1. McGraw-Hill/Irwin Copyright © 2012 by The McGraw-Hill Companies, Inc. All rights reserved.

2. 5-2 Money has a time value. It can be expressed in multiple ways: A dollar today held in savings will grow. A dollar received in a year is not worth as much as a dollar received today. Time Value of Money

3. 5-3 Future Values Future Value: Amount to which an investment will grow after earning interest. Let r = annual interest rate Let t = # of years Simple InterestCompound Interest

4. 5-4 Simple Interest: Example Interest earned at a rate of 7% for five years on a principal balance of $100. Example - Simple Interest TodayFuture Years 1 2 3 4 5 Interest Earned Value100 Value at the end of Year 5: $135 7 107 7 114 7 121 7 128 7 135

5. 5-5 Interest earned at a rate of 7% for five years on the previous year’s balance. Example - Compound Interest TodayFuture Years 1 2 3 4 5 Interest Earned Value100 Compound Interest: Example 7 107 7.49 114.49 8.01 122.50 8.58 131.08 9.18 140.26 Value at the end of Year 5 = $140.26

6. 5-6 The Power of Compounding Interest earned at a rate of 7% for the first forty years on the $100 invested using simple and compound interest.

7. 5-7 Present Value What is it? Why is it useful?

8. 5-8 Present Value Present Value: Discount Rate: Discount Factor: Recall: t = number of years

9. 5-9 Present Value: Example Always ahead of the game, Tommy, at 8 years old, believes he will need $100,000 to pay for college. If he can invest at a rate of 7% per year, how much money should he ask his rich Uncle GQ to give him? Note: Ignore inflation/taxes

10. 5-10 The PV formula has many applications. Given any variables in the equation, you can solve for the remaining variable. Time Value of Money (applications)

11. 5-11 Present Values: Changing Discount Rates Discount Rates The present value of $100 to be received in 1 to 20 years at varying discount rates:

12. 5-12 PV of Multiple Cash Flows The present value of multiple cash flows can be calculated: Recall: r = the discount rate

13. 5-13 Multiple Cash Flows: Example Your auto dealer gives you the choice to pay $15,500 cash now or make three payments: $8,000 now and $4,000 at the end of the following two years. If your cost of money (discount rate) is 8%, which do you prefer? * The initial payment occurs immediately and therefore would not be discounted.

14. 5-14 Perpetuities Let C = Yearly Cash Payment PV of Perpetuity: What are they? Recall: r = the discount rate

15. 5-15 Perpetuities: Example In order to create an endowment, which pays $185,000 per year forever, how much money must be set aside today if the rate of interest is 8%? What if the first payment won’t be received until 3 years from today?

16. 5-16 Annuities What are they? Annuities are equally-spaced, level streams of cash flows lasting for a limited period of time. Why are they useful?

17. 5-17 Present Value of an Annuity Let: C = yearly cash payment r = interest rate t = number of years cash payment is received The terms within the brackets are collectively called the “annuity factor.”

18. 5-18 Annuities: Example You are purchasing a home and are scheduled to make 30 annual installments of $10,000 per year. Given an interest rate of 5%, what is the price you are paying for the house (i.e. what is the present value )?

19. 5-19 Future Value of Annuities: Example You plan to save $4,000 every year for 20 years and then retire. Given a 10% rate of interest, how much will you have saved by the time you retire?

20. 5-20 Annuity Due How does it differ from an ordinary annuity? What is it? Recall: r = the discount rate How does the future value differ from an ordinary annuity?

21. 5-21 Annuities Due: Example Example: Suppose you invest $429.59 annually at the beginning of each year at 10% interest. After 50 years, how much would your investment be worth?

22. 5-22 Interest Rates: EAR & APR What is EAR? What is APR? How do they differ?

23. 5-23 *where MR = monthly interest rate EAR & APR Calculations Effective Annual Interest Rate (EAR) : Annual Percentage Rate (APR):

24. 5-24 EAR and APR: Example Given a monthly rate of 1%, what is the Effective Annual Rate(EAR)? What is the Annual Percentage Rate (APR)?

25. 5-25 Inflation What is it? What determines inflation rates? What is deflation?

26. 5-26 Inflation and Real Interest Exact calculation: Approximation:

27. 5-27 Inflation: Example If the nominal interest rate on your interest-bearing savings account is 2.0% and the inflation rate is 3.0%, what is the real interest rate?

28. 5-28 Appendix A: Inflation Annual U.S. Inflation Rates from 1900 - 2010