What are the asymptote(s) and hole(s), if any, of $f(x) =(x^2-3x+2)/(x-3)$ ?

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What are the asymptote(s) and hole(s), if any, of $f(x) =(x^2-3x+2)/(x-3)$ ?

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Answer 1 · 2017-02-03T06:48:44

Vertical asymptote $x=3$ and oblique / slanting asymptote $y=x$

Explanation:

As $f(x)=(x^2-3x+2)/(x-3)=((x-1)(x-2))/(x-3)$ and as $(x-3)$ in denominator does not cancel out with numeraor, we do not ave a hole.

If $x=3+delta$ as $delta->0$ , $y=((2+delta)(1+delta))/delta$ and as $delta->0$ , $y->oo$ . But if $x=3-delta$ as $delta->0$ , $y=((2-delta)(1-delta))/(-delta)$ and as $delta->0$ , $y->-oo$ .

Hence $x=3$ is a vertical asymptote.

Further $y=(x^2-3x+2)/(x-3)=(x^2-3x)/(x-3)+2/(x-3)$

= $x+2/(x-3)=x+(2/x)/(1-3/x)$

Hence as $x->oo$ , $y->x$ and we have an oblique or slant asymptote $y=x$
graph{(y-(x^2-3x+2)/(x-3))=0 [-17.34, 22.66, -8.4, 11.6]}

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What are the asymptote(s) and hole(s), if any, of $f(x) =(x^2-3x+2)/(x-3)$ ?

1 Answer

Explanation:

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What are the asymptote(s) and hole(s), if any, of f(x) =(x^2-3x+2)/(x-3) f(x) =(x^2-3x+2)/(x-3)?

1 Answer

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What are the asymptote(s) and hole(s), if any, of $f(x) =(x^2-3x+2)/(x-3)$ ?