Question

What is the derivative of `arctan(x-1)`?

Answer 1

The answer is `(arctan(x+1))' = 1/((x+1)^2+1)`

Explanation:

Let's start with an uncommon method,

We have `theta = arctan(x+1)`

`tan(theta) = x+1`

Derivate both side

`theta'(tan^2(theta)+1) = 1`

`theta' = 1/(tan^2(theta)+1)`

But `tan(theta) = x+1`

`theta' = 1/((x+1)^2+1)`

Answer 2

`d/(dx)[arctanu] = 1/(1+u^2)((du)/(dx))`

`=> 1/(1+(x-1)^2)*1`

`= 1/(1+(x-1)^2)`

`= 1/(x^2 - 2x + 2)`