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Question #a16fd

1 Answer

May 4, 2016

Use $d/dx(b^x) = b^x lnb$ and the chain rule.

Explanation:

$b^x = e^(xlnb)$ , so

$d/dx(b^x) = e^(xlnb) * d/dx(xlnb) = e^(xlnb) *lnb = b^x lnb$

For $f(x) = 3^(2x-4)$ , apply the previous formula and the chain rule:

$f'(x) = 3^(2x-4) ln3 (d/dx(2x-4)) = 2*3^(2x-4) ln3$

So the exact value of $f'(2)$ is $f'(2) = 2ln3$

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