Exercise
May 04'23
Answer
Solution: C
The ratio of the probability that one of the damaged pieces is insured to the probability that none of the damaged pieces are insured is
[[math]]
\frac{\binom{r}{1}\binom{27-r}{3}}{\binom{27}{4}} \Big / \frac{\binom{r}{0}\binom{27-r}{4}}{\binom{27}{4}} = \frac{4r}{24-r}
[[/math]]
where [math]r[/math] is the total number of pieces insured. Setting this ratio equal to 2 and solving yields [math]r[/math] = 8.
The probability that two of the damaged pieces are insured is
[[math]]
\begin{align*}
\frac{\binom{r}{2}\binom{27-r}{2}}{\binom{27}{4}} &= \frac{\binom{8}{2}\binom{19}{2}}{\binom{27}{4}} \\ &= \frac{(8)(7)(19)(18)(4)(3)(2)(1)}{(27)(26)(25)(24)(2)(1)(2)(1)} \\ &= \frac{266}{975} \\ &= 0.27.
\end{align*}
[[/math]]
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.