Learn on PengiBig Ideas Math, Algebra 1Chapter 2: Solving Linear Inequalities

Lesson 2: Solving Inequalities Using Addition or Subtraction

Property.

Section 1

Equivalent Inequalities

Property

Equivalent inequalities are inequalities that have exactly the same solution set. If two inequalities have identical solutions, they are equivalent regardless of how they appear.

Examples

Section 2

Addition and Subtraction Properties of Inequality

Property

Subtraction Property of Inequality
For any numbers $a$ , $b$ , and $c$ ,
if $a < b$ , then $a - c b$ , then $a - c > b - c$ .

Addition Property of Inequality
For any numbers $a$ , $b$ , and $c$ ,
if $a < b$ , then $a + c b$ , then $a + c > b + c$ .

Examples

To solve $x + 7 \leq 15$ , subtract 7 from both sides. This gives $x \leq 8$ . The solution is all numbers less than or equal to 8, or $(-\infty, 8]$ .

Section 3

Addition and Subtraction Properties of Inequality

Property

To solve an inequality using addition and subtraction:

We can add or subtract the same quantity on both sides.
The direction of the inequality sign remains unchanged when adding or subtracting.

Examples

Lesson overview

Expand to review the lesson summary and core properties.

Expand

Section 1

Equivalent Inequalities

Property

Equivalent inequalities are inequalities that have exactly the same solution set. If two inequalities have identical solutions, they are equivalent regardless of how they appear.

Examples

Section 2

Addition and Subtraction Properties of Inequality

Property

Subtraction Property of Inequality
For any numbers $a$ , $b$ , and $c$ ,
if $a < b$ , then $a - c b$ , then $a - c > b - c$ .

Addition Property of Inequality
For any numbers $a$ , $b$ , and $c$ ,
if $a < b$ , then $a + c b$ , then $a + c > b + c$ .

Examples

To solve $x + 7 \leq 15$ , subtract 7 from both sides. This gives $x \leq 8$ . The solution is all numbers less than or equal to 8, or $(-\infty, 8]$ .

Section 3

Addition and Subtraction Properties of Inequality

Property

To solve an inequality using addition and subtraction:

We can add or subtract the same quantity on both sides.
The direction of the inequality sign remains unchanged when adding or subtracting.

Examples

Overview

Lesson overview

Review the lesson summary and core properties without leaving the current page.

Overview

Section 1

Equivalent Inequalities

Property

Equivalent inequalities are inequalities that have exactly the same solution set. If two inequalities have identical solutions, they are equivalent regardless of how they appear.

Examples

Section 2

Addition and Subtraction Properties of Inequality

Property

Subtraction Property of Inequality
For any numbers $a$ , $b$ , and $c$ ,
if $a < b$ , then $a - c b$ , then $a - c > b - c$ .

Addition Property of Inequality
For any numbers $a$ , $b$ , and $c$ ,
if $a < b$ , then $a + c b$ , then $a + c > b + c$ .

Examples

To solve $x + 7 \leq 15$ , subtract 7 from both sides. This gives $x \leq 8$ . The solution is all numbers less than or equal to 8, or $(-\infty, 8]$ .

Section 3

Addition and Subtraction Properties of Inequality

Property

To solve an inequality using addition and subtraction:

We can add or subtract the same quantity on both sides.
The direction of the inequality sign remains unchanged when adding or subtracting.