Question

How do you find the asymptotes for `f(x) = (x^2) / (x^2 + 1)`?

Answer 1

`cancel(EE)` vertical asymptotes
`y=1` horizontal asymptote `x rarr +-oo`

Explanation:

Given:

`f(x)=g(h)/(h(x))`

possible asymptotes are `x=x_i` with `x_i` values that zero the denominator `h(x)=0`.

Indeed, the existence condition of `f(x) in RR` is `h(x)!=0`.

Therefore,

`h(x)=0 => x^2+1=0=> x^2=-1=>x_1,x_2 in CC`

`h(x)` hasn't any zeros `in RR`

`:.f(x): RR rarr RR, AA x in RR`

We could looking for possible horizontal asymptotes:

`y=L` is a horizontal asymptotes when:

`lim_(x rarr +-oo)f(x)=L`

`lim_(x rarr +-oo)f(x)=lim_(x rarr +-oo) x^2/(x^2+1)~~cancel(x^2)/cancel(x^2)=1`

`:.y=1` horizontal asymptote `x rarr +-oo`

graph{x^2/(x^2+1) [-6.244, 6.243, -3.12, 3.123]}