Topic 4 Jeopardy Template

Solving Systems of Equations by Graphing

Solving Systems of Equations by Substitution

Solving Systems of Equations by Elimination

Linear Inequalities in Two Variables

Systems of Linear Inequalities

100

Solve the system by graphing

y= 2x+ 2

y=x

(-2,-2)

100

Use substitution to solve the system of equations.

y=–x+ 4

y= 3x

(1,3)

100

Use elimination to solve the system of equations.

x + y= 7

x − y=−3

(2,5)

100

Less than or equal to

Explain the line and shading

solid line with shading below

100

How do you find the solution to a system of linear inequalities?

Graph and find the shading overlap.

200

Solve the system by graphing.

18x− 3y= 21

y= 6x− 7

infinitely many solutions

200

Use substitution to solve the system of equations.

y= 2x– 10

2y=x– 8

(4,-2)

200

Use elimination to solve the system of equations.

x− 2y= 10

3x+y =−12

(-2,-6)

200

greater than

explain the line and the shading

dashed line with shading above

200

Graph the system of inequalities.

y ≤ 2x− 1

y >−x+ 3

True or False: (4,2) a solution?

True

300

Solve the system by graphing.

y= 6x+ 4

6x−y= 1

no solution

300

Use substitution to solve the system of equations.

x– 2y= 12

y= 3x+ 14

(-8,-10)

300

Use elimination to solve the system of equations.

6x+ 2y=−12

4x+ 3y= 7

(-5,9)

300

A line that separates the graph into regions.

boundary line

300

Graph the system of inequalities.

3x− 2y< 4

−2x− 6y <−12

True or False: (4,-2) a solution?

False

400

Use a graph to approximate the solution of the system.

y= 4x− 3

y= 8x− 5

(0.5, -1)

400

Use substitution to solve the system of equations.

y= 3x+ 8

2y= 6x+ 16

infinitely many solutions

400

Which solution method, graphing, substitution, or elimination, is the most appropriate for solving the system of equations?

6x −y= 16

x= 4y− 5

Substitution, since the second equation already expresses x in terms of y.

400

Graph

y≤ 3x−6

Slope:

Y-intercept:

boundary line:

Shading:

Slope: 3

Y-intercept: -6

boundary line: solid

shading: below

400

Graph the system of inequalities.

y< −x+ 4

y≥ 2x+ 4

True or False: (-2,6) a solution?

False

500

Caterer A charges $15 per person and $100 to set up tables. Caterer B charges $20 per person and $50 to set up tables. Graph a system of equations. For what number of guests will the cost of Caterer A be the same as the cost of Caterer B? What is the cost for that number of guests?

10 number of guests at a cost of $250.

500

A community theater sold a total of 400 full-price tickets for adults and children. The price was $8.00 per adult ticket and $5.00 per children’s ticket. If the total revenue was $2,750, how many adult tickets and how many children’s tickets were sold?

250 adult tickets and 150 children’s tickets

500

Determine whether the first system of equations is equivalent to the second system of equations. Explain.

3x+ 5y= 1

2x− 6y= 38

-----------

18x+ 30y= 6

10x− 30y= 190

Yes, the pair of systems is equivalent.

Each equation in the second system is the result of multiplying every number in one of the equations in the first system by a constant.

500

Graph

x− 2y>−4

Slope:

Y-intercept:

Boundary line:

Shading:

Slope: 1/2

Y-intercept: 2

Boundary line: dashed

Shading: below

500

Graph the system of inequalities.

2x+ 2y≥−6

x+y ≤−1

True or False:(-10,8) is a solution.

True