$\frac{1}{�}$ , where μ is the mean of the random variable.

$\frac{1}{�}$ and the standard deviation is σ = 1m

$\frac{1}{�}$. The probability density function is f(x)=me−mx

$�(�)=�{�}^{–��}$ or f(x)=1μe−1μx

$�(�)=\frac{1}{�}{�}^{–\frac{1}{�}�}$, x ≥ 0 and the cumulative distribution function is P(X≤x)=1−e−mx

$�(�\le �)=1–{�}^{-��}$ or P(X≤x)=1−e−1μx

$�(�\le �)=1–{�}^{-\frac{1}{�}�}$ .

$�(�=�)=\frac{{�}^{�}{�}^{-�}}{�!}$.

$\frac{�+�}{2}$ and the standard deviation is σ=(b−a)212−−−−−√

$�=\sqrt{\frac{{\left(�-�\right)}^2}{12}}$. The probability density function is f(x) = 1b−a

$\frac{1}{�-�}$ for a < x < b or a ≤ x ≤ b. The cumulative distribution is P(X ≤ x) = x−ab−a

$\frac{�-�}{�-�}$.