How do you find the Vertical, Horizontal, and Oblique Asymptote given $f(x) = (x^2) / (x-2)$ ?

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Answer 1 · 2016-12-29T08:08:49

The vertical asymptote is $x=2$
The oblique asymptote is $y=x+2$
No horizontal asymptote

The domain of $f(x)$ is $D_f(x)=RR-{2}$

As we cannot divide by $0$ , $x!=2$

Therefore,

The vertical asymptote is $x=2$

As the degree of the numerator is $>$ than the degree of the denominator, we have an oblique asymptote.

Let's do a long division

$color(white)(aaaa)$ $x^2$ $color(white)(aaaaaaaa)$ $∣$ $x-2$

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

$color(white)(aaaaa)$ $0+2x$

$color(white)(aaaaaaa)$ $+2x-4$

$color(white)(aaaaaaaa)$ $+0+4$

So,
$f(x)=x+2+(4)/(x-2)$

Now we calculate the limits

$lim_(x->-oo)(f(x)-(x+2))=lim_(x->-oo)(4)/(x-2)=0^(-)$

$lim_(x->+oo)(f(x)-(x+2))=lim_(x->+oo)(4)/(x-2)=0^(+)$

So,

The oblique asymptote is $y=x+2$

graph{(y-(x^2)/(x-2))(y-x-2)=0 [-28.86, 28.86, -14.44, 14.44]}

How do you find the Vertical, Horizontal, and Oblique Asymptote given f(x) = (x^2) / (x-2) f(x) = (x^2) / (x-2)?