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Wednesday, 9 July 2014

Consider the following two mutually exclusive projects:

Consider the following two mutually exclusive projects:   
Year Cash Flow (A) Cash Flow (B)
0 –$ 348,000 –$ 51,000
1 47,000 24,200
2 67,000 22,200
3 67,000 19,700
4 442,000 14,800

  
Whichever project you choose, if any, you require a 14 percent return on your investment.

a-1
What is the payback period for each project? (Round your answers to 2 decimal places. (e.g., 32.16))

Payback period
  Project A years  
  Project B years  


a-2 If you apply the payback criterion, which investment will you choose?
Project B

b-1
What is the discounted payback period for each project? (Do not round intermediate calculations and round your final answers to 2 decimal places. (e.g., 32.16))
  
Discounted payback period
  Project A years  
  Project B years  

  
b-2 If you apply the discounted payback criterion, which investment will you choose?
Project B

c-1
What is the NPV for each project? (Do not round intermediate calculations and round your final answers to 2 decimal places. (e.g., 32.16))
  
NPV
  Project A $   
  Project B $   


c-2 If you apply the NPV criterion, which investment will you choose?
Project A

d-1
What is the IRR for each project? (Round your answers to 2 decimal places. (e.g., 32.16))

IRR
  Project A %  
  Project B %  


d-2 If you apply the IRR criterion, which investment will you choose?
Project B

e-1
What is the profitability index for each project? (Do not round intermediate calculations and round your final answers to 3 decimal places. (e.g., 32.161))
  
Profitability index
  Project A    
  Project B     


e-2 If you apply the profitability index criterion, which investment will you choose?
Project B
f Based on your answers in (a) through (e), which project will you finally choose?
Project A


Explanation: a.

The payback period for each project is:
  
A: 3 + ($167,000/$442,000) = 3.38 years
B: 2 + ($4,600/$19,700) = 2.23 years
  
The payback criterion implies accepting Project B, because it pays back sooner than project A.

b.

The discounted payback for each project is:
  
A: $47,000/1.14 + $67,000/1.142 + $67,000/1.143 = $138,005.49
$442,000/1.144 = $261,699.48
Discounted payback = 3 + ($348,000 – 138,005.49)/$261,699.48 = 3.80 years
B: $24,200/1.14 + $22,200/1.142 = $38,310.25
$19,700/1.143 = $13,296.94
Discounted payback = 2 + ($51,000 – 38,310.25)/$13,296.94 = 2.95 years
  
The discounted payback criterion implies accepting Project B because it pays back sooner than A.

c.

The NPV for each project is:
  
A: NPV = –$348,000 + $47,000/1.14 + $67,000/1.142 + $67,000/1.143 + $442,000/1.144
NPV = $51,704.97
B: NPV = –$51,000 + $24,200/1.14 + $22,200/1.142 + $19,700/1.143 + $14,800/1.144
NPV = $9,369.98
  
NPV criterion implies we accept project A because project A has a higher NPV than project B.

d.

The IRR for each project is:
  
A: $348,000 = $47,000/(1+IRR) + $67,000/(1+IRR)2 + $67,000/(1+IRR)3 + $442,000/(1+IRR)4
Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:
IRR = 18.89%
B: $51,000 = $24,200/(1+IRR) + $22,200/(1+IRR)2 + $19,700/(1+IRR)3 + $14,800/(1+IRR)4
Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:
IRR = 23.47%
  
IRR decision rule implies we accept Project B because IRR for B is greater than IRR for A.

e.

The profitability index for each project is:
  
A: PI = ($47,000/1.14 + $67,000/1.142 + $67,000/1.143 + $442,000/1.144) / $348,000 = 1.149
B: PI = ($24,200/1.14 + $22,200/1.142 + $19,700/1.143 + $14,800/1.144) / $51,000 = 1.184
  
Profitability index criterion implies accept Project B because its PI is greater than Project A’s.

Calculator Solution:
Note: Intermediate answers are shown below as rounded, but the full answer was used to complete  the calculation.
   
CF(A) c. d. e.
CFo
 –$348,000
CFo
 –$348,000
CFo
 $0
C01
 $47,000
C01
 $47,000
C01
 $47,000
F01
 1
F01
 1
F01
 1
C02
 $67,000
C02
 $67,000
C02
 $67,000
F02
 2
F02
 2
F02
 2
C03
 $442,000
C03
 $442,000
C03
 $442,000
F03
 1
F03
 1
F03
 1
  I = 14%   IRR CPT   I = 14%
  NPV CPT   18.89%   NPV CPT
  $51,704.97      $399,704.97
    
PI = $399,704.97 / $348,000 = 1.149
    
CF(B) c. d. e.
CFo
 –$51,000
CFo
 –$51,000
CFo
 $0
C01
 $24,200
C01
 $24,200
C01
 $24,200
F01
 1
F01
 1
F01
 1
C02
 $22,200
C02
 $22,200
C02
 $22,200
F02
 1
F02
 1
F02
 1
C03
 $19,700
C03
 $19,700
C03
 $19,700
F03
 1
F03
 1
F03
 1
C04
 $14,800
C04
 $14,800
C04
 $14,800
F04
 1
F04
 1
F04
 1
  I = 14%   IRR CPT   I = 14%
  NPV CPT   23.47%   NPV CPT
  $9,369.98      $60,369.98
    
PI = $60,369.98 / $51,000 = 1.184

f.
The final decision should be based on the NPV since it does not have the ranking problem associated with the other capital budgeting techniques.

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