1 Answer

David Yeiser · Answer 1 · 2023-03-31T04:43:43+0000

An exponential function has the form

Therefore, to find an exponential function that satisfies our condition, we need to find a and b.

From f(-2) = 1, we have

$1=ab^(-2)\: ^{}\: \: \: \: \; ^{}\: \: \: \: \; (1)$

and from f(7) = 63, we have

$63=ab^7\: \: \: \: \; ^{}\: \: \: \: \; (2)$

Solving for a in equation (1) gives

substituting this value of a into equation (2) gives

$63=b^2\cdot b^7$
63=b^8

$\begin{gathered} \therefore b=\sqrt[8]{63} \\ b=1.6785 \end{gathered}$

With the value of b in hand, we now find the value of a:

$\begin{gathered} a=b^2 \\ \therefore a=2.8173 \end{gathered}$

Hence, the exponential function is

Evaluating the above function at x = 1 gives

$\begin{gathered} f(1)=(2.8173)(1.6785)^1 \\ \boxed{\therefore f(1)=4.73.} \end{gathered}$

which is our answer!

Your comment on this question: