Answer:
16.08%
Step-by-step explanation:
The effective interest rate, effective annual interest rate, annual equivalent rate or simply effective rate is the interest rate on a loan or financial product restated from the nominal interest rate and expressed as the equivalent interest rate if compound interest was payable annually in arrears.
Amount deposited at beginning of month (Annuity due) = 80
Amount deposited at end of month (ordinary Annuity) = 81
Future value of annuity due formula = P *(1+i)*{ (1+r)^n - 1 } / r
Future value of annuity formula = P *{ (1+r)^n - 1 } / r
P *(1+i)*{ (1+r)^n - 1 } / r = P *{ (1+r)^n - 1 } / r
80*(1+i)= 81
(1+i)= 1.0125
i = 0.0125
effective annual interest rate =( (1+monthly interest rate)^no of months in a year)-1
effective annual interest rate = ((1+0.0125)^12)-1
effective annual interest rate = 0.1607545177 OR 16.08%