![]() ![]() ![]() The formula for an inscribed angle is given by The formula to find the central angle is given by In the above illustration, ∠ AOB is the inscribed angle. On the other hand, an inscribed angle is formed between two chords whose vertex lies in a circle’s circumference. In a circle, the sum of the minor and major segment’s central angle is equal to 360 degrees. In the above diagram, ∠ AOB = central angle The central angle is formed between two radii, and its vertex lies at the center of the circle. Let’s see each of them individually below. These are central, inscribed, interior, and exterior angles. We saw different types of angles in the “Angles” section, but in the case of a circle, there, basically, are four types of angles. An angle of a circle is an angle that is formed between the radii, chords, or tangents of a circle. The answer is that angles are formed inside a circle with radii, chords, and tangents. What is the angle of a circle? Or, to be more precise, how can we form an angle inside a shape which does not have any edges? You will also learn what the interior angle and exterior angle of a circle entail. For the definition of angles and parts of circles, you can consult previous articles. ![]() You will also learn how to find the measure of an angle in a circle. Now, this article is purely related to the angles of a circle. You have seen a few theorems related to circles previously that all involve angles in it. The concept of angles is essential in the study of geometry, especially in circles. Angles in a Circle – Explanation & Examples ![]()
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