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Resilience
Gratitude
Perseverance
Endurance
100

What kind of system of equations does the graph display below?


No Solution

100

What method would you use to solve this system of equations algebraically?

2x + y = 1

y = 2x + 1

Substitution

100

What's the constant of proportionality for this graph? (Make sure to include UNITS!)


37.5m/g

100

This graph is an example of what kind of system of equations?


One Solution

200

What is the y coordinate for the point of intersection displayed on the graph?


-4

200

What is the equation of the line in slope-intercept form?


y = -3/2x + 3

200

Solve for r.



r = -1

200

What is the equation of the line in the graph below in slope-intercept form?


y = 8/3x + 4
300

Solve the system of equations.


x - y = 3

7x - y = -3

(-1, -4)

300

Justin’s pay is represented by this line graph.  


Molly’s pay is represented by the equation y = 9x. Who makes more money and by how much?


A. Justin earns $2 more per hour than Molly.


B. Justin earns $3 more per hour than Molly.


C. Molly earns $2 more per hour than Justin.


D. Molly earns $1 more per hour than Justin.

Justin makes $7/hour

C. Molly earns $2 more per hour than Justin.

300

Solve the system of equations.


4x+5y=9

3x-3y=0


(1, 1)

300

Here is information about the cost of carpet at two stores.  


  • Carpet Store A is represented by the graph.


  • Carpet Store B sells 100 square yards of carpet for $1750.  

What is the cost, per square yard, of the carpet at the store with the lesser cost?

Carpet Store A: $15.sq. yd.

400

Solve for p.



p = 1

400

What is the solution to this system of equations?


8x - 6y = -20

-16x + 7y = 30


(-1, 2)

400

Solve for v.



v = -1

400

What is the solution to this system of equations?

4x-2y=14

10x+7y=-25

(1, -5)
500

Yomaira and Kevin play a game in which they earn the same number of points for each goal and lose the same number of points for each penalty. 


• Yolanda makes 6 goals and 3 penalties, ending the game with 6 points. 

• Neel earns 8 goals and 9 penalties, and ends the game with -22 points.


Write a system of equations that describes Yolanda's and Neel's outcomes.


**Remember**

- Define your variables first 

- Then setup your equations based off the problem

- Lastly, solve for the solution

x=points for each goal

y=points for each penalty


6x+3y=6

8x+9y=-22


Solution: (4, -6)

Each goal earns 4 points. Each penalty loses 6 points.

500

What is the solution to the system of equations below?


                       7x + 8/7y = 4

                       3x - 5/7y = 27

(4, -21)

500

Jamia babysits for two different families.  One family pays her $6 each hour and a bonus of $20 at the end of the night.  The other family pays her $5 per hour and a bonus of $30 at the end of the night.

**Remember**

- Define your variables first 

- Then setup your equations based off the problem

- Lastly, solve for the solution

x = # of hours babysitting

y = total amount of money paid after babysitting


6x + 20 = y

4x + 30 = y


(5, 50)

500

Solve the systems of equations below.


                        4x - 3/4y = 9

                        7x + 2/4y= -6

(0, -12)