Systems Of Linear Equations Question Preview (ID: 11242)
Systems Of Linear Equations.
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y = 2x - 4 y = -8x + 46
a) (5,6)
b) (6,5)
c) (-5,6)
d) (-6,-5)
y = -x + 3 y = x -3
a) (-3,-1)
b) (-3,0)
c) (0,-3)
d) (0,0)
y = -2x - 3 y = 8x - 8
a) (-2,-2)
b) (-3,1/2)
c) (-1/2,3)
d) (1/2,-3)
y = -4x + 54 y = -5x + 65
a) (11,10)
b) (-10,-11)
c) (-15,0)
d) (-5,-6)
Change to slope intercept form: 6x + y = 5
a) y = -6x + 5
b) y= 6x-5
c) y=-6x-5
d) y=-6x-5
Change to slope intercept form: 4x – 2y = 12
a) y = -2x + 6
b) y = 2x - 6
c) y = -2x - 6
d) y = 2x + 6
What type of system is this 3x – 2y = 6, x + y = 2
a) intersection (2,0)
b) Parallel
c) consistent
d) no solution
2x – y = 1, 4x – 2y = 2
a) many solutions
b) no solution
c) one solution
d) two solutions
y = 2x + 1, y = 2x – 3
a) parallel lines
b) intersecting lines
c) coinside lines
d)
y = -4x + 5, y = 3x – 9 where do these lines intersect?
a) (2,-3)
b) (-2,-3)
c) (0,-3)
d) (-2,-3)
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