How do you find a vertical asymptote for a rational function?

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How do you find a vertical asymptote for a rational function?

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Answer 1 · 2014-10-25T00:08:02

Let $f (x) = \frac{p (x)}{q (x)}$ $f(x)=(p(x))/(q(x))$ be a rational function. A line $x = x_{0}$ $x=x_0$ is a vertical asymptote of $f$ $f$ when

$lim_(x->x_0^+-)(p(x))/(q(x))=+-infty.$

Since a rational function is continuous in its domain, the possible vertical asymptote $x=x_0$ are among that for which $q(x_0)=0$ .

In other words, first we have to find a point $x_0$ that is not in the domain of $f$ , ie, $q(x_0)=0$ , and then verify if limits of $f$ are $+-infty$ when x goes to $x_0^+$ and $x_0^-$ .

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How do you find a vertical asymptote for a rational function?

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