Question

How do you determine the limit of `lim_{x to +infty} x/sqrt(1+x^2)` and `lim_{x to -infty} x/sqrt(1+x^2)` ?

it is right to think that for x that approach to `\pm infty` , `sqrt(x^2+1)` it's approximable to `sqrt(x^2)` that is equal to `|x|` so i can simplify my limit in `x/|x|` ?

Answer 1

We have that

`lim_(x->+oo) x/(sqrt(1+x^2))=lim_(x->+oo) x/(absx*sqrt(1+1/x^2))=1/sqrt(1+0)=1`

(Because `x->+oo` we have `absx=x`)

Also

`lim_(x->-oo) x/(sqrt(1+x^2))=lim_(x->-oo) x/(absx*sqrt(1+1/x^2))=1/-sqrt(1+0)=-1`

(Because `x->-oo` we have `absx=-x`)

Answer 2

Please see below.

Explanation:

Your suggestion will work for this limit. Here is another (similar) approach.

For all `x != 0`,

`sqrt(1+x^2) = sqrt(x^2)sqrt(1/x^2+1) = absx sqrt(1/x^2+1)`

On the right, we have `x > 0` so

`x/sqrt(x^2+1) = x/(xsqrt(1/x^2+1)) =1/sqrt(1/x^2+1)`

and

`lim_(xrarroo)x/sqrt(x^2+1) = lim_(xrarroo)1/sqrt(1/x^2+1) = 1/sqrt(0+1) = 1`

On the left, we have `x < 0` so

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

and

`lim_(xrarr-oo)x/sqrt(x^2+1) = lim_(xrarr-oo)-1/sqrt(1/x^2+1) = -1/sqrt(0+1) = -1`