Answer:
a) 40 yrs Price=$910.49 b) 17 yrs Price=$924.51 c) 8 yrs Price=$948.54
Explanation:
Hi, well, what we need to do is to use the following data and formula in order to find the ´price of each bond, just by changing the maturity time for each , option (40 years, 17 years, and 8 years). Let's illustrate with the first price, when its maturity is 40 years.
[tex]Price=\frac{Coupon((1+YTM)^{n-1}-1 )}{YTM(1+YTM)^{n-1} } +\frac{(Face Value+Coupon)}{(1+YTM)^{n} }[/tex]
[tex]Price=\frac{100((1+0.11)^{39}-1 )}{0.11(1+0.11)^{39} } +\frac{(1000+100)}{(1+0.11)^{40} }=910.49[/tex]
That was a) Price=$910.49
[tex]Price=\frac{100((1+0.11)^{16}-1 )}{0.11(1+0.11)^{16} } +\frac{(1000+100)}{(1+0.11)^{17} }=924.51[/tex]
That was b) Price=$924.51
[tex]Price=\frac{100((1+0.11)^{7}-1 )}{0.11(1+0.11)^{7} } +\frac{(1000+100)}{(1+0.11)^{8} }=948.54[/tex]
Finally, that was c) Price=$948.54
Best of luck.
