The Time Value of Money

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The Time Value of Money

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Title: The Time Value of Money

1
The Time Value of Money

Economics 71a
Spring 2007
Mayo, Chapter 7
Lecture notes 3.1

2
Goals

Compounding and Future Values
Present Value
Valuing an income stream
Annuities
Perpetuities
Mixed streams
Term structure again
Compounding
More applications

3
Compounding

PV present or starting value
FV future value
R interest rate
n number of periods

4
First example

PV 1000
R 10
n 1
FV ?

FV 1000(1.10) 1,100
5
Example 2Compound Interest

PV 1000
R 10
n 3
FV ?

FV 1000(1.1)(1.1)(1.1) 1,331
FV PV(1R)n
6
Example 3The magic of compounding

PV 1
R 6
n 50
FV ?
FV PV(1R)n 18
n 100, FV 339
n 200, FV 115,000

7
Example 4Doubling times

Doubling time time for funds to double

8
Example 5Retirement Saving

PV 1000, age 20, n 45
R 0.05
FV PV(10.05)45 8985
Doubling 14
R 0.07
FVPV(10.07)45 21,002
Doubling 10
Small change in R, big impact

9
Retirement Savings at 5 interest
10
Goals

Compounding and Future Values
Present Value
Valuing an income stream
Annuities
Perpetuities
Mixed streams
Term structure again
Compounding
More applications

11
Present Value

Go in the other direction
Know FV
Get PV
Answer basic questions like what is 100 tomorrow
worth today

12
ExampleGiven a zero coupon bond paying 1000 in
5 years

How much is it worth today?
R 0.05
PV 1000/(1.05)5 784
This is the amount that could be stashed away to
give 1000 in 5 years time

13
Goals

Compounding and Future Values
Present Value
Valuing an income stream
Annuities
Perpetuities
Mixed streams
Term structure again
Compounding
More applications

14
Annuity

Equal payments over several years
Usually annual
Types Ordinary/Annuity due
Beginning versus end of period

15
Present Value of an Annuity

Annuity pays 100 a year for the next 10 years
(starting in 1 year)
What is the present value of this?
R 0.05

16
Future Value of An Annuity

Annuity pays 100 a year for the next 10 years
(starting in 1 year)
What is the future value of this at year 10?
R 0.05

17
Why the Funny Summation?

Period 10 value for each
Period 10 100
Period 9 100(1.05)
Period 8 100(1.05)(1.05)
Period 1 100(1.05)9
Be careful!

18
Application Lotteries

Choices
16 million today
33 million over 33 years (1 per year)
R 7
PV12.75 million, take the 16 million today

19
Another Way to View An Annuity

Annuity of 100
Paid 1 year, 2 year, 3 years from now
Interest 5
PV 100/(1.05) 100/(1.05)2 100/(1.05)3
272.32

20
Cost to Generate From Today

Think about putting money in the bank in 3
bundles
One way to generate each of the three 100
payments
How much should each amount be?
100 FV PV(1.05)n (n 1, 2, 3)
PV 100/(1.05)n (n 1, 2, 3)
The sum of these values is how much money you
would have to put into bank accounts today to
generate the annuity
Since this is the same thing as the annuity it
should have the same price (value)

21
Perpetuity