1. Linear Inequalities in Two Variables Objectives: Solve and graph a linear inequality in two variables..

2. A linear inequality in two variables, x and y, is any inequality that can be written in one of the forms below, where A ≠ 0 and B ≠ 0. Ax + By ≥ C Ax + By > C Ax + By ≤ C Ax + By < C

3. A solution of a linear inequality in two variables, x and y, is an ordered pair (x, y) that satisfies the inequality. The solution to a linear inequality is a region of the coordinate plane and is called a half-plane bounded by a boundary line.

4. Graphing Linear Inequalities 1. Given a linear inequality in two variables, graph its related linear equation. For inequalities involving ≤ or ≥, use a solid boundary line. For inequalities involving, use a dashed boundary line.

5. 2. Shade the appropriate region. For inequalities in the form of y ≤ mx + b or y < mx + b, shade below the boundary line. For inequalities of the form y ≥ mx + b or y > mx + b, shade above the boundary line. For inequalities in the form x ≤ c or x < c, shade to the left of the boundary line. For inequalities in the form x ≥ c or x > c, shade to the right of the boundary line.

6. Ex 1. Graph each linear inequality. a. y < x + 2

7. b. y ≥ -2x + 3

8. * c. y > -2x - 2 Dotted Line

9. d. y ≥ 2x + 5

10. e. -2x –3y ≤ 3

11. f. 3x – 4y ≥ 4 -4y≥-3x + 4 y ≤ ¾ x - 1

12. g. -5x – 2y > 4 -2y > 5x + 4 y < -5/2 x - 2 Dotted Line

13. Ex 3. Graph each linear inequality. x is a vertical line and y is a horizontal line

14. a. x > -2

15. b. y ≤ -1

16. c. x ≤ -2

17. d. y > -1 Dotted Line