Question

What is the answer to this math question?

Use Taylor's power series for `tan^-1x` to evaluate:

`lim_(x->0)(tan^-1x-x)/x^3`

Answer 1

`lim_(x->0)(arctanx-x)/x^3=-1/3`

Explanation:

We want to find `lim_(x->0)(tan^-1x-x)/x^3=0` using Taylor series

First, let `tan^-1-= arctan`

Now,

`arctanx=x-x^3/3+x^5/5-x^7/7`

so

`lim_(x->0)(arctanx-x)/x^3`

`=lim_(x->0)(x-x^3/3+x^5/5-...-x)/x^3`

`=lim_(x->0)(-1/3+x^2/5-x^4/7...)`

`=-1/3`