Revision as of 18:40, 19 November 2023 by Admin (Created page with "An investor owns a bond that is redeemable for 250 in 6 years from now. The investor has just received a coupon of c and each subsequent semiannual coupon will be 2% larger than the preceding coupon. The present value of this bond immediately after the payment of the coupon is 582.53 assuming an annual effective yield rate of 4%. Calculate c. <ul class="mw-excansopts"><li>32.04</li><li>32.68</li><li>40.22</li><li>48.48</li><li>49.45</li></ul> {{soacopyright | 2023 }}")
ABy Admin
Nov 19'23
Exercise
An investor owns a bond that is redeemable for 250 in 6 years from now. The investor has just received a coupon of c and each subsequent semiannual coupon will be 2% larger than the preceding coupon. The present value of this bond immediately after the payment of the coupon is 582.53 assuming an annual effective yield rate of 4%.
Calculate c.
- 32.04
- 32.68
- 40.22
- 48.48
- 49.45
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.
ABy Admin
Nov 19'23
Solution: A
The effective semi-annual yield rate is
[[math]]
1.04=\left(1+\frac{i^{(2)}}{2}\right)^{2}=\gt\frac{i^{(2)}}{2}=1.9804\%
[[/math]]
Then,
[[math]]
\begin{array}{l}{{582.53=c(1.02) v+c(1.02 v)^{2}+\cdots+c(1.02 v)^{12}+250 v^{12}}}\\ {{=c{\frac{1.02 v-(1.02 v)^{13}}{1-1.02 v}}+250 v^{12}=12.015c+197.579=c=32.04.}}\\ {{582.53=c{\frac{1.02 v-(1.02 v)^{13}}{1-1.02 v}}+250 v^{12}=12.015c+197.579=c=32.04.}}\end{array}
[[/math]]
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.