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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.
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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.
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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:
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FHS Equations and Inequalities 4 | | | | | | | -4 -3 -2 -1 0 1 2 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.
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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. | | | | | | | | | | -3 -2 -1 0 1 2 3 4 5 6 Combine these into one.
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