Question

How do you find the derivative of `y = arctan(x^2)`?

Answer 1

`dy/dx=(2x)/(1+x^4)`

Explanation:

Note that `d/dxarctan(x)=1/(1+x^2)`. Thus, according to the chain rule:

`d/dxarctan(f(x))=1/(1+f(x)^2)*f'(x)`

Thus:

`dy/dx=d/dxarctan(x^2)=1/(1+(x^2)^2)*d/dxx^2=(2x)/(1+x^4)`

Answer 2

`dy/dx=(2x)/(x^4+1)`

Explanation:

Rearrange the equation:

`tan(y)=x^2`

Differentiate both sides. Recall to use the chain rule on the left hand side.

`sec^2(y)dy/dx=2x`

Note that `sec^2(y)=tan^2(y)+1`:

`(tan^2(y)+1)dy/dx=2x`

Since `tan(y)=x^2`:

`(x^4+1)dy/dx=2x`

Solving for `dy/dx`:

`dy/dx=(2x)/(x^4+1)`