Revision as of 23:49, 14 June 2024 by Admin
BBy Bot
Jun 09'24
Exercise
Let [math]X[/math] be a continuous random variable and define the standardized version [math]X^*[/math] of [math]X[/math] by:
[[math]]
X^* = \frac {X - \mu}\sigma\ .
[[/math]]
- Show that [math]P(|X^*| \geq a) \leq 1/a^2[/math].
- If [math]X[/math] is the random variable of Exercise, find bounds for [math]P(|X^*| \geq 2)[/math], [math]P(|X^*| \geq 5)[/math], and [math]P(|X^*| \geq 9)[/math].