How do you find the horizontal asymptote for $y = \frac{13 x}{x + 34}$ $y=(13x)/(x+34)$ ?

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How do you find the horizontal asymptote for $y = \frac{13 x}{x + 34}$ $y=(13x)/(x+34)$ ?

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Answer 1 · 2015-12-07T23:19:49

Find $lim_(x->+-oo) (13x)/(x+34) = 13$ hence asymptote $y=13$

Explanation:

One way is to divide both numerator and denominator by $x$ and look at the limit as $x->+-oo$

$f(x) = (13x)/(x+34) = 13/(1+34/x)$

So $lim_(x->oo) f(x) = 13/(1+0) = 13$

and $lim_(x->-oo) f(x) = 13/(1+0) = 13$

So the horizontal asymptote is $y = 13$

In general if $f(x) = (p(x))/(q(x))$ for some polynomials $p(x)$ and $q(x)$ of the same degree, then $f(x)$ will have a horizontal asymptote equal to the quotient of the leading coefficients.

For example:

$lim_(x->oo) (3x^2+4x-5)/(2x^2-11x+1)=lim_(x->oo) (3+4/x-5/(x^2))/(2-11/x+1/(x^2)) = 3/2$

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How do you find the horizontal asymptote for $y = \frac{13 x}{x + 34}$ $y=(13x)/(x+34)$ ?

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Explanation:

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How do you find the horizontal asymptote for $y = \frac{13 x}{x + 34}$ $y=(13x)/(x+34)$ ?