= Rubik's Cube group
{wiki=Rubik's_Cube_group}
The Rubik's Cube group, in the context of group theory, is a mathematical structure that represents the set of all possible configurations (or states) of a Rubik's Cube and the operations (moves) that can be performed on it. This is an example of a finite group in abstract algebra. \#\#\# Key Concepts: 1. **Group Definition**: A group is a set equipped with an operation that satisfies four properties: closure, associativity, identity, and invertibility.
Back to article page