Capital Structure
Capital Structure
Financial decision-makers must find answers to important questions, including;
What long-term investments should the firm undertake (capital budgeting) and how will investment and finance decisions affect the firmâs value (valuation)?
How can cash be raised for the required investments? This is known as the âfinancing decisionâ (cost of capital, capital structure and leasing).
How will the firm manage its day-to-day cash and financial affairs (short-term financing and net working capital)?
The Capital Budgeting Mini Case presents a financial decision of acquiring another corporation. Two choices are available; Corporation A and Corporation B, the cost of each choice is $250,000, and acquiring both corporations is not an option. The primary goal of any company is to create value for its shareholders and as such, the most important job of the financial manager is to create value from the companyâs capital budgeting,
Financial managers must be particularly aware of the timing of cash flows (the âtime value of moneyâ) and associated risks. This financial decision-maker will use projected cash flows to determine whether acquiring Corporation A or Corporation B (i.e. NPV and IRR) is the best choice. If acquisition does not generate positive cash flow, the company is effectively providing finance for the acquired corporation.
Capital Budgeting Decisions
Many business opportunities involve sacrificing current earnings for future profits (opportunity cost). For the acquisition to be worth pursuing, it must generate a higher rate of return than what could be earned in the capital markets (Jaffe et al., 2002:200). When assessing capital budgeting projects, financial decision makers typically use discounted cash flow methods such as Net Present Value (NPV) or Internal Rate of Return (IRR).
Net Present Value (NPV)
The most commonly used technique for financial decision making is Net Present Value (NPV) analysis. NPV is the present value of future cash returns, discounted at the appropriate market interest rate, minus the present value of the cost of investment. NPV includes the current cost of the investment in determining its value and not simply what it will return. The NPV rule that should be used by decision-makers is that an investment is worth making if it has a positive NPV and should be rejected if it has a negative NPV. An investment with a positive NPV is worth undertaking because doing so is essentially the same as receiving cash payments equal to the NPV (Jaffe et al., 2002:59,926).
Using the discount rate as the required rate of return, the net present value of an investment is the present value of the cash inflows minus the present value of the cash outflows. A more common way of expressing this is to say that the net present value (NPV) is the present value of the benefits (PVB) minus the present value of the costs (PVC)
NPV = PVB – PVC
To calculate the NPV (Net Present Value), I discounted the cash flow at discount rate of 10% for Corporation A and a discount rate of 11% for Corporation B. By using the discount rate I conducted a test to see if the project is expected to earn our minimum desired rate of return. Here are my decision rules:
If the NPV is:
Benefits vs. Costs
Should we expect to earn at least
our minimum rate of return?
Accept the
investment?
Positive
Benefits > Costs
Yes, more than
Accept
Benefits = Costs
Exactly equal to
Indifferent
Negative
Benefits < Costs
No, less than
Reject
In the Capital Budgeting Mini Case, Corporation Aâs NPV is equal to 20,979 and Corporation Bâs NPV is equal to 40,252. Corporation B is the better selection because:
The benefits are greater than the costs
Expect to earn at least the minimum rate of return and more
Whilst, Jaffe et al. (2002:140,157) argue that âthe NPV approach is the best one for evaluating capital budgeting projectsâ alternative methods exist, of which the Internal Rate of Return (IRR) method has âredeemable qualitiesâ. IRR is the rate at which the NPV of the project is equal to zero and investment decision becomes âaccept the project if IRR is greater than the discount rate, [and] reject the project if IRR is less than the discount rateâ (Jaffe et al., 2002:147). Jaffe et al. (2002:146) argues that IRR is the âmost