Download - Mod 2 - TVM - Compounding - Slides
7/7/15
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Michael R. Roberts William H. Lawrence Professor of Finance The Wharton School, University of Pennsylvania
Time Value of Money: Compounding
Copyright © Michael R. Roberts
Copyright © Michael R. Roberts
Last TimeTime Value of Money• Intuition – time units like different
currencies• Tools – time line and discount factor• Discounting – Moving CFs back in time• Lesson: Don’t add CFs with different time
units…ever!
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Copyright © Michael R. Roberts
This TimeTime Value of Money• Compounding
USING THE TOOLS: COMPOUNDING
Copyright © Michael R. Roberts
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Compounding
0 1 2 3 4
CF0 CF1 CF2 CF3 CF4
CF2 1+R( )2
CF3 1+R( )1
CF1 1+R( )3
CF0 1+R( )4
Compounding CFs moves them forward in time
Copyright © Michael R. Roberts
Compounding
0 1 2 3 4
CF0 CF1 CF2 CF3 CF4
CF2 1+R( )2
CF3 1+R( )1
CF1 1+R( )3
CF0 1+R( )4
Compounding CFs moves them forward in time
t > 0 because we are moving cash flows forward in time
Copyright © Michael R. Roberts
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Compounding
0 1 2 3 4
CF0 CF1 CF2 CF3 CF4
CF2 1+R( )2
CF3 1+R( )1
CF1 1+R( )3
CF0 1+R( )4
Compounding CFs moves them forward in time
We can add/subtract these CFs because they are in the same time units (date 4)
Copyright © Michael R. Roberts
Future Value
0 1 2 3 4
CF0 CF1 CF2 CF3 CF4
CF2 1+R( )2 = FV4 CF2( )
CF3 1+R( )1 = FV4 CF3( )
CF1 1+R( )3 = FV4 CF1( )
CF0 1+R( )4 = FV4 CF0( )
Future value, FVt(�) of CFs is compounded value of CFs as of t
These are future values of CFs as of year 4
Copyright © Michael R. Roberts
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How much money will I have after three years if I invest $1,000 in a savings account paying 3.5% interest per annum?
Example 1 – Savings
Copyright © Michael R. Roberts
How much money will I have after three years if I invest $1,000 in a savings account paying 3.5% interest per annum?
Example 1 – Savings
Copyright © Michael R. Roberts
0 1 2 3
?1,000
Step 1: Put cash flows on a time line
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How much money will I have after three years if I invest $1,000 in a savings account paying 3.5% interest per annum?
Example 1 – Savings
Copyright © Michael R. Roberts
0 1 2 3
1,000
Step 2: Move cash flow forward
1,000 1+ 0.035( )3
How much money will I have after three years if I invest $1,000 in a savings account paying 3.5% interest per annum?
Example 1 – Savings
Copyright © Michael R. Roberts
0 1 2 3
1,000
Step 2: Move cash flow forward
1,108.7179
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How much money will I have after three years if I invest $1,000 in a savings account paying 3.5% interest per annum?
Example 1 – Savings
Copyright © Michael R. Roberts
0 1 2 3
1,000
Step 2: Move cash flow forward
1,108.7179
This is the future value of the 1,000
How much money will we have four years from today if we save $100 a year, beginning today, for the next three years, assuming we earn 5% per annum?
Example 2 – Savings
Copyright © Michael R. Roberts
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How much money will we have four years from today if we save $100 a year, beginning today, for the next three years, assuming we earn 5% per annum?
Example 2 – Savings
Copyright © Michael R. Roberts
0 1 2 3 4
?100 100 100100
Step 1: Put cash flows on a time line
Example 2 – Savings
0 1 2 3 4
100 1+ 0.05( )2
100 1+ 0.05( )
100 1+ 0.05( )3
100 1+ 0.05( )4
100 100 100100 ?
Copyright © Michael R. Roberts
Step 2: Move CFs forward in time
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Example 2 – Savings
0 1 2 3 4
110.25
105.00
115.763
121.551
100 100 100100 ?
Copyright © Michael R. Roberts
Step 2: Move CFs forward in time
Example 2 – Savings
0 1 2 3 4
110.25
105.00
115.763
121.551
100 100 100100
+
+
+
+
= 452.564
Copyright © Michael R. Roberts
Step 3: Add up cash flows
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Interpretation 1: We will have $452.56 at the end of four years if we save $100 starting today for the next three years and our money earns 5% per annum.
Example 2 – Savings
0 1 2 3 4
100 100 100100 452.564
Copyright © Michael R. Roberts
Interpretation 2: The future value four years from today of saving $100 starting today for the next three years at 5% per annum is $452.56.
Example 2 – Savings
0 1 2 3 4
100 100 100100 452.564
Copyright © Michael R. Roberts
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Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.00
Copyright © Michael R. Roberts
Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.001 $5.00
Copyright © Michael R. Roberts
100 × 0.05
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Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.001 $5.00 $105.00
Copyright © Michael R. Roberts
100 + 5.00=
Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.001 $5.00 $105.00
Copyright © Michael R. Roberts
FV1 100( ) = 100 × 1+ 0.05( )1=
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Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.001 $5.00 $105.00 $100.00
Copyright © Michael R. Roberts
Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.001 $5.00 $105.00 $100.00 $205.00
Copyright © Michael R. Roberts
105 +100=
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Example 2 – Savings (Account)
Year InterestPre-Deposit
Balance DepositPost-Deposit
Balance0 $100.00 $100.001 $5.00 $105.00 $100.00 $205.002 $10.25 $215.25 $100.00 $315.253 $15.76 $331.01 $100.00 $431.014 $21.55 $452.56 $0.00 $452.56
Copyright © Michael R. Roberts
More Generally
0 1 2 3 4
CF0 CF1 CF2 CF3 CF4
CF4 1+R( )−2 = PV2 CF4( )
CF3 1+R( )−1 = PV2 CF3( )
CF1 1+R( )1 = FV2 CF1( )
CF0 1+R( )2 = FV2 CF0( )
Can add CFs at any point in time if same units
Copyright © Michael R. Roberts
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Summary
Copyright © Michael R. Roberts
Lessons
• We use compounding to move cash flows forward in time
• Denote the value of cash flows in the future as future value FVs (CFt)
Copyright © Michael R. Roberts
FVs CFt( ) =CFt 1+R( )s−t for t < s
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Coming up next
• Problem Set
• Useful shortcuts for PV and FV of common streams of cash flows
Copyright © Michael R. Roberts
Problems
Copyright © Michael R. Roberts
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Problem Instructions
Copyright © Michael R. Roberts
These problems are designed to test your understanding of the material and ability to apply what you have learned to situations that arise in practice – both personal and professional. I have tried to retain the spirit of what you will encounter in practice while recognizing that your knowledge to this point may be limited. As such, you may see similar problems in future modules that expand on these or incorporate important institutional features.
Know that all of the problems can be solved with what you have learned in the current and preceding modules. Good luck!
Which of the following future value notations denotes the value as of period six of a cash flow received today?
a) FV0(CF6)b) FV6(CF0)c) FV4(CF)d) FV0(CF0)e) FV6(CF6)
Problem – Notation 1
Copyright © Michael R. Roberts
0 1 2 3 4
CF0
5 6
FV6(CF0)
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Which of the following future value notations denotes the value as of period 11 of a cash flow received in period 2?
a) FV11(CF11)b) FV2(CF2)c) FV2(CF)d) FV11(CF2)e) FV2(CF11)
Problem – Notation 2
Copyright © Michael R. Roberts
0 1 2 10
CF2
113 4
FV11(CF2)
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What will the value of your house be in 10 years if the current value is $500,000 and local home prices are expected to appreciate by 5% per year in the future?
Problem – House Value
Copyright © Michael R. Roberts
Future Value = FV10 CF0( ) = 500,000 × 1+ 0.05( )10 = 814,447.3134
0 1 2 9
500,000 ?
10
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Your expect to earn $60,000 in after-tax income this year and expect that income to grow by 3% per year thereafter. If you save 10% of your income each year, how much will you have at the end of four years if you can invest that money at 6% per annum? Assume that you are paid at the end of each year and that you will receive your first paycheck one year from today?
Problem 1 – Savings
Copyright © Michael R. Roberts
Problem 1 – Savings (Cont.)
Copyright © Michael R. Roberts
0 1 2 3
60,000 x 1.033
Period
60,000 60,000 x 1.03
60,000 x 1.032
4
Income
Savings 6,556.366,000.00 6,180.00 6,365.40
FV 6,556.36
=6,556.36
6,000 x 1.063
= 7,146.10
6,180 x 1.062
= 6,943.85
6,365.40 x 1.06
=6,747.32+ + +
FV = 27,393.63
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Imagine that your goal is to retire 34 year from today with $1,000,000 in savings. Assuming you currently have $5,000 in savings, what rate of return must you earn on that savings to hit your goal?
Problem 2 – Savings
Copyright © Michael R. Roberts
0 1 2 33
5,000
343 4 32
1,000,000
FV34 5,000( ) = 5,000 1+R( )34 = 1,000,000 ⇒R = 1,000,0005,000
⎛⎝⎜
⎞⎠⎟
1/34
−1= 16.86%
, or
PV0 1,000,000( ) = 1,000,0001+R( )34 = 5,000 ⇒R = 1,000,000
5,000⎛⎝⎜
⎞⎠⎟
1/34
−1= 16.86%
How much money do you need to save each year for the next three years, starting next year, in order to have $12,000 at the end of the fourth year? Assume that you save the same amount each year and that you earn 3% per annum.
Problem 3 – Savings
Copyright © Michael R. Roberts
CF CF CF
CF 1+ 0.05( )3 +CF 1+ 0.05( )2 +CF 1+ 0.05( )1 = 12,000⇒CF = 12,000 1.053 +1.052 +1.05⎡⎣ ⎤⎦
−1= 3,625.24
0 1 2 3Period 4
12,000
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Assume that you will be saving each year for three years, starting next year. If your first year savings is $2,500, at what constant rate must your savings grow each year to hit your target of $12,000 at the end of four years if your savings earn 5% per annum?
Problem 4 – Savings
Copyright © Michael R. Roberts
2,500 2,500(1+g) CF(1+g)2
0 1 2 3Period 4
12,0002,500 1+ 0.05( )3 + 2,500 1+ g( ) 1+ 0.05( )2 + 2,500 1+ g( )2 1+ 0.05( )1 = 12,000⇒ 1+ g( )2 +1.05 1+ g( )− 3.4689 = 0⇒ g = 41.01%
Just prior to making the first payment, you find out your child has received a scholarship that pays for tuition and all expenses. So, instead of spending $130,428 per year for four years beginning immediately, you decide to save that money in an account earning 5% per annum and gift it to her when she graduates in four years. How much money will she receive?
Problem – Education
Copyright © Michael R. Roberts
0 1 2 3
?130,428
Period
130,428 130,428 130,428
4
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Just prior to making the first payment, you find out your child has received a scholarship that pays for tuition and all expenses. So, instead of spending $130,428 per year for four years beginning immediately, you decide to save that money in an account earning 5% per annum and gift it to her when she graduates in four years. How much money will she receive?
Problem – Education (Cont.)
Copyright © Michael R. Roberts
Solution 1:
FV4 = FV4 CF0( ) +FV4 CF1( ) +FV4 CF2( ) +FV4 CF3( )= 130,428 1+ 0.05( )4 +130,428 1+ 0.05( )3
+ 130,428 1+ 0.05( )2 +130,428 1+ 0.05( )= 590,269.0327
Just prior to making the first payment, you find out your child has received a scholarship that pays for tuition and all expenses. So, instead of spending $130,428 per year for four years beginning immediately, you decide to save that money in an account earning 5% per annum and gift it to her when she graduates in four years. How much money will she receive?
Problem – Education (Cont.)
Copyright © Michael R. Roberts
Solution 2: The present value of the cash flows is:
PV0 = CF0 +PV0 CF1( ) +PV0 CF2( ) +PV0 CF3( )= 130,428 + 130,428
1+ 0.05( ) +130,4281+ 0.05( )2
+ 130,4281+ 0.05( )3
= 485,615.79
FV4 485,615.79( ) = 485,615.79 1+ 0.05( )4 = 590,269.03