For $(x^2+1)/(2x^2-3x-2)$ , how do you find horizontal and vertical asymptotes?

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For $(x^2+1)/(2x^2-3x-2)$ , how do you find horizontal and vertical asymptotes?

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Answer 1 · 2018-04-12T19:46:48

Horizontal asymptote is $y=1/2$
Vertical asymptotes are: $x=-1/2$ and $x=2$

Explanation:

For the Horizontal asymptote, you look at the degrees of the numerator and denominator. Since the degree of the numerator and denominator are the same, we use a ratio of the leading coefficients.

$y="lead coef."/"lead coef." = 1/2$

So the Horizontal asymptote is $y=1/2$

For the Vertical asymptote, we look at the zeros of the denominator. Set the denominator equal to zero and solve for x.

$2x^2-3x-2 = 0$

$(2x+1)(x-2)=0$

$2x+1=0$ and $x-2=0$

$x=-1/2$ and $x=2$

So your Vertical asymptotes are:
$x=-1/2$ and $x=2$

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For $(x^2+1)/(2x^2-3x-2)$ , how do you find horizontal and vertical asymptotes?

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Science

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Humanities

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For (x^2+1)/(2x^2-3x-2)(x^2+1)/(2x^2-3x-2), how do you find horizontal and vertical asymptotes?

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Explanation:

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For $(x^2+1)/(2x^2-3x-2)$ , how do you find horizontal and vertical asymptotes?