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So far, we studied simple inequalities, but now we will study compound inequalities .

1. 2. 3. 4. 5. 6. 7. 8. 9. 1-7 Compound Inequalities. So far, we studied simple inequalities, but now we will study compound inequalities. A compound inequality consists of two inequalities connected by the words and or or . For example:.

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So far, we studied simple inequalities, but now we will study compound inequalities .

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  1. 1 2 3 4 5 6 7 8 9 1-7 Compound Inequalities So far, we studied simple inequalities, but now we will study compound inequalities. A compound inequality consists of two inequalities connected by the words and or or. For example: 2 < x< 6 is a compound inequality, read as “2 is less than x, and x is less than or equal to 6.”

  2. 1 2 3 4 5 6 7 8 9 Recall and Vocabulary So far, we studied simple inequalities, but now we will study compound inequalities. A compound inequality consists of two inequalities connected by the words and or or. For example: 2 < x< 6 is a compound inequality, read as “2 is less than x, and x is less than or equal to 6.”

  3. Compound Inequalities – two possible cases: 1) And 2) Or -2 -1 0 1 2 3 4 5 6 Graph all real numbers that are greater than zero and less than or equal to 4. 0 < x< 4 AND cases have the variable in-between two numbers. The graph is therefore in-between two numbers. This is the INTERSECTION of the Individual Solutions.

  4. Compound Inequalities – two cases: And/Or -2 -1 0 1 2 3 4 5 6 Graph all real numbers that are less than –1 or greater than 2. x < -1 or x > 2 OR cases have TWO separate answers and are solved (and graphed) separately (but on the same number line). The graph of this case goes in opposite directions. (This is the Union of the solutions to either inequality)

  5. -2 < 3x – 8 < 10 Original Problem -2 + 8 < 3x – 8 + 8 < 10 + 8 Add 8 6 < 3x< 18 Simplify Divide 3 2 <x< 6 Simplify Solving a Compound Inequality - AND When solving for variables in the “and” case, you isolate the variable in-between the inequality symbols. IMPORTANT – inverse operations apply to the WHOLE THING (that means both sides!).

  6. 0 1 2 3 4 5 6 7 8 Example Solve –2 < 3x – 8 < 10. Graph the solution. 2 <x< 6

  7. Solving Compound Inequalities - Or When solving for variables in the “or” case, you MUST solve AND graph each inequality separately (but on the same number line). Your solution is the union of both the simple parts. Solve: 3x + 1 < 4 OR 2x – 5 > 7 3x + 1 < 4 2x – 5 > 7

  8. Example – OR Case Solve Separately, Graph together Solve 3x + 1 < 4 OR 2x – 5 > 7. Graph the solution.

  9. -5 -4 -3 -2 -1 0 1 2 3 Compound Inequalities When graphing compound inequalities, be sure that the graph satisfies BOTH if it is AND or ONE if it is OR…….inequality. -3 > x OR x > 2

  10. Compound Inequalities – Multiplying or Dividing by negative numbers When you divide or multiply by a negative number, you must reverse BOTH signs if an “and” Case. In the “or” inequalities, only reverse it if it applies to the individual inequality. -2 < -x < 5 2 > x > -5

  11. Examples Solve -2 < -2 – x < 1. Graph the solution.

  12. Examples Solve -2 < -2 – x < 1. Graph the solution. -3 < x < 0 -3 0

  13. Write an inequality that describes each condition. • Water is a nonliquid when the temperature is 32 degrees F or below, or is at least 212 degrees F. t < 32 or t > 212 b. A refrigerator is designed to work on an electric line carrying from 115 to 120 volts. 115 < v < 120

  14. Quick Review Solve inequalities just as you would equations using inverse operations, KNOW WHEN AND WHEN NOT TO FLIP INEQUALITY SIGNS!!! Make sure your graph agrees with the inequalities involved. What does the graph of a compound inequality (AND) case look like? OR Case?

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