All segments connecting the center to any point on the circle are radii.
In the given diagram, the diameter and the perpendicular bisector intersect at the center of the circle, which is denoted by point O. Since the radius of a circle is the distance from the center to any point on the circle, all the segments connecting the center O to any point on the circumference of the circle are considered radii.
Therefore, all the drawn radii of the circle created by the diameter and its perpendicular bisector are the following:
OA, where A is any point on the circle along the diameter
OB, where B is any point on the circle along the diameter
OC, where C is any point on the circle along the perpendicular bisector
OD, where D is any point on the circle along the perpendicular bisector
In summary, all four segments - OA, OB, OC, and OD - represent the radii of the circle.
Complete question:
Identify the radii of the circle created by the diameter and is perpendicular bisector.