Revision as of 15:52, 28 April 2023 by Admin (Created page with "'''Solution: D''' Let <math>A</math> = event that a policyholder has an auto policy <math>H</math> = event that a policyholder has a homeowners policy Then based on the in...")
Exercise
ABy Admin
Apr 28'23
Answer
Solution: D
Let
[math]A[/math] = event that a policyholder has an auto policy
[math]H[/math] = event that a policyholder has a homeowners policy
Then based on the information given,
[[math]]
\begin{align*}
&\operatorname{P}( A ∩ H ) = 0.15 \\
&\operatorname{P}( A ∩ H^c ) = \operatorname{P}( A ) − \operatorname{P}( A ∩ H ) = 0.65 − 0.15 = 0.50 \\
&\operatorname{P}( A^c ∩ H ) = \operatorname{P}( H ) − \operatorname{P}( A ∩ H ) = 0.50 − 0.15 = 0.35 \\
\end{align*}
[[/math]]
and the portion of policyholders that will renew at least one policy is given by
[[math]]
0.4 \operatorname{P}( A ∩ H^c ) + 0.6 \operatorname{P}( A^c ∩ H ) + 0.8 \operatorname{P}( A ∩ H ) = ( 0.4 )( 0.5 ) + ( 0.6 )( 0.35 ) + ( 0.8 )( 0.15 ) = 0.53
[[/math]]
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.