Answer:
WACC 6.18%
Explanation:
to get the cost of capital we solve using the gordon model:
[tex]\frac{divends}{return-growth} = Intrinsic \: Value[/tex]
[tex]\frac{divends}{Price} = return-growth[/tex]
[tex]\frac{divends}{Price} + growth = return[/tex]
[tex]$Cost of Equity =\frac{D_1}{P)} +g[/tex]
D1 1.55
P 28
f 0.00
g 0.02
[tex]$Cost of Equity =\frac{1.55}{28} +0.02[/tex]
Ke 0.075357143
Then for the cost of debt, we need to calculate the YTM of the bonds:
which is the rate at which the present value of the coupon payment and maturity equals the market price:
For the complexity this is done with excel or a financial calculator there is also an approximation formula
YTM with excel: 0.073516565
now that we good this we need to determinate the weigth of equity and debt:
250,00 shares x 28 dollars each = 7,000,000
1,500 bonds of $1,000 each at 98% = 7,350,000
value of the company: 7,000,000 + 7,350,000 = 14,350,000
Ew: 7,000,000 / 14,350,000 = 0.487804878
Dw: 7,350,000 / 14,350,000 =0.512195122
Now we got all values and we can determinate the WACC:
[tex]WACC = K_e(\frac{E}{E+D}) + K_d(1-t)(\frac{D}{E+D})[/tex]
Ke 0.075357143
Equity weight 0.487804878
Kd 0.074
Debt Weight 0.512195122
t 0.34
[tex]WACC = 0.075357143(0.48780487804878) + 0.074(1-0.34)(0.51219512195122)[/tex]
WACC 0.0617752 = 6.18%
