Revision as of 22:09, 20 November 2023 by Admin (Created page with "'''Solution: A''' The PV and duration of the liability payments using <math>7 \%</math> rate are <math>P V=1,750,000 v^{12}=777,021</math> and duration 12 . The amount invested in the 5-year bond is <math>\frac{242,180}{1.07^5}=172,671</math>, Thus, the amount invested in the 14 year bond is <math>777,021-172,671=604,350</math>. The maturity value of the 14 -year bond is <math>604,350(1.07)^{14}=1,558,337</math>. The surplus if the interest rate moves to <math>4 \%</m...")
Exercise
Nov 20'23
Answer
Solution: A
The PV and duration of the liability payments using [math]7 \%[/math] rate are [math]P V=1,750,000 v^{12}=777,021[/math] and duration 12 .
The amount invested in the 5-year bond is [math]\frac{242,180}{1.07^5}=172,671[/math], Thus, the amount invested in the 14 year bond is [math]777,021-172,671=604,350[/math]. The maturity value of the 14 -year bond is [math]604,350(1.07)^{14}=1,558,337[/math].
The surplus if the interest rate moves to [math]4 \%[/math] is:
[[math]]
P V_A-P V_L=\left(\frac{242,180}{1.04^5}+\frac{1,558,337}{1.04^{14}}\right)-\frac{1,750,000}{1.04^{12}}=5,910
[[/math]]
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.