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CAPITAL BUDGETING WITH LEVERAGE. Introduction  Discuss three approaches to valuing a risky project that uses debt and equity financing.  Initial Assumptions.

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Presentation on theme: "CAPITAL BUDGETING WITH LEVERAGE. Introduction  Discuss three approaches to valuing a risky project that uses debt and equity financing.  Initial Assumptions."— Presentation transcript:

1 CAPITAL BUDGETING WITH LEVERAGE

2 Introduction  Discuss three approaches to valuing a risky project that uses debt and equity financing.  Initial Assumptions  The project has average risk. For convenience the betas or costs of capital used will be for the existing firm rather than being project specific.  The firm’s debt-equity ratio is constant. This simplifies the application in that we don’t need to worry about changing costs of capital and fixes the adjustment of our risk measure for leverage.  Corporate taxes are the only imperfection. No agency, bankruptcy or issuance costs to quantify.

3 The Weighted Average Cost of Capital Method  Because the WACC incorporates the tax savings from debt, we can compute the levered value (V for enterprise value, L for leverage) of an investment, by discounting its future expected free cash flow using the WACC.

4 Valuing a Project with WACC  Ralph Inc. is considering introducing a new type of chew toy for dogs.  Ralph expects the toys to become obsolete after five years when it will be discovered that chew toys only encourage dogs to eat shoes. However, the marketing group expects annual sales of $40 million for the first year, increasing by $10 million per year for the following four years.  Manufacturing costs and operating expenses (excluding depreciation) are expected to be 40% of sales and $7 million, respectively, each year.

5 Valuing a Project with WACC  Developing the product will require upfront R&D and marketing expenses of $8 million. The fixed assets necessary to produce the product will require an additional investment of $20 million. The equipment will be obsolete once production ceases and (for simplicity) will be depreciated via the straight-line method over the five year period.  Ralph expects no incremental net working capital requirements for the project.  Ralph has a target of 60% Equity financing.  Ralph pays a corporate tax rate of 35%.

6 Expected Future Free Cash Flow

7 “Market Value” Balance Sheet  The firm is currently at its target leverage:  Equity to Net Debt plus Equity ratio is: $510.00/($510.00 + $390.00 - $50.00) = 60.0%

8 Valuing a Project with WACC  Ralph intends to maintain a similar (net) debt-equity ratio for the foreseeable future, including any financing related to the project. Thus, Ralph’s WACC is:

9 Valuing a Project with WACC  The value of the project, including the tax shield from debt, is calculated as the present value of its future free cash flows discounted at the WACC. The NPV (value added) of the project is $52.10 million $77.30 million – $25.20 million = $52.10 million It is important to remember the difference between value and value added.

10 Summary of the WACC Method 1. Determine the free cash flow of the investment. 2. Compute the weighted average cost of capital. 3. Compute the value of the investment, including the tax benefit of leverage, by discounting the free cash flow of the investment using the WACC. 4. The WACC can be used throughout the firm as the companywide cost of capital for new investments that are of comparable risk to the rest of the firm and that will not alter the firm’s debt-equity ratio.

11 Implementing a Constant Debt-Equity Ratio  By undertaking the project, Ralph adds new assets to the firm with an initial market value $77.30 million.  Therefore, to maintain the target debt-to-value ratio, Ralph must add $30.92 million in new debt. 40% × $77.30 = $30.92 60% × $77.30 = $46.38 (compare to $52.10)

12 Implementing a Constant Debt-Equity Ratio  Ralph can add (net) debt in this amount either by reducing cash and/or by borrowing and increasing actual debt.  Suppose Ralph decides to spend $25.20 million (cover the negative FCF in year 0) in cash to initiate the project. This increases net debt by $25.20 million

13 New Market Value Balance Sheet  We need an increase in net debt of $30.92.  Spend $25.20 million on the project and pay a $5.72 million dividend so $30.92 million in cash goes out (this further increases net debt and reduces equity by the required amount).

14 Implementing a Constant Debt-Equity Ratio  The market value of Ralph’s equity increases by $46.38 million.  $556.38 − $510.00 = $46.38 (60% of $77.30)  Adding the dividend of $5.72 million into the mix, the shareholders’ total gain is $52.10 million.  $46.38 + 5.72 = $52.10  Which is exactly the NPV calculated for the project  Alternatively: without the dividend the equity increased by the project’s NPV of $52.10 = $562.10 - $510.00. This is too large an increase in equity, given the increase in debt of $25.20, if Ralph is to maintain 60% equity.

15 Implementing a Constant Debt-Equity Ratio  Debt Capacity  The amount of debt at a particular date that is required to maintain the firm’s target debt-to-value ratio  The debt capacity at date t is calculated as: Where d is the firm’s target debt-to-value ratio and V L t is the project’s levered continuation value on date t.

16 Implementing a Constant Debt-Equity Ratio  Debt Capacity  V L t calculated as:

17 Debt Capacity  In order to maintain the target financing, the amount of new debt must fall over the life of the project.  This is true because the value of the project depends upon the future cash flow at each point in time. Since the project ends, value decreases. Since value decreases, debt must also decrease.

18 The Adjusted Present Value Method  Adjusted Present Value (APV)  A valuation method to determine the levered value of an investment by first calculating its unlevered value and then adding the value of the interest tax shield and deducting any costs that arise from other market imperfections

19 The Unlevered Value of the Project  The first step in the APV method is to calculate the value of the free cash flows using the project’s cost of capital if it were financed without leverage.

20 The Unlevered Value of the Project  Unlevered Cost of Capital  The cost of capital of a firm, were it unlevered: for a firm that maintains a target leverage ratio, it can be estimated (recall the picture) as the weighted average cost of capital computed without taking into account taxes (pre-tax WACC). This is, strictly speaking, only true for firms that adjust their debt to maintain a target leverage ratio.

21 The Unlevered Value of the Project  Target Leverage Ratio  When a firm adjusts its debt proportionally to a project’s value or its cash flows (where the proportion need not remain constant)  A constant market debt-equity ratio is a special case.

22 The Unlevered Value of the Project  For Ralph, the unlevered cost of capital is calculated as:  The project’s value without leverage is then calculated as:

23 Valuing the Interest Tax Shield  The value of $75.71 million is the value of the unlevered project and does not include the value of the tax shield provided by the interest payments on debt. The interest tax shield is equal to the interest paid multiplied by the corporate tax rate.

24 Interest Tax Shield  From the debt capacity calculation we can find the interest associated with the project if the financing is kept at the target.

25 Valuing the Interest Tax Shield  The next step is to find the present value of the interest tax shield.  When the firm maintains a target leverage ratio, its future interest tax shields have similar risk to the project’s cash flows, so they should be discounted at the project’s unlevered cost of capital.

26 Valuing the Project with Leverage  The total value of the project with leverage is the sum of the value of the interest tax shield and the value of the unlevered project.  The NPV of the project is $52.10 million $77.30 million – $25.20 million = $52.10 million This is exactly the same value found using the WACC approach.

27 Summary of the APV Method 1. Determine the investment’s value without leverage. 2. Determine the present value of the interest tax shield. a. Determine the expected interest tax shield. b. Discount the interest tax shield. 3. Add the unlevered value to the present value of the interest tax shield to determine the value of the investment with leverage.

28 Summary of the APV Method  The APV method has some advantages.  It can be easier to apply than the WACC method when the firm does not maintain a constant debt-equity ratio.  The APV approach also explicitly values market imperfections and therefore allows managers to measure their contribution to value.

29 The Flow-to-Equity Method  Flow-to-Equity  A valuation method that calculates the free cash flow available to equity holders taking into account all payments to and from debt holders. Free Cash Flow to Equity (FCFE), the free cash flow that remains after adjusting for interest payments, debt issuance and debt repayments  The cash flows to equity holders are then discounted using the equity cost of capital.

30 Free Cash Flow to Equity

31 Valuing the Equity Cash Flows  Because the FCFE represent payments to equity holders, they should be discounted at the project’s equity cost of capital.  Given that the risk and leverage of the project are the same as for Ralph Inc. overall, we can use Ralph’s equity cost of capital of 12.0% to discount the project’s FCFE.  The value of the project’s FCFE represents the gain to shareholders from the project and it is identical to the NPV computed using the WACC and APV methods. (The debt is sold at a fair price.)

32 Project-Based Costs of Capital  In the real world, a specific project may have different market risk than the average project for the firm.  In addition, different projects will may also vary in the amount of leverage they will support.

33 Estimating the Unlevered Cost of Capital  Suppose the project Ralph launches faces different market risks than its main business.  The unlevered cost of capital for the new project can be estimated by looking at publicly traded, pure play firms that have similar business risks.

34 Estimating the Unlevered Cost of Capital  Assume two firms are comparable to the chew toy project in terms of basic business risk and have the following observable characteristics: FirmEquity BetaDebt BetaDebt-to-Value Ratio Firm A1.70.0540% Firm B1.90.1050%

35 Estimating the Unlevered Cost of Capital using Betas  We now find their unlevered or asset betas:  An average of these unlevered betas is 1.02.  Note, an unlevered beta of 1.02 gives an unlevered cost of equity capital of:

36 Project Leverage and the Equity Cost of Capital  Now assume that Ralph plans to maintain a 20% debt to value ratio for its chew toy project, and it expects its borrowing cost to be 4%.  We now “relever” the unlevered beta estimate of 1.02 and using the SML we find the cost of levered equity:  A cost of debt capital of 4% is consistent with the low leverage chosen and a debt beta of 0.

37 Project Leverage and the Weighted Average Cost of Capital  With a 20% debt to value ratio, a cost of equity capital of 11.65%, and a cost of debt capital of 4% we can now estimate the WACC for the project.

38 An Alternate Approach  From the observable (or measurable) data we can get estimates of the cost of equity capital and the cost of debt capital:  Firm A:  Firm B:

39 An Alternate Approach  Recall the relation between the levered cost of equity capital and the unlevered cost of equity capital:  Rearranging this we find:  In other words, the unlevered cost of equity capital equals the pre-tax WACC

40 Estimating the Unlevered Cost of Capital  Assuming that both firms maintain a target leverage ratio, the unlevered cost of capital for each competitor can be estimated by calculating their pretax WACC.  Based on these comparable firms, we estimate an unlevered cost of capital for the project that is approximately 10.12%.

41 Project Leverage and the Equity Cost of Capital  Ralph plans to maintain a 20% debt to value ratio for its chew toy project, and it expects its borrowing cost to be 4%.  Given the unlevered cost of capital estimate of 10.12%, the chew toy division’s equity cost of capital is estimated to be:

42 Project Leverage and the Weighted Average Cost of Capital  The division’s WACC can now be estimated to be:  An alternative method for calculating the chew toy division’s WACC is:


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