Answer:
Ke = D1/Po(1-F) + g
Ke = $0.65/17(1-0.1) + 0.06
Ke = 0.0425 + 0.06
ke = 0.1025 = 10.25%
WACC = Ke(E/V) + Kd(D/V)(1-T)
WACC = 10.25(55/100) + 7.75(45/100)(1-0.4)
WACC = 5.6375 + 2.0925
WACC = 7.73%
Explanation:
In this case, there is need to calculate cost of equity in the light of floatation cost using the above formula. Thus, we will now calculate WACC by considering cost of equity and the proportion of equity in the capital structure plus after-tax cost of debt and the proportion of debt in the capital structure.
The firm's WACC, assuming it must issue new stock to finance its capital budget is 7.73%.
But before that cost of equity should be determined:
Ke = D1 ÷ Po × (1 - F) + g
= $0.65 ÷ 17× (1 - 0.1) + 0.06
= 0.0425 + 0.06
= 0.1025
= 10.25%
Now
WACC = Ke(E/V) + Kd(D/V) × (1 - T)
= 10.25 × (55 ÷ 100) + 7.75 × (45 ÷ 100)× (1 - 0.4)
= 5.6375 + 2.0925
= 7.73%
Therefore we can conclude that the correct option is b.
Learn more: brainly.com/question/13549064
