What is rational function and how do you find domain, vertical and horizontal asymptotes. Also what is "holes" with all limits and continuity and discontinuity?

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What is rational function and how do you find domain, vertical and horizontal asymptotes. Also what is "holes" with all limits and continuity and discontinuity?

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Answer 1 · 2015-03-01T13:45:57

A rational function is where there are $x$ $x$ 's under the fraction bar.

The part under the bar is called the denominator .
This puts limits on the domain of $x$ $x$ , as the denominator may not work out to be $0$ $0$

Simple example: $y = \frac{1}{x}$ $y=1/x$ domain : $x \neq 0$ $x!=0$
This also defines the vertical asymptote $x = 0$ $x=0$ , because you can make $x$ $x$ as close to $0$ $0$ as you want, but never reach it.

It makes a difference whether you move toward the $0$ $0$ from the positive side of from the negative (see graph).

We say $lim_(x->0^+) y=oo$ and $lim_(x->0^-) y=-oo$

So there is a discontinuity
graph{1/x [-16.02, 16.01, -8.01, 8.01]}
On the other hand: If we make $x$ larger and larger then $y$ will get smaller and smaller, but never reach $0$ . This is the horizontal asymptote $y=0$

We say $lim_(x->+oo) y=0$ and $lim_(x->-oo) y=0$

Of course ratinal functions are usually more complicated, like:
$y=(2x-5)/(x+4)$ or $y=x^2/(x^2-1)$ but the idea is the same

In the latter example there are even two vertical asymptotes, as

$x^2-1=(x-1)(x+1)->x!=+1 and x!=-1$
graph{x^2/(x^2-1) [-22.8, 22.81, -11.4, 11.42]}

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What is rational function and how do you find domain, vertical and horizontal asymptotes. Also what is "holes" with all limits and continuity and discontinuity?

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