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20 votes
20 votes
Invested $5,000 seven years ago and that this investment is worth $38,700 today. What was annual rate of return if compounds annually?

User Dmitry Poroh
by
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1 Answer

25 votes
25 votes

For an initial amount P invested at an annually compounded interest rate r, after t year the total amount is given by:


A=P(1+r)^t

Then we have:


\begin{gathered} (A)/(P)=(1+r)^t \\ \ln(A)/(P)=t\ln(1+r) \\ \ln(1+r)=(1)/(t)\ln(A)/(P) \\ 1+r=e^{(1)/(t)\ln(A)/(P)} \\ r=e^{(1)/(t)\ln(A)/(P)}-1 \end{gathered}

Therefore, for P - $5,000, A = $38,700 and t = 7 years, we have:


r=e^{(1)/(7)\ln(38700)/(5000)}-1\approx0.3396=33.96\%

User Ben Rowe
by
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