Revision as of 18:04, 19 November 2023 by Admin (Created page with "'''Solution: C''' First, the present value of the liability is <math display = "block"> \mathrm{PV} = 35,000 a_{\overline{15}|6.2\%} = 335,530.30. </math> The duration of the liability is: <math display = "block"> \overline{d} = \frac{\sum tv^tR_t}{\sum v^tR_{t}} =\frac{35,000v+2(35,000)v^{2}+\cdots+15(35,000)v^{15}}{335,530.30}={\frac{2,312,521.95}{335.530.30}}=6.89214 </math> Let X denote the amount invested in the 5 year bond. Then <math display = "block"> \fra...")
Exercise
ABy Admin
Nov 19'23
Answer
Solution: C
First, the present value of the liability is
[[math]]
\mathrm{PV} = 35,000 a_{\overline{15}|6.2\%} = 335,530.30.
[[/math]]
The duration of the liability is:
[[math]]
\overline{d} = \frac{\sum tv^tR_t}{\sum v^tR_{t}} =\frac{35,000v+2(35,000)v^{2}+\cdots+15(35,000)v^{15}}{335,530.30}={\frac{2,312,521.95}{335.530.30}}=6.89214
[[/math]]
Let X denote the amount invested in the 5 year bond. Then
[[math]]
\frac{X}{335,530.30}(5)+\left(1-\frac{X}{335,530.30}\right)(10)=6.89214 \implies X=208,556.
[[/math]]
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.