However, it would then take another year and $5 million of costs to demolish the site and return it to its original condition. Thus, Project P's expected net cash flows look like this (in millions of dollars): Year Net Cash Flows -$0.8 5.0 1 2 -5.0 The project is estimated to be of average risk, so its cost of capital is 10%. (1) What are normal and nonnormal cash flows? (2) What is Project P's NPV? What is its IRR? Its MIRR? (3) Draw Project P's NPV profile. Does Project P have normal or nonnormal cash flows? Should this project be accepted? k. In an unrelated analysis, you have the opportunity to choose between the follow- ing two mutually exclusive projects, Project T (which lasts for 2 years) and Project F (which lasts for 4 years): Expected Net Cash Flows Year Project T Project F -$100,000 -$100,000 60,000 60,000 1 33,500 33,500 2 3 33,500 33,500 4 The projects provide a necessary service, so whichever one is selected is expected to be repeated into the foreseeable future. Both projects have a 10% cost of capital. (1) What is each project's initial NPV without replication? (2) What is each project's equivalent annual annuity? (3) Apply the replacement chain approach to determine the projects' extended NPVS. Which project should be chosen? (4) Assume that the cost to replicate Project T in 2 years will increase to $105,000 due to inflation. How should the analysis be handled now, and which project should be chosen? 1 You are also considering another project that has a physical life of 3 years-that is, the machiner y will be totally worn out after 3 years. However, if the project were terminated prior to the end of 3 years, the machinery would have a positive salvage value. Here are the project's estimated cash flows Initial Investment and End-of-Year Year Operating Cash Flows Net Salvage Value -$5,000 $5,000 1 2,100 2,000 3,100 2,000 1,750 Using the 10% cost of capital, what is the project's NPV if it is operated for the full 3 years? Would the NPV change if the company planned to terminate the project at the end of Year 2? At the end of Year 1? What is the project's optimal (economic) life?
You have just graduated from the MBA program of a large university, and one of your favorite courses was Today’s Entrepreneurs. In fact, you enjoyed it so much you have decided you want to “be your own boss.” While you were in the master’s program, your grandfather died and left you $1 million to do with as you please. You are not an inventor, and you do not have a trade skill that you can market; however, you have decided
that you would like to purchase at least one established franchise in the fast-foods area, maybe two (if profitable). The problem is that you have never been one to stay with any project for too long, so you figure that your time frame is 3 years. After 3 years you will go on to something else.
You have narrowed your selection down to two choices: (1) Franchise L, Lisa’s Soups, Salads & Stuff, and (2) Franchise S, Sam’s Fabulous Fried Chicken. The net cash flows that follow include the price you would receive for selling the franchise in Year 3 and the
and lunch, whereas Franchise S serves only dinner, so it is possible for you to invest in both franchises. You see these franchises as perfect complements to one another: You could attract both the lunch and dinner crowds and the health-conscious and not-so-health-conscious crowds without the franchises directly competing against one another.Here are the net cash flows (in thousands of dollars):
Expected Net Cash Flows
Year Franchise L Franchise S
0 2$100 2$100
1 10 70
2 60 50
3 80 20
Depreciation, salvage values, net working capital requirements, and tax effects are all included in these cash flows. You also have made subjective risk assessments of each franchise and concluded that both franchises have risk characteristics that require a return of 10%. You must now determine whether one or both of the franchises should be accepted.
a. What is capital budgeting?
b. What is the difference between independent and mutually exclusive projects?
c. (1) Define the term “
(2) What is the rationale behind the NPV method? According to NPV, which franchise or franchises should be accepted if they are independent? Mutually exclusive?
(3) Would the NPVs change if the cost of capital changed?
d. (1) Define the term “
(2) How is the IRR on a project related to the YTM on a bond? For example, suppose the initial cost of a project is $100 and it has cash flows of $40 each year at Years 1, 2, and 3. What is its IRR? Use the Excel RATE function as though the project were a bond.
(3) What is the logic behind the IRR method? According to IRR, which franchises should be accepted if they are independent? Mutually exclusive?
(4) Would the franchises’ IRRs change if the cost of capital changed?
e. (1) Draw NPV profiles for Franchises L and S. At what discount rate do the profiles cross?
(2) Look at your NPV profile graph without referring to the actual NPVs and IRRs.
Which franchise or franchises should be accepted if they are independent?
Mutually exclusive? Explain. Are your answers correct at any cost of capital less than 23.6%?
f. What is the underlying cause of ranking conflicts between NPV and IRR?
g. Define the term “modified IRR (MIRR).” Find the MIRRs for Franchises L and S.
h. What does the profitability index (PI) measure? What are the PIs of Franchises S and L?
i. (1) What is the payback period? Find the paybacks for Franchises L and S.
(2) What is the rationale for the payback method? According to the payback criterion, which franchise or franchises should be accepted if the firm’s maximum acceptable payback is 2 years and if Franchises L and S are independent? If they are mutually exclusive?
(3) What is the difference between the regular and discounted payback periods?
(4) What is the main disadvantage of discounted payback? Is the payback method of any real usefulness in capital budgeting decisions?
j. As a separate project (Project P), you are considering sponsorship of a pavilion at the upcoming World’s Fair. The pavilion would cost $800,000, and it is expected to result in $5 million of incremental
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