With the limited information provided by the question, the only statement which must be true is FJ = JH.
Not enough information has been given but if a given line bisects another line at 90 degrees then it is the perpendicular bisector of that line.
The answer letters always rearrange so here are the answers point H is the midpoint of FG line t intersects FG at a right angle Line T is perpendicular to FG
True
Ray BD is a bisector of angle EBA.
It bisects the line segment at midpoint at 90 degrees and its slope is the reciprocal of the line segment's slope plus or minus.
Not enough information has been given but if a given line bisects another line at 90 degrees then it is the perpendicular bisector of that line.
The perpendicular bisector of the line XY will meet it at its midpoint at right angles.
The bisector and the line segment are perpendicular to each other.
The answer letters always rearrange so here are the answers point H is the midpoint of FG line t intersects FG at a right angle Line T is perpendicular to FG
true
True
It Separates BC (Line on top) into two congruent line segments.
True. The perpendicular bisector of the segment connecting points ( a ) and ( b ) is defined as the set of all points that are equidistant from both ( a ) and ( b ). This line is perpendicular to the segment at its midpoint and ensures that any point on this line maintains equal distance to both endpoints.
Whether or not the line bisecting it has been drawn, it's true that every angle can be bisected.
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
True