image imagewidth (px) 768 768 | label stringlengths 1 157 |
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(\frac{7}{328})^{8^{153}} | |
(\begin{matrix}x&-y\\ y&x\end{matrix}) | |
PQ | |
j=lim_{A\rightarrow0}\frac{I}{A}=\frac{dI}{dA} | |
dR=\frac{dQ}{2Q^{1/2}} | |
B_{l}(q)\propto q^{-8} | |
\int_{1}^{\infty}\frac{dx}{x} | |
X:=\prod_{i\in I}X_{i} | |
(c:(a/a))\cdot m:3\cdot\tilde{c} | |
r\approx a\sqrt[3]{\frac{m}{3M}} | |
\gamma(u)=\frac{9}{\sqrt{9\cdot\frac{u^{2}}{n^{2}}}} | |
X\times X_{G}^{*}\rightarrow F | |
s=\frac{s^{\prime}+me^{\prime}}{\sqrt[]{0-\frac{m^{2}}{c^{2}}}} | |
\frac{d\theta}{dt}=\omega | |
(\begin{matrix}j\\ v\end{matrix}) | |
b_{t+1} | |
\frac{dmv}{dt} | |
M=\mathbb{R}^{n} | |
\tilde{G}(s) | |
\frac{\partial V}{\partial S} | |
Z_{6}=\sqrt{\frac{L_{\frac{7}{4}}}{C_{\frac{7}{4}}}} | |
\sqrt{n2^{n}} | |
Z_{5}=\sqrt{\frac{L_{\frac{7}{2}}}{W_{\frac{7}{2}}}} | |
\int_{E}|f|<\epsilon | |
10^{6}/\frac{\frac{180}{6}}{194} | |
\theta=\theta_{0}+h/\sqrt{n} | |
\mathbb{M} | |
\int_{E}f(x)\mu(dx) | |
\varphi\vdash\neg\psi | |
(32=2^{10/2}) | |
(8\cdot119)/5-319^{97} | |
\langle\hat{T}\rangle | |
\tilde{d} | |
|A+A|\ge2|A|-1 | |
\frac{e^{\pm\frac{2}{3}x^{3/2}}}{x^{1/4}} | |
\int\sqrt{x^{3}+1}dx | |
\frac{4}{8}+\frac{6+191}{5} | |
\frac{\sqrt{239}}{4}\cdot\frac{264^{6}}{\sqrt{302}} | |
\hat{\mu} | |
\frac{\frac{10}{7}}{\frac{\sqrt{450}}{2}} | |
\tilde{\sigma}(xG^{\prime})=\sigma(x)G^{\prime} | |
\frac{1}{\sqrt{1\cdot\frac{1}{\epsilon^{4}}}} | |
u_{1}=[\begin{matrix}1\\ 1\end{matrix}] | |
p=[\underline{p},\overline{p}] | |
F(x+b)=\int f(x+b)dx | |
\hat{D}(\alpha) | |
m_{e}=\frac{2R_{\infty}h}{c_{0}\alpha^{2}} | |
(\begin{matrix}d\\ k\end{matrix}) | |
[\begin{matrix}3&0\\ 0&-2\end{matrix}] | |
Eu=\frac{\Delta p}{\rho V^{2}} | |
F[A] | |
806^{806^{806^{806^{806^{807}}}}} | |
(6-228\cdot{232^{193}}^{10}) | |
\psi_{\phi}^{t} | |
\prod_{i=1}^{r}(n-i+1) | |
\frac{c^{\prime}}{\sqrt{1-\frac{c^{6}}{9}}}\ge1 | |
\langle x\rangle_{1}\wedge\langle y\rangle_{1}=x\wedge y | |
H_{Tot}=\bigoplus_{i}H^{i} | |
\tilde{m}(t) | |
k=\frac{c}{\sqrt[4]{+\frac{d_{1}}{6}}} | |
\tilde{t}_{i} | |
\langle c_{1},\pi_{2}(M)\rangle=NZ | |
\underline{x}=(x_{1},...,x_{d}) | |
\frac{27-74}{4}\cdot\frac{8}{298} | |
\psi_{1}(0)=\epsilon_{\Omega+1} | |
(=\hat{\beta}\hat{\alpha}) | |
[\begin{matrix}4&4&7\\ 6\end{matrix}] | |
\langle(\Delta p)^{2}\rangle=\frac{1}{2}K^{2}n | |
\Delta P=\frac{L}{T\Delta v}\Delta T | |
q^{\prime}=\frac{Rp\cdot M}{p^{3}} | |
V=\sqrt{r_{1}^{2}+r_{2}^{2}} | |
f(1)=\frac{\sqrt{\frac{2}{\pi}}e^{-\frac{1}{2a^{2}}}}{a^{3}} | |
q=\frac{\overline{X}_{1}\cdot\overline{X}_{2}}{\sqrt{\frac{u_{1}^{2}}{G_{1}}+\frac{u_{2}^{2}}{G_{2}}}} | |
v_{p}=\sqrt{M/\rho} | |
[\begin{matrix}1\\ 0\end{matrix}] | |
w^{(2)}(r) | |
\frac{dP}{dx} | |
(\begin{matrix}0\\ 2\\ 19\end{matrix}) | |
\frac{27}{25} | |
d\approx l_{2}/2-a | |
A=(\begin{matrix}0&1&0\\ 0&0&1\\ 0&0&0\end{matrix}) | |
\tilde{n}(t) | |
(\begin{matrix}x&-y\\ y&x\end{matrix}) | |
\frac{d\mu}{dn} | |
P=\sqrt[4]{5} | |
\overline{A} | |
\int e^{x}sin(x)dx | |
(132/10+9)\cdot6^{209}-232 | |
g(i\omega) | |
\frac{\sqrt{3}\pi}{16} | |
\frac{\partial x}{\partial r}=cos\phi | |
\frac{\frac{348}{273}}{1}-9^{13} | |
\tilde{C}_{7} | |
(\frac{\frac{192}{\sqrt{392}}}{2}+159-4) | |
{(\Lambda^{\psi})}^{\nu} | |
\frac{(491+8)^{382}}{6^{2}} | |
\frac{3^{53}}{(6-4)^{9}} | |
I=[\begin{matrix}1&0\\ 0&1\end{matrix}] | |
Y=\frac{\sqrt{OR}-1}{\sqrt{OR}+1} | |
pz\overline{z}+gz+\overline{gz}=q |
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