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2/22/2017
1
Engineering Economics
2/22/2017
FE REVIEW COURSE – SPRING 2017
Paige Harris
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Engineering Economics Knowledge
• 4 – 6 problems• Discounted cash flow
▫ Equivalence, PW, equivalent annual worth, FW, rate of return• Cost
▫ Incremental, average, sunk, estimating• Analyses
▫ Breakeven, benefit-cost, life cycle• Uncertainty
▫ Expected value and risk• Sections in FE Reference Handbook
▫ Engineering Economics
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Engineering Economics
Year‐End & Other
Conventions
Cash Flow
Discount Factors
Single Payment
Equivalence
Uniform Series Equivalence
Uniform Gradient
Equivalence
NonannualCompounding
Depreciation Book Value
Capitalized Cost
Inflation
Break‐Even Analysis
Benefit‐Cost Analysis
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Year-End & Other Conventions
• Year-end convention: Assume that all receipts and disbursements (cash flows) take place at the end of the year in which they occur▫ Exceptions:
– Initial project cost (purchase cost)
– Trade-in allowance– Other cash flows that are
associated with the inception of the project at t = 0
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Cash Flow
• Cash flows = the sums of money recorded as receipts or disbursements in a project’s financial records\
• Cash flow diagrams▫ Can be drawn to help visualize and
simplify problems that have diverse receipts and disbursements
▫ Horizontal (time) axis is marked off in equal increments, one per period
▫ Receipts ▫ Disbursements ▫ 2 or more transfers in same period
are placed end to end or combined▫ Sunk costs = expenses incurred
before t = 0
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Cash Flow Continued
• Uniform series cash flow▫ Series of equal transactions
starting at t = 1 and ending at t = n
▫ Symbol A (annual amount) given to the magnitude of each individual cash flow
• Gradient series cash flow▫ Starts with a cash flow
(symbol G) at t = 2 and increases by G each year until t = n, at which time the final cash flow is (n – 1)G.– Gradient at t = 1 is 0
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Discount Factors
• The procedure for determining the equivalent amount is known as discounting
• Discount factors – symbolic and formula form
P. 131
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Discount Factors
• Values of cash flow (discounting) factors are in tabulation form in Handbook▫ Pages 133-137
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Single Payment EquivalenceSingle Payment Future Worth
• (1 + i)n
▫ Single payment compound amount factor• Common convention to substitute the standard functional
notation of (F / P, i%, n)• "Find F, given P, using an interest rate of i% over n years”
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Single Payment EquivalenceSingle Payment Future Worth Example
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Single Payment EquivalenceSingle Payment Present Worth
• (1 + i)-n
▫ Single payment present worth factor
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Single Payment EquivalenceSingle Payment Present Worth Example
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Uniform Series EquivalenceUniform Series Future Worth
• A = annual amount = cash flow that repeats at the end of each year for n years without change in amount
• Uniform series compound factor convert from an annual amount to future amount
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Uniform Series EquivalenceUniform Series Future Worth Example
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Uniform Series EquivalenceUniform Series Annual Value of a Sinking Fund
• Sinking fund = a fund or account into which annual deposits of Aare made in order to accumulate F at t = n in the future
• Sinking fund factor = (A/F)
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Uniform Series EquivalenceUniform Series Annual Value of a Sinking Fund Example
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Uniform Series EquivalenceUniform Series Present Worth
• Annuity = a series of equal payments, A, made over a period of time
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Uniform Series EquivalenceUniform Series Present Worth Example
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Uniform Series EquivalenceUniform Series Annual Value Using the Capital Recovery Factor
• Capital recovery factor = used when comparing alternatives with different lifespans
• Can convert the present value of each alternative into its equivalent annual value, using the assumption that each alternative will be renewed repeatedly up to the duration of the longest-lived alternative
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Uniform Gradient EquivalenceUniform Gradient Present Worth
• Used to find present worth, P, of a cash flow that is increasing by a uniform amount, G.
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Uniform Gradient EquivalenceUniform Gradient Future Worth
• Used to find future worth, F, of a cash flow that is increasing by a uniform amount, G.
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Uniform Gradient EquivalenceUniform Gradient Uniform Series Factor
• Used to find the equivalent annual worth, A, of a cash flow that is increasing by a uniform amount, G.
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Uniform Gradient EquivalenceUniform Gradient Uniform Series Factor Example
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Non-Annual CompoundingEffective Annual Interest Rate
• If there are m compounding periods during the year (2 for semiannual compounding, 4 for quarterly compounding, 12 for monthly compounding, etc.), the effective interest rate per period, i, is r/ m
• Effective annual interest rate, ie, can be calculated from the effective interest rate per period
P. 131
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Non-Annual CompoundingEffective Annual Interest Rate Example
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DepreciationStraight Line Method
• Depreciation is the same each year
• Depreciation basis is divided uniformly among all of the years in the depreciation periods
• With the straight line method, depreciation is the same each year▫ Depreciation basis (C- Sn) is
divided uniformly among all of the n years in the depreciation period.
P. 132
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DepreciationStraight Line Method Example
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DepreciationModified Accelerated Cost Recovery System (MACRS)
• Cost recovery amount in a particular year is calculated by multiplying the initial cost of the asset by a factor▫ Initial cost is not reduced
by the asset's salvage value• Factor to be used varies
depending on the year and on the total number of years in the asset's cost recovery period▫ Subject to continuing
legislation changes
P. 132
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DepreciationModified Accelerated Cost Recovery System (MACRS) Example
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Book Value
• Difference between the original purchase price and the accumulated depreciation is known as the book value, BV
• Book value is initially equal to the purchase price, and at the end of each year it is reduced by that year's depreciation
P. 132
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Book Value Example
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Capitalized Cost
• Present worth of a project with an infinite life is known as the capitalized cost
• Capitalized cost is the amount of money at t= 0 needed to perpetually support the project on the earned interest only
• Capitalized cost is a positive number when expenses exceed income
• Equation can be used when the annual costs are equal in every year
P. 132
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Capitalized Cost Example
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Inflation
• f is a constant inflation rate per year
• Inflation-adjusted interest rate, d, can be used to compute present worth
P. 132
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Inflation Example
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Break-Even Analysis
• Method of determining when the value of one alternative becomes equal to the value of another
P. 131
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Benefit-Cost Analysis
• Used in municipal project evaluations where benefits and costs accrue to different segments of the community
• Present worth of all benefits, B, is divided by the present worth of all costs, C
• If the benefit-cost ratio, B / C, is greater than or equal to 1, the project is acceptable▫ Equivalent uniform annual costs
can be used in place of present worths
P. 132
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Benefit-Cost Analysis Example
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