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The balance owed on your credit card doubles from $800 to $1600 in 6 months. If the balance is growing linearly then it would take 61.5 months to reach $9000. If, on the other hand, the balance is growing exponentially,f(x)=800(1+0.122)^x where x represents the number of months, what would the balance be after 61.5 months? Round your answer to the nearest cent.

User Mikej
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1 Answer

21 votes
21 votes

If the balance is growing exponentially using the function below;


\begin{gathered} f(x)=800(1+0.122)^x \\ \text{Where;} \\ x=Number\text{ of months} \end{gathered}

The balance after 61.5 months would now be computed as;


\begin{gathered} f(x)=800(1+0.122)^x \\ f(61.5)=800(1+0.122)^(61.5) \\ f(61.5)=800(1.122)^(61.5) \\ f(61.5)=800(1187.300636) \\ f(61.5)=949840.5088 \\ \text{Rounded to the nearest cent, this becomes;} \\ f(61.5)\approx949,840.50 \end{gathered}

ANSWER:

The balance after 61.5 months would now be $949,840.50 (rounded to the nearest cent)

User Killogre
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