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The Structure of Systems of Equations

Solving Systems of Equations

Solving Even More Systems of Equations

Graphing Systems of Equations

100

How many solutions will this system of equations have?

10x + 2 = y

10x + 4 = y

No solutions

100

What is the solution to this system of equations?

x = 5

y = x + 2

(5, 7)

100

What is the solution to this system of equations?

y = 10x

x = 3.5

(3.5, 35)

100

What would the graph of this system of equations look like?

y = 2x + 5

y = 2x + 0

They would be parallel lines with no point of intersection. They lines would have the same slope, and one line would pass through the origin while the other would pass through the point (0,5)

200

How many solutions will this system of equations have?

3x + 5 = y

3x + 12 = y

One Solution

200

What is the solution to this system of equations?

x = 8

y = -11

(8, -11)

200

What is the solution to this system of equations?

y = 1/2x + 15

x = 15

(15, 22.5)

200

If you graphed the following system of equations, how many points of intersection would it have?

y + x = 10

y + x = 20

None. This system has no solutions

300

How many solutions will this system of equations have?

2x + 8 = y

12x + 48 = 6y

Infinite solutions

300

What is the solution to this system of equations?

y = 3x - 2

y = 4

(2, 4)

300

What is the solution to this system of equations?

y = 11x + 4

y = 10x + 4

(0,4)

300

What would the graph of this system of equations look like?

x = 8

y = -11

The graph would intersect at (8, -11). The graph would have a vertical line at going through 8 on the x axis and a horizontal line going through -11 on the y axis

400

How many solutions will this system of equations have?

x = 5

y = 11

One solution

400

What is the solution to this system of equations?

y = 2x + 3

y = 1/2 (4x + 3)

No solutions

400

What is the solution to this system of equations?

y = 5x + 7

y = 4x + 9

(2, 17)

400

What would the graph of this system of equations look like?

2x + 4 = y

1x + 2 = y

The lines would have one intersection point and both have positive sloped lines.

500

Mr. Turner says that he can tell just by looking at the structure of a systems of equations how many solutions it will have. What features is he looking for?

One solution: different slopes and vertical intercepts OR different slopes and same vertical intercept.

NO solutions: same slopes, different vertical intercepts

Infinite solutions: same slopes and same vertical intercepts

500

What is the solution to this system of equations?

y = 1/3 (9x + 3)

y = 3x + 1

Infinite solutions

500

What is the solution to this system of equations?

4x + 9 = y

5x + 4 = y

(5, 29)

500

What would the graph of this system of equations look like?

10x + 5 = y

50y = 500x + 250

The lines would be directly on top of one another and have infinite places where they touch