Revision as of 10:11, 22 November 2023 by Admin (Created page with "On February 1, Sawyer’s investment is worth $900. On August 1, the value has increased to $1600 and Sawyer deposits $D. On December 1, the value is $1400 and $400 is withdrawn. On February 1 of the following year, the investment account is worth $800. The time-weighted interest is 3%. Calculate the dollar-weighted rate of interest. <ul class="mw-excansopts"><li>Insufficient information given to complete problem</li><li>-.685</li><li>-.033</li><li>-.045</li><li>-.142...")
ABy Admin
Nov 22'23
Exercise
On February 1, Sawyer’s investment is worth $900. On August 1, the value has increased to $1600 and Sawyer deposits $D. On December 1, the value is $1400 and $400 is withdrawn. On February 1 of the following year, the investment account is worth $800. The time-weighted interest is 3%.
Calculate the dollar-weighted rate of interest.
- Insufficient information given to complete problem
- -.685
- -.033
- -.045
- -.142
Hardiek, Aaron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.
ABy Admin
Nov 22'23
Solution: C
| Feb 1 | Aug 1 | Dec 1 | Feb 1 |
|---|---|---|---|
| 900 | 1600 | 1400 | 800 |
| 1600 + D | 1000 |
Time Weighted Rate of interest:
[[math]]
\begin{aligned}
& {[1600 / 900] *[1400 /(1600+\mathrm{D})] *[800 / 1000]-1=.03} \\
& \quad \Rightarrow D=333.12
\end{aligned}
[[/math]]
Dollar-Weighted:
[[math]]
\begin{aligned}
& 900(1+\mathrm{i})+333.12(1+1 / 2 * \mathrm{i})-400(1+1 / 6 * \mathrm{i})=800 \\
& \Rightarrow 999.89^* \mathrm{i}=-33.12 \\
& \Rightarrow \mathrm{i}=-.033
\end{aligned}
[[/math]]
Hardiek, Aaron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.