Revision as of 00:30, 19 November 2023 by Admin (Created page with "'''Solution: D''' The effective annual rate of interest is (1.005)<sup>12</sup>-1 = 0.06168. The present value of the tuition payments six months before the first payment is <math display = "block"> 25,000^{-6}\,\ddot{a}_{\overline{4}|0.06168}=24,262.95(3.66473)=88,917.16 </math> The accumulated value of the deposits at that time is <math>1000s_{\overline{n}|0.05}</math>. Equating the two amounts: <math display = "block"> \begin{aligned} 88,917.16 = 1000 \frac{1.005...")
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Exercise

ABy Admin
Nov 19'23

Answer

Solution: D

The effective annual rate of interest is (1.005)12-1 = 0.06168. The present value of the tuition payments six months before the first payment is

[[math]] 25,000^{-6}\,\ddot{a}_{\overline{4}|0.06168}=24,262.95(3.66473)=88,917.16 [[/math]]

The accumulated value of the deposits at that time is [math]1000s_{\overline{n}|0.05}[/math]. Equating the two amounts:

[[math]] \begin{aligned} 88,917.16 = 1000 \frac{1.005^n-1}{0.005} \\ 1.44459 = 1.005^n \\ n = \ln(1.44459)/\ln(1.005) = 73.75. \end{aligned} [[/math]]

Therefore, at least 74 payments will be required.

Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.

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