Best Answer

Add the x values together and divid by 2 and add the y values together and divide by 2. You get 3, 4.

Q: What is the midpoint of the line segment with endpoints 2 2 and 4 6?

Write your answer...

Submit

Still have questions?

Continue Learning about Algebra

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

Midpoint = (x1+x2)/2 and (y1+y2)/2 So the midpoint is (4, 5)

Endpoints: (-4, -10) and (8, -1) Midpoint: (2, -5.5) Slope: 3/4 Perpendicular slope: -4/3 Perpendicular equation: y --5.5 = -4/3(x-2) => 3y = -4x -8.5 Perpendicular bisector equation in its general form: 4x+3y+8.5 = 0

10

-- The x-coordinate of the midpoint is the average of the x-coordinates of the end-points. -- The y-coordinate of the midpoint is the average of the y-coordinates of the end-points. -- The average of two numbers is 1/2 of (the first number plus the second number).

Related questions

Endpoints: (-2,-2) and (4, 6) Midpoint: (1, 2)

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 the midpoint of a horizontal line segment with a length of 8 is (3, -2), then the coordinates of its endpoints are (6, -2) and (0, -4).

Endpoints: (-8, 12) and (-13, -2) Midpoint: (-10.5, 5)

Endpoints: (2, 4) and (2, -4) Midpoint: (2, 0)

(1, 2)

It is: (-2, 5)

It is: (-4+2)/2 and (-2+6)/2 = (-1, 2) which is the midpoint of the line segment.

If you mean endpoints of (-1, 7) and (3, -3) then the midpoint is (1, 2)

Midpoint: (-10.5, 5)

Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)

If you mean endpoints of (1, 7) and (3, 3) then the midpoint is at (2, 5).