Question

How do you find vertical, horizontal and oblique asymptotes for `(x^2-2x-3) /( 2x^2-x-10)`?

Answer 1

vertical asymptotes at `x = -2, 2.5`

horizontal asymptote is `y = 1/2`

Explanation:

`(x^2-2x-3) /( 2x^2-x-10)`

looking at denominator

`2x^2-x-10 = 2 {x^2 - 1/2 x - 5}`

`= 2 {(x+2)(x- 5/2)}` so the denominator is zero at `x = -2, 2.5`

the numerator factorises as `x^2-2x-3 = (x-3)(x+1)` so it is zero at x = -1, 3 thus finite at `x = -2, 2.5`

we can therefore conclude vertical asymptotes at `x = -2, 2.5`

`lim_{x to pm oo} (x^2-2x-3) /( 2x^2-x-10)`

`=lim_{x to pm oo} (1-2/x-3/x^2) /( 2-1/x-10/x^2) = 1/2`

so the horizontal asymptote is `y = 1/2`