3.6 Rational functions (Page 10/16)

Page 10 / 16

Key equations

Rational Function	$f (x) = \frac{P (x)}{Q (x)} = \frac{a_{p} x^{p} + a_{p - 1} x^{p - 1} + ... + a_{1} x + a_{0}}{b_{q} x^{q} + b_{q - 1} x^{q - 1} + ... + b_{1} x + b_{0}}, Q (x) \neq 0$

Key concepts

We can use arrow notation to describe local behavior and end behavior of the toolkit functions $f (x) = \frac{1}{x}$ and $f (x) = \frac{1}{x^{2}} .$ See [link] .
A function that levels off at a horizontal value has a horizontal asymptote. A function can have more than one vertical asymptote. See [link] .
Application problems involving rates and concentrations often involve rational functions. See [link] .
The domain of a rational function includes all real numbers except those that cause the denominator to equal zero. See [link] .
The vertical asymptotes of a rational function will occur where the denominator of the function is equal to zero and the numerator is not zero. See [link] .
A removable discontinuity might occur in the graph of a rational function if an input causes both numerator and denominator to be zero. See [link] .
A rational function’s end behavior will mirror that of the ratio of the leading terms of the numerator and denominator functions. See [link] , [link] , [link] , and [link] .
Graph rational functions by finding the intercepts, behavior at the intercepts and asymptotes, and end behavior. See [link] .
If a rational function has x -intercepts at $x = x_{1}, x_{2}, \dots, x_{n},$ vertical asymptotes at $x = v_{1}, v_{2}, \dots, v_{m},$ and no $x_{i} = any v_{j},$ then the function can be written in the form
$\begin{array}{l} \begin{array}{l} f (x) = a \frac{{(x - x_{1})}^{p_{1}} {(x - x_{2})}^{p_{2}} \dots {(x - x_{n})}^{p_{n}}}{{(x - v_{1})}^{q_{1}} {(x - v_{2})}^{q_{2}} \dots {(x - v_{m})}^{q_{n}}} \end{array} \end{array}$

See [link] .

Section exercises

Verbal

What is the fundamental difference in the algebraic representation of a polynomial function and a rational function?

The rational function will be represented by a quotient of polynomial functions.

What is the fundamental difference in the graphs of polynomial functions and rational functions?

If the graph of a rational function has a removable discontinuity, what must be true of the functional rule?

The numerator and denominator must have a common factor.

Can a graph of a rational function have no vertical asymptote? If so, how?

Can a graph of a rational function have no x -intercepts? If so, how?

Yes. The numerator of the formula of the functions would have only complex roots and/or factors common to both the numerator and denominator.

Algebraic

For the following exercises, find the domain of the rational functions.

$f (x) = \frac{x - 1}{x + 2}$

$f (x) = \frac{x + 1}{x^{2} - 1}$

$All reals x \neq - 1, 1$

$f (x) = \frac{x^{2} + 4}{x^{2} - 2 x - 8}$

$f (x) = \frac{x^{2} + 4 x - 3}{x^{4} - 5 x^{2} + 4}$

$All reals x \neq - 1, - 2, 1, 2$

For the following exercises, find the domain, vertical asymptotes, and horizontal asymptotes of the functions.

$f (x) = \frac{4}{x - 1}$

$f (x) = \frac{2}{5 x + 2}$

V.A. at $x = - \frac{2}{5};$ H.A. at $y = 0;$ Domain is all reals $x \neq - \frac{2}{5}$

$f (x) = \frac{x}{x^{2} - 9}$

$f (x) = \frac{x}{x^{2} + 5 x - 36}$

V.A. at $x = 4, - 9;$ H.A. at $y = 0;$ Domain is all reals $x \neq 4, - 9$

$f (x) = \frac{3 + x}{x^{3} - 27}$

$f (x) = \frac{3 x - 4}{x^{3} - 16 x}$

V.A. at $x = 0, 4, - 4;$ H.A. at $y = 0;$ Domain is all reals $x \neq 0, 4, - 4$

$f (x) = \frac{x^{2} - 1}{x^{3} + 9 x^{2} + 14 x}$

$f (x) = \frac{x + 5}{x^{2} - 25}$

V.A. at $x = - 5;$ H.A. at $y = 0;$ Domain is all reals $x \neq 5, - 5$

$f (x) = \frac{x - 4}{x - 6}$

$f (x) = \frac{4 - 2 x}{3 x - 1}$

V.A. at $x = \frac{1}{3};$ H.A. at $y = - \frac{2}{3};$ Domain is all reals $x \neq \frac{1}{3} .$

For the following exercises, find the x - and y -intercepts for the functions.

$f (x) = \frac{x + 5}{x^{2} + 4}$

$f (x) = \frac{x}{x^{2} - x}$

none

$f (x) = \frac{x^{2} + 8 x + 7}{x^{2} + 11 x + 30}$

$f (x) = \frac{x^{2} + x + 6}{x^{2} - 10 x + 24}$

$x -intercepts none, y -intercept (0, \frac{1}{4})$

$f (x) = \frac{94 - 2 x^{2}}{3 x^{2} - 12}$

For the following exercises, describe the local and end behavior of the functions.

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Source: OpenStax, Essential precalculus, part 1. OpenStax CNX. Aug 26, 2015 Download for free at http://legacy.cnx.org/content/col11871/1.1

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