exercise:Fdfd7140f0: Difference between revisions

Latest revision as of 19:40, 1 July 2024

Suppose we have six risks. The probability that the [math]n[/math]^th risk's claim frequency equals [math]i[/math] is [math]1/(n+1)[/math] for [math] i = 0, \ldots, n [/math]. A risk is randomly selected with each risk equally likely to be selected. If a samples claim frequency of 4 is observed for the selected risk, determine the probability that a new sample claim frequency for the selected risk equals 0.

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	Suppose we have six risks. The probability that the <math>n</math><sup>th</sup> risk's claim frequency equals <math>i</math> is <math>1/n</math> for <math> i = 0, \ldots, n </math>. A risk is randomly selected with each risk equally likely to be selected. If a ~~sample~~ claim frequency of 4 is observed for the selected risk, determine the probability that a new sample claim frequency for the selected risk equals 0.		Suppose we have six risks. The probability that the <math>n</math><sup>th</sup> risk's claim frequency equals <math>i</math> is <math>1/(n+1)</math> for <math> i = 0, \ldots, n </math>. A risk is randomly selected with each risk equally likely to be selected. If a samples claim frequency of 4 is observed for the selected risk, determine the probability that a new sample claim frequency for the selected risk equals 0.

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