- 1. Which of the following points is a solution to the system of equations?
y = 2x - 1 y = 5x + 2
A) (-2,-8) B) (-1,-3) C) (0,-1) D) (-2,-5)
- 2. Determine whether (6,4) is a solution to the following system of linear equations:
x + y = 10 x-y = -2
A) No (6,4) it is not a solution B) Yes (6,4) is a solution C) There is not enough information given to determine is if it is or is not a solution.
- 3. Which is the solution to the graph of system of equations above?
A) (4,3) B) (0,5) C) (3,4) D) (2,0)
- 4. Without graphing, determine whether the system of linear equations has one solution, no solution, or infinitely many solution
x + y = 5
-2x - 2y = - 10
A) One Solution B) No Solution C) Infinite Solutions
- 5. Put the following equation into slope-intercept form:
2x+y=8
Type your answers in the space below - use all lowercase letters and DO NOT USE ANY SPACES :) (or the computer will automatically mark wrong)
- 6. Solve each system of linear equations using substitution
x = -4y 3x + 2y = 20
A) (8,-2) B) (-8, 2) C) (-2, -8) D) (2,-8)
- 7. Which system of equations has infinitely many solutions?
A. 8y=-8x 8y=-8x
B. y=3x+1 y=-4
C. x+y=4 3x+3y=1
D. y=2x+1 y=5-x
A) D B) A C) B D) C
- 8. A system of equations is shown.
x=10
3x+5y=20
In the system of equations, what is the value of y? Enter only your numeric answer in the box.
- 9. Part A
Please enter only the Star value in the box:
- 10. Part B
Please enter only the circle value in the box:
- 11. Determine the solution to this system of equations:
y=2x-3 y-x=-2
A) (1,-1) B) (-1,-1) C) (1,1) D) (-1,1)
- 12. The school that Stefan goes to is selling tickets to a choral performance. On the first day of ticket sales the school sold 3 senior citizen tickets and 1 child ticket for a total of $38. The school took in $52 on the second day by selling 3 senior citizen tickets and 2 child tickets.
Write the price of the senior citizens ticket in the space below. Use only the number without a label or dollar sign.
- 13. The school that Stefan goes to is selling tickets to a choral performance. On the first day of ticket sales the school sold 3 senior citizen tickets and 1 child ticket for a total of $38. The school took in $52 on the second day by selling 3 senior citizen tickets and 2 child tickets.
Write the price of the children's ticket in the space below. Use only the number without a label or dollar sign.
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