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Aim: How do we solve Compound Inequalities? Do Now: Solve the following inequalities 1. 2x + 3 > 2 2. 5x < 10 How do we put two inequalities together?

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Presentation on theme: "Aim: How do we solve Compound Inequalities? Do Now: Solve the following inequalities 1. 2x + 3 > 2 2. 5x < 10 How do we put two inequalities together?"— Presentation transcript:

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2 Aim: How do we solve Compound Inequalities? Do Now: Solve the following inequalities 1. 2x + 3 > 2 2. 5x < 10 How do we put two inequalities together?

3 Definition A compound inequality consists of two inequalities connected by the word and or the word or. Examples -7 27 x 4 12  x and x  30

4 ● Example: ● This is a conjunction because the two inequality statements are joined by the word “and”. ● You must solve each part of the inequality. ● The graph of the solution of the conjunction is the intersection of the two inequalities. Both conditions of the inequalities must be met. ● In other words, the solution is wherever the two inequalities overlap. ● If the solution does not overlap, there is no solution.

5 “ and’’ Statements can be Written in Two Different Ways ● 1. 8 < m + 6 < 14 ● 2. 8 < m+6 and m+6 < 14 These inequalities can be solved using two methods.

6 Method One Example : 8 < m + 6 < 14 Rewrite the compound inequality using the word “and”, then solve each inequality. 8 < m + 6 and m + 6 < 14 2 < m m < 8 m >2 and m < 8 2 < m < 8 Graph the solution: 8 2

7 Example: 8 < m + 6 < 14 To solve the inequality, isolate the variable by subtracting 6 from all 3 parts. 8 < m + 6 < 14 -6 -6 -6 2 < m < 8 Graph the solution. 8 2 Method Two

8 ● Example: ● This is a disjunction because the two inequality statements are joined by the word “or”. ● You must solve each part of the inequality. ● The graph of the solution of the disjunction is the union of the two inequalities. Only one condition of the inequality must be met. ● In other words, the solution will include each of the graphed lines. The graphs can go in opposite directions or towards each other, thus overlapping. ● If the inequalities do overlap, the solution is all reals. Review of the Steps to Solve a Compound Inequality:

9 ‘or’ Statements Example: x - 1 > 2 or x + 3 < -1 x > 3 x < -4 x 3 Graph the solution. 3 -4

10 Solve and graph the compound inequality. and -7 0 4

11 Solve and graph. -3 0 1

12 Solve and graph. -2 0 10

13 Solve and graph the compound inequality. or 0 5 10

14 Solve and graph the compound inequality. or -7 0 12

15 Number Line Graphs of Inequalities IntersectionsUnions x < 5 x < 3 0 1 2 3 4 5 6 { x : x < 3 }{ x : x < 5 } x 3 0 1 2 3 4 5 6 { x : 3 < x < 5 } x 3 0 1 2 3 4 5 6 { x : x = Any Real Number }

16 x > 5 x < 3 0 1 2 3 4 5 6 { }{ x : x 5 } x > 5 x > 3 0 1 2 3 4 5 6 { x : x > 5 } x > 5 x > 3 0 1 2 3 4 5 6 { x : x > 3 } IntersectionsUnions Number Line Graphs of Inequalities

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