linear systems – graphing method in this module, we will be graphing two linear equations on one...

LINEAR SYSTEMS – Graphing Method

In this module, we will be graphing two linear equations on one coordinate plane and seeing where they intersect.

You can use either an ( x , y ) table, or slope – intercept to graph your lines.

INTERSECTION POINT

( x , y )

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y x y

244 yx 32 yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y

0 6

x y

6

244

2440

244

y

y

y

yx244 yx 32 yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y

0 6

4 5

x y

5

204

2444

244

y

y

y

yx244 yx 32 yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y

0 6

4 5

x y

5

204

2444

244

y

y

y

yx244 yx 32 yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y

0 6

4 5

x y

0 - 3

3

30

302

32

y

y

y

yx244 yx 32 yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y

0 6

4 5

x y

0 - 3

1 - 1

1

32

312

32

y

y

y

yx244 yx 32 yx

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

x y

0 6

4 5

x y

0 - 3

1 - 1

244 yx 32 yxINTERSECTION POINT

( 4 , 5 )

LINEAR SYSTEMS – Graphing Method

Example # 1 : Find the intersection point of the following system of

equations :

32

244

yx

yx

Using an ( x , y ) table :

2424

24204

24544

244

yx

33

358

3542

32

yx

INTERSECTION POINT

( 4 , 5 )

CHECK CHECK

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

63

2 xy

x y

1 xy

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0

63

2 xy

x y

1 xy

603

2y

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

63

2 xy

x y

1 xy

6

60

603

2

y

y

y

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

3 8

63

2 xy

x y

1 xy

8

62

633

2

y

y

y

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

3 8

63

2 xy

x y

1 xy

8

62

633

2

y

y

y

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

3 8

63

2 xy

x y

0 1

1 xy

1

10

1

y

y

xy

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

3 8

63

2 xy

x y

0 1

1 0

1 xy

0

11

11

y

y

y

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

3 8

63

2 xy

x y

0 1

1 0

1 xy

0

11

11

y

y

y

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

x y

0 6

3 8

63

2 xy

x y

0 1

1 0

1 xy

INTERSECTION POINT

( – 3 , 4 )

LINEAR SYSTEMS – Graphing Method

Example # 2 : Find the intersection point of the following system of

equations :

1

63

2

xy

xy

Using an ( x , y ) table :

44

624

633

24

63

2

xy

44

134

134

1

xy

INTERSECTION POINT

( – 3 , 4 )

CHECK

CHECK

LINEAR SYSTEMS – Graphing Method

Example # 3 : Find the intersection point of the following system of

equations :

73

52

xy

xy

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

73 xy

71

3

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

73 xy

71

3

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

73 xy

71

3

b

m

Example # 3 : Find the intersection point of the following system of

equations :

LINEAR SYSTEMS – Graphing Method

Example # 3 : Find the intersection point of the following system of

equations :

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

73 xy

71

3

b

m

LINEAR SYSTEMS – Graphing Method

Example # 3 : Find the intersection point of the following system of

equations :

73

52

xy

xy

I will use slope – intercept on this one…

52 xy

51

2

b

m

73 xy

71

3

b

m

INTERSECTION POINT

( 2 , – 1 )

LINEAR SYSTEMS – Graphing Method

Example # 3 : Find the intersection point of the following system of

equations :

73

52

xy

xy

I will use slope – intercept on this one…

11

541

5221

52

xy

11

761

7231

73

xy

INTERSECTION POINT

( 2 , – 1 )

CHECK CHECK