How do you find the slant asymptote of $\frac{x^{2}}{x - 3}$ $(x^2)/(x-3)$ ?

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How do you find the slant asymptote of $\frac{x^{2}}{x - 3}$ $(x^2)/(x-3)$ ?

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Answer 1 · 2015-12-27T10:15:13

Divide the numerator $x^{2}$ $x^2$ by the denominator $(x - 3)$ $(x-3)$ to obtain a quotient $(x + 3)$ $(x+3)$ and remainder $9$ $9$ . The quotient polynomial is the slant asymptote (also called an oblique asymptote).

Explanation:

You can divide the polynomials in several different ways.

Here's a long division of the coefficients: enter image source here

Note the $0$ $0$ 's in the dividend for the missing $x$ $x$ and constant terms.

Equivalently, you can add and subtract terms to separate out multiples of the divisor like this:

$\frac{x^{2}}{x - 3}$ $x^2/(x-3)$

$= \frac{x^{2} - 3 x + 3 x}{x - 3}$ $=(x^2-3x+3x)/(x-3)$

$= \frac{x (x - 3) + 3 x}{x - 3}$ $=(x(x-3)+3x)/(x-3)$

$= x + \frac{3 x}{x - 3}$ $=x + (3x)/(x-3)$

$= x + \frac{3 x - 9 + 9}{x - 3}$ $=x + (3x-9+9)/(x-3)$

$= x + \frac{3 (x - 3) + 9}{x - 3}$ $=x + (3(x-3)+9)/(x-3)$

$= x + 3 + \frac{9}{x - 3}$ $=x + 3 + 9/(x-3)$

In either case, we find that the quotient is $x + 3$ $x+3$ and the remainder is $9$ $9$ .

As $x \to \pm \infty$ $x->+-oo$ the term $\frac{9}{x - 3} \to 0$ $9/(x-3)->0$ , so the asymptote is:

$y = x + 3$ $y = x+3$

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How do you find the slant asymptote of $\frac{x^{2}}{x - 3}$ $(x^2)/(x-3)$ ?

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Explanation:

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