If two line segments are congruent, it must be true that they have the same length. This means that if you measure both segments, they will be equal in distance from one endpoint to the other. Additionally, congruent segments can be superimposed on each other, matching perfectly in length and endpoints.
True
If two line segments have the same length, it must be true that they are congruent, meaning they can be considered equivalent in terms of distance. However, this does not necessarily mean they are positioned in the same location or orientation in space. Additionally, they may not be parallel or intersecting; they can exist in different geometrical contexts while still sharing the same length.
False. They can only be straight line segments: there cannot be any curved line segments.
No, it is not true that a segment's bisector will always be congruent to the segment itself. A segment bisector is a line, ray, or segment that divides the original segment into two equal parts, but the bisector itself does not have to be equal in length to the original segment. For example, if you have a segment of length 10 units, its bisector will simply divide it into two segments of 5 units each, but the bisector itself can be of any length and orientation.
true
They are congruent.
True
True
They must be the same length.
It Separates BC (Line on top) into two congruent line segments.
true
If two line segments have the same length, it must be true that they are congruent, meaning they can be considered equivalent in terms of distance. However, this does not necessarily mean they are positioned in the same location or orientation in space. Additionally, they may not be parallel or intersecting; they can exist in different geometrical contexts while still sharing the same length.
If by "equal" you mean "equal in length", yes, that is the same as "congruent".
False. They can only be straight line segments: there cannot be any curved line segments.
The triangles must be congruent.
That seems to be true. Sides pretty much are line segments, and the angles are the end points.
True