Reading: Unlevering and Relevering Betas

Finally, we the WACC remains the same, namely:

WACC = \( k_D^* \times(1- \tau_C ) \times \big(\frac{D}{D+E}\big)^*+k_E^* \times \big(\frac{E}{D+E}\big)^* \)

Let us go back to our example to compute the WACC under the new capital structure. Here is the information that we have gathered over the last few pages:

Earlier in this chapter, we have already estimated the firm's cost of equity under the current capital structure, namely:

k_E = R_F + β_E × MRP = 0.02 + 1.5 × 0.05 = 9.5%.

Consequently, the unlevered cost of capital (k_A) is 8.7%: 

\( k_A=k_D \times \frac{D \times (1-\tau) }{(D \times (1-\tau)+E)}+k_E \times \frac{E}{(D\times (1-\tau)+E)} \)

\( k_A=0.04 \times \frac{2'000 \times (1-0.3) }{2'000 \times (1-0.3)+8'000}+0.095 \times \frac{8'000}{2'000\times (1-0.3)+8'000} \) = 8.7%.

Note that we obtain the same result when plugging the asset beta of 1.28 from the previous section in the CAPM:

k_A = R_F + β_A × MRP = 0.02 + 1.34 × 0.05 = 8.7%.

Now we can study the implications of the new capital structure on the firm. Remember from our previous considerations that:

• New debt level (D*) = 6'000
• New equity value (E*) = 5'200
• New cost of borrowing (k_D*) = 5% 
• Corporate tax rate = 30%

Consequently, the cost of equity under the target capital structure (k_E*) is 11.65%: 

\( k_E=k_A+(k_A-k_D^*) \times \big(\frac{D\times(1-\tau)}{E}\big)^* = 0.087 + (0.087-0.05) \times \frac{6'000\times(1-0.3)}{5'200} \) = 11.65%.

This is the same value as we have derived before. Similarly, the firm's WACC under the target capital structure is 7.3%, namely: