exercise:Aff2c8c6c0

ABy Admin

Jan 19'24

Exercise

For a fully discrete 10 -year deferred whole life annuity-due of 1000 per month on (55), you are given:

(i) The premium, [math]G[/math], will be paid annually at the beginning of each year during the deferral period

(ii) Expenses are expected to be 300 per year for all years, payable at the beginning of the year

(iii) Mortality follows the Standard Ultimate Life Table

(iv) [math]\quad i=0.05[/math]

(v) Using the two-term Woolhouse approximation, the expected loss at issue is -800 Calculate [math]G[/math].

12,110
12,220
12,330
12,440
12,550

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ABy Admin

Jan 19'24

Answer: C

Need [math]\operatorname{EPV}([/math] Ben [math]+\operatorname{Exp})-\operatorname{EPV}([/math] Prem [math])=-800[/math]

[math]\operatorname{EPV}([/math] Prem [math])=G \ddot{a}_{55: 10}=8.0192 G[/math]

[[math]] \begin{aligned} \operatorname{EPV}(\operatorname{Ben}+\operatorname{Exp}) & =12,000{ }_{10} \ddot{a}_{55}^{(12)}+300 \ddot{a}_{55} \\ & =12,000_{10} E_{55} \ddot{a}_{65}^{(12)}+300 \ddot{a}_{55} \\ & =12,000_{10} E_{55}\left(\ddot{a}_{65}-\frac{m-1}{2 m}\right)+300 \ddot{a}_{55} \\ & =12,000(0.59342)(13.5498-11 / 24)+300(16.0599) \\ & =98,042.83 \end{aligned} [[/math]]

Therefore, [math]\quad 98,042.83-8.0192 G=-800[/math]

[[math]] G=12,326 [[/math]]