Revision as of 22:43, 20 November 2023 by Admin (Created page with "'''Solution: B''' The price of a one-year bond for 1000 is <math>\frac{30}{1.021}+\frac{1030}{1.021^2}=1017.45</math>. Therefore, to match the payment at time 2 we need to invest <math>\frac{1500}{1030} 1017.45=1481.72</math> in the oneyear bond. The one-year bond gives a payment of <math>\frac{1500}{1030} 30=43.69</math> at time 0.5 . Therefore, the amount that needs to be invested in the six month zero coupon bond is <math>=\frac{2000-43.69}{1.0175}=1922.66</math>....")
Exercise
Nov 20'23
Answer
Solution: B
The price of a one-year bond for 1000 is [math]\frac{30}{1.021}+\frac{1030}{1.021^2}=1017.45[/math]. Therefore, to match the payment at time 2 we need to invest [math]\frac{1500}{1030} 1017.45=1481.72[/math] in the oneyear bond.
The one-year bond gives a payment of [math]\frac{1500}{1030} 30=43.69[/math] at time 0.5 . Therefore, the amount that needs to be invested in the six month zero coupon bond is [math]=\frac{2000-43.69}{1.0175}=1922.66[/math].
The total cost of the dedicated portfolio is: [math]1481.72+1922.66=3404.38[/math].
Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.