Answer:
Swing an arc above and below the segment. Does the construction demonstrate how to copy an angle correctly using technology? (The construction shows angles CAB and IDE. There is a circle created from point A that intersects with ray AC, creating point F, and ray AB, creating point G.
Step-by-step explanation:
Yes the circles D and E have the same radius.
In construction, how do you bisect an angle?
By creating angles bisectors for an angle, one can divide the angle precisely in half. A "bisect" is a division into two equally sized pieces. Angle bisector construction results in a line that provides two congruent angles for a given angle. For instance, when an angle bisector is built for a 70° angle, it divides the angle into two identical angles, each of which is 35°. Angle bisectors can be created for acute, obtuse, and right angles as well.
Using a compass to find a point on the angle bisector and a straightedge to connect it to the angle's vertex, you can bisect an angle.
Given in the circle
AE = AD
EG = DG
AG = AG
Which means triangle AEG ≅ triangle ADG
Congruency property:
The dimensions of the sides and angles of two or more triangles determine whether they are congruent. A triangle's size and shape are determined by its three sides and three angles, respectively. If pairings of corresponding sides and corresponding angles are equal, two triangles are said to be congruent. They are the exact same size and form. Triangles can satisfy a wide variety of congruence requirements. Let's go over them in more depth.
Hence ∠EAG = ∠DAG
Therefore circle D and E have the same radius.
Learn more about "bisecting angles" here-
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