Answer:
If a regular hexagon is inscribed in a circle, there will be 6 equal arcs drawn on the circle.
Explanation:
A regular hexagon has 6 equal sides and 6 equal angles.
If the radius of the circle is r, the circumference of the circle will be 2πr.
Therefore, the length of each of the 6 arcs will be (2πr)/6 = (πr)/3.
Because the central angle for the circle is 360°, the central angle for each arc will be 360/6 = 60°.
The figure shown below illustrates the solution for the problem. The 6 equal arcs are numbered from 1 to 6.
