0
The midpoint is (0, 1)
If the endpoints are: (3, 7) and (2, -1) then the midpoint is at (2.5, 3)
To find the midpoint of a segment with endpoints (3, 1) and (5, 3), you can use the midpoint formula: ((\frac{x_1 + x_2}{2}, \frac{y_1 + y_2}{2})). Plugging in the values, the midpoint is ((\frac{3 + 5}{2}, \frac{1 + 3}{2}) = (4, 2)). Thus, the midpoint of the segment is (4, 2).
4
-1
Midpoint: (1, 1)
The midpoint is (0, 1)
If you mean points of (-1, 10) and (9, -1) then the midpoint is (4, 4.5)
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
The midpoint of the hypotenuse equidistant from all the vertices
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
If the endpoints are: (3, 7) and (2, -1) then the midpoint is at (2.5, 3)
The midpoint of 0.9 and 1 is 0.95 0.95 - 0.5 = 0.90 0.95 + 0.5 = 1.00
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
Points: (-11, 0) and (9, -1) Midpoint: (-1, -1/2)