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THE INVESTMENT DECISION

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The rate that can be earned on alternative investments of similar risk. Not the source of funds, but what ... The EAC for sprinkler A is: ($5,000/A10,10) $500 ... – PowerPoint PPT presentation

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Title: THE INVESTMENT DECISION


1
THE INVESTMENT DECISION
2
TIME VALUE OF MONEY
3
Opportunity Costs
  • The rate that can be earned on alternative
    investments of similar risk.
  • Not the source of funds, but what you do with the
    funds.

4
Comparison
FV Grows to its
PV Is discounted to its
5
Time Value
  • A dollar today is worth more than a dollar in the
    future. Why?
  • Certainty
  • Inflation
  • Opportunity Cost

6
Interest Comparison
  • Future Value Single Sum
  • Present Value Single Sum
  • Future Value Annuity
  • Present Value - Annuity

7
Future Value
  • Any simple compound interest problem requires 3
    of these 4 variables
  • Number of periods which compounding occurs (n)
  • Present value of future sum (p)
  • Future value of present sum (f)
  • Interest rate per period (i)

8
Future Value
  • What an amount invested today will be worth at a
    certain time (compounding)
  • f p X f(i,n) or
  • FV PV X (1I)n
  • P or PV initial investment amount
  • I interest rate
  • N of time periods of the investment
  • So if we invest 10,000 for 5 years at 10

9
Future Value
  • The Future Value Factor (1I)n or f(I,n) can also
    be derived from the table (15-1).
  • In the previous case the FVF 10,5 would follow
    the top row to 10 and the side row to 5 periods.

10
Present Value
  • The value today of payments which will be
    received in the future (known as discounting)
  • p f X p(I,n) or
  • PV FV (1I)n
  • So if we have 16,105 at 10 for 5 years

11
Present Value
  • The Present Value Factor 1/(1I)n or p(I,n) can
    also be derived from the table (15-2).
  • In the previous case the PVF 10,5 would follow
    the top row to 10 and the side row to 5 periods.

12
Future/Present Value - Annuity
  • Multiple payments/receipts
  • F R X F(I,n)
  • P R X P(I,n)
  • In this case, R refers to the periodic deposits
    into the annuity account.

13
Future Value of an Annuity
  • Suppose you received 10,000 each year for 3
    years? What would it be worth if at each year it
    earned 10?
  • Table 15-3

14
Present Value of an Annuity
  • Suppose a donor wants to give 10,000 each year
    for 3 years? What is it worth today if at each
    year it earned 10?
  • Table 15-4

15
Combo Problem
  • A Hospital has a sinking fund payment required
    for the last 10 years of a bonds life. At the
    end of that period, there must be 45 million
    available to retire the debt. Luckily, the
    hospital has created a 5 million fund today, 20
    years before debt retirement. If the yield is
    expected to be 10, what annual deposit must be
    made?

16
Combo Problem
  • 1st Determine future value of the 5 million
    deposit
  • F P X F(I,n) ? Z
  • 2nd Determine remainder
  • 45,000,000 - Z
  • 3rd Calculate solution
  • Z R X F(I,n)

17
Using Decision Making
  • Strategic Decisions
  • Expansion Decisions
  • Replacement Decisions

18
Capital Investment Objectives
Financial Return
Non-Financial Benefit
Future Funding
19
Capital Expenditures
  • Relatively small percentage of total costs
    often 6 to 10.
  • Usually land, land improvements, buildings, fixed
    equipment, major movable equipment, major repairs
    that extend useful life.
  • Replacement New (for budgeting)

20
Payback Rule
  • Feasibility of investment determined by how long
    it would take to be recovered
  • Initial investmentAnnual Cash Flows

21
Payback Rule
  • Acceptable if calculated payment is less than
    some prespecified number of years
  • One alternative
  • Two alternatives

22
Example
  • If it costs 1,000,000 either way, do we
  • Buy an existing physician practice and renovate
    it to our needs (333,333 for 6 years) OR
  • Build our own satellite clinic (200, 250, 300,
    350, 450, 650)?

23
The Good and Bad
  • GOOD ?
  • Simple to calculate and understand
  • BAD ?
  • Answers in years, not
  • Disregards cash flow after payback
  • Time value of money

24
Net Present Value
  • Relies on discounting cash flows
  • Difference between initial amount paid for an
    investment and the future cash flows the
    investment brings in

25
NPV Equation
  • In this formula t is the time of the cash flow, n
    the total time of the project, r the discount
    rate and C is the cash flow at that point in
    time.

26
Example
  • Launch a new consumer product?
  • Cash flows for Year 1 2000
  • Year 2 2000
  • Year 3 4000
  • Year 4 4000
  • Year 5 5000
  • Cost of Capital 10
  • Production Cost 10,000

27
Answer
  • PV 2000/1.1 2000/1.12 4000/1.13
    4000/1.14 5000/1.15
  • 12,313
  • NPV 12313-10000 2313

28
NPV of Physician Practice
  • Lets say we have 1,000,000 to invest in either
    upgrading our physician practice or setting up a
    satellite clinic.
  • For our practice, we would bring in
  • 333,333 for 6 years with a capital cost of 10
  • PV Factor is 4.3553
  • Thus Answer - 1,000,000 NPV

29
NPV of Satellite Clinic
30
NPV Total
  • Initial Investment 1,000,000
  • PV of Cash Flows 1,499,202
  • Net Present Value/SC 499,202
  • Net Present Value/PP 451,765

31
The Good and Bad
  • Good ?
  • Answers in , not years
  • Accounts for cash flows
  • Discounts cost of capital
  • Bad ?
  • Estimates are difficult to develop
  • Discount rate not always determinable

32
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33
Profitability Index
  • Equals NPV/Investment Cost
  • Values greater than zero imply earnings are
    greater than discount rate
  • Thus it should be funded.

34
Average Accounting Return
  • Average Net IncomeAverage Book Value
  • Ignores time value, no meaningful economic sense

35
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36
Internal Rate of Return
  • The Internal Rate of Return (IRR) is defined as
    the discount rate that makes the project have a
    zero Net Present Value (NPV).
  • IRR is an alternative method of evaluating
    investments without estimating the discount rate.
  • IRR takes into account the time value of money by
    considering the cash flows over the lifetime of a
    project. The IRR and NPV concepts are related but
    they are not equivalent.
  • Trial Error insert different discount factors
    until sum equals zero
  • The IRR uses the NPV equation as its starting
    point

37
Equation
38
Graph
39
Equation
40
  • Calculate NPVs at different rates
  • 0 164.56
  • 5 100.36
  • 10 46.15
  • 15 0.00
  • 20 -39.61
  • 15 is IRR. Can we make 18?

41
The Good and Bad
  • Good ?
  • Considers all relevant cash flows
  • Time value of money based
  • Widely used
  • Bad ?
  • Assumes reinvestment of proceeds at IRR
  • Estimates difficult
  • Can have multiple rates of return

42
EAC
  • In finance the equivalent annual cost (EAC) is
    the cost per year of owning and operating an
    asset over its entire lifespan.
  • EAC is often used as a decision making tool in
    capital budgeting when comparing investment
    projects of unequal lifespans. For example if
    project A has an expected lifetime of 7 years,
    and project B has an expected lifetime of 11
    years it would be improper to simply compare the
    net present values (NPVs) of the two projects,
    unless neither project could be repeated.
  • EAC is calculated by dividing the NPV of a
    project by the present value of an annuity
    factor. Equivalently, the NPV of the project may
    be multiplied by the loan repayment factor.

43
Equivalent Annual Cost
  • EAC PV of operating cost
  • PV of investment cost
  • PV of annuity

44
Example
  • A manager must decide on which sprinkler to
    purchase
  • Sprinkler AInvestment cost 5,000Expected
    lifetime 10 yearsAnnual maintenance 500
  • Sprinkler BInvestment cost 10,000Expected
    lifetime 20 yearsAnnual maintenance 200
  • The cost of capital is 10.
  • The EAC for sprinkler A is (5,000/A10,10)500T
    he EAC for sprinkler B is (10,000/A20,10)200
  • Where A is the loan repayment factor for t years
    and 10 cost of capital.

45
Example
  • OR
  • PV of operating costs of sprinkler A
  • 500 X 6.145 3,073
  • PV of investment
  • 5000
  • EAC
  • 3,073 5,000/6.145 1,314

46
Example
  • PV of operating costs of sprinkler B
  • 200 X 8.514 1,703
  • PV of investment
  • 10,000
  • EAC
  • 1,703 10,000/8.541 1,370
  • THUS YOU CHOOSE A
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