Revision as of 13:33, 2 May 2023 by Admin (Created page with "The owner of an automobile insures it against damage by purchasing an insurance policy with a deductible of 250. In the event that the automobile is damaged, repair costs can...")
ABy Admin
May 02'23
Exercise
The owner of an automobile insures it against damage by purchasing an insurance policy with a deductible of 250. In the event that the automobile is damaged, repair costs can be modeled by a uniform random variable on the interval (0, 1500).
Calculate the standard deviation of the insurance payment in the event that the automobile is damaged.
- 361
- 403
- 433
- 464
- 521
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.
ABy Admin
May 02'23
Solution: B
Let [math]X[/math] and [math]Y[/math] denote repair cost and insurance payment, respectively, in the event the auto is damaged. Then
[[math]]
Y = \begin{cases}
0, \quad x \leq 250 \\
x-250, \quad x \gt 250
\end{cases}
[[/math]]
and
[[math]]
\operatorname{E}[Y] = \int_{250}^{1500} \frac{1}{1500} (x-250) dx = \frac{1}{3000} (x-250)^2 \Big |_{250}^{1500} = \frac{1250^2}{3000} = 521
[[/math]]
[[math]]
\operatorname{E}[Y^2] = \int_{250}^{1500} \frac{1}{1500} (x-250)^2 dx = \frac{1}{3000} (x-250)^3 \Big |_{250}^{1500} = \frac{1250^3}{4500} = 434,028
[[/math]]
[[math]]
\operatorname{Var}[Y] = \operatorname{E}[Y^2] - (\operatorname{E}[Y])^2 = 434028 - (521)^2
[[/math]]
[[math]]
\sqrt{\operatorname{Var}[Y]} = 403.
[[/math]]
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.