Answer:
The effective annual interest rate is 24.62%
Explanation:
for effective annual interest rate we will be using the following formula
to calculate the present value of the annuity for the loan repayments first which is :
Pv= C[(1-(1+i)^-n)/i]
where Pv is the present value of the annuity for $1000 loan payments.
C is the annual payments of $1000 being done every year.
i is the interest rate if the payments are reinvested immediately.
then n is period the payments are made in which is 20 years.
we use the present value formula because we want the present value that will be reinvested in yearly payments of $1000 so we will substitute the above mentioned values to the formula above:
Pv = 1000[((1-(1+5%)^20)/5%] then we compute
Pv = $12462.21 which is the present value of the $1000 investment per year for 20 years.
now to get the effective interest rate, we will calculate the interest rate between the $10000 loan and the present value investment $12462.21 because the initial value of the lumpsum investment is $10000.
which will be $12462.21/$10000 - 1=ieff
1.246221-1 = ieff
0.246221 x 100 = ieff
24.62% = ieff