Answer:
YTM = 8.93%
YTC = 8.47%
Explanation:
[tex]P = \frac{C}{2} \times\frac{1-(1+YTC/2)^{-2t} }{YTC/2} + \frac{CP}{(1+YTC/2)^{2t}}[/tex]
The first part is the present value of the coupon payment until the bond is called.
The second is the present value of the called amount
P = market price value = 1,200
C = annual coupon payment = 1,000 x 12% 120
C/2 = 60
CP = called value = 1,060
t = time = 6 years
[tex]P = 60 \times\frac{1-(1+YTC/2)^{-2\times 6} }{YTC/2} + \frac{1,060}{(1+YTC/2)^{2\times 6}}[/tex]
Using Financial calculator we get the YTC
8.467835879%
[tex]P = 60 \times\frac{1-(1+YTM/2)^{-2\times 10} }{YTM/2} + \frac{1,000}{(1+YTM/2)^{2\times 10}}[/tex]
The first part is the present value of the coupon payment until manurity
The second is the present value of the redeem value at maturity
P = market price value = 1,200
C = coupon payment = 1,000 x 12%/2 = 60
C/2 = 60
F = face value = 1,060
t = time = 10 years
Using Financial calculator we get the YTM
8.9337714%
