exercise:00c7c51f18

ABy Admin

Jan 19'24

Exercise

For a special fully discrete 10 -year deferred whole life insurance of 100 on (50), you are given:

(i) Premiums are payable annually, at the beginning of each year, only during the deferral period

(ii) For deaths during the deferral period, the benefit is equal to the return of all premiums paid, without interest

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

(iv) [math]\quad \ddot{a}_{50}=17.0[/math]

(v) [math]\quad \ddot{a}_{60}=15.0[/math]

(vi) [math]{ }_{10} E_{50}=0.60[/math]

(vii) [math]\quad(I A)_{50: 101}^{1}=0.15[/math]

Calculate the annual net premium for this insurance.

1.3
1.6
1.9
2.2
2.5

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ABy Admin

Jan 19'24

Answer: D

Let [math]P[/math] be the premium per 1 of insurance.

[[math]] \begin{aligned} & P \ddot{a}_{50: \overline{10}}=P(I A)_{50: 10}^{1}+{ }_{10} E_{50} A_{60} \\ & \ddot{a}_{50: 10 \mid}=\ddot{a}_{50}-{ }_{10} E_{50} \ddot{a}_{60}=17.0-0.60 \times 15.0=8 \\ & A_{60}=1-d \ddot{a}_{60}=1-\left(\frac{0.05}{1.05}\right) 15=0.285714 \\ & P\left(\ddot{a}_{50: \overline{10}}-(I A)_{50: 10}^{1}\right)={ }_{10} E_{50} A_{60} \\ & P=\frac{10}{\ddot{a}_{50: \overline{10}}-(I A)_{50: 10}^{1}}=\frac{0.6 \times 0.285714}{8-0.15}=0.021838 \\ & 100 P=2.18 \end{aligned} [[/math]]