Inequalities More solution sets, and interval notation (1.6)

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Presentation transcript:

Inequalities More solution sets, and interval notation (1.6)

POD Solve for {R}: (2x+3)(x-5)(x+1) 2 = 0 What do you notice about one of the solutions?

POD Solve for {R}: (2x+3)(x-5)(x+1) 2 = 0 x = -2/3, 5, -1 What do you notice about one of the solutions? One solution occurs twice– we say it has a multiplicity of two.

Last time it was all about… … equalities. Today we talk about inequalities, but the idea is the same– we still want the values that make the statement true. What do these solution sets look like on a number line? How would they look using interval notation?

Last time it was all about… … equalities. Today we talk about inequalities, but the idea is the same– we still want the values that make the statement true. The bottom line is interval notation. Notice the open and closed brackets. What do these solution sets look like on a number line?

Trick #1 for inequalities What happens when we multiply or divide by a negative number? Give the answer in interval notation.

Trick #1 for inequalities What happens when we multiply or divide by a negative number? Give the answer in interval notation.

Trick #2 for inequalities What about a combined inequality?

Trick #2 for inequalities What about a combined inequality?

Trick #3 for inequalities What about absolute value inequalities?

Trick #3 for inequalities What about absolute value inequalities? There are two parts— set them up by keeping the sign and direction in place for one answer, then changing the sign and direction for the second answer. Careful! The last one is tricky!