How do I identify the horizontal asymptote of $f(x) = (7x+1)/(2x-9)$ ?

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How do I identify the horizontal asymptote of $f(x) = (7x+1)/(2x-9)$ ?

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Answer 1 · 2018-03-09T09:41:46

We have a horizontal asymptote $y=3.5$

Explanation:

As the degree of polynomial in the numerator is equal to the degree of polynomial in the denominator, there is indeed a horizontal asymptote. We can find this by dividing each term in numerator and denominator by this highest degree and find limit as $x->oo$ . The process is shown below:

Now $lim_(x->oo)(7x+1)/(2x-9)$

= $lim_(x->oo)(7+1/x)/(2-9/x)$

= $7/2$

Hence, we have a horizontal asymptote $y=7/2$ or $y=3.5$

graph{(y-(7x+1)/(2x-9))(y-3.5)=0 [-40.42, 39.58, -17.76, 22.24]}

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How do I identify the horizontal asymptote of $f(x) = (7x+1)/(2x-9)$ ?

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How do I identify the horizontal asymptote of $f(x) = (7x+1)/(2x-9)$ ?