Moment Generating Function of Logistic Distribution/Examples/First Moment

Examples of Use of Moment Generating Function of Logistic Distribution
Let $X$ be a continuous random variable which satisfies the logistic distribution:


 * $X \sim \map {\operatorname {Logistic} } {\mu, s}$

for some $\mu \in \R, s \in \R_{> 0}$.

Let $\size t < \dfrac 1 s$.

The first moment generating function of $X$ is given by:


 * $\ds \map { {M_X}'} t = \mu \map \exp {\mu t} \int_{\to 0}^{\to 1} \paren {\dfrac {1 - u} u}^{-s t} \rd u - s \map \exp {\mu t} \int_{\to 0}^{\to 1} \map \ln {\dfrac {1 - u} u} \paren {\dfrac {1 - u} u}^{-s t} \rd u$

Proof
We have: