Time value of money

Time Value of Money
“The value of money varies in terms of
time.”
-Prof. Dr. Md. Jahirul Hoque

Why you need to study?
 Accounting: To understand time-value-of-money (T-V-M) calculations
in order to account for certain transactions such as loan amortization,
lease payments, and bond interest rates.
 Information systems: To design systems that optimize the firm’s cash
flows.
 Management: To make plan of cash collections and disbursements in a
way that will enable the firm to get the greatest value from its money.
 Marketing: To ensure funding for new programs and products must be
justified financially using time-value-of-money techniques.
 Operations: To identify the optimum ways of investments in new
equipment, in inventory, and in production quantities will be affected by
TVM techniques.

Basic Chapter Contents…..
 Concept of Time Value of Money,
 Significance of Time value of money.
 Present Value, Future Value.
 Concept & Types of Annuity,
 Present Value of an Annuity.
 Future Value of an Annuity, Perpetual annuity.
 Loan Amortization & Sinking Fund.
 Problems and Solutions

9/29/20194
Concept of Time Value of Money
The idea that today’s a specific sum of money is
worth more than the same amount in the future
because time allows us the opportunity to postpone
consumption and earn return.

Significance of Time value of money
This chapter introduces the topic of financial
mathematics also known as the time value of
money.
To avoid Inflationary effect in assets
To secure the assets’ return both in short and long-run
by creating proper working capital Management and
capital budgeting decisions
To calculate the cost of capital when a firm is going to
raise capital.
To determine pricing a bond issuance
To find out whether lease financing is applicable or
not.

9/29/20196
Simple vs Compound Interest Rate
Simple Interest Rate: Interest is applicable only on the
principal amount.
Compound Interest Rate: Interest is applicable on both
the principal amount and cumulative interest earned.

9/29/20197
Nominal vs Effective Annual Interest Rates
i. Nominal Interest Rate: The contractual interest rate
for a year which is not adjusted for frequency of
compounding.
ii. Effective Annual Interest Rate: The rate of interest for
a year which is adjusted for frequency of
compounding.

9/29/20198
Present Value vs Future Value
Present Value: It is the current value of a future
amount of money, or a series of payments, evaluated
at a given interest rate.
Future Value: It is the value at some future time of a
present amount of money, or a series of payments,
evaluated at a given interest rate.

Future Value of a Lump Sum
 The future value in 2 years of $1,000 earning
5% annually is an example of computing the
future value of a lump sum. We can compute
this in any one of three ways:
 Using a calculator programmed for financial math
 Solve the mathematical equation
 Using financial math tables

Solve for the Future Value
 The general equation for future value is:
FVn = PV x (1+i)n
 Computing the future value in the
example:
FV2 = $1,000 x (1+5%)2 = $1,102.50

Present Value of a Lump Sum
 How much do you need to invest today so
you can make a single payment of $30,000
in 18 years if the interest rate is 8%? This is
an example of the present value of a lump
sum.
 Again we can solve it using a programmed
calculator, solving the math
Md. Azizur Rahman

The general equation for present value is:
 Computing the present value in the example:
Solve for the Present Value
 n
n
i1
FV
PV


 
47.507,7$
8%1
$30,000
PV 18




Annuities
• Two or more periodic payments
• All payments are equal in size.
• Periods between each payment are
equal in length.
Md. Azizur Rahman

9/29/201915
Types of Annuity
i. Ordinary Annuity: Payments or receipts occur at the
end of each period.
ii. Annuity Due: Payments or receipts occur at the
beginning of each period.
iii. Perpetual Annuity: It is expected to be continued
forever.

Future Value of an Annuity
 Suppose you plan to deposit $1,000
annually into an account at the end of each
of the next 5 years. If the account pays
12% annually, what is the value of the
account at the end of 5 years? This is a
future value of an annuity example.
 We can solve this problem using a
programmed calculator, solving the math,
or using Table 5.3.

Solve for the Future Value of an Annuity
 The general equation for a FV of an annuity is:
 The FV of the annuity in the example is:
 





 

i
1i1
xPMTFVA
n
n
  85.352,6$
12%
112%1
x000,1$FVA
5
5 




 


Present Value of an Annuity
 You plan to withdraw $1,000 annually from
an account at the end of each of the next 5
years. If the account pays 12% annually,
what must you deposit in the account today?
This is an example of a present value of an
annuity.
 We can solve this problem using a
programmed calculator, solving the math, or
using Table 5.4.

Solve for the Present Value of an Annuity
 The general equation for PV of an annuity is:
 The PV of the annuity in the example is:
 














i
i1
1
-1
xPMTPVA
n
n
  78.604,3$
12%
12%1
1
-1
x000,1$PVA
5
5 















Perpetuity—An Infinite Annuity
 A perpetuity is essentially an infinite annuity.
 An example is an investment which costs you
$1,000 today and promises to return to you $100
at the end of each forever!
 What is your rate of return or the interest rate?
%10
$1,000
$100
PV
PMT
i 

The Present Value of a Perpetuity
 Another investment pays $90 at the end of
each year forever. If 10% is the relevant
interest rate, what is the value of this
investment to you today? We need to solve
for the present value of the perpetuity.
900$
10%
$90
i
PMT
PV 

Compounding Periods Other Than Annual
 Future value of a lump sum.
– inom = nominal annual interest rate
– m = number of compounding periods per year
– n = number of years
nxm
nom
n
m
i
1xPVFV 







 A $1,000 investment earns 6% annually
compounded monthly for 2 years.
2x12
2
12
6%
1x000,1$FV 






  16.127,1$0.5%1x000,1$FV
24
2 

 PV of a lump sum uses a similar adjustment to the basic
equation for non-annual compounding.
– inom = nominal annual interest rate
– m = number of compounding periods per year
– n = number of years
nxm
nom
n
m
i
1
FV
PV









Effective Annual Rate
 An effective annual rate is an annual
compounding rate. When compounding periods
are not annual, the rate can still be expressed as
an effective annual rate using the following:
– inom = nominal annual rate
– m = number of compounding periods in 1 year
1
m
i
1RateAnnualEffective
m
nom








Effective Annual Rate
 A bank offers a certificate of deposit rate of 6%
annually compounded monthly. What is the
equivalent effective annual rate?
  6.17%1-0.5%11
12
6%
1
12
12








SINKING FUND
Vs
AMORTIZATION
 SINKING FUND: With the sinking fund we begin with a fund of
zero taka and make periodic deposits into the fund which, along
with the interest earned on these deposits, accumulate to the
total amount of a savings goal.
 Where, S= Amount (Future value of annuity) Sinking fund after
n payment.








1)1(
xSR n
i
i

SINKING FUND
Vs
AMORTIZATION
 AMORTIZATION: With the amortization of a debt, we begin with a
debt balance of ‘X’ taka and make periodic payments toward the
debt and the interest on the unpaid balance, eventually reducing
the debt balance to zero taka.
Where, A= Amount of Debt (Present value of annuity)
  













n-
i1
1
-1
A xR
i

1. Calculate the payment per period.
2. Determine the interest in Period t.
(Loan Balance at t-1) x (i% / m)
3. Compute principal payment in Period t.
(Payment - Interest from Step 2)
4. Determine ending balance in Period t.
(Balance - principal payment from Step 3)
5. Start again at Step 2 and repeat.
Steps to Amortizing a Loan

Julie Miller is borrowing $10,000 at a compound
annual interest rate of 12%. Amortize the loan
if annual payments are made for 5 years.
Step 1: Payment
PV0 = R (PVIFA i%,n)
$10,000 = R (PVIFA 12%,5)
$10,000 = R (3.605)
R = $10,000 / 3.605 = $2,774
Amortizing a Loan Example

Amortizing a Loan Example
End of
Year
Payment Interest Principal Ending
Balance
0 --- --- --- $10,000
1 $2,774 $1,200 $1,574 8,426
2 2,774 1,011 1,763 6,663
3 2,774 800 1,974 4,689
4 2,774 563 2,211 2,478
5 2,775 297 2,478 0
$13,871 $3,871 $10,000
[Last Payment Slightly Higher Due to Rounding]

Using the Amortization
Functions of the Calculator
Press:
2nd Amort
2 ENTER
2 ENTER
Results:
BAL = 6,662.91* ↓
PRN = -1,763.99* ↓
INT = -1,011.11* ↓
Year 2 information only
*Note: Compare to 3-82

Using the Amortization
Functions of the Calculator
Press:
2nd Amort
1 ENTER
5 ENTER
Results:
BAL = 0.00 ↓
PRN =-10,000.00 ↓
INT = -3,870.49 ↓
Entire 5 Years of loan information
(see the total line of 3-82)

Usefulness of Amortization
2. Calculate Debt Outstanding -- The
quantity of outstanding debt may be used
in financing the day-to-day activities of the
firm.
1. Determine Interest Expense -- Interest
expenses may reduce taxable income of
the firm.

Reference:
 Gitman, L.J. (2007) Principles of Managerial Finance (Twelfth Edition).
Boston, MA: Pearson Education, Inc.
 Besley, S., & Brigham, E. F. (2008). Essentials of managerial finance.
Thomson South-Western.
 Brigham, E. F., & Houston, J. F. (2012). Fundamentals of financial
management. Cengage Learning.
 Hoque, Md. Jahirul (2007), Fundamentals of Managerial Finance,
Open University.

Time value of money

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