Absolute Value Inequalities SEI.3.AC.1SLE 1: Solve, with and without appropriate technology, multi-step equations and inequalities with rational coefficients.

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Presentation transcript:

Absolute Value Inequalities SEI.3.AC.1SLE 1: Solve, with and without appropriate technology, multi-step equations and inequalities with rational coefficients numerically, algebraically and graphically Students will be able to solve absolute value equations and inequalities, and be able to graph them.

FHS Equations and Inequalities 2 Absolute Value Inequalities To solve absolute value inequalities, we convert them to compound inequalities. If we have an inequality like |x| > 5, we convert that to an “or” compound inequality. [Think “great”or”] That would be: x > 5 or x < – 5.

FHS Equations and Inequalities 3 Absolute Value Inequalities If we have an inequality like |x| < 5, we convert that to an “and” compound inequality. [Think less th“and”] That would be: x – 5. We can then combine the two equations to become a single inequality:

FHS Equations and Inequalities 4 | | | | | | | Examples Solve the following inequality and graph your answer on the number line given: Set up two inequalities with an “or” between them. Then we can graph the answer.

FHS Equations and Inequalities 5 Examples Solve the following inequality and graph your answer on the number line given: Set up two inequalities with an “and” between them. Then we can graph the answer. | | | | | | | | | | Combine these into one.