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7.6 Solve Rational Inequalities

3 min read•june 25, 2024

Rational inequalities involve fractions with polynomials in the and . Solving them requires finding , identifying , and determining the sign of the function in different intervals.

Graphing solutions on a helps visualize the results. Open circles represent strict inequalities, closed circles show inclusive inequalities, and shading indicates where the inequality is satisfied. These skills are crucial for analyzing rational functions.

Solving Rational Inequalities

Solving rational inequalities

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Rational inequalities contain fractions with polynomials in the numerator and denominator (e.g., $\frac{x+2}{x-1} [>](https://www.fiveableKeyTerm:>) 3$ )
Solve rational inequalities using these steps:
1. Find critical points by setting numerator and denominator equal to zero and solving for x
2. Identify undefined points where the denominator equals zero, as the is undefined at these x-values ()
3. Determine the sign (positive or negative) of the rational function in each created by the critical points and undefined points
  - Test a point from each interval in the original inequality to determine the sign (e.g., if $x [<](https://www.fiveableKeyTerm:<) 2$ , test $x = 0$ )
4. Combine the intervals where the inequality is satisfied to find the (e.g., $x < -2$ or $x > 1$ )

Graphing inequality solutions

Represent the solution set of a on a number line
- Use an (○) for strict inequalities ( $<$ or $>$ )
- Use a (●) for inclusive inequalities ( $\leq$ or $\geq$ )
- Shade the number line to indicate the intervals where the inequality is satisfied
  - Shade to the right for $x > a$ or $x \geq a$ (e.g., $x > 3$ shades from 3 to positive infinity)
  - Shade to the left for $x < a$ or $x \leq a$ (e.g., $x \leq -1$ shades from negative infinity to -1)
- If the solution set consists of multiple intervals, shade each interval separately (e.g., $x < -2$ or $x > 1$ shades from negative infinity to -2 and from 1 to positive infinity)

Comparing rational functions to values

Determine when a rational function is greater than, less than, or equal to a given value $k$ $k$ :
1. Set up an inequality comparing the rational function to $k$ $k$
  - If $f(x)$ is the rational function, set up $f(x) > k$ , $f(x) < k$ , or $f(x) = k$ (e.g., if $f(x) = \frac{x+1}{x-2}$ , set up $\frac{x+1}{x-2} > 5$ )
2. Solve the resulting rational inequality using the method described earlier
  - Find critical points and undefined points
  - Determine the sign of the function in each interval
  - Identify the intervals where the inequality is satisfied (e.g., $x < -6$ or $x > 2$ )
3. The solution set represents the x-values for which the rational function satisfies the given condition (greater than, less than, or equal to $k$ )

Properties of Rational Functions

: The set of all possible input values (x-values) for which the rational function is defined
: The set of all possible output values (y-values) that the rational function can produce
: A rational function is continuous at all points in its domain, except at vertical asymptotes

Key Terms to Review (29)

<: The less than symbol, <, is a mathematical operator that indicates a relationship where one value is smaller than another value. It is used in various contexts within algebra to represent inequalities, where the solution set includes all values that satisfy the inequality condition.

>: The greater than symbol (>) is a mathematical operator used to compare two values and indicate that one value is larger than the other. It is a fundamental concept in algebra that is applied in various contexts, including solving linear inequalities, compound inequalities, absolute value inequalities, graphing linear inequalities in two variables, graphing systems of linear inequalities, solving rational inequalities, and solving quadratic inequalities.

≤ (Less Than or Equal To): The symbol '≤' represents the mathematical relationship of 'less than or equal to'. It is used to compare two values and indicate that one value is less than or equal to the other value. This key term is essential in understanding and working with various mathematical concepts, including integers, linear inequalities, compound inequalities, absolute value inequalities, linear inequalities in two variables, systems of linear inequalities, rational inequalities, and quadratic inequalities.

Asymptotes: Asymptotes are imaginary lines that a graph approaches but never touches. They provide important information about the behavior of a function, particularly for rational functions and hyperbolas.

Closed Circle: A closed circle is a graphical representation of the solution set for an inequality, where the endpoints of the solution set are included in the solution. This concept is particularly relevant in the context of solving linear inequalities and rational inequalities.

Closed Interval: A closed interval is a set of real numbers that includes both the lower and upper bounds. It is denoted by square brackets and represents a range of values that are greater than or equal to the lower bound and less than or equal to the upper bound.

Continuity: Continuity is a fundamental concept in mathematics that describes the smooth and uninterrupted behavior of a function. It is a crucial property that ensures the function can be graphed and analyzed without any sudden jumps or breaks in the curve.

Critical Points: Critical points refer to the specific values of a function where the derivative of the function is equal to zero or undefined. These points are crucial in analyzing the behavior and characteristics of a function, such as local maxima, local minima, and points of inflection.

Denominator: The denominator is the bottom number in a fraction, which represents the number of equal parts into which the whole has been divided. It plays a crucial role in various mathematical operations and concepts, including fractions, exponents, rational expressions, and rational inequalities.

Domain: The domain of a function refers to the set of all possible input values for that function. It represents the range of values that the independent variable can take on, and it determines the set of values for which the function is defined.

Greater Than or Equal To (≥): The symbol ≥ is a mathematical operator that represents the relationship where one value is greater than or equal to another value. It is used to compare quantities and express inequalities, indicating that the left-hand side is either greater than or equal to the right-hand side.

Inclusive Inequality: Inclusive inequality refers to the concept of representing inequalities where the solution set includes the boundary values. This term is particularly relevant in the context of solving rational inequalities, as it helps determine the range of values that satisfy the given inequality.

Interval: An interval is a set of real numbers that fall between two given values. It represents a range or a continuous segment on the number line. Intervals are a fundamental concept in mathematics, particularly in the context of solving rational inequalities.

Linear Rational Inequality: A linear rational inequality is a type of inequality that involves a rational function, where the numerator and denominator are both linear expressions. These inequalities are used to solve problems involving the comparison of two rational expressions.

Number Line: The number line is a visual representation of the set of real numbers, extending infinitely in both the positive and negative directions. It serves as a fundamental tool in understanding and working with various mathematical concepts, including integers, linear inequalities, compound inequalities, rational inequalities, and quadratic inequalities.

Numerator: The numerator is the part of a fraction that represents the number of equal parts being considered. It is the number above the fraction bar that indicates the quantity or number of units being referred to.

Open Circle: An open circle is a mathematical symbol used to represent a strict inequality in the context of linear and rational inequalities. It denotes that the solution set does not include the boundary point, indicating that the inequality is strictly less than or strictly greater than the given value.

Open Interval: An open interval is a set of real numbers that includes all the values between two specified endpoints, but does not include the endpoints themselves. It is denoted using parentheses to indicate the exclusion of the endpoints.

Quadratic Rational Inequality: A quadratic rational inequality is an inequality that involves a rational expression with a quadratic function in the numerator or denominator. These types of inequalities require a multi-step process to solve, often involving factoring, finding critical points, and testing intervals to determine the solution set.

Range: The range of a set of data or a function is the difference between the largest and smallest values in the set. It represents the spread or variation within the data and is a measure of the dispersion or variability of the values.

Rational Function: A rational function is a function that can be expressed as the ratio of two polynomial functions. It is a function that can be written in the form $f(x) = \frac{P(x)}{Q(x)}$, where $P(x)$ and $Q(x)$ are polynomial functions and $Q(x)$ is not equal to zero.

Rational Inequality: A rational inequality is an inequality that involves a rational expression, which is a fraction with a polynomial in the numerator and a non-zero polynomial in the denominator. Solving rational inequalities requires analyzing the sign of the rational expression over the given interval.

Sign Analysis: Sign analysis is the process of examining the sign or direction of a function or inequality to determine its behavior and characteristics. It is a fundamental tool used in solving rational inequalities and quadratic inequalities, as the sign of the expression can provide valuable insights about the solution set.

Solution Set: The solution set is the set of all values of the variable(s) that satisfy an equation, inequality, or system of equations or inequalities. It represents the collection of all possible solutions to a given mathematical problem.

Strict Inequality: A strict inequality is a mathematical relationship between two values where one value is strictly greater than or strictly less than the other value. This concept is crucial in understanding and solving various types of inequalities, including absolute value inequalities, rational inequalities, and quadratic inequalities.

Test Intervals: Test intervals, in the context of solving rational inequalities, refer to the intervals on the number line where the solution to the inequality is valid. These intervals represent the range of values for the variable that satisfy the given rational inequality.

Undefined Points: Undefined points refer to the points where a rational inequality or function is not defined, typically due to the presence of a variable in the denominator. These points are crucial in understanding the behavior and solutions of rational inequalities.

Union: In mathematics, a union refers to the combination of two or more sets that includes all the elements from each set without duplication. This concept is crucial when dealing with inequalities, as it helps identify the total range of solutions that satisfy at least one of the conditions, allowing for a comprehensive understanding of overlapping and distinct solution sets.

Zero-Factor Property: The zero-factor property states that if the product of two or more factors is equal to zero, then at least one of the factors must be equal to zero. This property is particularly important in solving rational inequalities, as it helps determine the critical points where the inequality may change its behavior.

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Practice QuizGlossary

Practice Quiz Glossary

7.6 Solve Rational Inequalities

Solving Rational Inequalities

Solving rational inequalities

Top images from around the web for Solving rational inequalities

Top images from around the web for Solving rational inequalities

Graphing inequality solutions

Comparing rational functions to values

Properties of Rational Functions

Key Terms to Review (29)

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AP® and SAT® are trademarks registered by the College Board, which is not affiliated with, and does not endorse this website.

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