Explanation:
According to the chain rule, if we have a function:
[tex]f(x)=k(g(x))[/tex]
The derivative at a point [tex]a[/tex] will be:
[tex]f'(a)=k'(g(a))g'(a)[/tex]
We know that:
[tex]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}[/tex]
