Answer:
bond market value $660
Explanation:
We need to calculate the present value of the maturity and the cuopon payment using the effective rate of 9.7%
First we do the annuity:
[tex]C \times \frac{1-(1+r)^{-time} }{rate} = PV\\[/tex]
C 24.25 (1,000 face value x 4.85 bond rate / 2 )
time 24.00 (12 year 2 payment a year)
rate 0.04850 (current rate divide by 2 to get it annually)
[tex]24.25 \times \frac{1-(1+0.0485)^{-24} }{0.0485} = PV\\[/tex]
PV $339.55
Then present value of the maturity
[tex]\frac{Maturity}{(1 + rate)^{time} } = PV[/tex]
Maturity 1,000.00 the face value of the bond
time 24.00
rate 0.04850
[tex]\frac{1000}{(1 + 0.0485)^{24} } = PV[/tex]
PV 320.89
Finally we add them together:
PV coupon payment $339.5545
PV maturity $320.8910
Total $660.4455
rounding to nearest dollar
bond market value $660
