1. Chapter 3 Principles PrinciplesofCorporateFinance Concise Edition How To Calculate Present Values Slides by Matthew Will Copyright © 2009 by The McGraw-Hill Companies, Inc. All rights reserved. McGraw Hill/Irwin

2. 3- 2 Topics Covered  Valuing Long-Lived Assets  Looking for Shortcuts – Perpetuities and Annuities  More Shortcuts – Growing Perpetuities and Annuities  Compound Interest & Present Values

3. 3- 3 Present Values  Discount Factors can be used to compute the present value of any cash flow.

4. 3- 4 Present Values Example You just bought a new computer for $3,000. The payment terms are 2 years same as cash. If you can earn 8% on your money, how much money should you set aside today in order to make the payment when due in two years?

5. 3- 5 Present Values Example You have the opportunity to purchase the baseball hit by Barry Bonds to break Hank Arron’s home run record (home run # 756). You estimate this baseball will be worth $2,000,000 when you retire at the end of twenty years. If you expect a 12% return on your investment, how much will you pay for the baseball ?

6. 3- 6 Present Values  Replacing “1” with “t” allows the formula to be used for cash flows that exist at any point in time

7. 3- 7 Present Values Example You will receive $200 risk free in two years. If the annual rate of interest on a two year treasury note is 7.7%, what is the present value of the $200?

8. 3- 8 Present Values  PVs can be added together to evaluate multiple cash flows.

9. 3- 9 Present Values  PVs can be added together to evaluate multiple cash flows.

10. 3- 10 Present Values Present Value Year 0 100/1.07 200/1.077 2 Total = $93.46 = $172.42 = $265.88 $100 $200 Year 0 12

11. 3- 11 Present Values  Given two dollars, one received a year from now and the other two years from now, the value of each is commonly called the Discount Factor. Assume r 1 = 20% and r 2 = 7%.

12. 3- 12 Present Values Example Assume that the cash flows from the construction and sale of an office building is as follows. Given a 5% required rate of return, create a present value worksheet and show the net present value.

13. 3- 13 Present Values Example - continued Assume that the cash flows from the construction and sale of an office building is as follows. Given a 5% required rate of return, create a present value worksheet and show the net present value.

14. 3- 14 Present Values Present Value Year 0 -170,000 -100,000/1.05 320,000/1.05 2 Total = NPV -$170,000 = -$170,000 = $95,238 = $290,249 = $25,011 -$100,000 +$320,000 Year 0 12 Example - continued Assume that the cash flows from the construction and sale of an office building is as follows. Given a 5% required rate of return, create a present value worksheet and show the net present value.

15. 3- 15 Short Cuts  Sometimes there are shortcuts that make it very easy to calculate the present value of an asset that pays off in different periods. These tools allow us to cut through the calculations quickly.

16. 3- 16 Short Cuts Perpetuity - Financial concept in which a cash flow is theoretically received forever.

17. 3- 17 Short Cuts Perpetuity - Financial concept in which a cash flow is theoretically received forever.

18. 3- 18 Present Values Example What is the present value of $1 billion every year, for all eternity, if you estimate the perpetual discount rate to be 10%?

19. 3- 19 Short Cuts Annuity - An asset that pays a fixed sum each year for a specified number of years. Perpetuity (first payment in year 1) Perpetuity (first payment in year t + 1) Annuity from year 1 to year t AssetYear of Payment 1 2…..t t + 1 Present Value

20. 3- 20 Example Tiburon Autos offers you “easy payments” of $5,000 per year, at the end of each year for 5 years. If interest rates are 7%, per year, what is the cost of the car? Present Values 5,000 Year 0 1 2 3 4 5 5,000 Present Value at year 0

21. 3- 21 Short Cuts Annuity - An asset that pays a fixed sum each year for a specified number of years.

22. 3- 22 Annuity Short Cut Example You agree to lease a car for 4 years at $300 per month. You are not required to pay any money up front or at the end of your agreement. If your opportunity cost of capital is 0.5% per month, what is the cost of the lease?

23. 3- 23 Annuity Short Cut Example - continued You agree to lease a car for 4 years at $300 per month. You are not required to pay any money up front or at the end of your agreement. If your opportunity cost of capital is 0.5% per month, what is the cost of the lease?

24. 3- 24 Annuity Short Cut Example The state lottery advertises a jackpot prize of $295.7 million, paid in 25 installments over 25 years of $11.828 million per year, at the end of each year. If interest rates are 5.9% what is the true value of the lottery prize?

25. 3- 25 FV Annuity Short Cut Future Value of an Annuity – The future value of an asset that pays a fixed sum each year for a specified number of years.

26. 3- 26 Annuity Short Cut Example What is the future value of $20,000 paid at the end of each of the following 5 years, assuming your investment returns 8% per year?

27. 3- 27 Constant Growth Perpetuity g = the annual growth rate of the cash flow

28. 3- 28 Constant Growth Perpetuity NOTE: This formula can be used to value a perpetuity at any point in time.

29. 3- 29 Constant Growth Perpetuity Example What is the present value of $1 billion paid at the end of every year in perpetuity, assuming a rate of return of 10% and a constant growth rate of 4%?

30. 3- 30 Perpetuities A three-year stream of cash flows that grows at the rate g is equal to the difference between two growing perpetuities.

31. 3- 31 Compound Interest i ii iii iv v Periods Interest Value Annually per per APR after compounded year period (i x ii) one year interest rate 1 6% 6% 1.06 6.000% 2 3 6 1.03 2 = 1.0609 6.090 4 1.5 6 1.015 4 = 1.06136 6.136 12.5 6 1.005 12 = 1.06168 6.168 52.1154 6 1.001154 52 = 1.06180 6.180 365.0164 6 1.000164 365 = 1.06183 6.183

32. 3- 32 Simple and Compound Interest The value of a $100 investment earning 10% annually.

33. 3- 33 Compound Interest Compound interest versus simple interest. The top two ascending lines show the growth of $100 invested at simple and compound interest. The longer the funds are invested, the greater the advantage with compound interest. The bottom line shows that $38.55 must be invested now to obtain $100 after 10 periods. Conversely, the present value of $100 to be received after 10 years is $38.55.

34. 3- 34 Compound Interest The same story as the previous chart, except that the vertical scale is logarithmic. A constant compound rate of growth means a straight ascending line. This graph makes clear that the growth rate of funds invested at simple interest actually declines as time passes.

35. 3- 35 Compound Interest

36. 3- 36 Compound Interest Example Suppose you are offered an automobile loan at an APR of 6% per year. What does that mean, and what is the true rate of interest, given monthly payments?

37. 3- 37 Compound Interest Example - continued Suppose you are offered an automobile loan at an APR of 6% per year. What does that mean, and what is the true rate of interest, given monthly payments? Assume $10,000 loan amount.

38. 3- 38 Web Resources www.bankrate.com www.money.cnn.com www.quicken.com www.smartmoney.com Click to access web sites Internet connection required