How do you find vertical, horizontal and oblique asymptotes for $(x^2-2x)/(x+1)$ ?

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Answer 1 · 2016-12-08T15:03:35

The vertical asymptote is $x=-1$
The oblique asymptote is $y=x$
No horizontal asymptote

Let $f(x)=(x^2-2x)/(x+1)$

The domain of $f(x)$ is $D_f(x)=RR-{-1}$

As you cannot divide by $0$ , $x!=0$

So, the vertical asymptote is $x=-1$

The degree of the numerator is $>$ to the degree of the denominator, so we expect an oblique asymptote.

Let's do a long division

$color(white)(aaaa)$ $x^2-2x$ $color(white)(aaaa)$ $∣$ $x+1$

$color(white)(aaaa)$ $x^2+x$ $color(white)(aaaaa)$ $∣$ $x$

$color(white)(aaaaa)$ $0-3x$

So,

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

Therefore

The oblique asymptote is $y=x$

To calculate the limits as $x->+-oo$ , we take the terms of highest degree in the numerator and the denominator

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

graph{(y-(x^2-x)/(x+1))(y-x)=0 [-36.53, 36.57, -18.26, 18.27]}

How do you find vertical, horizontal and oblique asymptotes for (x^2-2x)/(x+1)(x^2-2x)/(x+1)?