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Algebra 2 Traditional. 9-14-2012. Representing the solutions of equalities. You can think of the solution(s) to a given equation as solution sets . Equation Set notation Interval notation 3x+1 = 10 2x + 1 = 2x + 1 3x+4 = 3x – 7. Representing the solutions of equalities.
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Algebra 2 Traditional 9-14-2012
Representing the solutions of equalities • You can think of the solution(s) to a given equation as solution sets. • Equation Set notation Interval notation • 3x+1 = 10 • 2x + 1 = 2x + 1 • 3x+4 = 3x – 7
Representing the solutions of equalities • You can think of the solution(s) to a given equation as solution sets. • Equation Set notation Interval notation • 3x+1 = 10 {3} [3] • 2x + 1 = 2x + 1 {x| x is a real number} • 3x+4 = 3x – 7 { } ( )
Representing the solutions of in-equalities • -2x + 4 > 8 • -2x > 4 • X < -2 • {x| x<-2} (set builder notation) • (-∞, -2) (interval notation) • Number line (Draw below)
Quick final note… • If an inequality includes an “or equal to” part, that part remains even if you need to flip the inequality.
Before the next section: Operations with Sets • Goals: • Know what it means to find the “intersection” and “union” between multiple sets. • Be able to graph unions and intersections on number lines • Define what an empty set, or “null” set is
Union & Intersections Union: the set of elements in one set, another, or both means the union of sets “A” and “B” Intersection: The set of elements that are in two sets at the same time means the intersection of sets “F” and “G”
Null or Empty Sets Sets with no elements in them are called null or empty sets. { } OR
Union and Intersection on the number line • Union • x<4 OR x>0 • Intersection • x<4 AND x>0
Absolute Value Inequalities • Everything you EVER wanted to know about |2x-3|=, <, or > 9!
Group Work/HW • Group Work: • 1.7 1-14 • Homework • 1.7 • 15-43 odd • Test early next week on chapter 1!