excans:C3bbb52ac1: Difference between revisions
From Stochiki
(Created page with "'''Solution: B''' Let X and Y be the miles driven by the two cars. The total cost, is then <math display = "block"> C = 3(X/15 + Y/30) = 0.2X + 0.1Y. </math> C has a normal...") |
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'''Solution: B''' | '''Solution: B''' | ||
Let X and Y be | Let X and Y be the two independent losses and Z = min(X,Y). Then, | ||
<math display = "block"> | <math display = "block"> | ||
\operatorname{P}(Z > z) = \operatorname{P}(X > z \cap Y > z ) = \operatorname{P}(X > z ) \operatorname{P}(Y > z) = e^{-z}e^{-z} = e^{-2z} | |||
</math> | </math> | ||
<math display = "block"> | <math display = "block"> | ||
\operatorname{P}( | F_Z(z) = \operatorname{P}(Z \leq z) = 1-\operatorname{P}(Z > z) = 1-e^{-2z} | ||
</math> | </math> | ||
which can be recognized as an exponential distribution with mean 1/2. | |||
{{soacopyright | 2023}} | {{soacopyright | 2023}} | ||
Latest revision as of 22:09, 6 May 2023
Solution: B
Let X and Y be the two independent losses and Z = min(X,Y). Then,
[[math]]
\operatorname{P}(Z \gt z) = \operatorname{P}(X \gt z \cap Y \gt z ) = \operatorname{P}(X \gt z ) \operatorname{P}(Y \gt z) = e^{-z}e^{-z} = e^{-2z}
[[/math]]
[[math]]
F_Z(z) = \operatorname{P}(Z \leq z) = 1-\operatorname{P}(Z \gt z) = 1-e^{-2z}
[[/math]]
which can be recognized as an exponential distribution with mean 1/2.
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.