This article needs additional citations for verification. Please help improve this article by adding citations to reliable sources. Unsourced material may be challenged and removed. Find sources: "Superflip" – news · newspapers · books · scholar · JSTOR (October 2024) (Learn how and when to remove this message) |
The superflip or 12-flip is a special configuration on a Rubik's Cube, in which all the edge and corner pieces are in the correct permutation, and the eight corners are correctly oriented, but all twelve edges are oriented incorrectly ("flipped").
The term superflip is also used to refer to any algorithm that transforms the Rubik's Cube from its solved state into the superflip configuration.
Properties
The superflip is a completely symmetrical combination, which means applying a superflip algorithm to the cube will always yield the same position, irrespective of the orientation in which the cube is held.
The superflip is self-inverse; i.e. performing a superflip algorithm twice will bring the cube back to the starting position.
Furthermore, the superflip is the only nontrivial central configuration of the Rubik's Cube. This means that it is commutative with all other algorithms – i.e. performing any algorithm X followed by a superflip algorithm yields exactly the same position as performing the superflip algorithm first followed by X – and it is the only configuration (except trivially for the solved state) with this property. By extension, this implies that a commutator of a superflip and any other algorithm will always bring the cube back to its solved position.
Algorithms
The table below shows four possible algorithms that transform a solved Rubik's Cube into its superflip configuration, together with the number of moves each algorithm has under each metric:
- the most commonly-used half-turn metric (HTM), in which rotating a face (or outer layer) either 90° or 180° counts as a single move, but a "slice-turn" – i.e. rotating a centre layer – counts as two separate moves (equivalent to rotating the two outer layers in the opposite direction);
- the quarter-turn metric (QTM), in which only 90° face-turns count as single moves; thus, a 180° turn counts as two separate moves, while a slice-turn counts as either two or four moves (depending on whether the slice is moved 90° or 180°);
- the slice-turn metric (STM), in which 90° face-turns, 180° face-turns, and slice-turns (both 90° and 180° centre-layer rotations) all count as single moves.
All the algorithms below are recorded in Singmaster notation:
Algorithm | Number of turns under: | ||
---|---|---|---|
HTM | QTM | STM | |
20 | 28 | 19 | |
22 | 24 | 22 | |
22 | 32 | 16 | |
36 | 36 | 24 |
It has been shown that the shortest path between a solved cube and the superflip requires 20 moves under HTM (the first algorithm is one such example), and that no position requires more moves. Contrary to popular belief, however, the superflip is not unique in this regard: there are many other positions that also require 20 moves.
Under the more restrictive QTM, the superflip requires at least 24 moves (the second algorithm above is one such sequence), and is not maximally distant from the solved state. Instead, when superflip is composed with the "four-dot" or "four-spot" position, in which four faces have their centres exchanged with the centres on the opposite face, the resulting position requires 26 moves under QTM.
Under STM, the superflip requires at least 16 moves (as shown by the third algorithm).
The last solution in the table is not optimal under any metric, but is both easiest to learn and fastest to do for humans, as the sequence of moves is very repetitive.
See also
References
- Rokicki, Tomas. "God's Number is 20". Cube 20.
- "Pretty Patterns Rubik's Cube". www.randelshofer.ch.
- Rokicki, Tomas. "God's Number is 26 in the Quarter-Turn Metric". Cube 20.
Further reading
- David Joyner (2008). Adventures in Group Theory: Rubik's Cube, Merlin's Machine, and Other Mathematical Toys. JHU Press. pp. 75, 99–101, 149. ISBN 978-0801897269.
- David Singmaster (1981). Notes on Rubik's Magic Cube. Enslow Publishers. pp. 28, 31, 35, 48, 52–53, 60.
- Stefan Pochmann (2008-03-29), Analyzing Human Solving Methods for Rubik's Cube and similar Puzzles (PDF), pp. 16–17, archived from the original (PDF) on 2014-11-09
Rubik's Cube | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Puzzle inventors | |||||||||||||||
Rubik's Cubes | |||||||||||||||
Variations of the Rubik's Cube | |||||||||||||||
Other cubic combination puzzles | |||||||||||||||
Non-cubic combination puzzles |
| ||||||||||||||
Virtual combination puzzles (>3D) | |||||||||||||||
Derivatives | |||||||||||||||
Renowned solvers |
| ||||||||||||||
Solutions |
| ||||||||||||||
Mathematics | |||||||||||||||
Official organization | |||||||||||||||
Related articles |