User:Usien6/x

$$\frac{f}{f\prime}=\left(1\pm\frac{v}{c}\right)$$

$${n \choose p}={n \choose n-p}=\frac{n!}{\left(n-p\right)\!!p!}$$

$${n \choose p}={n \choose n-p}=\frac{n!}{\left(n-p\right)!p!}$$

$$\frac{n!}{\left(n-p\right)!}$$

$$n!=\prod_{1\leq m\leq n}^{m\subset\mathbb{N}}m=n(n-1)!$$

$$p\left(A\subseteq\Omega\right)=\frac{N\left(A\right)}{N\left(\Omega\right)}$$ (Probabilidade) $$p\left(\Omega-A\right)=1-p\left(A\subseteq\Omega\right)$$ (Improbabilidade) $$\left[\left[A\subseteq B\right]\Longrightarrow\left[N\left(A\right)\leq N\left(B\right)\right]\right]\Longrightarrow\left[p\left(\emptyset\right)\leq p\left(A\subseteq\Omega\right)\leq p\left(\Omega\right)\right]$$ (Limites da Probabilidade) \end{enumerate}