1 Answer

Kadie · Answer 1 · 2023-01-07T14:49:40+0000

If g is an exponential function, it has the form:

$g(x)=a\cdot b^x$

We know two values of the function, and we will use them to find a and b.

We start by finding b, as we have:

$\begin{gathered} (g(3))/(g(2))=(ab^3)/(ab^2)=b^(3-2)=b \\ b=(g(3))/(g(2))=(33.603)/(33.5359)\approx1.0002 \end{gathered}$

Then, we use one of the points to find a:

$\begin{gathered} g(3)=a\cdot1.0002^3=33.603 \\ a=(33.603)/(1.0002^3)\approx(33.603)/(1.0006)\approx33.583 \end{gathered}$

We can then write g(x) as:

$g(x)=33.583\cdot1.0002^x$

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