Exercise
May 14'23
Answer
Key: D
Members of the ( a, b,1) class have
[[math]]\frac{p_k}{p_{k-1}} = a + \frac{b}{k}[[/math]]
for [math]k = 2,3,4, \ldots, [/math] so point iii) implies that [math]N [/math] is an (a,b,1) distribution with [math]a = 0 [/math] and [math] b = \lambda = 1 [/math]. This, together with point ii), implies the distribution is a zero-modified Poisson distribution with [math]p_0^M = 0.45 [/math].
[[math]]
\begin{aligned}
P( N \geq 2) = 1 − P( N \leq 1) &= 1 − ( P( N = 0) + P( N = 1)) \\ &= 1 −(0.45 + \frac{1-p_0^M}{1-P(L=0)} P(L =1 ) ),
\end{aligned}
[[/math]]
where [math]L[/math] has a Poisson distribution with [math]\lambda = 1 [/math] and [math]P(L=0) = P(L=1) e^{-} [/math], so [math]P(N \geq 2) = 1- (0.45 + \frac{0.55}{1-e^{-1}} ) = 0.2299 [/math].
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.