How do you find the derivative of $f(t)=(3^(2t))/t$ ?

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How do you find the derivative of $f(t)=(3^(2t))/t$ ?

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Answer 1 · 2017-12-18T01:18:36

$f'(t) = (3^(2t)(2*ln(3)*t-1))/t^2$

Explanation:

$f'(t) = (t*d/dt(3^(2t))-3^(2t)*d/dt(t))/t^2$ quotient rule
$f'(t) = (t*3^(2t)*ln(3)*d/dt(2t)-3^(2t)*1)/t^2$ exponent differentiation, chain rule
$f'(t) = (t*3^(2t)*ln(3)*2-3^(2t))/t^2$
$f'(t) = (3^(2t)(2*ln(3)*t-1))/t^2$

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How do you find the derivative of $f(t)=(3^(2t))/t$ ?

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