Answer:
IRR = 12.92%
Explanation:
<em>The IRR is the discount rate that equates the present value of cash inflows to that of cash outflows. At the IRR, the Net Present Value (NPV) of a project is equal to zero
</em>
<em>If the IRR greater than the required rate of return , we accept the project for implementation </em>
<em>If the IRR is less than that the required rate , we reject the project for implementation </em>
A project that provides annual cash flows of $24,000 for 9 years costs $110,000 today. Under the IRR decision rule, is this a good project if the required return is 8 percent?
Lets Calculate the IRR
<em>Step 1: Use the given discount rate of 10% and work out the NPV
</em>
NPV = 9000× (1-1.10^(-4)/0.1) - 27,000 =1528.78
<em>Step 2 : Use discount rate of 20% and work out the NPV (20% is a trial figure)
</em>
NPV = 9000× 1- 1.20^(-4)/0.2 - 27000 = -3701.38
<em>Step 3: calculate IRR
</em>
<em>IRR = a% + ( NPVa/(NPVa + NPVb)× (b-a)%</em>
IRR = 10% + 1528.78/(1528.78+3701.38)× (20-10)%= 0.12923
= 0.129230153 × 100
IRR = 12.92%
