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CONSIDER THE EXPONENTIAL FUNCTION F(x)=250(1.03)^x, which models shawnda’s savings account where x represents the number of years since the money way invested A GROWINGB DECAYING

CONSIDER THE EXPONENTIAL FUNCTION F(x)=250(1.03)^x, which models shawnda’s savings-example-1
User Tajihiro
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1 Answer

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\text{The value in the parenthesis is greater than 1, so it is growing (option A)}

Step-by-step explanation:
\begin{gathered} \text{The given exponential function:} \\ f(x)=250(1.03)^x \\ \text{where x = number of years since the money was invested} \end{gathered}

To determine if it is growing or decaying, we will compare the exponential function when it is growing with the given function


\begin{gathered} \text{Exponential growth formula:} \\ f(x)=a(1+r)^x \\ \text{where a = initial value} \\ r\text{ = rate of growth} \\ x\text{ = number of years} \end{gathered}
\begin{gathered} f(x)=250(1.03)^x \\ f(x)=250(1+0.03)^x \\ \text{if value in parenthesis is greater than 1, it is a growth} \\ \text{if value in parenthesis is less than 1, it is a decay} \\ \end{gathered}
Since\text{ the value in the parenthesis is greater than 1, then it is growing (optino A)}

User Ankit Bohra
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