Copyright © 1999 Addison Wesley Longman 1 Chapter 6: The Time Value of Money Part II Investments Copyright © 1999 Addison Wesley Longman
The Time Value of Money 6 CHAPTER 6 Copyright © 1999 Addison Wesley Longman
3 Chapter 6: The Time Value of Money Objectives 1. Compute FV of Lump Sum 2. Compute PV of Lump Sum 3. Compute FV of Annuity 4. Apply TVM Concepts
Copyright © 1999 Addison Wesley Longman 4 Chapter 6: The Time Value of Money The time value of money is the return required to induce a saver to defer current consumption with the expectation of increased future wealth. The time value of money embodies the first fundamental tenant of finance: A dollar today is worth more than a dollar to be received in the future. THE TIME VALUE OF MONEY
Copyright © 1999 Addison Wesley Longman 5 Chapter 6: The Time Value of Money FUTURE VALUE What an amount of money today will be worth at some point in the future at given rate of interest. 1. Compounding is the process of accumulating interest on interest making the balance grow at a geometric rate 2. Compound interest is interest earned on both the initial principal and the interest reinvested from prior periods
Copyright © 1999 Addison Wesley Longman 6 Chapter 6: The Time Value of Money One Period Model FV 1 = PV 0 (1 + i) FV 1 = 100 (1.05) = 105
Copyright © 1999 Addison Wesley Longman 7 Chapter 6: The Time Value of Money Calculating Future Value FV = PV(1 + i/k) nk FV = future value of money n periods into the future PV = present value of money today i = nominal interest rate n = # of years investment is to be held k = # of compounding periods in a year (# of times interest is calculated and credited to account) i/k = periodic rate
Copyright © 1999 Addison Wesley Longman 8 Chapter 6: The Time Value of Money Example: Place $1000 into a savings account for 5 years at 10% compounded annually. What will be the future value of the account upon withdrawal in 5 years? FV = PV(1 + i/k) nk | | | | | | $1,000 ?
Copyright © 1999 Addison Wesley Longman 9 Chapter 6: The Time Value of Money Using the Calculator 1. Set up the TVM template [N] = [I/Y]= [PV]= [PMT]= [FV]= 2. Make sure your calculator is set to the financial mode for time value of money calculations. 3. Make sure calculator is set to 1 payment per year [P/Y].
Copyright © 1999 Addison Wesley Longman 10 Chapter 6: The Time Value of Money 4. To obtain [N], multiply the # of years (n) quoted in the problem by the # of payments per year or compounding periods per year (k). 5. To enter [I/Y], divide the interest rate by the # of payments per year (k). 6.To enter [PMT], enter the amount of the payment. If there is no payment, enter a To enter [PV] or [FV], enter the amount and press the key.
Copyright © 1999 Addison Wesley Longman 11 Chapter 6: The Time Value of Money 8. To solve for the missing variable a.TI-BApress[CPT] & [?] b. HPpress[?]
Copyright © 1999 Addison Wesley Longman 12 Chapter 6: The Time Value of Money As the Number of Compounding Periods Increases, the Future Balance Increases FV of $ years from now at a rate of 6% Annual Compunding = $3, Semi-Annual Compounding = $3,612.22
Copyright © 1999 Addison Wesley Longman 13 Chapter 6: The Time Value of Money FIGURE 6.1 Effect of Different Compounding Frequencies on Future Value
Copyright © 1999 Addison Wesley Longman 14 Chapter 6: The Time Value of Money Present Value What an amount of money to be received in the future is worth today discounted at a certain rate of interest. A. Discounting The process of deducting or taking out interest income or the expected increase in an investments value over time to determine the current (present) value of an asset The reverse of compunding B. The discount rate The rate that you expect to receive on similar investments of comparable risk.
Copyright © 1999 Addison Wesley Longman 15 Chapter 6: The Time Value of Money Calculating Present Value PV = FV [1/ (1 + i/k) nk ] FV = future value of money n periods into the future PV = present value of money today i = nominal interest rate n = # of years investment is to be held k = # of compounding periods in a year (# of times interest is calculated and credited to account) i/k = periodic rate
Copyright © 1999 Addison Wesley Longman 16 Chapter 6: The Time Value of Money Example : Your new company will reimburse your total education costs of $10,000 after you have been with the firm for 5 years. If your discount rate is 8% compounded monthly (probably the rate you are paying on your student loans), what is the present value of the $10,000 reimbursement? | | | | | | ? $10,000 Using the calculator [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 17 Chapter 6: The Time Value of Money Comparing Interest Rates A. Annual Percentage Rate (APR) 1. the periodic rate times the number of compounding periods 2. rate stated by banks in advertising B. Effective (equivalent) Annual Rate (EAR) The annual rate which provides the same return on money compounded at some periodic rate k times a year. 1. The "true" rate 2. used to compare rates when compounding periods differ 3. EAR = (1 + i/k) k - 1
Copyright © 1999 Addison Wesley Longman 18 Chapter 6: The Time Value of Money Example: You place $5,000 into a CD for 3 years paying a nominal rate of 8% compounded quarterly. What is the effective annual rate for this CD? In other words, at what annual compounding rate would you have the same amount of money? EAR = (1 + i/k) k - 1
Copyright © 1999 Addison Wesley Longman 19 Chapter 6: The Time Value of Money Checking your answer Obtain the terminal value of the CD at the 8% with quarterly compounding and at the EAR using annual compounding Quarterly compoundingAnnual compounding [N] =[N] = [I/Y]=[I/Y]= [PV]=[PV]= [PMT]=[PMT]= [FV]=[FV]=
Copyright © 1999 Addison Wesley Longman 20 Chapter 6: The Time Value of Money Compounding Effective Interval Equation6.3 Rate Annual FV = (1.12) 1 – % SemiannualFV = (1.06) 2 – Quarterly FV = (1.03) 4 – MonthlyFV = (1.01) 12 – WeeklyFV = (1.0023) 52 – DailyFV = ( ) 365 – Continuously FV = e.12 – Table 2.2Effective Interest Rates with 12% Annual Rate
Copyright © 1999 Addison Wesley Longman 21 Chapter 6: The Time Value of Money Annuities An annuity is a series of equal payments made at fixed intervals for a specified number of years or indefinitely. A. Types of Annuities 1. Ordinary annuity Series of equal payments made at the end of each period for a fixed number of periods | | | | | | $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 22 Chapter 6: The Time Value of Money 2. Annuity Due Series of equal payments made at the beginning of each period for a fixed number of periods | | | | | | $100 $100 $100 $100 $ Perpetuity Series of equal payments made at the end of each period which continue foever | | | | |----(...)------| $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 23 Chapter 6: The Time Value of Money Future Value of an Annuity 1. The future value of an ordinary annuity where i=10% | | | | | | $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 24 Chapter 6: The Time Value of Money Using a calculator [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 25 Chapter 6: The Time Value of Money 2. The future value of an annuity due where i=10% | | | | | | $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 26 Chapter 6: The Time Value of Money Using a calculator [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 27 Chapter 6: The Time Value of Money 3. Future value of a perpetuity = | | | | |----(...)------| $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 28 Chapter 6: The Time Value of Money Present Value of an Annuity The present value of all annuity payments discounted at your discount rate. 1. the present value of an ordinary annuity where i=10% | | | | | | $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 29 Chapter 6: The Time Value of Money Using a calculator [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 30 Chapter 6: The Time Value of Money 2. the present value of an annuity due where i=10% | | | | | | $100 $100 $100 $100 $ the present value of a perpetuity where i=10% | | | | |----(...)------| $100 $100 $100 $100 $100
Copyright © 1999 Addison Wesley Longman 31 Chapter 6: The Time Value of Money Using a calculator [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 32 Chapter 6: The Time Value of Money What is the PV of the following cash flow stream? | | | % Example: Deferred Annuities
Copyright © 1999 Addison Wesley Longman 33 Chapter 6: The Time Value of Money Uneven Cash Flows A series of Cash flows in which the payment amount varies from period to period. A. Future Value of an uneven cash flow stream where i=10% | | | | | | $100 $200 $-50 $300 $100
Copyright © 1999 Addison Wesley Longman 34 Chapter 6: The Time Value of Money B.Present Value of an uneven cash flow stream where i=10% | | | | | | $100 $200 $-50 $300 $100
Copyright © 1999 Addison Wesley Longman 35 Chapter 6: The Time Value of Money Amortized Loans Characteristics 1. Repay the loan in equal payments for each period over the life of the loan. 2. Each payment includes both principal and interest.
Copyright © 1999 Addison Wesley Longman 36 Chapter 6: The Time Value of Money Example: You buy a car for $10,000 and finance it for 5 years at 10% APR with payments at the end of each month. What is the amount of each payment if you fully amortize the loan? [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 37 Chapter 6: The Time Value of Money The Amortization Schedule 1.Repayment schedule of amortized loan 2.Breaks payments into interest and principal components 3.As the loan is paid off the proportion of interest being paid declines and the proportion of principal being paid off increases
Copyright © 1999 Addison Wesley Longman 38 Chapter 6: The Time Value of Money Example: Given the above car loan, provide an amortization schedule for the first year. MonthBeginningPaymentInterest Principal Balance Per Payment Per Payment Jan$10,000 $ $83.33 $ Feb$ 9,871 $ $82.26 $ Mar $ 9,741_______ _______ ________ Apr______________ _______ ________ May ______________ _______ ________ Jun______________ _______ ________ Jul______________ _______ ________ Aug______________ _______ ________ Sep______________ _______ ________ Oct______________ _______ ________ Nov______________ _______ ________ Dec______________ _______ ________
Copyright © 1999 Addison Wesley Longman 39 Chapter 6: The Time Value of Money Growth Rates To compute the compounded growth rate use the FV equation. The beginning value is the PV. The ending value is the FV.
Copyright © 1999 Addison Wesley Longman 40 Chapter 6: The Time Value of Money Example: You bought stock for $15.00 per share 5 years ago. It is currently selling for $45.00 per share. What is the compounded average growth rate? FV = PV (1 + g) N
Copyright © 1999 Addison Wesley Longman 41 Chapter 6: The Time Value of Money FV = PV (1 + g) N Using a calculator [N] = [I/Y]= [PV]= [PMT]= [FV]=
Copyright © 1999 Addison Wesley Longman 42 Chapter 6: The Time Value of Money 1 Use future value to find the balance resulting from an interest-earning deposit. 2 Use future value of an annuity to find the payment needed to achieve a known future balance. Review of FV & PV
Copyright © 1999 Addison Wesley Longman 43 Chapter 6: The Time Value of Money 3 Use either present or future value (without an annuity) to compute growth rates. 4 Use present value on all loan calculations. 5 Use present value to value assets. 6 Use present value to evaluate investments.