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Last Study Topics. How To Value Common Stock Valuing Common Stock Capitalization Rates Returns Measurements. Today’s Topics. FCF and PV NPV and its Competitors The Payback Period The Book Rate of Return Internal Rate of Return. FCF and PV.
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Last Study Topics • How To Value Common Stock • Valuing Common Stock • Capitalization Rates • Returns Measurements
Today’s Topics • FCF and PV • NPV and its Competitors • The Payback Period • The Book Rate of Return • Internal Rate of Return
FCF and PV • Free Cash Flows (FCF) should be the theoretical basis for all PV calculations. • FCF is a more accurate measurement of PV than either Div or EPS. • The market price does not always reflect the PV of FCF. • When valuing a business for purchase, always use FCF.
FCF and PV Valuing a Business The value of a business is usually computed as the discounted value of FCF out to a valuation horizon (H). • The valuation horizon is sometimes called the terminal value and is calculated like PVGO.
FCF and PV Valuing a Business PV (free cash flows) PV (horizon value)
FCF and PV Example Given the cash flows for Concatenator Manufacturing Division, calculate the PV of near term cash flows, PV (horizon value), and the total value of the firm. r=10% and g= 6%
FCF and PV Example - continued Given the cash flows for Concatenator Manufacturing Division, calculate the PV of near term cash flows, PV (horizon value), and the total value of the firm. r=10% and g= 6% .
FCF and PV Example - continued Given the cash flows for Concatenator Manufacturing Division, calculate the PV of near term cash flows, PV (horizon value), and the total value of the firm. r=10% and g= 6% .
Chapter 5 Why Net Present Value Leads to Better Investment Decisions than Other Criteria Wajid S Ahmed McGraw Hill/Irwin
Introduction • Vegetron’s chief financial officer (CFO) is wondering how to analyze a proposed $1 million investment in a new venture called project X; • Your response should be as follows: “First, forecast the cash flows generated by project X over its economic life. • Second, determine the appropriate opportun -ity cost of capital
Continue • Third, use this opportunity cost of capital to discount the future cash flows of project X; • Fourth, calculate net present value (NPV) by subtracting the $1 million investment from PV. Invest in project X if its NPV is greater than zero. • Why NPV is so important!
Continue • What is best for Vegetron stockholders – Maximization of their wealth. • Lets see the following table;
Continue • Clearly project X is worthwhile if its present value, PV, is greater than $1 million, that is, if net present value is positive; • By calculating the present value of project X, we are replicating the process by which the common stock of firm X would be valued in capital markets; • And, ultimately show up in Vegetron’s market value;
Continue • The opportunity cost of taking the project is the return shareholders could have earned had they invested the funds on their own; • When we discount the project’s cash flows by the expected rate of return on comparable financial assets, we are measuring how much investors would be prepared to pay for your project;
NPV and Cash Transfers • Every possible method for evaluating projects impacts the flow of cash about the company as follows. Cash Investment opportunity (real asset) Investment opportunities (financial assets) Firm Shareholder Invest Alternative: pay dividend to shareholders Shareholders invest for themselves
NPV’s Competitors • we will now look at three of the alternatives. • They are: • 1. The book rate of return. • 2. The payback period. • 3. The internal rate of return. • But, Three Points to Remember about NPV!
NPV’s 3-Points • First, the NPV rule recognizes that a dollar today is worth more than a dollar tomorrow, because the dollar today can be invested to start earning interest immediately; • Second, net present value depends solely on the forecasted cash flows from the project and the opportunity cost of capital;
Continue • Third, because present values are all measured in today’s dollars, you can add them up; • Therefore, if you have two projects A and B, the net present value of the combined investment is; • NPV(A +B) = NPV(A) + NPV(B)
NPV depends on CFs • Net present value depends only on the project’s cash flows and the opportunity cost of capital; • When companies report to shareholders, they report book—that is, accounting—income and book assets; book income gets most of the immediate attention;
Continue • The book rate of return may not be a good measure of true profitability. It is also an average across all of the firm’s activities; • Book rate of return = book income book assets • The average profitability of past investments is not usually the right hurdle for new investments;
Payback • The payback period of a project is the number of years it takes before the cumulative forecasted cash flow equals the initial outlay. • The payback rule says only accept projects that “payback” in the desired time frame. • This method is very flawed, primarily because it ignores later year cash flows and the the present value of future cash flows.
Payback Example Examine the three projects and note the mistake we would make if we insisted on only taking projects with a payback period of 2 years or less.
Payback Example Examine the three projects and note the mistake we would make if we insisted on only taking projects with a payback period of 2 years or less.
The Payback Rule • The payback rule with a cutoff period of three or more years would accept all three projects; • Therefore, regardless of the choice of cutoff period, the payback rule gives answers different from the net present value rule; • The payback rule ignores all cash flows after the cutoff date; • The payback rule gives equal weight to all cash flows before the cutoff date;
continue • In order to use the payback rule, a firm has to decide on an appropriate cutoff date; • If it uses the same cutoff regardless of project life, it will tend to accept many poor short-lived projects and reject many good long-lived ones; • What about the discounted-payback rule asks?
Internal Rate of Return Example You can purchase a turbo powered machine tool gadget for $4,000. The investment will generate $2,000 and $4,000 in cash flows for two years, respectively. What is the IRR on this investment?
Internal Rate of Return Example You can purchase a turbo powered machine tool gadget for $4,000. The investment will generate $2,000 and $4,000 in cash flows for two years, respectively. What is the IRR on this investment?
Internal Rate of Return Example You can purchase a turbo powered machine tool gadget for $4,000. The investment will generate $2,000 and $4,000 in cash flows for two years, respectively. What is the IRR on this investment?
Internal Rate of Return IRR=28%
Summary • FCF and PV • NPV and its Competitors • The Payback Period • The Book Rate of Return • Internal Rate of Return
Continue • Now, the internal rate of return rule is to accept an investment project if the opportunity cost of capital is less than the internal rate of return; • If the opportunity cost of capital is less than the 28 percent IRR, then the project has a positiveNPV. • If it is equal to the IRR, the project has a zero NPV. • And if it is greater than the IRR, the project has a negative NPV
Internal Rate of Return Pitfall 1 - Lending or Borrowing? • With some cash flows (as noted below) the NPV of the project increases s the discount rate increases. • This is contrary to the normal relationship between NPV and discount rates.
Project C • If the opportunity cost of capital is 10 percent, that means the project is a good one. Or does it? • Should we accept or reject? • The only way to find the answer is to look at the net present value.
Internal Rate of Return Pitfall 1 - Lending or Borrowing? • With some cash flows (as noted below) the NPV of the project increases s the discount rate increases. • This is contrary to the normal relationship between NPV and discount rates. NPV Discount Rate
Internal Rate of Return Pitfall 2 - Multiple Rates of Return • Certain cash flows can generate NPV=0 at two different discount rates. • The following cash flow generates NPV=0 at both (-50%) and 15.2%.
Internal Rate of Return Pitfall 2 - Multiple Rates of Return • Certain cash flows can generate NPV=0 at two different discount rates. • The following cash flow generates NPV=0 at both (-50%) and 15.2%. NPV 1000 IRR=15.2% 500 Discount Rate 0 -500 IRR=-50% -1000
Internal Rate of Return Pitfall 3 - Mutually Exclusive Projects • IRR sometimes ignores the magnitude of the project. • The following two projects illustrate that problem.
Explanation • If you follow the IRR rule, you have the satisfaction of earning a 100 percent rate of return; • If you follow the NPV rule, you are $11,818 richer; • Is it worth making the additional $10,000 investment in F? • you look at the IRR on the incremental flows.
Internal Rate of Return Pitfall 3 - Mutually Exclusive Projects
Opportunity Cost matters • if the opportunity cost of capital were 20 percent, investors would place a higher value on the shorter-lived project G. • But in our example the opportunity cost of capital is not 20 percent but 10 percent. • Investors are prepared to pay relatively high prices for longer-lived securities, and so they will pay a relatively high price for the longer-lived project.
Continue • At a 10 percent cost of capital, an investment in H has an NPV of $9,000 and an investment in G has an NPV of only $3,592; • Assume, it is a shortage of capital which forces the choice between G and H.; • When this implicit assumption is brought out, H is better if there is no capital shortage.
Incremental Flows • First, you check that project G has a satisfactory IRR. • Then you look at the return on the additional investment in H. • The IRR on the incremental investment in H is 15.6 percent. Since this is greater than the opportunity cost of capital, you should undertake H rather than G.
Internal Rate of Return Pitfall 4 - Term Structure Assumption • We assume that discount rates are stable during the term of the project. • This assumption implies that all funds are reinvested at the IRR. • This is a false assumption. • In a situation where it is important, we have to compare the project IRR with the expected IRR (yield to maturity) offered by a traded security
Internal Rate of Return • that; • (1) is equivalent in risk to the project and. • (2) offers the same time pattern of cash flows as the project. • Calculating the IRR can be a laborious task. Fortunately, financial calculators can perform this function easily.
Profitability Index • When resources are limited, the profitability index (PI) provides a tool for selecting among various project combinations and alternatives • A set of limited resources and projects can yield various combinations. • The highest weighted average PI can indicate which projects to select.
Profitability Index Example We only have $300,000 to invest. Which do we select? Proj NPV Investment PI A 230,000 200,000 1.15 B 141,250 125,000 1.13 C 194,250 175,000 1.11 D 162,000 150,000 1.08
Profitability Index Example - continued Proj NPV Investment PI A 230,000 200,000 1.15 B 141,250 125,000 1.13 C 194,250 175,000 1.11 D 162,000 150,000 1.08 Select projects with highest Weighted Avg PI WAPI (BD) = 1.13(125) + 1.08(150) + 0.0 (25) (300) (300) (300) = 1.01
Profitability Index Example - continued Proj NPV Investment PI A 230,000 200,000 1.15 B 141,250 125,000 1.13 C 194,250 175,000 1.11 D 162,000 150,000 1.08 Select projects with highest Weighted Avg PI WAPI (BD) = 1.01 WAPI (A) = 0.77 WAPI (BC) = 1.12
Linear Programming • Maximize Cash flows or NPV • Minimize costs Example Max NPV = 21Xn + 16 Xb + 12 Xc + 13 Xd subject to 10Xa + 5Xb + 5Xc + 0Xd <= 10 -30Xa - 5Xb - 5Xc + 40Xd <= 12
Vegetron Case Table 5.1