Answer:
The equivalent value of the series=$ 10,536.61
Step-by-step explanation:
An annuity is a series of equal payment or receipt occurring for certain number of period.
The series of cash flows of $149 and the increase $76 occurring for 10 years are example of ordinary annuity.
So we can workout their present value using the formula stated below:
This is done as follows:
The Present Value of annuity = A × (1- (1+r)^(-n))/r
Present value of series of fixed amount cashflow
A- periodic cash flow-149, r- semi annual rate of interest - 1.3/5= 0.26%
n- number of period- (10×5) = 50.
Present value = 149× (1-1.0026^(-50)/0.0026=6,977.57
Present value of the increment series of cashflow
A- periodic cash flow-76, r- semi annual rate of interest - 1.3/5= 0.26%
n- number of period- (10×5) = 50.
Present value = 76× (1-1.0026^(-50)/0.0026=3,559.03
The equivalent value of the series = Present value of the fixed amount + present value of the increment= 6,977.57 + 3,559.03= 10536.61
The equivalent value of the series=$ 10,536.61