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A newborn child receives a $6,000 gift toward a college education from her grandparents. How much will the $6,000 be worth in 19 years if it is invested at 7.8%compounded quarterly?

User Chaos Legion
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1 Answer

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9 votes

Solution:

To find the amount after 19 years, we use the compound interest formula.


\begin{gathered} A=P(1+(r)/(n))^(nt) \\ \text{where;} \\ A\text{ is the amount after t-years} \\ P\text{ is the principal or initial deposit} \\ r\text{ is the rate} \\ n\text{ is the number of compounding} \\ t\text{ is the time } \end{gathered}

Given:


\begin{gathered} P=\text{ \$6000} \\ t=19\text{years} \\ r=7.8\text{ \% =}(7.8)/(100)=0.078 \\ n=4\text{ (compounded quarterly)} \end{gathered}

Substituting these values into the formula;


\begin{gathered} A=P(1+(r)/(n))^(nt) \\ A=6000(1+(0.078)/(4))^(4*19) \\ A=6000(1+0.0195)^(76) \\ A=6000(1.0195)^(76) \\ A=6000*1.0195^(76) \\ A=26,036.39 \end{gathered}

Therefore, the amount $6,000 will be worth in 19 years if it is invested at 7.8% compounded quarterly is $26,036.39

User Koynov
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