In: Finance
We have two independent and mutually exclusive projects, A and B. Project A requires an initial investment of $1500, and will yield $800 of cash inflows for the next three years. Project B requires an initial investment of $5000, and will yield $1,500 of cash inflows for the next five years. The required return on each project is 10%. (13 marks total)
a. What are the net present values of Project A and Project B?
b. What is the problem with using the NPV investment criterion in this case? What alternative criterion should be used? (1 mark)
c. Which project should be chosen?
The cash flows and required return given are all in nominal terms. Given that the inflation rate is 3%, answer the following questions:
d. What is the real rate of return based on the exact Fisher equation? (1 mark)
e. What are the real cash flows from Project A and Project B?
f. What are the real net present values of Project A and Project B? (Hint: The real NPV should be the same as the nominal NPV.)
g. Which project should be chosen based on the real cash flows and real rate of return?
a)
Statement showing NPV of project A
Year | Cash flow | PVIF @ 10% | PV |
A | B | C = A x B | |
1 | 800 | 0.9091 | 727.27 |
2 | 800 | 0.8264 | 661.16 |
3 | 800 | 0.7513 | 601.05 |
Total fo PV | 1989.48 | ||
Less : Initial Investment | 1500 | ||
NPV | 489.48 |
Thus NPV of project A = $489.48
Statement showing NPV of project B
Year | Cash flow | PVIF @ 10% | PV |
A | B | C = A x B | |
1 | 1500 | 0.9091 | 1363.64 |
2 | 1500 | 0.8264 | 1239.67 |
3 | 1500 | 0.7513 | 1126.97 |
4 | 1500 | 0.6830 | 1024.52 |
5 | 1500 | 0.6209 | 931.38 |
Total fo PV | 5686.18 | ||
Less : Initial Investment | 5000 | ||
NPV | 686.18 |
Thus NPV of project B = $686.18
b) Here both the project have different life period. i.e project A is of 3 years and project B has 5 years. Thus NPV method might not provide proper solution. Instead equivalent annual benefit should be found for both the project
Equivalent annual benefit for project A = NPV of project A / PVIFA(10%,3)
=489.48/2.4869
= 196.83 $
Equivalent annual benefit for project B = NPV of project B /
PVIFA(10%,5)
= 686.18/3.7908
= 181.01 $
c) Since Equivalent annual benefit for project A is more than Equivalent annual benefit for project B , project A should be selected
d) Real rate of return = (1+ Nominal rate of interest)/(1+ Inflation rate) - 1
Nominal rate of interest = 10%
Inflation rate = 3%
Real rate of return = (1+10%)/(1+3%) - 1
=(1+0.1)/(1+0.03) - 1
= 1.1/1.03 - 1
= 1.067961 - 1
= 0.067961
i.e 6.7961 %