Moment Generating Function of Geometric Distribution/Formulation 1/Examples/Second Moment

Examples of Use of Moment Generating Function of Geometric Distribution
Let $X \sim \Geometric p$ for some $0 < p < 1$, where $\Geometric p$ is the Geometric distribution.
 * $\map X \Omega = \set {0, 1, 2, \ldots} = \N$
 * $\map \Pr {X = k} = \paren {1 - p} p^k$

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


 * $\map { {M_X}''} t = \dfrac {p \paren {1 - p} e^t + p^2 \paren {1 - p} e^{2t} } {\paren {1 - p e^t}^3 }$

Proof
We have: