Math 1300: Section 3-3 Future Value of an Ordinary Annuity; Sinking Funds

Present Value of an Ordinary Annuity
Amortization
Amortization Schedules

Math 1300 Finite Mathematics
Section 3.4 Present Value of an Annuity; Amortization

Jason Aubrey

Department of Mathematics
University of Missouri

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Jason Aubrey Math 1300 Finite Mathematics

Amortization

Present Value

Present value is the value on a given date of a future
payment or series of future payments, discounted to reﬂect
the time value of money and other factors such as
investment risk.

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Amortization

Present Value

Present value is the value on a given date of a future
payment or series of future payments, discounted to reﬂect
the time value of money and other factors such as
investment risk.
Present value calculations are widely used in business and
economics to provide a means to compare cash ﬂows at
different times on a meaningful "like to like" basis.

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Amortization

Theorem (The present value of an ordinary annuity)
1 − (1 + i)−n
PV = PMT
i

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Amortization

1 − (1 + i)−n
PV = PMT
i
where
PV = present value of all payments

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Amortization

1 − (1 + i)−n
PV = PMT
i
where
PMT = periodic payment

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Amortization

1 − (1 + i)−n
PV = PMT
i
where
i = rate per period

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Amortization

1 − (1 + i)−n
PV = PMT
i
where
i = rate per period
n = number of periods

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Amortization

1 − (1 + i)−n
PV = PMT
i
where
i = rate per period
n = number of periods
Note: Payments are made at the end of each period.

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Amortization

Example: American General offers a 10-year ordinary annuity
with a guaranteed rate of 6.65% compounded annually. How
much should you pay for one of these annuities if you want to
receive payments of $5,000 annually over the 10-year period?

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Amortization

r 0.0665
Here m = 1; n = 10; i = m = 1 = 0.0665; PMT = $5, 000.
So,

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Amortization

r 0.0665
Here m = 1; n = 10; i = m = 1 = 0.0665; PMT = $5, 000.
So,

1 − (1 + i)−n
PV = PMT
i

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Amortization

r 0.0665
Here m = 1; n = 10; i = m = 1 = 0.0665; PMT = $5, 000.
So,

1 − (1 + i)−n
PV = PMT
i
1 − (1.0665)−10
PV = ($5, 000) = $35, 693.18
.0665

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Amortization

Example: Recently, Lincoln Beneﬁt Life offered an ordinary
annuity that earned 6.5% compounded annually. A person
plans to make equal annual deposits into this account for 25
years in order to then make 20 equal annual withdrawals of
$25,000, reducing the balance in the account to zero. How
much must be deposited annually to accumlate sufﬁcient funds
to provide for these payments? How much total interest is
earned during this entire 45-year process?

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Amortization

We ﬁrst ﬁnd the present value necessary to provide for the
withdrawals.

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Amortization

withdrawals.
In this calculation, PMT = $25,000, i = 0.065 and n = 20.

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Amortization

withdrawals.

1 − (1 + i)−n
PV = PMT
i

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Amortization

withdrawals.

1 − (1 + i)−n
PV = PMT
i
1 − (1.065)−20
PV = ($25, 000) = $275, 462.68
.065

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Amortization

Now we ﬁnd the deposits that will produce a future value of
$275,462.68 in 25 years.

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Amortization

$275,462.68 in 25 years.
Here we use FV = $275,462.68, i = 0.065 and n = 25.

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Amortization

$275,462.68 in 25 years.

(1 + i)n − 1
FV = PMT
i

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Amortization

$275,462.68 in 25 years.

(1 + i)n − 1
FV = PMT
i
(1.065)25 − 1
$275, 462.68 = PMT
.065

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Amortization

$275,462.68 in 25 years.

(1 + i)n − 1
FV = PMT
i
(1.065)25 − 1
$275, 462.68 = PMT
.065
.065
PMT = ($275, 462.68) = $4, 677.76
(1.065)25 − 1

Thus, depositing $4,677.76 annually for 25 years will provide
for 20 annual withdrawals of $25,000.
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Amortization

The interest earned during the entire 45-year process is

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Amortization


interest = (total withdrawals) − (total deposits)

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Amortization


= 20($25, 000) − 25($4, 677.76)

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Amortization


= 20($25, 000) − 25($4, 677.76)
= $383, 056

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Amortization

Amortization

In business, amortization is the distribution of a single
lump-sum cash ﬂow into many smaller cash ﬂow
installments, as determined by an amortization schedule.

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Amortization

Amortization

In business, amortization is the distribution of a single
lump-sum cash flow into many smaller cash flow
installments, as determined by an amortization schedule.
Unlike other repayment models, each repayment
installment consists of both principal and interest.
Amortization is chiefly used in loan repayments (a common
example being a mortgage loan) and in sinking funds.

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Amortization

Amortization

Payments are divided into equal amounts for the duration
of the loan, making it the simplest repayment model.

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Amortization

Amortization

Payments are divided into equal amounts for the duration
of the loan, making it the simplest repayment model.
A greater amount of the payment is applied to interest at
the beginning of the amortization schedule, while more
money is applied to principal at the end.

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Amortization

Example: A family has a $50,000, 20-year mortgage at 7.2%
compounded monthly. Find the monthly payment.

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Amortization

0.072
We note that m = 12; i = 12 = 0.006; n = 20 × 12 = 240;
PV = $50, 000

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Amortization

0.072
We note that m = 12; i = 12 = 0.006; n = 20 × 12 = 240;
PV = $50, 000

1 − (1 + i)−n
PV = PMT
i

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Amortization

0.072
We note that m = 12; i = 12 = 0.006; n = 20 × 12 = 240;
PV = $50, 000

1 − (1 + i)−n
PV = PMT
i
1 − (1.006)−240
$50, 000 = PMT
.006

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Amortization

0.072
We note that m = 12; i = 12 = 0.006; n = 20 × 12 = 240;
PV = $50, 000

1 − (1 + i)−n
PV = PMT
i
1 − (1.006)−240
$50, 000 = PMT
.006
.006
PMT = ($50, 000) = $393.67
1 − (1.006)−240

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Amortization

For the same mortgage, ﬁnd the unpaid balance after 5 years.

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Amortization


We use the value of PMT=$393.67 to ﬁnd the unpaid
balance after 5 years.
In these "unpaid balance after" problems, n represents the
number of interest periods remaining.
Here n = 240 − 60 = 180. Therefore,

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Amortization



1 − (1 + i)−n
PV = PMT
i

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Amortization



1 − (1 + i)−n
PV = PMT
i
1 − (1.006)−180
PV = (393.67) = $43, 258.22
.006

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Amortization

For the same mortgage, compute the unpaid balance after 10
years.

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Amortization

years.
Here n = 240 − 120 = 120 and so,

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Amortization

years.
Here n = 240 − 120 = 120 and so,

1 − (1 + i)−n
PV = PMT
i

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Amortization

years.
Here n = 240 − 120 = 120 and so,

1 − (1 + i)−n
PV = PMT
i
1 − (1.006)−120
PV = ($393.67) = $33, 606.26
.006

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Amortization


Example: Construct the amortization schedule for a $5,000
debt that is to be amortized in eight equal quarterly payments
at 2.8% compounded quarterly.

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Amortization


First we calculate the quarterly payment. Here we have
m = 4; n = 8; i = m = 0.028 = 0.007. Then
r
4

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Amortization


m = 4; n = 8; i = m = 0.028 = 0.007. Then
r
4

1 − (1 + i)−n
PV = PMT
i

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Amortization


m = 4; n = 8; i = m = 0.028 = 0.007. Then
r
4

1 − (1 + i)−n
PV = PMT
i
1 − (1.007)−8
$5, 000 = PMT
.007

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Amortization


m = 4; n = 8; i = m = 0.028 = 0.007. Then
r
4

1 − (1 + i)−n
PV = PMT
i
1 − (1.007)−8
$5, 000 = PMT
.007
.007
PMT = ($5, 000) = $644.85
1 − (1.007)−8
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Amortization


Period Payment Payment Int. Bal. Reduction Unpaid Bal.
0
1
2
3
4
5
6
7
8

Interest owed during a period = university-logo
(Balance during period)(Interest rate per period)

Amortization


0 $5,000
1
2
3
4
5
6
7
8


Amortization


0 $5,000
1 $644.85
2 $644.85
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35
2 $644.85
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85
2 $644.85
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85 $8.93
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85 $8.93 $635.50
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85 $8.93 $635.50 $640.35
8 $644.85


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85 $8.93 $635.50 $640.35
8 $644.85 $4.48


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85 $8.93 $635.50 $640.35
8 $644.85 $4.48 $640.37


Amortization


0 $5,000
1 $644.85 $35 $609.85 $4,390.15
2 $644.85 $30.73 $614.12 $3,776.03
3 $644.85 $26.43 $618.42 $3,157.61
4 $644.85 $22.10 $622.75 $2,534.87
5 $644.85 $17.74 $627.11 $1,907.76
6 $644.85 $13.35 $631.50 $1,276.26
7 $644.85 $8.93 $635.50 $640.35
8 $644.85 $4.48 $640.37 $0.00*


Amortization

Example: A family purchased a home 10 years ago for
$80,000. The home was ﬁnanced by paying 20% down and
signing a 30-year mortgage at 9% on the unpaid balance. The
net market value of the house (amount recieved after
subtracting all costs involved in selling the house) is now
$120,000, and the family wishes to sell the house. How much
equity (to the nearest dollar) does the family have in the house
now after making 120 monthly payments?
[Equity = (current net market value) - (unpaid loan balance)]

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Amortization

Step 1. Find the monthly payment:

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Amortization

r 0.09
Here PV = (0.80)($80,000) = $64,000, i = m = 12 = 0.0075
and n = 360.

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Amortization

r 0.09
Here PV = (0.80)($80,000) = $64,000, i = m = 12 = 0.0075
and n = 360.
1 − (1 + i)−n
PV = PMT
i

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Amortization

r 0.09
Here PV = (0.80)($80,000) = $64,000, i = m = 12 = 0.0075
and n = 360.
1 − (1 + i)−n
PV = PMT
i
1 − (1.0075)−360
$64, 000 = PMT
.0075

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Amortization

r 0.09
Here PV = (0.80)($80,000) = $64,000, i = m = 12 = 0.0075
and n = 360.
1 − (1 + i)−n
PV = PMT
i
1 − (1.0075)−360
$64, 000 = PMT
.0075
.0075
PMT = ($64, 000) = $514.96
1 − (1.0075)−360

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Amortization

Step 2. Find unpaid balance after 10 years (the PV of a
$514.96 per month, 20-year annuity):

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Amortization

0.09
Here PMT = $514.96, n = 12(20) = 240, i = 12 = 0.0075.

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Amortization

0.09
Here PMT = $514.96, n = 12(20) = 240, i = 12 = 0.0075.

1 − (1 + i)−n
PV = PMT
i

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Amortization

0.09
Here PMT = $514.96, n = 12(20) = 240, i = 12 = 0.0075.

1 − (1 + i)−n
PV = PMT
i
1 − (1.0075)−240
PV = ($514.96) = $57, 235
.0075

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Amortization

Step 3. Find the equity:

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Amortization


Equity = (current net market value) − (unpaid loan balance)
= $120, 000 − $57, 235

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Amortization


= $120, 000 − $57, 235
= $62, 765

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Amortization


= $120, 000 − $57, 235
= $62, 765

Thus, if the family sells the house for $120,000 net, the family
will have $62,765 after paying off the unpaid loan balance of
$57,235.

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Amortization

Example: A person purchased a house 10 years ago for
$120,000 by paying 20% down and signing a 30-year mortgage
at 10.2% compounded monthly. Interest rates have dropped
and the owner wants to reﬁnance the unpaid balance by
signing a new 20-year mortgage at 7.5% compounded monthly.
How much interest will the reﬁnancing save?

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Amortization

Step 1: Find monthly payments.

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Amortization


The owner put 20% down at the time of purchase.
Therefore, PV = $120, 000 − (0.2)($120, 000) = $96, 000.

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Amortization


Therefore, PV = $120, 000 − (0.2)($120, 000) = $96, 000.
We also have that
r 0.102
m = 12; n = 30 × 12 = 360; i = m = 12 = 0.0085.

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Amortization


Therefore, PV = $120, 000 − (0.2)($120, 000) = $96, 000.
We also have that
r 0.102
m = 12; n = 30 × 12 = 360; i = m = 12 = 0.0085.

1 − (1.0085)−360
$96, 000 = PMT
0.0085

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Amortization


Therefore, PV = $120, 000 − (0.2)($120, 000) = $96, 000.
We also have that
r 0.102
m = 12; n = 30 × 12 = 360; i = m = 12 = 0.0085.

1 − (1.0085)−360
$96, 000 = PMT
0.0085
PMT = $856.69

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Amortization

Step 2: Find amount owed after 10 years (at the time of
reﬁnancing).

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Amortization

reﬁnancing).
Here we apply the formula with i = 0.0085 and n = 240.

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Amortization

reﬁnancing).

1 − (1 + i)−n
PV = PMT
i

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Amortization

reﬁnancing).

1 − (1 + i)−n
PV = PMT
i
1 − (1.0085)−240
PV = ($856.69) = $87, 568.38
.0085

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Amortization

Step 3: We now calculate the owner’s monthly payment after
reﬁnancing.

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Amortization

reﬁnancing.
0.075
Here we apply the formula with i = 12 = 0.00625 and
n = 240.

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Amortization

reﬁnancing.
0.075
n = 240.
1 − (1 + i)−n
PV = PMT
i

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Amortization

reﬁnancing.
0.075
n = 240.
1 − (1 + i)−n
PV = PMT
i
1 − (1.00625)−240
$87, 568.38 = PMT
.00625

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Amortization

reﬁnancing.
0.075
n = 240.
1 − (1 + i)−n
PV = PMT
i
1 − (1.00625)−240
$87, 568.38 = PMT
.00625
.00625
PMT = ($87, 568.38) = $705.44
1 − (1.00625)−240

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Amortization

Step 4: We now compare the amount he would have spent
without reﬁnancing to the amount he spends after reﬁnancing.

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Amortization

If the owner did not reﬁnance, he would pay a total of
856.69 × 240 = $205, 605.60 in principal and interest
during the last 20 years of the loan.

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Amortization

If the owner did not reﬁnance, he would pay a total of
856.69 × 240 = $205, 605.60 in principal and interest
during the last 20 years of the loan.
This would amount to a total of
$205, 605.60 − $87, 568.38 = $118, 037.22 in interest.

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Amortization

After reﬁnancing, the owner pays a total of
$705.44x240 = $169, 305.60 in principal and interest.

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Amortization

$169, 305.60 − $87, 568.38 = $81, 737.22 in interest.

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Amortization

$169, 305.60 − $87, 568.38 = $81, 737.22 in interest.
Therefore reﬁnancing results in a total interest savings of

$118, 037.22 − $81, 737.22 = $36, 299.84.

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Amortization

Example: You want to purchase a new car for $27,300. The
dealer offers you 0% ﬁnancing for 60 months or a $5,000
rebate. You can obtain 6.3% ﬁnancing for 60 months at the
local bank. Which option should you choose?

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Amortization

To answer this question, we determine which option gives the
lowest monthly payment.

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Amortization

To answer this question, we determine which option gives the
lowest monthly payment.
Option 1: If you choose 0% ﬁnancing, your monthly payment
will be
$27, 300
PMT1 = = $455
60

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Amortization

Option 2: Suppose that you choose the $5,000 rebate and
borrow $22,300 for 60 months at 6.3% compounded monthly.

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Amortization

We compute the PMT for a loan with PV = $22,300,
i = 0.063 = 0.00525 and n = 60.
12

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Amortization

i = 0.063 = 0.00525 and n = 60.
12

1 − (1 + i)−n
PV = PMT
i

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Amortization

i = 0.063 = 0.00525 and n = 60.
12

1 − (1 + i)−n
PV = PMT
i
1 − (1.00525)−60
$22, 300 = PMT
0.00525

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Amortization

i = 0.063 = 0.00525 and n = 60.
12

1 − (1 + i)−n
PV = PMT
i
1 − (1.00525)−60
$22, 300 = PMT
0.00525
PMT = $434.24

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Amortization

i = 0.063 = 0.00525 and n = 60.
12

1 − (1 + i)−n
PV = PMT
i
1 − (1.00525)−60
$22, 300 = PMT
0.00525
PMT = $434.24

You should choose the rebate. You will save $455 - $434.24 =
$20.76 monthly, or ($20.76)(60) = $1,245.60 over the life of the
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Math 1300: Section 3-3 Future Value of an Ordinary Annuity; Sinking Funds

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Math 1300: Section 3-3 Future Value of an Ordinary Annuity; Sinking Funds