1.4 Solving Inequalities I can: 1.Graph inequalities 2.Solve inequalities
To Start: As with an equation, the solutions of an inequality are the ______________ that make it true. An equation, such as 2x = -10 has only one solution, x = -5. On the other hand, the inequality 2x> -10 is true for many values of x. Let’s solve that inequality and see what numbers do make it true. Example: Solve 2x > -10
Summary: Properties of Inequalities Let a, b, and c represent real numbers. Addition Property: Subtraction Property: Multiplication Property: Division Property:
Solving Inequalities ● Solving inequalities follows the same procedures as solving equations. ● There are a few special things to consider with inequalities: ● We need to look carefully at the inequality sign. ● We also need to graph the solution set.
Review of Inequality Signs > greater than < less than greater than or equal less than or equal
How to graph the solutions > Graph any number greater than... open circle, line to the right < Graph any number less than... open circle, line to the left Graph any number greater than or equal to... closed circle, line to the right Graph any number less than or equal to... closed circle, line to the left
Solve the inequality: x + 4 < x < 3 ● Subtract 4 from each side. ● Keep the same inequality sign. ● Graph the solution. Open circle, line to the left. 30
There is one special case. ● Sometimes you may have to reverse the direction of the inequality sign!! ● That only happens when you multiply or divide both sides of the inequality by a negative number.
Example: Solve: -3y + 5 > y > y < -6 ● Subtract 5 from each side. ● Divide each side by negative 3. ● Reverse the inequality sign. ● Graph the solution. Open circle, line to the left. 0-6
Try these: ● Solve 2x+3>x+5 ● Solve - c - 11>23 ● Solve 3(r-2)<2r+4
Some inequalities have no solution, and some are true for all real numbers. Example 2: Solve and graph each inequality.
Some inequalities have no solution, and some are true for all real numbers. 2.
Try These… 1. 2.