Partition of Non-Regular Prime Stellated Cyclic Polygons into Rotation Classes/Examples/Pentagons
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Examples of Use of Partition of Non-Regular Prime Stellated Cyclic Polygons into Rotation Classes
The equivalence classes by rotation of the non-regular stellated pentagons whose vertices are equally spaced on the circumference of a circle are depicted thus.
Thus there are $2$ equivalence classes, each with $5$ elements.
Matt Westwood suggests that these equivalence classes could be nicknamed fish and bat.
Sources
- 1971: George E. Andrews: Number Theory ... (previous) ... (next): $\text {3-3}$ Wilson's Theorem: Theorem $\text {3-5}$