Revision as of 00:55, 19 January 2024 by Admin (Created page with "'''Answer: B''' {| class="table table-bordered" ! Discounted Payment !! Probability |- | 10 || <math>(1-0.95)=0.05</math> |- | <math>10+10 v=19.3</math> || <math>(0.95)(1-0.9)=0.095</math> |- | <math>10+10 v+10 v^{2}=27.949</math> || <math>(0.95)(0.9)=0.855</math> |} <math>\operatorname{Var}(X)=E\left(X^{2}\right)-[E(X)]^{2}</math> <math>E(X)=10(1-0.95)+[10+10 v](0.95)(1-0.9)+\left[10+10 v+10 v^{2}\right](0.95)(0.9)=26.23</math> <math>E\left(X^{2}\right)=10^{2}(1-0.9...")
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)

Exercise

AAdmin
Jan 19'24

Answer

Answer: B

Discounted Payment Probability
10 [math](1-0.95)=0.05[/math]
[math]10+10 v=19.3[/math] [math](0.95)(1-0.9)=0.095[/math]
[math]10+10 v+10 v^{2}=27.949[/math] [math](0.95)(0.9)=0.855[/math]

[math]\operatorname{Var}(X)=E\left(X^{2}\right)-[E(X)]^{2}[/math]

[math]E(X)=10(1-0.95)+[10+10 v](0.95)(1-0.9)+\left[10+10 v+10 v^{2}\right](0.95)(0.9)=26.23[/math]

[math]E\left(X^{2}\right)=10^{2}(1-0.95)+[10+10 v]^{2}(0.95)(1-0.9)+\left[10+10 v+10 v^{2}\right]^{2}(0.95)(0.9)=708.27[/math]

[math]\operatorname{Var}(X)=708.27-(26.23)^{2}=20.26[/math]

Standard Deviation [math]=(20.26)^{1 / 2}=4.5[/math]

It's not significantly less work, but since everyone receives the first 10, you could use the formula [math]\operatorname{Var}(X[/math]-constant [math])=\operatorname{Var}(X)[/math], and work with the three payment amounts as [math]0,10 v[/math], [math]10 v+10 v^{2}[/math], and you would get the same answer.

Copyright 2024. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.

00