A segment joining two segments refers to a line segment that connects the endpoints of two existing line segments. This new segment can be seen as a bridge that links the two segments together, often creating a larger geometric shape or structure. In geometry, this is commonly used in discussions about polygons, paths, or composite figures. The properties of the new segment can depend on the characteristics of the original segments it connects.
By definition, a segment bisector always created two congruent segments.
The line that divides a segment into two congruent segments is called the perpendicular bisector. This line intersects the segment at its midpoint and forms right angles with the segment, ensuring that the two resulting segments are equal in length.
the bisector
That's the " midpoint " of the segment.
the midpoint
it depends on how long or how many joining segments it has. normally one line segment contains only one midpoint. Unless it has a joining segment there is only one midpoint.
By definition, a segment bisector always created two congruent segments.
The line that divides a segment into two congruent segments is called the perpendicular bisector. This line intersects the segment at its midpoint and forms right angles with the segment, ensuring that the two resulting segments are equal in length.
A point that divides a segment into two segments of equal length is a midpoint.
MidpointMidpoint.midpoint
Midpoint
the bisector
MidpointMidpoint.midpoint
A midpoint is a point that divides a segment into two congruent segments. A angle bisector is a ray that divides an angle into two congruent angles.
That's the " midpoint " of the segment.
the midpoint
It is the midpoint