Question

6. Meagan invests $1,200 each year in an IRA for 12 years in an account that earned 5% compounded annually. At the end of 12 years, she stopped making payments to the account, but continued to invest her accumulated amount at 5% compounded annually for the next 11 years. a. What was the value of the Ira at the end of 12 years? b. What was the value of the investment at the end of the next 11 years? c. How much interest did she earn?

Answer 1

a)


`\bf \qquad \qquad \textit{Future Value of an ordinary annuity} \\\\ A=pymnt\left[ \cfrac{\left( 1+(r)/(n) \right)^(nt)-1}{(r)/(n)} \right] \\\\\\ \qquad \begin{cases} A= \begin{array}{llll} \textit{accumulated amount}\\ \end{array} \begin{array}{llll} \end{array}\\ pymnt=\textit{periodic payments}\to &1200\\ r=rate\to 5\%\to (5)/(100)\to &0.05\\ n= \begin{array}{llll} \textit{times it compounds per year}\\ \textit{annually, thus once} \end{array}\to &1\\ t=years\to &12 \end{cases}`


`\bf A=1200\left[ \cfrac{\left( 1+(0.05)/(1) \right)^(1\cdot 12)-1}{(0.05)/(1)} \right]`

b)

`\bf \textit{so, if from the previous calculation, you ended up with an}\\ \textit{amount of say P, then P gets compounded for 11 years then}\\\\ -------------------------------`



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c)

how much interest did she earn? well, simply subtract how much came out of her pocket, from the accumulated amount, whatever is left, is the interest

how much did she put out of pocket? well, out of her pocket came 1200 every year for 12 years, or 1200 * 12