The correct sequence of the steps required to construct the bisector of [tex] \angle{A}[/tex] is presented as follows;
- Place the point of the compass at point A and draw an arc that intersects the sides of [tex] \angle{A}[/tex]. Label the points of intersection as points B and C.
- Place the point of the compass on point B and draw an arc in the interior of the angle
- Without changing the opening of the compass, place the point of the compass at point C and draw another arc in the interior of the angle
- Label the intersection of the arcs in the interior of the angle as point D.
- Use the straight edge to draw [tex] \overrightarrow{AD}[/tex]
What is the correct order of steps required to construct the bisector of [tex] \angle{A}[/tex]?
The game given steps and their number of appearance in the question photo are;
1. Label the intersection of the arcs in the interior of the angle as point D.
2. Without changing the opening of the compass, place the point of the compass at point C and draw another arc in the interior of the angle
3. Place the point of the compass on point B and draw an arc in the interior of the angle
4. Use the straight edge to draw [tex] \overrightarrow{AD}[/tex]
5. Place the point of the compass at point A and draw an arc that intersects the sides of [tex] \angle{A}[/tex]. Label the points of intersection as points B and C.
The correct order of the steps required to construct the bisector of [tex] \angle{A}[/tex] is as follows;
Step 5 → Step 3 → Step 2 → Step 1 → Step 4
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