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What is the derivative of #5^(3x)#?

1 Answer

Mar 2, 2018

Please see below.

Explanation:

#d/dx(a^x) = a^x lna#

So, #d/dx(a^u) = (a^u lna) (du)/dx#

So #d/dx(5^(3x)) = (5^(3x) ln5) (3)#

# = 3(5^(3x))ln5#

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