Rational Inequalities

Rational inequalities can be solved much like polynomial inequalities.

Learning Objective

Solve for the zeros of a rational inequality to find its solution

Key Points

First factor the numerator and denominator polynomial to reveal the zeros in each.
Substitute $x$ with a zero (root) to determine whether the rational function is positive or negative to the right of that point. Repeat for all zeros.
The intervals that satisfy the inequality symbol will be the answer. Note that for any $\geq$ or $\leq$ , the interval will only be closed to include the zero if the zero is found in the numerator. If the zero is found in the denominator, that point is undefined, and cannot be included in the solution.

Terms

zero
Also known as a root, a zero is an $x$ value at which the function of $x$ is equal to zero.
inequality
A statement that of two quantities one is specifically less than or greater than another. Symbols: $<$ or $\leq$ or $>$ or $\geq$ , as appropriate.

Full Text

Solving Rational Inequalities

As with solving polynomial inequalities, the first step to solving rational inequalities is to find the zeros. Because a rational expression consists of the ratio of two polynomials, the zeroes for both polynomials will be needed.

The zeros in the numerator are $x$ -values at which the rational inequality crosses from negative to positive or from positive to negative. The zeros in the denominator are $x$ -values are at which the rational inequality is undefined, the result of dividing by zero.

Example

Consider the rational inequality:

$\frac{x^2+2x-3}{x^2-4}>0$

This equation can be factored to give:

$\frac{(x+3)(x-1)}{(x+2)(x-2)}\geq 0$

The numerator has zeros at $x=-3$ and $x=1$ . The denominator has zeros at $x=-2$ and $x=2$ .

As $x$ crosses rightward past $-3$ , $(x+3)$ becomes positive. At that same point, $(x-1)$ , $(x+2)$ , and $(x-2)$ are all negative. The product of a positive and three negatives is negative, so the rational expression becomes negative as it crosses $x=-3$ in the rightward direction.

The same process can be used to determine that the rational expression is positive after passing the zero at $x=-2$ , is negative after passing $x=1$ , and is positive after passing $x=2$ .

Thus we can conclude that for $x$ values on the open interval from $-\infty$ to $-3$ , the rational expression is negative. From $-3$ to $-2$ , it is positive; from $-2$ to $1$ it is negative; from $1$ to $2$ it is positive, and from $2$ to $\infty$ it is negative.

Because the inequality is written as $\geq0$ as opposed to $>0$ , we will need to evaluate the $x$ values at zeros to determine whether the function is defined.

In the case of $x=-2$ and $x=2$ , the rational function has a denominator equal to zero and becomes undefined.

In the case of $x=-3$ and $x=1$ , the rational function has a numerator equal to zero, which makes the function overall equal to zero, making it inclusive in the solution.

Thus, the full solution is:

[-3, -2), [1, 2)

Graph of example

Graph of a rational polynomial with the equation $y=\frac{x^2+2x-3}{x^2-4}$ . For $x$ values that are zeros for the numerator polynomial, the rational function overall is equal to zero. For $x$ values that are zeros for the denominator polynomial, the rational function is undefined, with a vertical asymptote forming instead.

[ edit ]

Prev Concept

Polynomial Inequalities

Introduction to Inverse Functions

Next Concept