Answer:
$1,044.57
Explanation:
Price of the bond is the present value of all cash flows of the bond. These cash flows include the coupon payment and the maturity payment of the bond. We calculate the present value of both the coupon payment and the maturity payment.
According to given data
Face value of the bond is $1,000
Coupon payment = C = $1,000 x 8% = $80 annually = $40 semiannually
Number of periods = n = 15 years x 2 = 30 period
YTM = 7.5% annually = 3.75% semiannually
Price of the bond is calculated by following formula:
Price of the Bond = C x [ ( 1 - ( 1 + r )^-n ) / r ] + [ F / ( 1 + r )^n ]
Price of the Bond = $40 x [ ( 1 - ( 1 + 3.75% )^-30 ) / 3.75% ] + [ $1,000 / ( 1 + 3.75% )^30 ]
Price of the Bond = $713.17 + $331.40 = $1,044.57
Answer:
The price of the bond will be closest $1,0445
Explanation:
Face value $1000, years to maturity 15 years , coupon rate 8% paid semi annually, YTM 80%
Semiannual
n = 15*2 = 30
coupon payments = 8%*1000/2 = $40
YTM = 7.5%/2 = 3.75%
Value of a bond is equal the present value of coupon payments and present value of face value at maturity
Bond Price = C* [1-(1+r)^-n/r] + FV/ (1+r)^n
= 40 * [1-(1+0.375)^-30/0.0375] + 1000/(1+0.0375)^30
=713.1698 +331.4033
= $1,044.57
Therefore when rounding of the price of this bond is closest to $1,0445
