Revision as of 00:44, 19 January 2024 by Admin (Created page with "'''Answer: E''' Any of these ways of viewing the benefit structure would be fine; all give the same answer: (i) A temporary life annuity-due of <math>X</math> plus a deferred life annuity-due of <math>0.75 X</math>. (ii) A whole life annuity-due of <math>0.75 \mathrm{X}</math> plus a temporary deferred life annuity-due of <math>0.25 \mathrm{X}</math> (iii) A whole life annuity-due of <math>X</math> minus a deferred life annuity-due of <math>0.25 X</math> This soluti...")
Exercise
Jan 19'24
Answer
Answer: E
Any of these ways of viewing the benefit structure would be fine; all give the same answer:
(i) A temporary life annuity-due of [math]X[/math] plus a deferred life annuity-due of [math]0.75 X[/math].
(ii) A whole life annuity-due of [math]0.75 \mathrm{X}[/math] plus a temporary deferred life annuity-due of [math]0.25 \mathrm{X}[/math]
(iii) A whole life annuity-due of [math]X[/math] minus a deferred life annuity-due of [math]0.25 X[/math]
This solution views it the first way.
[math]X \ddot{a}_{55: 10}+0.75 X \ddot{a}_{65}{ }_{10} E_{55}=8.0192 X+(0.75 X)(0.59342)(13.5498)=14.05 X=250,000[/math]
[math]\Rightarrow X=17,794[/math]
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