}+v^{2}-2u-2v-2uv\]
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\[g= \frac{ \sqrt{1-Ar^{2}}}{a^{3}r^{2} \sin \theta}\]
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\[1- \sqrt{1+ \sqrt{E}}\]
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\[\sqrt{7}+1\]
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\[p(n)= \sin \frac{n \pi}{k+2r-2}\]
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\[4=1+1+1+1\]
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\[R_{i}x_{i}=-x_{i}R_{i}\]
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\[48!/(17!31!)\]
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\[\int a(x)d^{2}x= \int b(x)d^{2}x=0\]
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\[y \neq ax\]
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\[- \log E\]
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\[\sum 1= \infty\]
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\[\sum_{l}x^{(l)}\]
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\[\frac{527}{72(k+12)}+ \frac{1}{72k}\]
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\[x= \frac{x_{1}+x_{2}}{2}\]
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\[f(x,y)=x(1-x)+y(1-y)-xy\]
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\[1 \div 10\]
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\[\int H_{3}\]
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\[Y \times Y\]
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\[+c.c\]
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\[X_{9}(X_{2}X_{7}-X_{3}X_{6})\]
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\[\frac{n(n-1)}{2}- \frac{(n-2)(n-3)}{2}=2n-3\]
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\[ds^{2}=e^{2f}(dr^{2}+dz^{2}-dt^{2})+ \frac{e^{2g}}{y^{2}}(dx^{2}+dy^{2})\]
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