Question

How do you differentiate `f(x)=sin(cos(tanx))` using the chain rule?

Answer 1

`f'(x)=-sec^2xsin(tanx)cos(cos(tanx))`

Explanation:

The first major issue is the sin function. According to the chain rule,

`d/dx[sinu]=u'cosu`, so

`f'(x)=cos(cos(tanx))*d/dx[cos(tanx)]`

Now to differentiate `cos(tanx)`, know that

`d/dx[cosu]=-u'sinu`

Thus,

`d/dx[cos(tanx)]=-d/dx[tanx]*sin(tanx)`

Also recall that `d/dx[tanx]=sec^2x`, so

`d/dx[cos(tanx)]=-sec^2xsin(tanx)`

Plug this back into the `f'(x)` equation.

`f'(x)=-sec^2xsin(tanx)cos(cos(tanx))`