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Wednesday, 9 July 2014

Garage, Inc., has identified the following two mutually exclusive projects:

Garage, Inc., has identified the following two mutually exclusive projects:    
Year Cash Flow (A) Cash Flow (B)
0 –$ 29,900 –$ 29,900
1 15,300 4,750
2 13,200 10,250
3 9,650 16,100
4 5,550 17,700

  
a-1
What is the IRR for each of these projects? (Do not round intermediate calculations and round your final answers to 2 decimal places. (e.g., 32.16))

IRR
  Project A %  
  Project B %  


a-2
Using the IRR decision rule, which project should the company accept?
Project A

a-3 Is this decision necessarily correct?
No

b-1
If the required return is 11 percent, what is the NPV for each of these projects? (Do not round intermediate calculations and round your final answers to 2 decimal places. (e.g., 32.16))
  
NPV
  Project A $  
  Project B $  


b-2 Which project will the company choose if it applies the NPV decision rule?
Project B
  
c.
At what discount rate would the company be indifferent between these two projects? (Do not round intermediate calculations and round your final answer to 2 decimal places. (e.g., 32.16))

  Discount rate %  


Explanation: a.

The IRR is the interest rate that makes the NPV of the project equal to zero. The equation for the IRR of Project A is:

0 = –$29,900 + $15,300 / (1 + IRR) + $13,200 / (1 + IRR)2 + $9,650 / (1 + IRR)3 + $5,550 / (1 + IRR)4
Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:
IRR = 20.57%
The equation for the IRR of Project B is
0 = –$29,900 + $4,750 / (1 + IRR) + $10,250 / (1 + IRR)2 + $16,100 / (1 + IRR)3 + $17,700 / (1 + IRR)4
Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:
IRR = 18.58%
Examining the IRRs of the projects, we see that the IRRA is greater than the IRRB, so IRR decision rule implies accepting project A. This may not be a correct decision; however, because the IRR criterion has a ranking problem for mutually exclusive projects. To see if the IRR decision rule is correct or not, we need to evaluate the project NPVs.

b.

The NPV of Project A is:
NPVA = –$29,900 + $15,300 / 1.11 + $13,200 / 1.112 + $9,650 / 1.113 + $5,550 / 1.114
NPVA = $5,309.15
And the NPV of Project B is:
NPVB = –$29,900 + $4,750 / 1.11 + $10,250 / 1.112 + $16,100 / 1.113 + $17,700 / 1.114
NPVB = $6,130.13
The NPVB is greater than the NPVA, so we should accept Project B.

c.

To find the crossover rate, we subtract the cash flows from one project from the cash flows of the other project. Here, we will subtract the cash flows for Project B from the cash flows of Project A. Once we find these differential cash flows, we find the IRR. The equation for the crossover rate is:
Crossover rate: 0 = $10,550 / (1 + R) + $2,950 / (1 + R)2 – $6,450 / (1 + R)3 – $12,150 / (1 + R)4
Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:
R = 14.09%
At discount rates above 14.09 percent choose project A; for discount rates below 14.09 percent choose project B; indifferent between A and B at a discount rate of 14.09 percent.
  
Calculator Solution:
Note: Intermediate answers are shown below as rounded, but the full answer was used to complete  the calculation.
     
Project A
CFo
 –$29,900
CFo
 –$29,900
C01
 $15,300
C01
 $15,300
F01
 1
F01
 1
C02
 $13,200
C02
 $13,200
F02
 1
F02
 1
C03
 $9,650
C03
 $9,650
F03
 1
F03
 1
C04
 $5,550
C04
 $5,550
F04
 1
F04
 1
  IRR CPT   I = 11%
  20.57%   NPV CPT
     $5,309.15
  
Project B
CFo
 –$29,900
CFo
 –$29,900
C01
 $4,750
C01
 $4,750
F01
 1
F01
 1
C02
 $10,250
C02
 $10,250
F02
 1
F02
 1
C03
 $16,100
C03
 $16,100
F03
 1
F03
 1
C04
 $17,700
C04
 $17,700
F04
 1
F04
 1
  IRR CPT   I = 11%
  18.58%   NPV CPT
     $6,130.13
     
Crossover rate
CFo  $0
C01  $10,550
F01  1
C02  $2,950
F02  1
C03  –$6,450
F03  1
CO4  –$12,150
FO4  1
 IRR CPT
 14.09%

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