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Graphing Linear Inequalities in Two Variables

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1 Graphing Linear Inequalities in Two Variables
Section 6-6 Graphing Linear Inequalities in Two Variables

2 Linear Inequalities x - 3y ≤ 6 0 ≤ 6 (0) – 3(0) ≤ 6
An example of a linear inequality in two variables is x - 3y ≤ 6. The solution of an inequality in two variables, x and y, is an ordered pair (x, y) that produces a true statement when substituted into the inequality. Which ordered pair is NOT a solution of x - 3y ≤ 6? A. (0,0) B. (6,-1) C. (10, 3) D. (-1,2) Substitute each point into the inequality. If the statement is true then it is a solution. x - 3y ≤ 6 0 ≤ 6 (0) – 3(0) ≤ 6 True, therefore (0,0) is a solution.

3 Solution of Linear Inequalities
Expressions of the type x + 2y ≤ 8 and 3x – y > 6 are called linear inequalities in two variables. A solution of a linear inequality in two variables is an ordered pair (x, y) which makes the inequality true. Example: (1, 3) is a solution to x + 2y ≤ 8 since (1) + 2(3) ≤ 8 7 ≤ 8. (Yes, this is true.) Solution of Linear Inequalities

4 Graph an Inequality in Two Variables
The graph of an inequality in two variables is the set of points that represent all solutions of the inequality. The BOUNDARY LINE of a linear inequality divides the coordinate plane into two HALF-PLANES. Only one half-plane contains the points that represent the solutions to the inequality.

5 Example: The solution set for x + 2y ≤ 8 is the shaded region.
The solution set, or feasible set, of a linear inequality in two variables is the set of all solutions. Example: The solution set for x + 2y ≤ 8 is the shaded region. x y 2 The solution set is a half-plane. It consists of the line x + 2y ≤ 8 and all the points below and to its left. The line is called the boundary line of the half-plane. Some solutions in the solution set are (0,0), (2, -2), and (-4, 2). (6, 4) is not in the solution set! Feasible Set

6 3x – y = 2 x y If the inequality is ≤ or ≥ , the boundary line is solid; its points are solutions. 3x – y < 2 3x – y > 2 Example: The boundary line of the solution set of 3x – y ≥ 2 is solid. Boundary lines

7 If the inequality is < or >, the boundary line is dotted; its points are not solutions.
x y Example: The boundary line of the solution set of x + y < 2 is dotted. Boundary lines

8 Example: For 2x – 3y ≤ 18 graph the boundary line.
A test point can be selected to determine which side of the half-plane to shade. Pick any point that is not on your line. Example: For 2x – 3y ≤ 18 graph the boundary line. x y (0, 0) Use (0, 0) as a test point. 2(0) – 3(0) ≤ 18 0 ≤ 18 Yes/True Shade towards your test point/Include your test point in the shading! The solution set/feasible set, is the set of all solutions in the shaded region. 2 -2 Test Point

9 Graphing an Inequality
To graph the solution set/feasible set for a linear inequality: Step 1. Graph the boundary line. (Remember to check if your line is a dotted line or a solid line.) Step 2. Select a test point, not on the boundary line, and determine if it is a solution. Step 3. Shade a half-plane. Graphing an Inequality

10 Example: Graph an Inequality
Example: Graph the solution set for x – y > 2. Step 1.) Graph the boundary line x – y = 2 as a dotted line. Step 2.) Select a test point not on the line, say (0, 0). x y x – y > 2 (0) – (0) > 2 0 > 2 No/False! (0, 0) (2, 0) (0, -2) Step 3.) Since this is a not a solution, shade in the half-plane not containing (0, 0). Or, shade away from your test point. The solution set/feasible set, is the set of all solutions in the shaded region. Example: Graph an Inequality

11 Step 1.) Graph the solution set for x < - 2.
Solution sets for inequalities with only one variable can be graphed in the same way. Example: Graph the solution set for x < - 2. Step 1.) Graph the solution set for x < - 2. x y 4 - 4 Step 2.) Select a test point not on the line, say (0, 0). x < - 2 0 < - 2 No/False! Step 3.) Since this is a not a solution, shade in the half-plane not containing (0, 0). Or, shade away from your test point. The solution set/feasible set, is the set of all solutions in the shaded region. Inequalities in One Variable

12 Inequalities in One Variable
Example: Graph the solution set for x ≥ 4. Step 1.) Graph the solution set for x ≥ 4. x y 4 - 4 Step 2.) Select a test point not on the line, say (0, 0). x ≥ 4 (0) ≥ 4 No/False! Since this is a not a solution, shade in the half-plane not containing (0, 0). Or, shade away from your test point. The solution set/feasible set, is the set of all solutions in the shaded region. Inequalities in One Variable

13 Graph the inequality y > 4x - 3.
Graph an Inequality Graph the inequality y > 4x - 3. STEP 2 STEP 3 STEP 1 Shade the half-plane that contains the point (0,0), because (0,0) is a solution to the inequality. Graph the equation Test (0,0) in the original inequality.

14 Graph the inequality x + 2y ≤ 0.
Graph an Inequality Graph the inequality x + 2y ≤ 0. STEP 2 STEP 3 STEP 1 Shade the half-plane that does not contain the point (1,0), because (1,0) is not a solution to the inequality. Graph the equation Test (1,0) in the original inequality.

15 Graph the inequality -1 ≤ x + y.
Graph an Inequality Graph the inequality -1 ≤ x + y. STEP 2 STEP 3 STEP 1 Shade the half-plane that contains the point (0,0), because (0,0) is a solution to the inequality. Graph the equation Test (0,0) in the original inequality.

16 Graph the inequality x – 3y ≤ 12.
Graph an Inequality Graph the inequality x – 3y ≤ 12. STEP 2 STEP 3 STEP 1 Shade the half-plane that contains the point (0,0), because (0,0) is a solution to the inequality. Graph the equation Test (0,0) in the original inequality.

17 Graph the inequality y ≥ -3.
Graph an Inequality Graph the inequality y ≥ -3. STEP 2 STEP 3 STEP 1 Shade the half-plane that contains the point (0,0), because (0,0) is a solution to the inequality. Graph the equation Test (0,0) in the original inequality. Use only the y-coordinate, because the inequality does not have a x-variable.

18 Graph the inequality x ≤ -1.
Graph an Inequality Graph the inequality x ≤ -1. STEP 2 STEP 3 STEP 1 Shade the half-plane that does not contain the point (0,0), because (0,0) is not a solution to the inequality. Graph the equation Test (0,0) in the original inequality. Use only the y-coordinate, because the inequality does not have a x-variable.

19 Writing an Inequality Write an inequality for each graph. a b.

20 Writing an Inequality Write an inequality for each graph. c d.

21 Assignment Study Guide 6-6 (In-Class)
Skills Practice/Practice Worksheet 6-6 Chapter 6 Test on

22 Application d. Suppose your budget for a party allows you to spend no more than $12 on peanuts and cashews. Peanuts cost $2/lb and cashews cost $4/lb. Find three possible combinations of peanuts and cashews you can buy. x = number of pounds of peanuts y = number of pounds of cashews 2x + 4y ≤ 12

23 Solution of a System of Linear Inequalities
A solution of a system of linear inequalities is an ordered pair that satisfies all the inequalities. Example: Find a solution for the system (5, 4) is a solution of x + y > 8. (5, 4) is also a solution of 2x – y ≤ 7. Since (5, 4) is a solution of both inequalities in the system, it is a solution of the system. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. Solution of a System of Linear Inequalities

24 2. Shade in the intersection of the half-planes.
The set of all solutions of a system of linear inequalities is called its solution set. To graph the solution set for a system of linear inequalities in two variables: 1. Shade the half-plane of solutions for each inequality in the system. 2. Shade in the intersection of the half-planes. Solution Set

25 Example: Graph a System of Two Inequalities
Example: Graph the solution set for the system x y Graph the solution set for x + y > 8. Graph the solution set for 2x – y ≤ 7. 2 The intersection of these two half-planes is the wedge-shaped region at the top of the diagram. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. Example: Graph a System of Two Inequalities

26 Example: Graph a System of Two Inequalities
Example: Graph the solution set for the system of linear inequalities: x y -2x + 3y ≥ 6 Graph the two half-planes. 2 The two half-planes do not intersect; therefore, the solution set is the empty set. 2x – 3y ≥ 12 Copyright © by Houghton Mifflin Company, Inc. All rights reserved. Example: Graph a System of Two Inequalities

27 Example: Graph a System of Four Inequalities
Example: Graph the solution set for the linear system. (2) x y 4 - 4 (1) (3) (4) Graph each linear inequality. The solution set is the intersection of all the half-planes. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. Example: Graph a System of Four Inequalities


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