What is the smallest angle of rotational symmetry that a regular hexagon has?

1 Answer
Jul 14, 2017

${60}^{o}$

Explanation:

A hexagon has six rotations so $360 \div 6 = 60$
The angles of rotation are ${60}^{o} , {120}^{o} , {180}^{o} , {240}^{o} , {300}^{o} ,$ and back to the original at ${360}^{o}$

The smallest angle of rotation is ${60}^{o}$