1. Engineering Economic Analysis Canadian Edition
Chapter 4:
More Interest Formulas

2. Chapter 4 … Examines uniform series compound interest formulas.
Uses arithmetic and geometric gradients to solve problems.
Evaluates non-standard series:
begin-period payments;
different payment and compounding periods;
perpetual annuities.

3. Chapter Assumptions in Solving Economic Analysis Problems
End-of-period convention (simplifies calculations)
Viewpoint of the firm (generally)
Sunk costs (the past has no bearing on current decisions)
Owner provided capital (no debt capital)
Stable prices
No depreciation
No income taxes

4. Components of Engineering Economic Analysis
Calculation of present value (P), annual cash flow (A), or future value (F) is fundamental.
Some problems are more complex and require an understanding of added components:
uniform series
arithmetic or geometric gradients
non-standard series

5. Uniform Series
Annuities have equally-spaced and equal-valued cash flows during a period of time.
Cash inflows are positive — toward the firm.
Cash outflows are negative — away from the firm.
Ordinary annuities have a cash flow at the end of each payment period.
Simple annuities have payment period = compounding period.
We can find the value of a series as a single sum equivalent by calculating its present value (PV) or future value (FV).

6. Economic Criteria Projects are judged against an economic criterion.
Situation
Criterion
Fixed input
Maximize output
Fixed output
Minimize input
Neither fixed
Maximize difference
(output  input)

7. Transformation of Uniform Series
COMPOUND
AMOUNT
(FV)
DISCOUNT
(PV)
Transformations

8. Uniform Series: Future Value1 2 3 4 5
$1000 ≡
FV = ??
EQUIVALENCE
What is the value in five years of five end-of-year deposits of $1000 beginning one year from today if interest is 10% compounded annually? (Answer: $ )

9. Uniform Series: Future Value …
From the cash flow diagram, we see that
F = $1000( ) = $
In general, we can use the series formula
which in this case gives

10. Uniform Series: Future Value …
Find the balance in ten years of annual deposits of $1500 into a fund that pays interest of 8% compounded annually.
All other things being equal, $1500 at the end of each year for ten years is equivalent to $21, ten years from today.

11. Importance of Interest Income

12. Uniform Series: Present Value1 2 3 4 5
$1000 ≡
PV = ??
What is the value today of five end-of-year deposits of $1000 beginning one year from today if interest is 10% compounded annually? (Answer: $ )

13. Uniform Series: Present Value …
From the cash flow diagram, we see that
F = $1000(1.10    5) = $
In general, we can use the series formula
which in this case gives

14. Uniform Series: Present Value …
Example: A = $140/month, i = 1%/month (usually specified as 12% compounded monthly), n = 60 (five years).
Would you pay $6320 today for these payments?
The value today is less than the $6320 asking price, therefore, you should not accept the offer.

15. Uniform Series: Present Value …
Determine the maximum purchase price for an energy-saving device with a five-year life (and no salvage value) if the device will pro-vide annual savings of $ Assume the savings occur at the end of each year and the interest rate is 12½% compounded annually.

16. Uniform Series: Present Value …
A lender has offered you $10,000 today if you make monthly payments of $ for four years. Determine the interest rate the lender is charging, expressed as a nominal monthly compounded rate.
By trial and error, or interpolation, solve for i = % (periodic rate). Nominal rate = 12 % = 7.500% compounded monthly.

17. Uniform Series: More Examples
You want to purchase a $50,000 car in four years. Calculate how much you must deposit in a bank account at the end of every three months in order to save up for the car if the rate of interest on your deposits is 5¾% compounded quarterly.
i = 5¾%/4 = %, n = 44 = 16.
Solving gives A = $

18. Uniform Series: More Examples …
Five years ago, a couple purchased an RV (recreational vehicle) for $100,000. The RV has a market value of $25,000 today. If the market interest rate was 10% compounded annually during the last five years, find the annual equivalent cost of owning the RV.
Solving for A = $22,

19. Arithmetic Gradient Series
Payment grows by a constant amount, G:
The series consists of two payments: A and
which is the equivalent payment for the gradient series: 0, G, 2G, 3G, … (n1)G. 1 2 3 4 5 6 7 A
A+G
A+2G
A+3G
A+4G
A+5G
A+6G

20. Arithmetic Gradient Series …
A company has maintenance costs that will be $1500 six months from today and will grow by $75 every six months after that. Find the value today of the maintenance costs over a ten-year period if the rate of interest is 11¼% compounded semiannually. G = $75; i = /2 = ; n = 102 = 20.

21. Arithmetic Gradient Series …
You will save for a vacation by depositing $200 in one month then $5 less each month for two years. Determine the amount you will have saved after two years if the interest rate is 4½% compounded monthly. G = $5; i = 0.045/12 = ; n = 212 = 24.

22. Geometric Gradient Series
Payment grows by a constant rate, g:
General formulas: 1 2 3 4 5 A1
A1(1+g)
A1(1+g)2
A1(1+g)3
A1(1+g)4

23. Geometric Gradient Series …
A company has maintenance costs that will be $1500 six months from today and will grow by 4% every six months after that. Find the value today of the maintenance costs over a ten-year period if the rate of interest is 11¼% compounded semiannually. g = 0.04; i = /2 = ; n = 102 = 20.

24. Geometric Gradient Series …
You will save for a vacation by depositing $200 in one month then 3% less each month for two years. Determine the amount you will have saved after two years if the interest rate is 4½% compounded monthly. g = 0.03; i = /12 = ; n = 212 = 24.
Challenge: derive the formulas if i = g.

25. Non-standard series: Payments at the beginning of the period
For some series, the payments occur at the beginning of each payment period.
These are also called annuities due. The formulas are:
These formulas are the essentially those for ordinary annuities, multiplied by the factor (1+ i).

26. Annuities Due
You want to lease a vehicle that is worth $42,500 by making monthly payments in advance for four years at an interest rate of 2¾% compounded monthly. Calculate the payment required.
Extra: find the payment if the vehicle’s buyout value is $17,000 at the end of the lease.

27. Non-standard series: Payment period  compounding period
These are called general annuities.
Convert the nominal interest rate to the equivalent rate for the payment period.
p = number of payment periods per year, and c = number of compounding periods per year.

28. General Annuities
You arrange a mortgage loan for $295,000 that requires monthly payments for 25 years at an interest rate of 5.35% compounded semiannually. Find the amount of the monthly payment.

29. Non-standard series: Perpetual payments
Series with perpetual payments are called perpetual annuities or perpetuities.
We only consider the present value of perpetual annuities (the future value is ).

30. Perpetual Annuities
A family wants to establish a scholarship in their name at a university. They want $2500 to be awarded annually, starting immediately. The scholarship fund has an interest rate of 6¼% compounded annually. Determine the size of the endowment the family must give.
Extra: find the endowment if the award grows by 2% per year after the first award of $2500.

31. Suggested Problems
4-25, 34, 37, 43, 51, 53, 56, 62, 63, 73, 75, 77, 78, 80, 81, 84, 86, 89, 102, 116, 124, 131.