Question

What is the derivative of `y=sin(1+tan(2x))`?

Answer 1

`2sec^2(2x)*cos(1+tan2x)`

Explanation:

Finding the derivative of this function by applying chain rule and using derivative of some trigonometric functions.

Let:
`u(x)=1+tan(2x)`
`f(x)=sinx`

Then `f(u(x))=sin(1+tan(2x))`

`f(u(x)))` is a composite function where its derivative can be found by applying chain rule that says:

`color(blue)(f(u(x))'=u'(x)*f'(u(x))`

Let's find `u'(x)` and `f'(x)`

`u'(x)=(2x)'*tan'(2x)`
`color(blue)(u'(x)=2sec^2(2x))`

`color(blue)(f'(x)=cosx)`

`(f(u(x)))'=u'(x)*f'(u(x))`

`(f(u(x)))'=2sec^2(2x)*cos(u(x))`

`color(red)((sin(1+tan2x))'=2sec^2(2x)*cos(1+tan2x))`