image imagewidth (px) 42 697 | label stringlengths 1 157 |
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\tilde{H_{i}}=\varphi(H_{i}) | |
{169^{492}}^{8}\cdot\frac{\frac{152}{10}}{62} | |
[\begin{matrix}4&4\\ 6\end{matrix}] | |
|y|<|\frac{a}{d}| | |
\lambda/r_{0} | |
E(X)=G^{\prime}(1^{-}) | |
K=s^{s^{s^{...^{s^{f}}}}} | |
\hat{\mu} | |
\frac{25+\sqrt{621}}{2} | |
(\begin{matrix}-1\\ 0\end{matrix}) | |
-\frac{1+mtan(mx)}{ln(2)} | |
(\begin{matrix}n\\ n\end{matrix}) | |
t\propto l^{1-k/2} | |
\int\sqrt{x^{3}+1}dx | |
\delta r_{i}=\sum_{j=1}^{m}\frac{\partial r_{i}}{\partial q_{j}}\delta q_{j} | |
Z | |
\{X_{i},X_{j}\}\notin E | |
\frac{n!}{k!(n-k)!} | |
f(x)=\frac{1}{1+x^{2}} | |
\frac{1+\frac{n}{c}cos\iota_{s}}{\sqrt{1\cdot\frac{n^{3}}{c^{3}}}} | |
(\frac{1}{249}+10)^{(2\cdot103)^{305}} | |
{d^{\chi}}^{m} | |
\sqrt{-}4(3-\sqrt{-}9) | |
(\sqrt{10}\cdot3)\cdot\frac{375-26}{96} | |
V(\tilde{\beta}) | |
D^{s}f(x) | |
\frac{d^{2}u}{dx^{2}}-u=0 | |
D_{\mu}T^{\mu\nu}=0 | |
\sqrt{-g}_{;\rho}=0 | |
[L:K]=efg | |
(\begin{matrix}c_{i}\\ i\end{matrix})=0 | |
\frac{dx}{dt}=rx(1-x)-px | |
\frac{df}{dz}=f | |
z=\pm\sqrt{R^{2}-r^{2}}; | |
\overline{O_{L}P} | |
\overline{op_{1}}^{\prime} | |
q=[\begin{matrix}u\\ d\end{matrix}] | |
a^{s^{n^{\cdot^{\cdot^{\cdot}}}}} | |
A(x)>x^{\sqrt{2}-1-o(1)} | |
(\begin{matrix}\alpha\\ k\end{matrix}) | |
(A,B) | |
\tilde{Q_{s}} | |
(\frac{-3}{\sqrt{10}},\frac{-7}{\sqrt{6}},\frac{2}{\sqrt{3}},0) | |
\omega\in[0,2\pi) | |
\sum_{k=1}^{n}\frac{a^{k}}{k} | |
A=[\begin{matrix}4&1\\ 6&3\end{matrix}] | |
-(4^{n}) | |
C\approx Wlog_{2}\frac{\overline{P}}{N_{0}W} | |
w\sqrt{\theta}/\delta | |
O(\underline{u}:G) | |
\sqrt{xi} | |
Z_{0}=\sqrt{\frac{L_{\frac{6}{5}}}{D_{\frac{6}{5}}}} | |
\sqrt[5]{\pi^{3}+1}\approx2 | |
\hat{U}\approx I-i\hat{H}\tau | |
\overline{O_{L}P} | |
\frac{1+\frac{n}{c}cos\iota_{s}}{\sqrt{1\cdot\frac{n^{3}}{c^{3}}}} | |
\hat{\alpha}=\hat{\beta} | |
\frac{dL}{dt} | |
{(\Omega^{c})}^{\mu} | |
10-160-\frac{69}{150} | |
\frac{mol}{L\cdot atm} | |
c^{\prime}(x^{\prime},t^{\prime})=c(x,t) | |
\{\begin{matrix}6\\ 6\end{matrix}\} | |
=\frac{8}{13} | |
\frac{d_{A}}{d_{B}}=\sqrt{\frac{P_{A}}{P_{B}}} | |
\frac{u\overline{u}+d\overline{d}+s\overline{s}}{\sqrt{3}} | |
\alpha=1+\frac{[I]}{K_{i}} | |
\sqrt{-1}\omega | |
z=tan(x)/\sqrt{2} | |
[\frac{n}{n+p}]=0.21 | |
(\begin{matrix}n+k\\ k\end{matrix}) | |
H^{k}(B)\simeq H^{k+m}(K) | |
\frac{10}{112}-{104^{40}}^{6} | |
r=\frac{2Gm}{c^{2}} | |
u:=\int_{a}^{b}v(t)dt | |
U2=U1=U | |
\xi_{1}>\lambda>\xi_{2} | |
\tau^{(\epsilon_{\psi})} | |
W=\int_{a}^{b}PdV | |
\frac{3}{\sqrt{3-\frac{p^{2}}{u^{2}}}} | |
\sigma=\sqrt{\sigma_{i}^{2}+\sigma_{j}^{2}} | |
(\begin{matrix}n\\ 0\end{matrix}) | |
y=\frac{\pm\sqrt{3}}{2} | |
\hat{S_{z}} | |
p_{1}=\frac{1}{6} | |
C_{x}=b\lambda+A_{x} | |
R=\frac{r+1}{n} | |
\tilde{X}=f(Y) | |
\epsilon_{0123}=\sqrt{-g} | |
\tilde{Q} | |
T^{a}=\frac{\lambda^{a}}{2} | |
\frac{\partial\mu}{\partial y} | |
t^{\prime}=\int_{t_{0}}^{t}b(u)du | |
\overline{w}\frac{\partial}{\partial z}-\overline{z}\frac{\partial}{\partial w} | |
\pi\approx\frac{22}{7} | |
r=|z|=\sqrt{x^{2}+y^{2}} | |
\vartheta(n)=\frac{1}{\sqrt{1-\frac{n^{7}}{c^{7}}}} | |
s\notin T | |
k_{4}^{\prime}=\frac{k_{4}-ra_{4}}{\sqrt{1-\frac{r^{4}}{c^{4}}}} | |
r_{c}=(\frac{2\pi D_{\odot}^{2}}{\mu_{0}v\dot{M}})^{\frac{1}{4}} |
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