How do you find all the asymptotes for function $f(x)=(1/(x-10))+(1/(x-20))$ ?

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Answer 1 · 2016-03-04T04:19:04

$x=10$ and $x=20$ are two vertical asymptotes

Simplifying $f(x)=1/(x−10)+1/(x−20)$ , we get

$f(x)=((x-20)+(x-10))/((x-20)(x-10))=(2x-30)/((x-20)(x-10))$

As $x=20$ and $x=10$ i.e. $x=10$ and $x=20$ make the denominator zero, these two are two vertical asymptotes.

As degree of numerator is less than that of denominator, there is no other asymptote.

graph{(2x-30)/((x-20)(x-10)) [-10, 30, -5, 5]}

How do you find all the asymptotes for function f(x)=(1/(x-10))+(1/(x-20)) f(x)=(1/(x-10))+(1/(x-20)) ?