| A | B |
|---|
| Distance is used to find | Length |
| If given the endpoints of a diameter what formula would you use to find the center | Midpoint |
| Parallel lines have | Equal slopes |
| Perpendicular lines have | Negative reciprocal slopes |
| Use midpoint to show | Diagonals bisect each other |
| In the equation of a line the b stands for | The y-intercept |
| In the equation of a line the m stands for | The slope |
| 2y=4x+8 and y-2x=5 are | Parallel |
| 3x-4y=7 and y-3x=5 are | not parallel |
| The center is (2,1) and one endpoint is (3,2) find coordinates of other endpoint | (1,0) |
| The line 4y-6x=8 is perpendicular to | 2x+3y=7 |
| The line 3x-4y=3 is parallel to | 8y=6x-5 |
| The midpoint of (6,4) and (4,2) is | (5,3) |
| The length of diameter whose endpoints are (5,4) and (2,0) is | 5 |
| The slope of a line parallel to 3x+2y=4 is | -3/2 |
| The slope of a line perpendicular to 2y-6x=5 is | -1/3 |
