Шпаргалка по LaTex

Версия 1.0

Команда	Результат
X^{a+b}_{i-j}	$X^{a+b}_{i-j}$
f+f'+f''+\cdots+f^{(10)}	$f+f'+f''+\cdots+f^{(10)}$
$A\ast B\times C\cdot D	$A\ast B\times C\cdot D$
\varphi\approx\varepsilon	$\varphi\approx\varepsilon$
\sqrt{x}+\sqrt[10]{y}\leq \frac{1+\|\vec{z}\|}8	$\sqrt{x}+\sqrt[10]{y}\leq \frac{1+\|\vec{z}\|}8$
\frac1{ \displaystyle\bar{\xi} + \displaystyle\frac{3}7 }	$\frac1{ \displaystyle\bar{\xi} + \displaystyle\frac{3}7 }$
\sqrt[6]{\log_3{h(x)}} + \dot{\rho}	$\sqrt{\log_3{h(x)}} + \dot{\rho}$
!\lim_{n \to \infty} \sum_{k=1}^n \frac{1}{k}	$\lim_{n \to \infty} \sum_{k=1}^n \frac{1}{k}$
!\int_a^b f(x)\,dx \ne \iint \cos{z}\,dxdy	$\int\limits_a^b f(x)\,dx \ne \iint \cos{z}\,dxdy$
\left( 1+\frac{1}{n}\right) ^n	$\left( 1+\frac{1}{n}\right) ^n$
\forall \, k\geq0 \quad \exists n \Leftrightarrow y\notin X	$\forall \, k\geq0 \quad \exists n \Leftrightarrow y\notin X$
\angle ABC = 90^{\circ} \Longleftarrow AB \perp BC	$\angle ABC = 90^{\circ} \Longleftarrow AB \perp BC$
!\overbrace{\underbrace{a+b+\ldots+z}_{n}+1+2+\ldots+9}^k	$\overbrace{\underbrace{a+b+\ldots+z}_{n}+1+2+\ldots+9}^k$
!\arctan{x}+\max_{1\le n\le m}{x_n}	$\arctan{x}+\max_{1\le n\le m}{x_n}$