Answer:
The NPV of this investment is $64,581.75
Explanation:
Hi, we need to discount to present value all the future cash flows, the formula to use is as follows:
[tex]NPV=-Investment+\frac{CF1}{(1+r)^{1} }+\frac{CF2}{(1+r)^{2}} +\frac{CF3}{(1+r)^{3}} +\frac{CF4}{(1+r)^{4}} +\frac{CF5}{(1+r)^{5}}[/tex]
Where
NPV = Net Present Value
CF = The cash flow stated in the problem by year
r= discount rate (in our case, 0.08 or 8%)
Now, let´s solve this.
[tex]NPV=-336,875+\frac{100,000}{(1+0.08)^{1} }+\frac{82,000}{(1+0.08)^{2}} +\frac{76,000}{(1+0.08)^{3}} +\frac{111,000}{(1+0.08)^{4}} +\frac{142,000}{(1+0.08)^{5}}[/tex]
[tex]NPV=-336,875+ 92,592.59 + 70,301.78 + 60,331.25 + 81,588.31+96,642.81[/tex]
[tex]NPV=64,581.75[/tex]
So, the net present value of this project is $64,581.75
Best of luck.
