Answer: $1,193,838.80
Step-by-step explanation:
The price of a bond is the sum of the present value of the coupon payments and the face value at maturity.
= Present value of coupon payments + Present value of face value at maturity
First adjust the variables for semi-annual:
Number of periods = 5 * 2 = 10 semi annual periods
Coupon payment = 8% * 1,100,000 * 1/2 years = $44,000
Yield = 6% / 2 = 3%
Present value of coupon payments:
The coupon payments are constant so are an annuity:
= Annuity * Present value of an annuity factor, 10 periods, 3%
= 44,000 * 8.5302
= $375,328.80
Present value of face value
= 1,100,000 * Present value of 1, 3%, 10 periods
= 1,100,000 * 0.7441
= $818,510
Selling price:
= 375,328.80 + 818,510
= $1,193,838.80