Answer:
IRR = 13.8109 %
Step-by-step explanation:
We can calculate the IRR using the following formula.
IRR = R1 + (NPV1 * (R2-R1) / (NPV1 - NPV2)
where,
R1 and R2 are random interest rates used to calculate 2 NPV values, and NPV1 is the higher npv value and NPV2 is the lower npv value among those calculated using R1 and R2.
Annuity factors for 4 years for,
R1 = 7% = 3.6243
R2 = 10% = 3.4869
Using the annuity factors, the present values are as follows
(8900 for 4 years is the cash flow generated)
Present Values:
R1 = 7% = 3.6243 * 8900 = $32,256.27
R2 = 10% = 3.4869 * 8900 = $31,033.41
Using these pv values, we subtract the initial out lay to compute Net present values,
NPV @ R1 of 7% = 32256.27 - 29480 = $2,776.27 = NPV1
NPV @ R2 of 10% = 31033.41 - 29480 = $1,553.41 = NPV2
Now we have the following information,
R1 = 7%
NPV1 = 2,776.27
R2 = 10%
NPV2 = 1,553.41
We input this data in the formula for IRR,
IRR = 7 + (2,776.27 * (10 - 7) ) / (2,776.27 - 1,553.41)
IRR = 7 + 6.8109
IRR = 13.8109 %
This is the rate at which NPV = 0.
Hope that helps.