How do you identify all asymptotes or holes for $f(x)=(2x-2)/(x^2-2x-3)$ ?

Question

2258 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-11-24T06:34:15

The vertical asymptotes are $x=-1$ and $x=3$
No slant asymptote
The horizontal asymptote is $y=0$
No holes

Let's factorise the denominator

$x^2-2x-3=(x+1)(x-3)$

The domain of $f(x)$ is $D_(f(x))=RR-{-1,3}$

As you cannot divide by $0$ , $x!=-1$ and $x!=3$

The vertical asymptotes are $x=-1$ and $x=3$

The degree of the numerator $<$ than the degree of the denominator, thereis no slant asymptote

We calculate the limits of $f(x)$ , we take only the terms of highest degree.

$lim_(x->-oo)f(x)=lim_(x->-oo)(2x)/x^2=lim_(x->-oo)2/x=0^(-)$

$lim_(x->+oo)f(x)=lim_(x->+oo)(2x)/x^2=lim_(x->+oo)2/x=0^(+)$

The horizontal asymptote is $y=0$

graph{(2x-2)/(x^2-2x-3) [-8.89, 8.89, -4.444, 4.445]}

How do you identify all asymptotes or holes for f(x)=(2x-2)/(x^2-2x-3)f(x)=(2x-2)/(x^2-2x-3)?