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

32
Graphing Graphing Linear Linear Inequalities Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph

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

Page 1: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Graphing Graphing

Linear Linear

InequalitiesInequalities

Section 6.8

EVERYONE GET A

COMMUNICATOR!!!

One side blank, other

side graph

Page 2: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

How to Determine

the Type of Line to Draw

Inequality Symbol

Type of Line

> or < Dotted Line

> or < Solid Line

Page 3: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Choose the type of line for the inequality given.

1. y > 3x - 2

a. Solid b. Dotted

2. y > ¼x - 5

a. Solid b. Dotted

Page 4: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Choose the inequality symbol for the line shown.

< or >

< or >

Page 5: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Choose the inequality symbol for the line shown.

< or >

< or >

Page 6: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

If the inequality is:

Shade

y > mx + bor

y > mx + bAbove the

line

y < mx + bor

y < mx + bBelow the

line

Page 7: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y > x - 2.1. Graph the line

y = x - 2.

2. Since y >, shade above the line.

Page 8: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y < x - 2.

1. Graph the line

y = x - 2.

2. Since y <, shade below the line.

Page 9: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Do you do anything different when the line is dotted rather than solid?

LessonStart

Page 10: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

LessonStart

Page 11: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y > x - 2.

2. Since y >, shade above the line.

1. Graph the line

y = x - 2, but make the line dotted.

Page 12: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y < x - 2.

1. Graph the line

y = x - 2, but make the line dotted.

2. Since y <, shade below the line.

Page 13: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y > -½x + 3

Type of line:

Solid

Dotted

Page 14: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y > -½x + 3Type of line:

Solid

Dotted

Shade ___ the line.

Above Below

LessonStart

Page 15: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph y > -½x + 3Type of line:

Solid

Dotted

Shade ___ the line.

Above Below

Page 16: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Choose the correct inequality for the graph shown.

y < 1/3 x + 2

y < 1/3 x + 2

y > 1/3 x + 2

y > 1/3 x + 2

Page 17: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Where to Shade for Undefined or No Slopes:

The inequality must be in

x # (no y)

format.

can be:

>, >, <, or <.

Page 18: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

If the inequality is:

ShadeTo the

x > #or

x > #Right of the

line

x < #or

x < #Left of the line

Page 19: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph x > -2

1. Draw a dotted vertical line at x = -2.

2. Shade to the right of the line.

Page 20: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph x < -2.

1. Graph the line

X = -2.

2. Shade to the left of the line.

Page 21: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph x > 3.

Choose type of line.

Solid

Dotted

Page 22: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph x > 3.

Choose type of line.

Solid

Choose where to shade.

Left Right

Page 23: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

x

y

Graph x > 3.

Choose type of line.

Solid

Choose where to shade.

Right

Page 24: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Solve -3x - 2y < 12.+3x +3x-2y < 3x + 12-2 -2 -2 y < -3/2 x - 6>

Page 25: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Choose the correct inequality.

1. 2x + 5y > -10

y > -2/5 x - 2y < -2/5 x - 2

y > 2/5 x + 2 y < 2/5 x + 2

2. 3x - 2y > 10

y > -2/3 x - 5 y < -2/3 x - 5

y > 2/3 x - 5y < 2/3 x - 5

Page 26: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Example 1Example 1

Which ordered pair is a solution of5x - 2y ≤ 6?

A. (0, -3)B. (5, 5)C. (1, -2)D. (3, 3)

Page 27: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Example 2Example 2 Graph the inequality x ≤ 4 in a coordinate

plane. Decide whether to

use a solid or dashed line.

Use (0, 0) as a test point.

Shade where the solutions will be.

y

x

5

5

-5

-5

Page 28: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Example 3Example 3

Graph 3x - 4y > 12 in a coordinate plane. Sketch the boundary line of the graph.

Solve for “y” first: y < ¾x - 3

Solid or dashed line?

Use (0, 0) as a test point.

Shade where the solutions are.

y

x

5

5

-5

-5

Page 29: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Example 4:Example 4:

Graph y < 2/5x in a coordinate plane.• What is the slope and y-intercept?• m = 2/5• b = (0,0)• Solid or dashed

line? Use a test point

OTHER than theorigin.

Shade where the solutions are.

y

x

5

5

-5

-5

Page 30: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Graph: y ≥ -3/2x + 1Graph: y ≥ -3/2x + 1Step 1: graphthe boundary(the line is solid ≥)

Step 2: testa point NOTOn the line(0,0) is alwaysThe easiest if it’sNot on the line!! 3(0) + 2(0) ≥ 2 0 ≥ 2Not a solution So shade the other side of the line!!

Page 31: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Graph: y <Graph: y < 6 6

Page 32: Graphing Linear Inequalities Section 6.8 EVERYONE GET A COMMUNICATOR!!! One side blank, other side graph.

Graph: 4x – 2y < 7Graph: 4x – 2y < 7