Answer:
IRR = 10.75%
Explanation:
The yield to maturity will be the rate at which the present value of the coupon payment and the maturity equals the market price.
[tex]C \times \frac{1-(1+r)^{-time} }{rate} = PV\\[/tex]
C 57.50
time 24
[tex]57.5 \times \frac{1-(1+r)^{-24} }{r} = PV\\[/tex]
PVc
[tex]\frac{Maturity}{(1 + rate)^{time} } = PV[/tex]
Maturity 1,000.00
time 24.00
PVm
[tex]\frac{1000}{(1 +r)^{24} } = PV[/tex]
PV c $765.3158
PV m $284.6842
Total $1,050.0000
rate ?
The only way to solve this equation is with trial and error. Because of technological advance we can do it using excel goal seek.
we write the formula for the PV of an ordinary annuity
and the formula for a lump sum
below them we add them both together
then we define a cell for the rate
and we determinate that we want the cell which contain the sum to match 1,050 changing the rate cell
this will give us an IRR of 0.10749 = 10.75%
