A bisector is a line that divides either a given line or an angle into two equal parts. The answer to the given question is in the attachments to this answer.
The process of bisection implies dividing a given angle or line into two equal parts. Thus a bisector should be constructed.
The construction required is as given below:
For figure 1:
- With center S and any radius, draw an arc to intersect S and T.
- Using the end of the arc on SR and a greater radius, draw two arcs.
- Using the end of the arc on ST and the same radius, draw another arc to intersect the previous arc.
- Join S to the point of intersection of the arcs by a straight line. Thus this line is the required bisector of <RST.
For figure 2:
- With center u and any radius, draw an arc to intersect T and V.
- Using the end of the arc on uT and a greater radius, draw two arcs.
- Using the end of the arc on uV and the same radius, draw another arc to intersect the previous arc.
- Join u to the point of intersection of the arcs by a straight line. Thus this line is the required bisector of <TuV.
For figure 3:
- With center B and any radius, draw an arc to intersect A and C.
- Using the end of the arc on AB and a greater radius, draw two arcs.
- Using the end of the arc on BC and the same radius, draw another arc to intersect the previous arc.
- Join B to the point of intersection of the arcs by a straight line. Thus this line is the required bisector of <ABC.
The required construction is as shown in the attachments to this answer.
For more clarifications on bisection of angles, visit: https://brainly.com/question/12028523
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