Revision as of 22:46, 17 November 2023 by Admin (Created page with "Let S be the accumulated value of 1000 invested for two years at a nominal annual rate of discount d convertible semiannually, which is equivalent to an annual effective interest rate of i. Let T be the accumulated value of 1000 invested for one year at a nominal annual rate of discount d convertible quarterly. <math>S/T = (39/38)^4.</math> Calculate <math>i</math> <ul class="mw-excansopts"><li>10.0%</li><li>10.3%</li><li>10.8%</li><li>10.9%</li><li>11.1%</li></ul>...")
ABy Admin
Nov 17'23
Exercise
Let S be the accumulated value of 1000 invested for two years at a nominal annual rate of discount d convertible semiannually, which is equivalent to an annual effective interest rate of i.
Let T be the accumulated value of 1000 invested for one year at a nominal annual rate of discount d convertible quarterly.
[math]S/T = (39/38)^4.[/math]
Calculate [math]i[/math]
- 10.0%
- 10.3%
- 10.8%
- 10.9%
- 11.1%
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.
ABy Admin
Nov 17'23
Solution: C
[[math]]
\begin{align*}
\ {\frac{\left(1-d/2\right)^{-4}}{\left(1-d/4\right)^{-4}}}=\left({\frac{39}{38}}\right)^{4}\Rightarrow{\frac{1-d/2}{1-d/4}}={\frac{38}{39}}\Rightarrow39-39(d/2)=38-38(d/4) \\
d(39/2 -38/4) = 39-38 \\
d = 1/(19.5-9.5)=0.1 \\
1+i=\left(1-d/\,2\right)^{-2}=95^{-2}=1.108\Longrightarrow i=10.8 \%
\end{align*}
[[/math]]
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.