Answer:
Year 0 Year 1 Year 2 Year 3 Year 4
-$109,13 $6,50 $6,50 $6,50 $112,53 (6,5+106,03)
5,3%, the YTM of the bond.
Explanation:
If the YTM of the bond does not change during the year, it means that at the time the bond was sold, the total rate of return would be the same as was when the bonds were purchased, in this case 5,3%.
Principal Present Value = F / (1 + r)^t
Coupon Present Value = C x [1 - 1/(1 +r)^t] / r
Price of the Bond at the moment it was purchased:
The price of this bond it's $59,66 + $6,5 = $109,13
Present Value of Bonds $59,66 = $100/(1+0,053)^10
Present Value of Coupons $49,47 = $6,5 (Coupon) x 7,61
7,61 = [1 - 1/(1+0,053)^10 ]/ 0,053
Price of the Bond 4 years later:
The price of this bond it's $73,66 + $32,68 = $106,03
Present Value of Bonds $73,66 = $100/(1+0,053)^6
Present Value of Coupons $32,68 = $6,50 (Coupon) x 5,03
5,03 = [1 - 1/(1+0,053)^6 ]/ 0,053
