How to find the asymptotes of $f(x) =(-7x + 5) / (x^2 + 8x -20)$ ?

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How to find the asymptotes of $f(x) =(-7x + 5) / (x^2 + 8x -20)$ ?

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Answer 1 · 2016-02-04T01:54:13

There are two kinds of asymptotes. The vertical ones are when the part under the fraction bar approaches zero.

Explanation:

You can factor $x^2+8x-20=(x+10)(x-2)$
Now you can expect asymptotes at $x=-10andx=2$

For the horizontal asymptote we make $x$ as large as we want, both positive and negative. The function begins to look more and more like:
$(-7x)/(x^2+8x)$ as the $+5and-20$ don't matter anymore

If we cross out the $x$ 's it's more like:
$-7/x$ as the $+8$ doesn't matter as compared to the size of $x$
As $x$ gets larger, $f(x)$ gets smaller, or, in 'the language':
$lim_(x->oo) f(x)=0 and lim_(x->-oo) f(x)=0$
graph{(-7x+5)/(x^2+8x-20) [-32.48, 32.47, -16.23, 16.26]}

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How to find the asymptotes of $f(x) =(-7x + 5) / (x^2 + 8x -20)$ ?

1 Answer

Explanation:

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How to find the asymptotes of f(x) =(-7x + 5) / (x^2 + 8x -20)f(x) =(-7x + 5) / (x^2 + 8x -20) ?

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Explanation:

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How to find the asymptotes of $f(x) =(-7x + 5) / (x^2 + 8x -20)$ ?