Question

How do you differentiate `f(x)=x^3 * sin^2x` using the product rule?

Answer 1

`f'(x)=x^2sinx(3sinx+2xcosx)`

Explanation:

The product rule states that

`f'(x)=sin^2xd/dx[x^3]+x^3d/dx[sin^2x]`

Now, find both of those derivatives.

`d/dx[x^3]=3x^2`

The following will require the power rule with chain rule.

`d/dx[sin^2x]=2sinxd/dx[sinx]=2sinxcosx`

Plug these back in to the original equation.

`f'(x)=3x^2sin^2x+2x^3sinxcosx`

This can be factored, but not exceptionally helpfully:

`f'(x)=x^2sinx(3sinx+2xcosx)`