Answer:
Ans. Bond A =$20,800; Bond B =$55,125; Bond C =$69,068.29
Explanation:
Hello, First, we have to find the price of the bond, or in other words what is the percentage of its nominal rate that will match its face value, that is , for bond A (zero coupon, yield=4%, 1 year) $20,000, for bond B (zero coupon, yield=5%, 2 years) $50,000, and bond C (coupon=6%, yield=5.5%, 3 year) $70,000. The equation is as follows.
[tex]Price=\frac{PresentValueCashFlows}{Liability}[/tex]
For the first 2 bonds, the math is as follows
[tex]PriceBondA=\frac{\frac{20000}{(1+0.04)^{1} } }{20000} =0.961538462[/tex]
[tex]PriceBondB=\frac{\frac{50000}{(1+0.05)^{2} } }{50000} =0.907029478[/tex]
For Bond C, remember that this is a coupon bond so we have to find the present value of this instrument by using the following equation.
[tex]PriceBondC=\frac{\frac{Coupon((1+yield)^{n-1}-1) }{yield(1+yield)^{n-1} } +\frac{(4200+70000)}{(1+yield)^{n} } }{Liability}[/tex]
[tex]PriceBondA=\frac{\frac{4200((1+0.055)^{2}-1) }{0.055(1+0.055)^{2} } +\frac{(4200+70000)}{(1+0.055)^{3} } }{70000} =1.013489667[/tex]
So, the amount in Bond value for each one that will match each debt is:
Bond A = 20000/0.961538462=$20,800
Bond B = 50000/0.907029478=$55,125
Bond C = 70000/1.013489667=$69,068.29
Best of luck.
