How do you differentiate $f(x)=cos(=3x^2+2)^2$ ?

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How do you differentiate $f(x)=cos(=3x^2+2)^2$ ?

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Answer 1 · 2018-01-27T00:38:07

$f'(x)=-12xcos(3x^2+2)*sin(3x^2+2)$

Explanation:

We need to remember two things:
the chain rule and the power rule.

The chain rule states that if $h(x)=f(g(x))$ , then $h'(x)=f'(g(x))*g'(x)$
The power rule states that if $f(x)=x^n$ , then $f'(x)=nx^(n-1)$
For this problem, note that $d/dxcosx=-sinx$
Also, derivative of a constant is always 0.

Let's apply this to $f(x)=cos(3x^2+2)^2$
=> $f'(x)=2cos(3x^2+2)*-sin(3x^2+2)*6x$

=> $f'(x)=-12xcos(3x^2+2)*sin(3x^2+2)$

That is our answer!

We have basically thought of $cos(3x^2+2)^2$ as a triple function of $h(g(f(x)))$ where $h(x)=x^2$ , $g(x)=cos(x)$ and $f(x)=3x^2+2$

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How do you differentiate $f(x)=cos(=3x^2+2)^2$ ?

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Explanation:

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How do you differentiate $f(x)=cos(=3x^2+2)^2$ ?