Step-by-step explanation:
To calculate the NPV (Net Present Value) of the expansion project, we need to determine the cash flows associated with the project and discount them to their present values.
Given information:
Target debt ratio = 40%
Cost of equity (Ke) = 10%
Cost of debt (Kd) = 4%
Equity issuance cost = 5%
Tax rate = 30%
Investment required = $1 million
Additional free cash flows per year = $0.2 million
Step 1: Calculate the weighted average cost of capital (WACC).
WACC is the weighted average of the cost of equity and the after-tax cost of debt, considering the target debt ratio.
Weight of equity (We) = 1 - Target debt ratio = 1 - 0.40 = 0.60
Weight of debt (Wd) = Target debt ratio = 0.40
WACC = (We * Ke) + (Wd * Kd * (1 - Tax rate))
WACC = (0.60 * 0.10) + (0.40 * 0.04 * (1 - 0.30))
WACC = 0.06 + 0.0112
WACC = 0.0712 = 7.12%
Step 2: Calculate the present value of the additional free cash flows.
Since the additional free cash flows are expected to continue indefinitely, we can use the perpetuity formula.
PV = CF / r
PV = $0.2 million / 0.0712
PV ≈ $2.81 million
Step 3: Calculate the present value of the investment required.
The investment required is $1 million.
PV = CF / r
PV = -$1 million / 0.0712
PV ≈ -$14.04 million (negative sign indicates cash outflow)
Step 4: Calculate the net present value (NPV).
NPV = PV of cash inflows - PV of cash outflows
NPV = $2.81 million - $14.04 million
NPV ≈ -$11.23 million
Therefore, the NPV of the expansion project is approximately -$11.23 million. This indicates a negative NPV, suggesting that the project may not be financially viable or profitable given the specified assumptions and costs.