How do you find the asymptotes for $f(x)= (2x+4) / (x^2-3x-4)$ ?

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How do you find the asymptotes for $f(x)= (2x+4) / (x^2-3x-4)$ ?

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Answer 1 · 2015-08-11T16:19:24

$x = 4, x = -1 " and " f(x) = 0$

Explanation:

To find the vertical asymptotes:
$lim_{x rarr a^+} f(x) = pm oo " and " lim_{x rarr a^-} f(x) = pm oo$
To find the horizontal asymptotes:
$lim_{x rarr pm oo} f(x) = b$

$f(x) = (2(x+2))/(x^2-3x-4) = (2(x+2))/((x-4)(x+1))$

In this case the vertical asymptotes are when the denominator of $f(x)$ in its simplest form is equal to zero. Hence:
$(x-4)(x+1) = 0$
$x = 4 " or " x = -1$

Note: $lim_{x rarr 4^+-} f(x) = +- oo " and " lim_{x rarr -1^+-} f(x) = ""_+^(-) oo$

To find the horizontal asymptotes:
$lim_(x rarr pm oo) f(x) = lim_(x rarr pm oo) (2(x+2))/(x^2-3x-4) = 0^pm$

Hence the asymptotes for $f(x)$ are:
$x = 4, x = -1 " and " f(x) = 0$

graph{(2x+4)/(x^2-3x-4) [-5, 8, -10, 10]}

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How do you find the asymptotes for $f(x)= (2x+4) / (x^2-3x-4)$ ?

1 Answer

Explanation:

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