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Chapter 3Understanding Money Management
Nominal and Effective Interest RatesEquivalence CalculationsChanging Interest RatesDebt Management
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Understanding Money Management
Financial institutions often quote interest rate based on an APR.In all financial analysis, we need to convert the APR into an appropriate effective interest rate based on a payment period.When payment period and interest period differ, calculate an effective interest rate that covers the payment period.
3
Understanding Money Management
4
Focus1. If payments occur more frequently than
annual, how do we calculate economic equivalence?
2. If interest period is other than annual, how do we calculate economic equivalence?
3. How are commercial loans structured?4. How should you manage your debt?
5
Nominal Versus Effective Interest Rates
Nominal Interest Rate:Interest rate quoted based on an annual period
Effective Interest Rate:Actual interest earned or paid in a year or some other time period
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18% Compounded Monthly
Nominal interest rate
Annual percentagerate (APR)
Interest period
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18% Compounded Monthly
What It Really Means?Interest rate per month (i) = 18%/12 = 1.5%Number of interest periods per year (N) = 12
In words,Bank will charge 1.5% interest each month on your unpaid balance, if you borrowed money You will earn 1.5% interest each month on your remaining balance, if you deposited money
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18% compounded monthlyQuestion: Suppose that you invest $1 for 1 year at 18% compounded monthly. How much interest would you earn?Solution:
=
+=+=
ai
iF 1212 )015.01(1$)1(1$
= $1.19560.1956 or 19.56%
: 1.5%
18%
9
: 1.5%
18%
18% compounded monthly or
1.5% per month for 12 months=
19.56 % compounded annually
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Effective Annual Interest Rate(Annual Effective Yield)
r = nominal interest rate per yearia = effective annual interest rateM = number of interest periods per
year
1)/1( −+= Ma Mri
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Practice Problem
If your credit card calculates the interest based on 12.5% APR, what is your monthly interest rate and annual effective interest rate, respectively?Your current outstanding balance is $2,000 and skips payments for 2 months. What would be the total balance 2 months from now?
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Solution
12
2
Monthly Interest Rate:12.5% 1.0417%
12Annual Effective Interest Rate:
(1 0.010417) 13.24%Total Outstanding Balance:
$2,000( / ,1.0417%,2)$2,041.88
a
i
i
F B F P
= =
= + =
= ==
-1
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Practice Problem
Suppose your savings account pays 9% interest compounded quarterly. If you deposit $10,000 for one year, how much would you have?
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Solution
4
(a) Interest rate per quarter:9% 2.25%4
(b) Annual effective interest rate:(1 0.0225) 1 9.31%
(c) Balance at the end of one year (after 4 quarters)$10, 000( / , 2.25%, 4)
$10, 000( / , 2.25%,1)$10, 9
a
i
i
F F PF P
= =
= + − =
==
= 319.31%
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Effective Annual Interest Rates (9% compounded quarterly)
= $10,690.30+ $240.53= $10,930.83
= New base amount+ Interest (2.25 %)= Value after one year
Fourth quarter
= $10,455.06+$235.24
= New base amount+ Interest (2.25%)
Third quarter
= $10,225+$230.06
= New base amount+ Interest (2.25%)
Second quarter
$10,000+ $225
Base amount+ Interest (2.25%)
First quarter
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Nominal and Effective Interest Rates with Different Compounding Periods
12.7412.6812.5512.3612.0012
11.6211.5711.4611.3011.0011
10.5210.4710.3810.2510.0010
9.429.389.319.209.009
8.338.308.248.168.008
7.257.237.197.127.007
6.186.176.146.096.006
5.135.125.095.065.005
4.08%4.07%4.06%4.04%4.00%4%
Compounding Daily
Compounding Monthly
Compounding Quarterly
Compounding Semi-annually
Compounding Annually
Nominal Rate
Effective Rates
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Effective Interest Rate per Payment Period (i)
C = number of interest periods per payment period
K = number of payment periods per yearM = number of interest periods per year
(M=CK)
1]/1[ −+= CCKri
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12% compounded monthlyPayment Period = QuarterCompounding Period = Month
One-year• Effective interest rate per quarter
• Effective annual interest rate
1% 1% 1%3.030 %
1st Qtr 2nd Qtr 3rd Qtr 4th Qtr
%030.31)01.01( 3 =−+=i
ii
a
a
= + − =
= + − =
( . ) .( . ) .1 0 0 1 1 1 2 6 8 %1 0 0 3 0 3 0 1 1 2 6 8 %
1 2
4
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Effective Interest Rate per Payment Period with Continuous Compounding
where CK = number of compounding periods per year
continuous compounding => M (=CK) ∞
1]/1[ −+= CCKri
1)(]1)/1lim[(
/1 −=
−+=Kr
C
eCKri
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Case 0: 8% compounded quarterlyPayment Period = QuarterInterest Period = Quarterly
1 interest period Given r = 8%,K = 4 payments per yearC = 1 interest periods per quarterM = 4 interest periods per year
2nd Q 3rd Q 4th Q
i r C K C= + −
= + −=
[ / ]
[ . / ( ) ( ) ].
1 1
1 0 0 8 1 4 12 0 0 0 %
1
p e r q u a r te r
1st Q
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Case 1: 8% compounded monthlyPayment Period = QuarterInterest Period = Monthly
3 interest periods Given r = 8%,K = 4 payments per yearC = 3 interest periods per quarterM = 12 interest periods per year
2nd Q 3rd Q 4th Q
i r C K C= + −
= + −=
[ / ]
[ . / ( ) ( ) ].
1 1
1 0 0 8 3 4 12 0 1 3 %
3
p e r q u a r te r
1st Q
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Case 2: 8% compounded weeklyPayment Period = QuarterInterest Period = Weekly
13 interest periodsGiven r = 8%,
K = 4 payments per yearC = 13 interest periods per quarterM = 52 interest periods per yeari r C K C= + −
= + −=
[ / ]
[ . / ( )( )].
1 1
1 0 0 8 1 3 4 12 0 1 8 6 %
1 3
p e r q u a rte r
2nd Q 3rd Q 4th Q1st Q
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Case 3: 8% compounded continuouslyPayment Period = QuarterInterest Period = Continuously
∞ interest periodsGiven r = 8%,
K = 4 payments per year
2nd Q 3rd Q 4th Q
quarterper %0201.211
02.0
/
=−=
−=
eei Kr
1st Q
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Summary: Effective interest rate per quarter
2.0201% per quarter
2.0186% per quarter
2.013% per quarter
2.000% per quarter
Payments occur quarterly
Payments occur quarterly
Payments occur quarterly
Payments occur quarterly
8% compounded continuously
8% compounded weekly
8% compounded monthly
8% compounded quarterly
Case 3Case 2Case 1Case 0
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Practice Example1000 YTL initial deposit.
Effective interest rate per quarterBalance at the end of 3 years for a nominal rate of 8% compounded weekly?
)12%,0186.2,|(1000or
03.1271)020186.01(1000
quarterper %0186.215208.01
12
13
PFF
F
i
=
=+=
=−⎟⎠⎞
⎜⎝⎛ +=
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Practice Example1000 YTL initial deposit.
Effective interest rate per quarterBalance at the end of 3 years for a nominal rate of 8% compounded daily?
)12%,0199.2,|(1000or
21.1271)020199.01(1000
quarterper %0199.21365
08.01
12
4365
PFF
F
i
=
=+=
=−⎟⎠⎞
⎜⎝⎛ +=
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Practice Example1000 YTL initial deposit.
Effective interest rate per quarterBalance at the end of 3 years for a nominal rate of 8% compounded continuously?
)12%,0201.2,|(1000or
23.1271)020201.01(1000quarterper %0201.211
12
408.0
PFF
Feei k
r
=
=+=
=−=−=
Notice the negligible difference as compoundingchanges between weekly, daily, continuously!
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Practice Example2000 YTL borrowed. How much must be returned at the end of 3 years if i=6% compounded monthly?
)12%,5075.1,|(2000
%5075.111206.01quarterper rateinterest Effective
or)3%,168.6,|(2000
%168.611206.01yearper rateinterest Effective
or)36%,5.0,|(2000
005.01206.0monthper rateInterest
3
12
PFF
PFF
PFF
=
=−⎟⎠⎞
⎜⎝⎛ +=
=
=−⎟⎠⎞
⎜⎝⎛ +=
=
==
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Equivalence Analysis using Effective Interest Rate
Step 1: Identify the payment period(e.g., annual, quarter, month, week, etc)Step 2: Identify the interest period(e.g., annually, quarterly, monthly, etc)Step 3: Find the effective interest ratethat covers the payment period.
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Principle: Find the effective interest rate that covers the payment period
Case 1: compounding period = payment period
Case 2: compounding period < payment period
Case 3: compounding period > payment period
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When Payment Periods and Compounding periods coincide
�Step 1: Identify the number of compounding periods (M) per year
�Step 2: Compute the effective interest rate per payment period (i)
i = r/M�Step 3: Determine the total number of payment
periods (N)N = M
�Step 4: Use the appropriate interest formula using i and N above
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When Payment Periods and Compounding periods coincide Payment Period = Interest Period
Given: P = $20,000, r = 8.5% per year compounded monthly
Find A (monthly payments)
�Step 1: M = 12�Step 2: i = r/M = 8.5%/12 = 0.7083% per month�Step 3: N = (12)(4) = 48 months�Step 4: A = $20,000(A/P, 0.7083%,48) = $492.97
48
01 2 3 4
$20,000
A
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Dollars Up in Smoke
What three levels of smokers who bought cigarettes every day for 50 years at $1.75 a pack would have if they had
instead banked that money each week:
Level of smoker Would have had1 pack a day
2 packs a day
3 packs a day
$169,325
$339,650
$507,976
Note: Assumes constant price per pack, the money banked weekly and an annual interest rate of 5.5%
Source: USA Today, Feb. 20, 1997
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Sample Calculation: One Pack per Day
Step 1: Determine the effective interest rate per payment period.
Payment period = weekly“5.5% interest compounded weekly”
i = 5.5%/52 = 0.10577% per week
Step 2: Compute the equivalence value.Weekly deposit amount
A = $1.75 x 7 = $12.25 per week
Total number of deposit periodsN = (52 weeks/yr.)(50 years)
= 2600 weeks
F = $12.25 (F/A, 0.10577%, 2600)= $169,325
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Suppose you make equal quarterlydeposits of $1000 into a fund that paysinterest at a rate of 12% compoundedmonthly. Find the balance at the end of year three.
Compounding more frequent than paymentsDiscrete Case Example: Quarterly deposits with monthly compounding
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Compounding more frequent than paymentsDiscrete Case Example: Quarterly deposits with monthly compounding
� Step 1: M = 12 compounding periods/year K = 4 payment periods/year C = 3 interest periods per quarter
� Step 2:
� Step 3: N = 4(3) = 12� Step 4: F = $1,000 (F/A, 3.030%, 12)
= $14,216.24
%030.31)]4)(3/(12.01[ 3
=−+=i
F = ?
A = $1,000
0 1 2 3 4 5 6 7 8 9 10 11 12 Quarters
Year 1 Year 2 Year 3
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Suppose you make equal quarterlydeposits of $1000 into a fund that paysinterest at a rate of 12% compoundedcontinuously. Find the balance at theend of year three.
Continuous Case: Quarterly deposits with Continuous compounding
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Continuous Case: Quarterly deposits with Continuous compounding
� Step 1: K = 4 payment periods/year C = ∞ interest periods per quarter
� Step 2:
� Step 3: N = 4(3) = 12� Step 4: F = $1,000 (F/A, 3.045%, 12)
= $14,228.37
F = ?
A = $1,000
0 1 2 3 4 5 6 7 8 9 10 11 12 Quarters
i e= −=
0 12 4 13045%
. /
. per quarter
Year 2Year 1 Year 3
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Suppose you make $500 monthly deposits toan account that pays interest at a rate of 10%, compounded quarterly. Compute thebalance at the end of 10 years.
%826.01)4/10.01( 3/1 =−+=i
Compounding less frequent than payments
per month
89.101907)120%,826.0,|(500 == AFF
83.101103)40%,5.2,|(1500 == AFF Money deposited during a quarter does not earn interest
Whenever a deposit is made, it starts to earn interest.
40
Credit Card Debt
Annual feesAnnual percentage rateGrace periodMinimum paymentFinance charge
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Regardless of your payment size, the bank will charge 1.5% on your beginning balance $3,000: (1.5%)($3,000)=$45.
The bank does not subtract any payments you make from your previous balance. You pay interest on the total amount you owe at the beginning of the period. This method costs you the most.
Previous Balance
Your beginning balance is $3,000. With your $1,000 payment at the 15th day, your balance will be reduced to $2,000. Therefore, your average balance will be (1.5%)($3,000+$2,000)/2=$37.50.
The bank charges you interest on the average of the amount you owe each day during the period. So the larger the payment you make, the lower the interest you pay.
Average Daily Balance
Your beginning balance is $3,000. With the $1,000 payment, your new balance will be $2,000. You pay 1.5% on this new balance, which will be $30.
The bank subtracts the amount of your payment from the beginning balance and charges you interest on the remainder. This method costs you the least.
Adjusted Balance
Interest You OweDescriptionMethod
Methods of Calculating Interests on your
Credit Card
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Commercial Loans
�Amortized Loans• Effective interest rate specified• Paid off in installments over time (equal periodic amounts)• What is the cost of borrowing? NOT necessarily the loan
with lowest payments or lowest interest rate. Have to lookat the total cost of borrowing (interest rate and fees, lengthof time it takes you to repay (term))
43
Auto Loan
$20,000
0481 2 2524
Given: APR = 8.5%, N = 48 months, andP = $20,000
Find: AA = $20,000(A/P,8.5%/12,48)
= $492.97
44
Suppose you want to pay off the remaining loan in lump sum right after making the 25th payment. How much would this lump be?
$20,000
0481 2 2524
$492.97$492.97
23 payments that are still outstanding
25 payments that were already made
P = $492.97 (P/A, 0.7083%, 23)= $10,428.96
45
For the 33rd payment, what is the interestpayment and principal payment?
76.52)0071.0(12.7431 =
12.7431)16,12/%5.8,|(97.492 =AP
21.44076.5297.492 =−
Remainingbalance after32 payments
Interestcomponent of the33rd payment
Principal paymentcomponent of the33rd payment
46
Buying versus Lease Decision
$731.45$2,000Cash due at signing
$8.673.10Purchase option at lease end
$300Cash due at lease end
$495Fees
36 months36 monthsLength
$236.45$372.55Monthly payment
3.6%APR (%)
0$2,000Down payment
$14,695$14,695Price
Option 2Lease Financing
Option 1Debt Financing
47
6% compounded monthly
48
Which Option is Better?
Debt Financing:Pdebt = $2,000 + $372.55(P/A, 0.5%, 36)
- $8,673.10(P/F, 0.5%, 36)= $6,998.47
Lease Financing:Please = $495 + $236.45 + $236.45(P/A, 0.5%, 35)
+ $300(P/F, 0.5%, 36)= $8,556.90
49
Example
Suppose you borrowed $10000 at an interest rate of 12% compoundedmonthly over 36 months. At the end of the first year (after 12 payments), youwant to negotiate with the bank to pay off the remainder of the loan in 8 equalquarterly payments. What is theamount of this quarterly payment, if theinterest rate and compoundingfrequency remain the same?
50
Example Solution
quarterper 41.1006)8%,03.3,|(77.7055%03.31)01.01(quarterper rate Effective
77.7055)24%,1,|(14.3321st) of (enddebt Remaining14.332)36%,1,|(10000
3
===−+=
====
PAA
APPAA
51
Example
An individual wants to make equal monthlydeposits into an account for 15 years in orderto then make equal monthly withdrawals of $1500 for the next 20 years, reducing thebalance to zero. How much should be deposited each month for the first 15 years ifthe interest rate is 8% compounding weekly? What is the total interest earned during this35 year process?
52
Example
A family has a $30000, 20 year mortgage at 15% compounded monthly.
Find the monthly payment and the total interestpaid.Suppose the family decides to add an extra $100 to its mortgage payment each month starting fromthe first payment of the 6th year. How long will it take the family to pay off the mortgage? Howmuch interest will the family save?
53
Example
A man borrows a loan of $10000 from a bank. Aaccording to theagreement between the bank and the man, the man will pay nothing during the first year and will pay equal amounts of A every month for the next 4 years. If the interest rate is 12% compounded weekly, find
the payment amount AThe interest payment and principal payment for the 20th payment.Suppose you want to pay off the remaining loan in lump sum right after making the 25th payment. How much would this lump be?
54
Example
A man’s current salary is $60000 per year and he is planning toretire 25 years from now. He anticipates that his annual salarywill increase by $3000 each year and he plans to deposit 5% of his yearly salary into a retirement fund that earns 7% interestcompounded daily. What will be the amount accumulated at thetime of his retirement.
55
Example
A series of equal quarterly payments of $1000 extends over a period of 5 years. What is the present worth of this quarterly-payment series at 9.75% interest compounded continuously?
56
Example
A lender requires that monthly mortgage payments be no morethan 25% of gross monthly income, with a maximum term of 30 years. If you can make only a 15% down payment, what is theminimum monthly income needed in order to purchase a $200,000 house when the interest rate is 9% compoundedmonthly?
57
ExampleAlice wanted to purchase a new car for $18,400. A dealer offered her financing through a local bank at an interest rate of 13.5% compounded monthly. The dealer’s financing required a 10% downpayment and 48 equal monthly payments. Because the interest rate is rather high, Alice checked with her credit union for other possiblefinancing options. The loan officer at the credit union quoted her 10.5% interest for a new-car loan and 12.25% for a used-car loan. But to be eligible for the loan, Alice had to have been a member of thecredit union for at least six months. Since she joined the credit uniontwo months ago, she has to wait four more months to apply for theloan. Alice decides to go ahead with the dealer’s financing and 4 months later refinances the balance through the credit union at an interest rate of 12.25%(because the car is no longer new)
a)Compute the monthly payment to the dealerb)Compute the monthly payment to the credit unionc)What is the total interest payment for each loan transaction
58
Example
A loan of $10000 is to be financed over a period of 24 months. The agency quotes a nominal interest rate of 8%for the first 12 months and a nominal interest rate of 9% for any remainingunpaid balance after 12 months, with both rates compoundedmonthly. Based on these rates, what equal end-of-monthpayments for 24 months would be required in order to repaythe loan?
59
ExampleSuppose you are in the market for a new car worth $18000. You areoffered a deal to make a $1800 down payment now and to pay thebalance in equal end-of-month payments of $421.85 over a 48 month period. Consider the following situations:
a) Instead of going through the dealer’s financing, you want to make a down payment of $1800 and take out an auto loan from a bank at 11.75% compounded monthly. What would be your monthlypayments to pay off the loan in 4 years?
b) If you were to accept the dealer’s offer, what would be the effectiverate of interest per month charged by the dealer on your financing?
60
Example
A man borrowed money from a bank to finance a smallfishing boat. The bank’s loan terms allowed him to deferpayments for six months and then to make 36 equal end-of-month payments thereafter. The original bank note was for$4800 with an interest rate of 12% compounded weekly. After 16 monthly payments, David found himself in a financialbind and went to a loan company for assistance in loweringhis monthy payments. Fortunately, the loan company offeredto pay his debts in one lump sum, provided that he pays thecompany $104 per month for the next 36 months. Whatmonthly rate of interest is the loan company charging on thistransaction?
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