Revision as of 16:42, 3 May 2023 by Admin (Created page with "An insurance policy covers losses incurred by a policyholder, subject to a deductible of 10,000. Incurred losses follow a normal distribution with mean 12,000 and standard dev...")
ABy Admin
May 03'23
Exercise
An insurance policy covers losses incurred by a policyholder, subject to a deductible of 10,000. Incurred losses follow a normal distribution with mean 12,000 and standard deviation [math]c.[/math] The probability that a loss is less than [math]k[/math] is 0.9582, where [math]k[/math] is a constant. Given that the loss exceeds the deductible, there is a probability of 0.9500 that it is less than [math]k[/math].
Calculate [math]c[/math].
- 2045
- 2267
- 2393
- 2505
- 2840
ABy Admin
May 03'23
Solution: A
We have
[[math]]
\begin{align*}
0.95 = \operatorname{P}(X \lt k | X \gt 10000) = \frac{\operatorname{P}(X \lt k) - \operatorname{P}(X \leq 10000)}{1-\operatorname{P}(X \leq 10000)} \\
0.95[1 − \operatorname{P}( X ≤ 10, 000)]= 0.9582 − \operatorname{P}( X ≤ 10, 000) \\
\operatorname{P}(X \leq 10000 ) = \frac{0.9582-0.95}{1-0.95} = 0.164 \\
0.164 = \Phi(\frac{10000-12000}{c}).
\end{align*}
[[/math]]
The z-value that corresponds to 0.164 is between -0.98 and -0.97. Interpolating leads to z = –0.978. Then,
[[math]]
0.164 = \Phi \left( \frac{10000 - 12000}{c}\right) \Rightarrow -0.978 = \frac{-2000}{c} \Rightarrow c = 2045.
[[/math]]