grandes-ecoles 2020 Q14

grandes-ecoles · France · centrale-maths2__pc Continuous Probability Distributions and Random Variables Characteristic/Moment Generating Function Derivation

We assume that there exists $t _ { 0 } \in \mathbb { R } ^ { * }$ such that $\left| \phi _ { X } \left( t _ { 0 } \right) \right| = 1$. We assume further that $X ( \Omega )$ is countable and we use the notations of question 2 (i.e. $X ( \Omega ) = \left\{ x _ { n } , n \in \mathbb { N } \right\}$ with $a _ { n } = \mathbb { P } \left( X = x _ { n } \right)$). Deduce that $\mathbb { P } \left( X \in a + \frac { 2 \pi } { t _ { 0 } } \mathbb { Z } \right) = 1$.

We assume that there exists $t _ { 0 } \in \mathbb { R } ^ { * }$ such that $\left| \phi _ { X } \left( t _ { 0 } \right) \right| = 1$. We assume further that $X ( \Omega )$ is countable and we use the notations of question 2 (i.e. $X ( \Omega ) = \left\{ x _ { n } , n \in \mathbb { N } \right\}$ with $a _ { n } = \mathbb { P } \left( X = x _ { n } \right)$).\\
Deduce that $\mathbb { P } \left( X \in a + \frac { 2 \pi } { t _ { 0 } } \mathbb { Z } \right) = 1$.

Paper Questions

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