Answer:
PV = 140,465.70$
Step-by-step explanation:
Since the values will be paid in the future then we need to find the Present Value of each of the amounts factoring in a interest rate of 4.3%
Given
1) Amount = 18,000$ : Period(t) = 1 year
2) Amount = 26,500$ : Period(t) = 2 years
3) Amount = 46,000$ : Period(t) = 3 years
2) Amount = 69,000$ : Period(t) = 4 years
The Present Value formula is as follow
[tex]PV = \frac{Amount}{(1 + rate)^t}[/tex]
Solving for each of the payments.
[tex]PV_{1} Â = \frac{18000}{(1 + 0.043)^1} = 17257.91\\ PV_{2} Â = \frac{26500}{(1 + 0.043)^2} = 24359.99\\ PV_{3} Â = \frac{46000}{(1 + 0.043)^3} = 40541.98\\ PV_{4} Â = \frac{69000}{(1 + 0.043)^4} = 58305.81[/tex]
Now the total Present Value is calculated by adding all the above answers
[tex]PV = PV_{1} + PV_{2} + PV_{3} + PV_{4}\\ PV = 140,465.69[/tex]
