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May 13'23
Exercise
You are given:
- Losses follow an exponential distribution with mean [math]\theta[/math] .
- A random sample of 20 losses is distributed as follows:
| Loss Range | Frequency |
| [0, 1000] | 7 |
| (1000, 2000] | 6 |
| (2000, [math]\infty[/math]) | 7 |
Calculate the maximum likelihood estimate of [math]\theta[/math].
- Less than 1950
- At least 1950, but less than 2100
- At least 2100, but less than 2250
- At least 2250, but less than 2400
- At least 2400
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.
May 13'23
Key: B
[[math]]\begin{aligned}
& L=F(1000)^{7}[F(2000)-F(1000)]^{6}[1-F(2000)]^{7} \\
& =\left(1-e^{-1000 / \theta}\right)^{7}\left(e^{-1000 / \theta}-e^{-2000 / \theta}\right)^{6}\left(e^{-2000 / \theta}\right)^{7} \\
& =(1-p)^{7}\left(p-p^{2}\right)^{6}\left(p^{2}\right)^{7}=p^{20}(1-p)^{13}
\end{aligned}[[/math]]
where [math]p=e^{-1000 / \theta}[/math]. The maximum occurs at [math]p=20 / 33[/math] and so [math]\hat{\theta}=-1000 / \ln (20 / 33)=1996.90[/math].
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.