Answer:
Yield to Maturity = 7.96%
Explanation:
As coupon value and maturity value are given, we will use the following formula to determine YTM instead of trial and error method.
We know,
Yield to Maturity = [tex]\frac{I + \frac{M - V_{0}}{n}}{\frac{2M + V_{0}}{3}}[/tex]
Given,
I = coupon payment = $95
M = Par value = $1,000
[tex]V_{0}[/tex] = Value of bond at maturity = $1,165
n = number of period (years) = 15
Therefore,
Yield to Maturity = [tex]\frac{95 + \frac{1,000 - 1,165}{15}}{\frac{(2*1,000) + 1,165}{3}}[/tex]
or, Yield to Maturity = [tex]\frac{95 + \frac{-165}{15}}{\frac{2,000 + 1,165}{3}}[/tex]
or, Yield to Maturity = [tex]\frac{95 - 11}{1,055}[/tex]
or, Yield to Maturity = $(84 ÷ 1,055)
Therefore, Yield to Maturity = 0.0796 = 7.96%
