Segment, Polygon, Diagonals, Midpoint , Coordinates For The Midpoint – Mathematics
The key terms of this Maths chapter include Coordinates For The Midpoint, Endpoints, Point, Midpoint, Segment, Circle, Endpoint, Diameter, Length, Polygon, Square, Vertices, Bisect, Diagonals, Equation, Radius.
Find the coordinates for the midpoint of the segment with endpoints given.
(10, 6) and (-4, 8)
(3,7)
Find the coordinates for the midpoint of the segment with endpoints given.
(-16, 0) and (0, -16)
(-8.-8)
Find the coordinates for the midpoint of the segment with endpoints given.
(12, 4) and (-8, 8)
(2,6)
A polygon has vertices whose coordinates are A(1, 4), B(4, -1), C(-1, -4), and D(-4, 1). The diagonals of this polygon bisect each other.
True
A segment has endpoints A (-1, 1) and B (8, 4) .
If the segment is divided into four equal parts, the coordinates of the point closest to point A are _____.
(7/2,5/2)
The diameter of a circle has endpoints whose coordinates are R(-2, 2) and S(4, 2).
Find the center of the circle.
(1,2)
The diameter of a circle has endpoints whose coordinates are R(-2, 2) and S(4, 2).
The radius of the circle has length _____.
3
Square RSTU is inscribed in circle P. Given the coordinates for the vertices of the square, find the equation of circle P.
R(0, 4), S(6, 2), T(4, -4), and U(-2, -2)
(x – 2)2 + y2 = 20
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (3, 5) and M =(-2, 0)
(-7,-5)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (5, 6) and M = (8, 2)
(11,-2)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (10, 6) and M = (-4, 8)
(-18,10)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (-16, 0) and M = (0, -16)
(16,-32)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (12, 4) and M = (-8, 8)
(2,6)
The _______ of a segment divides the segment into two segments of equal length
midpoint
Find the coordinates for the midpoint of the segment with endpoints given.
(3, 5) and (-2, 0)
(1/2,5/2)
Find the coordinates for the midpoint of the segment with endpoints given.
(5, 6) and (8, 2)
(13/2.4)
Find the coordinates for the midpoint of the segment with endpoints given.
(10, 6) and (-4, 8)
(3,7)
Find the coordinates for the midpoint of the segment with endpoints given.
(-16, 0) and (0, -16)
(-8.-8)
Find the coordinates for the midpoint of the segment with endpoints given.
(12, 4) and (-8, 8)
(2,6)
A polygon has vertices whose coordinates are A(1, 4), B(4, -1), C(-1, -4), and D(-4, 1). The diagonals of this polygon bisect each other.
True
A segment has endpoints A (-1, 1) and B (8, 4) .
If the segment is divided into four equal parts, the coordinates of the point closest to point A are _____.
(7/2,5/2)
The diameter of a circle has endpoints whose coordinates are R(-2, 2) and S(4, 2).
Find the center of the circle.
(1,2)
The diameter of a circle has endpoints whose coordinates are R(-2, 2) and S(4, 2).
The radius of the circle has length _____.
3
Square RSTU is inscribed in circle P. Given the coordinates for the vertices of the square, find the equation of circle P.
R(0, 4), S(6, 2), T(4, -4), and U(-2, -2)
(x – 2)2 + y2 = 20
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (3, 5) and M =(-2, 0)
(-7,-5)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (5, 6) and M = (8, 2)
(11,-2)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (10, 6) and M = (-4, 8)
(-18,10)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (-16, 0) and M = (0, -16)
(16,-32)
Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P).
P = (12, 4) and M = (-8, 8)
(2,6)
The _______ of a segment divides the segment into two segments of equal length
midpoint
Find the coordinates for the midpoint of the segment with endpoints given.
(3, 5) and (-2, 0)
(1/2,5/2)
Find the coordinates for the midpoint of the segment with endpoints given.
(5, 6) and (8, 2)
(13/2.4)