Revision as of 01:57, 19 January 2024 by Admin (Created page with "(35) purchases a fully discrete whole life insurance policy of 100,000 . You are given: (i) The annual gross premium, calculated using the equivalence principle, is 1770 (ii) The expenses in policy year 1 are <math>50 \%</math> of premium and 200 per policy (iii) The expenses in policy years 2 and later are <math>10 \%</math> of premium and 50 per policy (iv) All expenses are incurred at the beginning of the policy year (v) <math>\quad i=0.035</math> Calculate <ma...")
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ABy Admin
Jan 19'24

Exercise

(35) purchases a fully discrete whole life insurance policy of 100,000 .

You are given:

(i) The annual gross premium, calculated using the equivalence principle, is 1770

(ii) The expenses in policy year 1 are [math]50 \%[/math] of premium and 200 per policy

(iii) The expenses in policy years 2 and later are [math]10 \%[/math] of premium and 50 per policy

(iv) All expenses are incurred at the beginning of the policy year

(v) [math]\quad i=0.035[/math]

Calculate [math]\ddot{a}_{35}[/math].

  • 20.0
  • 20.5
  • 21.0
  • 21.5
  • 22.0

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

ABy Admin
Jan 19'24

Answer: B

Per equivalence Principle:

[[math]] \begin{aligned} G \ddot{a}_{35} & =100,000 A_{35}+0.4 G+150+0.1 G \ddot{a}_{35}+50 \ddot{a}_{35} \\ 1770 \ddot{a}_{35} & =100,000\left(1-d \ddot{a}_{35}\right)+0.4(1770)+150+0.1(1770) \ddot{a}_{35}+50 \ddot{a}_{35} \\ 1770 \ddot{a}_{35} & =100,000+708+150+\ddot{a}_{35}\left(177+50-100,000\left(\frac{0.035}{1.035}\right)\right) \end{aligned} [[/math]]


Solving for [math]\ddot{a}_{35}[/math], we have

[[math]] \ddot{a}=\frac{100,858}{1770+3154.64}=\frac{100,858}{4924.64}=20.48 [[/math]]

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

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