- 1. Given the following lines are they parallel, perpendicular or neither? y = 2x - 5; y = 1/2 x + 4
A) Neither B) Parallel C) Perpendicular
- 2. Given the following lines are they parallel, perpendicular or neither?
y =2/3x + 5; y =2/3x-7
A) Perpendicular B) Neither C) Parallel
- 3. Given the following lines are they parallel, perpendicular or neither?
y =7/3x+ 7 y = -3/7x+3
A) Perpendicular B) Parallel C) Neither
- 4. Determine the slope and the point the line passes through:
y+13=4/3(x-8)
A) m=4/3 B) (-13, 8) C) (8, -13) D) (-8, 13) E) m=-3/4
- 5. Given the following lines are they parallel, perpendicular or neither? y =-x+7; y =x -4
A) Parallel B) Perpendicular C) Neither
- 6. Determine the slope and y intercept of the following line:
y=-4x+6
A) m=-4 B) y-intercept: (0,-4) C) m=6 D) m=4 E) y-intercept: (0,6)
- 7. Given the following lines are they parallel, perpendicular or neither? 2x - 3y = 9; 4x - 6y = 11
A) Perpendicular B) Neither C) Parallel
- 8. Determine the slope and the point the line passes through:
y-3=1/2(x-6)
A) m=2 B) (6,3) C) (3, 6) D) m=1/2 E) (-6,-3)
- 9. Determine the slope (m) and y-intercept (b) of this line:
y=1/5x+12
A) m=1/5 B) m=5 C) b=12 D) b=-12 E) m=-1/5
- 10. Given the following lines are they parallel, perpendicular or neither? y = 3x + 4; y = -3x + 2
A) Parallel B) Perpendicular C) Neither
- 11. Find the x-intercept of 3x + 4y = -24
A) (3,0) B) (-3,0) C) (-6,0) D) (-8,0)
- 12. Find the y-intercept of 2x - 7y = 28
A) (0,4) B) (0,28) C) (0,-4) D) (-4,0)
- 13. Write a slope intercept equation to represent this scenario:
Larry wants to buy a car for his 16th birthday, so he got a job earning $7.50 per hour. He plans to save all of his earnings. He already has $250 in his savings account.
A) y=7.50x-16 B) y=7.50x+250 C) y=-7.50x+250 D) y=16x+250 E) y=250x+7.50
- 14. Find the y-intercept of y = 2x - 3
A) (0,-3) B) (-3,0) C) (0,2) D) (0,0)
- 15. Write a slope-intercept equation to represent this scenario:
Austin Police Department speeding tickets are expensive. Mr. Wright got pulled over while speeding to work last week. The fine for speeding is $97 plus $8.40 for each mile per hour over the limit you are driving.
A) y=97x+8.40 B) y=8.40x-97 C) y=97+8.40x D) y=-8.40x+97
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