SYSTEMS OF LINEAR INEQUALITIES

Slides:

Advertisements

Similar presentations

Graphing Linear Inequalities in Two Variables

Advertisements

Entry Task Solve for y 1) 2x + -3y < 12 2) x > ½ y - 7.

Warm Up # 1 The perimeter of a rectangle is 32. The length is 1 more than twice the width. What are the dimensions of the rectangle? Solve the system:

Warm Up Solve the following system of equations using any method:

Look at the two graphs. Determine the following: A.The equation of each line. B.How the graphs are similar. C.How the graphs are different. A.The equation.

Lesson 7.5, page 755 Systems of Inequalities Objective: To graph linear inequalities, systems of inequalities, and solve linear programming problems.

Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

{ Graphing Linear Equations And Inequalities.  Create an x y chart.  Pick the x’s that you would like to use.  You must pick at least three, you may.

Systems of Linear Inequalities.  Two or more linear inequalities together form a system of linear inequalities.

2.8 Graph Linear Inequalities in Two Variable. Types of Two Variable Inequalities: Linear Inequality: y < mx + b Ax + By ≥ C Absolute Value Inequality:

Graphing Method Example: Graph the inequalities on the same plane: x + y 4. Before we graph them simultaneously, let’s look at them separately. Graph.

3.3 Solving Systems of Inequalities by Graphing Pg. 123 Standards addressed: 2.1 & 2.2.

Graphing and Solving Inequalities In Two Variables = Medina 1/06/09 ( Revised:1/3/10 DM)

Essential Question: When graphing an inequality, how do you determine whether to include the boundary in the graph and which region to shade?

Systems of Inequalities by Tammy Wallace Varina High School.

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

Algebra 2 Graphing Linear Inequalities in Two Variables.

SYSTEMS OF LINEAR INEQUALITIES Solving Linear Systems of Inequalities by Graphing.

GraphingSubstitutionEliminationNon-LinearInequalities

Warm Up Solve by graphing y = x + 3 2x + y = 4

SYSTEMS OF LINEAR INEQUALITIES Solving Linear Systems of Inequalities by Graphing.

Chapter 4 Section 4.6 Solving Systems of Linear Inequalities.

Name: Date: Topic: Systems of Linear Inequalities Essential Question : How can you determine what is the solution to a Systems of Linear Inequalities and.

SILENTLY Algebra 1 19 April 2011 SILENTLY Homework due next class: pg. 318: 8, 14 Warm up: Solve each inequality for y: 1) 84x + 7y > 70 2) 4.8x – 0.12y.

GRAPHING LINEAR INEQUALITIES How to Determine the Type of Line to Draw Inequality Symbol Type of Line > or or

Graphing Inequality Systems

3.4 Solving Systems of Linear Inequalities ©2001 by R. Villar All Rights Reserved.

Unit 3 Lesson 17 Graphing Inequalities Solve for y (make sure the y is on left) Decide if the line is dotted or solid Use the y-intercept and slope Shade.

Graphing Linear Inequalities in Two Variables Objective: Graph all of the solutions to a linear inequality.

Graphing Linear Inequalities Review: One variable inequality and graph 1.) x > 2 2.) x

SOLVING LINEAR SYSTEMS by GRAPHING ADV133 Put in slope-intercept form: y = mx + b. y = 4x – 1 y = –x + 4 The solution to a system of linear equations is.

9.5 Inequalities in Two Variables  Two Key Terms  Two Objectives.

Graphing Linear Inequations y > y is greater than  all points above the line are a solution y < y is less than  all points below the line are a solution.

Systems of Inequalities Essential Question: How do we solve systems of inequalities by graphing? Standard: MCC9-12.A.REI.12.

Essential Question: How do you find the solution to a system of linear inequalities? Students will write a summary how to graph systems of linear inequalities.

Review Graphing of Linear Inequality y < -3x - 1.

SYSTEM OF INEQUALITIES Graphing. Linear Inequalities and System of Linear Inequalities  Make sure both inequalities are solved for y.  Graph like an.

SYSTEMS OF LINEAR INEQUALITIES

Entry Task Solve for y 1) 2x + -3y < 12 2) x > ½ y - 7.

Graphing Linear Inequalities

Bell Work Solve the system of equations using elimination. 3x – 4y = 10 3y = 2x - 7.

SYSTEMS OF LINEAR INEQUALITIES

6-6 Systems of Linear Inequalities

Objectives: Learn to solve Linear Inequalities 3x + 2y > 6 y > 0

5.6 Solving Linear Systems of Inequalities by Graphing

Graphing Linear Inequalities

Learning Target I can solve systems of linear inequalities by graphing.

SYSTEMS OF LINEAR INEQUALITIES

Graphing Linear Inequalities.

Math3H - Unit 1 Day 2 SYSTEMS OF LINEAR INEQUALITIES

2.7 Two-variable inequalities (linear) 3.3 Systems of Inequalities

Math3H - Unit 2 Day 2 SYSTEMS OF LINEAR INEQUALITIES

5-6 Graphing Linear Inequalities in Two Variables

Solutions of Equations and Inequalities

Graphing Systems of Linear Inequalities

Objective Graph and solve linear inequalities in two variables.

UNIT 6 REVIEW FOR GRAPHING INEQUALITIES TEST

7.6 Graphing Systems of Linear Inequalities

SYSTEMS OF LINEAR INEQUALITIES

Algebra 1B – Name: _________________________

SYSTEMS OF LINEAR INEQUALITIES

SYSTEMS OF LINEAR INEQUALITIES

SYSTEMS OF LINEAR INEQUALITIES

SYSTEMS OF LINEAR INEQUALITIES

Warm-Up #8 Solve for y: 2y – x = 4 5 – y = 6x y – 2x = 6.

SYSTEMS OF LINEAR INEQUALITIES

SYSTEMS OF LINEAR INEQUALITIES

6-6 Systems of Linear Inequalities

Presentation transcript:

SYSTEMS OF LINEAR INEQUALITIES Solving Linear Systems of Inequalities by Graphing

Solving Systems of Linear Inequalities We show the solution to a system of linear inequalities by graphing them. This process is easier if we put the inequalities into Slope-Intercept Form, y = mx + b.

Solving Systems of Linear Inequalities Graph the line using the y-intercept & slope. If the inequality is < or >, make the lines dotted. If the inequality is < or >, make the lines solid.

Solving Systems of Linear Inequalities The solution also includes points not on the line, so you need to shade the region of the graph: above the line for ‘y >’ or ‘y ’. below the line for ‘y <’ or ‘y ≤’.

Solving Systems of Linear Inequalities Example: a: 3x + 4y > - 4 b: x + 2y < 2 Put in Slope-Intercept Form:

Solving Systems of Linear Inequalities Example, continued: Graph each line, make dotted or solid and shade the correct area. a: dotted shade above b: dotted shade below

Solving Systems of Linear Inequalities a: 3x + 4y > - 4

Solving Systems of Linear Inequalities a: 3x + 4y > - 4 b: x + 2y < 2

Solving Systems of Linear Inequalities a: 3x + 4y > - 4 b: x + 2y < 2 The area between the green arrows is the region of overlap and thus the solution.