Segment Bisector

A segment bisector at all times passes throughout the midpoint of a line segment. If a division bisector crosses the part at 900, then it is recognized while perpendicular bisector of the segment. When geometry is developing to structure, lines are utilized to denote straight substance width and height. A triangle is generally the fundamental shape of geometry: a polygon with three corners and three sides to be line segments. Now we see about definition of segment bisector.

                           segment bisector at all times passes throughout the midpoint of a line segment

Definition of Segment Bisector:

Definition of Segment Bisector:

                 A Segment Bisector is a line or a segment to separate a line segment into two equivalent elements.

                                 Segment Bisector is a line or a segment to separate a line segment into two equivalent elements

                       In the known form, DE is the bisector of the segment AC while it intersects the line segment AC on its midpoint B.

                      A line segment is a partition of a line to be enclosed by two dissimilar end points and include all point on the line among its end points. Two or more line fragment can have some of the similar relationships as lines.

Examples for Definition of Segment Bisector:

Example 1 for Definition of segment bisector:

How to find the length of AB, if a line l is segment bisector and AO = 8 units?

                  the length of AB, if a line l is segment bisector and AO = 8 units

Solution:
Step 1: Line l separate AB into two equivalent parts also O is the midpoint of AB.
           A segment bisector at all times passes throughout the midpoint of a line segment. 
Step 2: AB = 2(AO) = 2(8) = 16

            [Substitute AO = 8.] 
Step 3: So, the length of AB is 16 units.

 

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Example 2 for Definition of segment bisector:

How to find the length of AB, if a line l is segment bisector and AO = 12 units?

                  the length of AB, if a line l is segment bisector and AO = 8 units

Solution:
Step 1: Line l separate AB into two equivalent parts also O is the midpoint of AB.
           A segment bisector at all times passes throughout the midpoint of a line segment. 
Step 2: AB = 2(AO) = 2(12) = 24

            [Substitute AO = 12.] 
Step 3: So, the length of AB is 24 units.