Answer:
Total PV= $262,205.54
Step-by-step explanation:
Giving the following information:
Discount rate= 10%
We need to calculate the present value of each cash flow, and then the total present value. We will start from the lasts payments to the firsts.
To calculate the present value, first, we need to determine the value at the moment of each change in cash flow:
PV= A*{(1/i) - 1/[i*(1 + i)^n]}
A= annual cash flow
53,000 for 12 years:
PV= 53,000*{(1/0.1) - 1/[0.1*(1.1^12)]}
PV= $361,125.67
27,000 for 12 years:
PV= 27,000*{(1/0.1) - 1/[0.1*(1.1^12)]}
PV= $183,969.68
23,000 for 8 years:
PV= 23,000*{(1/0.1) - 1/[0.1*(1.1^8)]}
PV= $122,703.30
Now, the value today of each part:
PV= FV / (1 + i)^n
PV1= 361,125.67 / (1.1^20)= $53,679.03
PV2= 183,969.68 / (1.1^8)= $85,823.21
PV3= 122,703.3
Total PV= $262,205.54