ABy Admin
Apr 29'23
Exercise
An actuary compiles the following information from a portfolio of 1000 homeowners insurance policies:
- 130 policies insure three-bedroom homes.
- 280 policies insure one-story homes.
- 150 policies insure two-bath homes.
- 30 policies insure three-bedroom, two-bath homes.
- 50 policies insure one-story, two-bath homes.
- 40 policies insure three-bedroom, one-story homes.
- 10 policies insure three-bedroom, one-story, two-bath homes.
Calculate the number of homeowners policies in the portfolio that insure neither one-story nor two-bath nor three-bedroom homes.
- 310
- 450
- 530
- 550
- 570
ABy Admin
Apr 29'23
Solution: D
Let A, B, and C be the sets of policies in the portfolio on three-bedroom homes, one-story homes, and two-bath homes, respectively. We are asked to calculate 1000 − n( A ∪ B ∪ C ) , where n(D) denotes the number of elements of the set D. Then,
[[math]]
\begin{align*}
n( A ∪ B ∪ C ) &= n( A) + n( B ) + n(C ) − n( A ∩ B ) − n( A ∩ C ) − n( B ∩ C ) + n( A ∩ B ∩ C ) \\
&= 130 + 280 + 150 − 40 − 30 − 50 + 10 = 450.
\end{align*}
[[/math]]
The answer is 1000 – 450 = 550.