When we work with inequalities, we can usually treat them similarly to but not exactly as we treat equalities. We can use the addition property and the multiplication property to help us solve them. The one exception is when we multiply or divide by a negative number; doing so reverses the inequality symbol.
A General Note: Properties of Inequalities
[latex]\begin{array}{ll}\text{Addition Property}\hfill& \text{If }a< b,\text{ then }a+c< b+c.\hfill \\ \hfill & \hfill \\ \text{Multiplication Property}\hfill & \text{If }a< b\text{ and }c> 0,\text{ then }ac< bc.\hfill \\ \hfill & \text{If }a< b\text{ and }c< 0,\text{ then }ac> bc.\hfill \end{array}[/latex]
These properties also apply to [latex]a\le b[/latex], [latex]a>b[/latex], and [latex]a\ge b[/latex].
Example 3: Demonstrating the Addition Property
Illustrate the addition property for inequalities by solving each of the following:
a. [latex]x - 15<4[/latex] b. [latex]6\ge x - 1[/latex] c. [latex]x+7>9[/latex]
Solution
The addition property for inequalities states that if an inequality exists, adding or subtracting the same number on both sides does not change the inequality.
a. [latex]\begin{array}{ll}x - 15<4\hfill & \hfill \\ x - 15+15<4+15 \hfill & \text{Add 15 to both sides.}\hfill \\ x<19\hfill & \hfill \end{array}[/latex] b. [latex]\begin{array}{ll}6\ge x - 1\hfill & \hfill \\ 6+1\ge x - 1+1\hfill & \text{Add 1 to both sides}.\hfill \\ 7\ge x\hfill & \hfill \end{array}[/latex] c. [latex]\begin{array}{ll}x+7>9\hfill & \hfill \\ x+7 - 7>9 - 7\hfill & \text{Subtract 7 from both sides}.\hfill \\ x>2\hfill & \hfill \end{array}[/latex]
Try It 3
Solve [latex]3x - 2<1[/latex]. Solution
Example 4: Demonstrating the Multiplication Property
Illustrate the multiplication property for inequalities by solving each of the following:
- [latex]3x<6[/latex]
- [latex]-2x - 1\ge 5[/latex]
- [latex]5-x>10[/latex]
Solution
a. [latex]\begin{array}{l}3x<6\hfill \\ \frac{1}{3}\left(3x\right)<\left(6\right)\frac{1}{3}\hfill \\ x<2\hfill \end{array}[/latex]
Solving Inequalities in One Variable Algebraically
As the examples have shown, we can perform the same operations on both sides of an inequality, just as we do with equations; we combine like terms and perform operations. To solve, we isolate the variable.
Example 5: Solving an Inequality Algebraically
Solve the inequality: [latex]13 - 7x\ge 10x - 4[/latex].
Solution
Solving this inequality is similar to solving an equation up until the last step.
The solution set is given by the interval [latex]\left(-\infty ,1\right][/latex], or all real numbers less than and including 1.
Try It 5
Solve the inequality and write the answer using interval notation: [latex]-x+4<\frac{1}{2}x+1[/latex]. Solution
Example 6: Solving an Inequality with Fractions
Solve the following inequality and write the answer in interval notation: [latex]-\frac{3}{4}x\ge -\frac{5}{8}+\frac{2}{3}x[/latex].
Solution
We begin solving in the same way we do when solving an equation.
The solution set is the interval [latex]\left(-\infty ,\frac{15}{34}\right][/latex].
Try It 6
Solve the inequality and write the answer in interval notation: [latex]-\frac{5}{6}x\le \frac{3}{4}+\frac{8}{3}x[/latex].
Candela Citations
- College Algebra. Authored by: OpenStax College Algebra. Provided by: OpenStax. Located at: http://cnx.org/contents/9b08c294-057f-4201-9f48-5d6ad992740d@3.278:1/Preface. License: CC BY: Attribution