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## Identify Lines of Equations as Parallel, Perpendicular, or NeithIdentify each set of linear equations as parallel, perpendicular, or neither.
Hint 1: Parallel lines have the same slope but different y-intercepts.
Hint 2: The slope of perpendicular lines are opposite reciprocals.
Hint 3: If Hint 1 and Hint 2 does not apply, then the lines are NEITHER parallel or perpendicular.
Groups: Parallel, Perpendicular, Neither, group_name4, Words: Line 1: y = 3x - 2 Line 2: y = 3x %2b 6, Line 1: y = (1/2)x - 8 Line 2: y = - 2x %2b 5, invite students Line 1: y = 3x %2b 5 Line 2: y = 3x %2b 5, Line 1: y = (1/2)x %2b 3 Line 2: y = 2x - 4, Line 1: y = (2/3)x %2b 7 Line 2: y = (2/3)x - 1, Line 1: y = 4x %2b 5 Line 2: y = (-1/4)x %2b 5, Line 1: y = (1/3)x %2b 3 Line 2: y = 3x - 2, teacher Line 1: y = 8x %2b 1 Line 2: y = (-1/8)x %2b 4, Line 1: y = 7x Line 2: y = 7x %2b 8, Line 1: y = (-2/3)x - 1 Line 2: y = (3/2)x %2b 1, Line 1: y = 2x - 3 Line 2: y = 4x %2b 1, Line 1: y = 5 Line 2: x = 3, mix questions Line 1: y = - 8x %2b 7 Line 2: y = - 8x %2b 3, Line 1: y = 7- 3x Line 2: y = (1/3)x %2b 8, Line 1: y = (2/5)x %2b 4 Line 2: y = (5/2)x %2b 4, Line 1: y = 8x %2b 2 Line 2: y = 8x - 2, |