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

1 Answer
MeneerNask
Jan 16, 2016

You start by factoring the denominator, which can be written as (x+1)(x-4)

Explanation:

Now the vertical discontinuities are clear, because that's when the denominator becomes zero:
x=-1andx=+4

If we near x=4 from both sides, it will be seen that:
lim_(x->4+) y = lim_(x->4-) y=1/5
So this is a 'repairable' discontinuity, while x=-1 is not.

We can now do the following:
(cancel(x-4))/((x+1)(cancel(x-4))) =1/(x+1)

The horizontal asymptote is when x becomes very large. In this case the whole thing goes to zero.

Answer:
x=-1
y=0
graph{(x-4)/(x^2-3x-4) [-10, 10, -5, 5]}

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