Endpoints: (-1, 1) and (1, 5)
Slope: 2
Endpoints: (2, 9) and (9, 2) Midpoint: (5.5, 5.5) Slope of line segment: -1 Perpendicular slope: 1 Perpendicular bisector equation: y-5.5 = 1(x-5.5) => y = x
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Endpoints: (-2, 4) and (6, 8) Slope: 1/2 Perpendicular slope: -2 Midpoint: (2, 6) Perpendicular bisector equation: y = -2x+10
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Endpoints: (-1, -6) and (5, -8) Midpoint: (2, -7) Slope: -1/3 Perpendicular slope: 3 Perpendicular bisector equation: y - -7 = 3(x -2) => y = 3x -13
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
(1, 5)
The endpoints of a line segment graphed on a Cartesian coordinate system are (2, -5) and (-4, 2). What are the coordinates of the midpoint of the segment?
If you mean endpoints of (-1, 7) and (3, -3) then the midpoint is (1, 2)
Midpoint: (1, 1)