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A project initially costs $40,500 and will not produce any cash flows for the first 2 years. Starting in Year 3, it will produce cash flows of $34,500 a year for 2 years. In Year 6, the project will end and should produce a final cash inflow of $12,000. What is the net present value of this project if the required rate of return is 18.5 percent?

Respuesta :

Answer:

Net present value = $2063.1922

Explanation:

given data

initially costs = $40,500

cash flows = $34,500

final cash inflow = $12,000

required rate of return = 18.5 percent

solution

The cash flows is  

Year 0 =  $40500

Year 1 = $0

Year 2 = $0

Year 3 = $34500

Year 4 = $34500

Year 5 = $0

Year 6 = $12000

so  Net present value will be express as

Net present value = -Initial cash outflow + Present value of future cash flows ...............1

Present value of future cash flows = (cash flow in year n) ÷ (1 + required rate of return)^t   ..........................2

put here value we get

Present value = [tex]\frac{0}{(1+0.185)^1} + \frac{0}{(1+0.185)^2} + \frac{34500}{(1+0.185)^3} + \frac{34500}{(1+0.185)^4} + \frac{0}{(1+0.185)^5} + \frac{12000}{(1+0.185)^6}[/tex]    

Present value = $42563.1922    

Net present value= -$40500 + $42563.1922

Net present value = $2063.1922

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