How do you find the asymptotes for $h(x) = (2x^2-5x-12)/(3x^2-11x-4)$ ?

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How do you find the asymptotes for $h(x) = (2x^2-5x-12)/(3x^2-11x-4)$ ?

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Answer 1 · 2016-04-06T10:41:54

vertical asymptote $x = -1/3$
horizontal asymptote y $= 2/3$

Explanation:

First step is to factorise h(x).

$h(x) = ((2x + 3)cancel((x-4)))/((3x+1)cancel((x-4)))$

$rArr h(x) = (2x+3)/(3x+1)$

Vertical asymptotes occur when the denominator of a rational function tends to zero. To find the equation let the denominator equal zero.

solve : 3x + 1 = 0 → $x = - 1/3" is the asymptote "$

Horizontal asymptotes occur as $lim_(xto+-oo) f(x) to 0$

divide all terms on numerator/denominator by x

$((2x)/x + 3/x)/((3x)/x + 1/x) = (2 + 3/x )/(3 + 1/x)$

as $xto+-oo , 3/x" and " 1/x to 0$

$rArr y = 2/3" is the asymptote "$

here is the graph of h(x).
graph{(2x+3)/(3x+1) [-10, 10, -5, 5]}

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How do you find the asymptotes for $h(x) = (2x^2-5x-12)/(3x^2-11x-4)$ ?

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Explanation:

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How do you find the asymptotes for h(x) = (2x^2-5x-12)/(3x^2-11x-4)h(x) = (2x^2-5x-12)/(3x^2-11x-4)?

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Explanation:

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How do you find the asymptotes for $h(x) = (2x^2-5x-12)/(3x^2-11x-4)$ ?