Find the value of the given function's derivative at x=3 f(x)=k(g(x)) g(x)=2x-x^2 k'(-3)=2 f'(3)=[]

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asked Oct 26, 2021 129k views

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Slaurent · Answer 1 · 2021-10-31T12:01:59+0000

Step-by-step explanation:

According to the chain rule, if we have a function:

f(x)=k(g(x))

The derivative at a point
will be:

f'(a)=k'(g(a))g'(a)

We know that:

$f'(3)=k'(g(3))g'(3)\\ \\ \\ a=3 \\ \\ \\ Then: \\ \\ g(3)=2(3)-3^2 \\ \\ g(3)=6-9 \\ \\ g(3)=-3 \\ \\ \\ k'(g(3))=k'(-3)=2 \\ \\ \\ g'(x)=2-2x \\ \\ g'(3)=2-2(3)=-4 \\ \\ \\ Finally: \\ \\ f'(3)=2(-4) \\ \\ \boxed{f'(3)=-8}$

Find the value of the given function's derivative at x=3 f(x)=k(g(x)) g(x)=2x-x^2 k'(-3)=2 f'(3)=[]

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