Graphing Linear Inequalities in Two Variables. Graphing Linear Inequalities The graph of a linear...
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Transcript of Graphing Linear Inequalities in Two Variables. Graphing Linear Inequalities The graph of a linear...
Graphing Linear Inequalities in Two
Variables
Graphing Linear Inequalities
The graph of a linear inequality in two variables is the graph of all solutions of the inequality.
GRAPHING A LINEAR INEQUALITY
The graph of a linear inequality in two variables is a half-plane. To graph a linear inequality, follow these steps.
1STEP
2STEP
Graph the boundary line of the inequality. Use a dashed line for < or > and a solid line for or .
To decide which side of the boundary line to shade, test a point not on the boundary line to see whether it is a solution of the inequality. Then shade the appropriate half-plane.
The boundary line of the inequality divides the coordinate plane into two half-planes: a shaded region which contains the points that are solutions of the inequality, and an unshaded region which contains the points that are not.
Graphing an Inequality in Two Variables
Graph x < 2Step 1: Start by graphing the line x = 2
Now what points would give you less
than 2?
Since it has to be x < 2 we shade everything to
the left of the line.
*Notice the line is dashed
Graphing a Linear Inequality
Sketch a graph of y 3 *Notice the line is solid
Some Helpful Hints
•If the sign is > or < the line is dashed
•If the sign is or the line will be solid
When dealing with just x and y.
•If the sign > or the shading either goes up or to the right
•If the sign is < or the shading either goes down or to the left
Graphing Linear Inequalities in One Variable
Graph a) y < –2 and b) x 1 in a coordinate plane.
SOLUTION
Test the point (0, 0). Because (0, 0) is not a solution of the inequality, shade the half-plane below the line.
Graph the boundary line y = –2. Use a dashed line because y < – 2.
Test the point (0, 0). Because (0, 0) is a solution of the inequality, shade the half-plane to the left of the line.
Graph the boundary line x = 1. Use a solid line because x 1.
Using What We KnowSketch a graph of x + y < 3
Step 1: Put into slope intercept form
y <-x + 3
Step 2: Graph the line y = -x + 3
Less than means to the left or below.
To check it, pick any point that is not on the line. (0,0) is an easy point to use.
x + y < 3Substitute 0 for x and y.0 + 0 < 30 < 3 Decide if this is true or false.Is 0 less than 3?If it is true, you shade on the same side of the line of the point you picked. If it is false, you shade on the opposite side of the line where the point you picked lies.
Graphing Linear Inequalities in Two Variables
Graph a) y < 2x and b) 2x – 5y 10.
SOLUTION
Graph the boundary line y = 2x. Use a dashed line because y < 2x.
Test the point (1, 1). Because (1, 1) is a solution of the inequality, shade the half-plane below the line.
Graph the boundary line 2x – 5y = 10.
(Put in slope-intercept form and graph)
Use a solid line because 2x – 5y 10.
Test the point (0, 0). Because (0, 0) is not a solution of the inequality, shade the half-plane below the line.
• Graphing Inequalities in Two - Variables