1 Answer

Spencer Wieczorek · Answer 1 · 2023-07-06T09:21:35+0000

First step, derivative of the constant:

$f^(\prime)(x)=(1)/(2)(d(e^(-3x^2+tan(3x+5))))/(dx)$

Second step, the chain rule:

$\begin{gathered} =(1)/(2)e^(-3x^2+tan(3x+5))*(d(-3x^2+tan(3x+5)))/(dx) \\ =(1)/(2)e^(-3x^2+tan(3x+5))*\frac{(-6x+sec^2(3x+5)*3)}{} \end{gathered}$

Where we applied that the derivative of tangent is the secant^2.

Hence the answer is:

$(1)/(2)e^(-3x^2+tan(3x+5))*\frac{(-6x+3sec^2(3x+5))}{}$

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