V-Cube 6

The puzzle consists of 152 pieces ("cubies") on the surface. There are also 66 pieces (60 movable, 6 fixed, and a central "spider" frame) entirely hidden within the interior of the cube. The V-Cube 7 uses essentially the same mechanism, except that on the latter these hidden pieces (corresponding to the center rows) are made visible.^[1]

There are 96 center pieces which show one color each, 48 edge pieces which show two colors each, and eight corner pieces which show three colors. Each piece (or quartet of edge pieces) shows a unique color combination, but not all combinations are present (for example, there is no edge piece with both red and orange sides, since red and orange are on opposite sides of the solved Cube). The location of these cubes relative to one another can be altered by twisting the layers of the Cube 90°, 180° or 270°, but the location of the colored sides relative to one another in the completed state of the puzzle cannot be altered: it is fixed by the distribution of color combinations on the edge and corner pieces.

The V-Cube 6 is produced with white plastic as a base, with red opposite orange, blue opposite green, and yellow opposite black. One center piece is branded with the letter V. Verdes also sells a version with black plastic and a white face, with the other colors remaining the same.

Unlike the rounded V-Cube 7, the original V-Cube 6 has flat faces. The outermost pieces are slightly wider than those in the center. This subtle difference allows the use of a thicker stalk to hold the corner pieces to the internal mechanism, thus making the puzzle more durable. The original V-Cube 6 incorporates a clicking mechanism designed to keep the hidden middle layer in alignment with the rest of the pieces. The V-Cube 6b, with the same pillowed shape as the V-Cube 7, was introduced later with a modified internal mechanism.

There are 8 corners, 48 edges and 96 centers.

Any permutation of the corners is possible, including odd permutations. Seven of the corners can be independently rotated, and the orientation of the eighth depends on the other seven, giving 8!×3⁷ combinations.

There are 96 centers, consisting of four sets of 24 pieces each. Within each set there are four centers of each color. Centers from one set cannot be exchanged with those from another set. Each set can be arranged in 24! different ways. Assuming that the four centers of each color in each set are indistinguishable, the number of permutations is reduced to 24!/(24⁶) arrangements. The reducing factor comes about because there are 24 (4!) ways to arrange the four pieces of a given color. This is raised to the sixth power because there are six colors. The total number of center permutations is the permutations of a single set raised to the fourth power, 24!⁴/(24²⁴).

There are 48 edges, consisting of 24 inner and 24 outer edges. These cannot be flipped, due to the internal shape of the pieces, nor can an inner edge exchange places with an outer edge. The four edges in each matching quartet are distinguishable, since corresponding edges are mirror images of each other. Any permutation of the edges in each set is possible, including odd permutations, giving 24! arrangements for each set or 24!² total, regardless of the position or orientation of any other pieces.

Assuming the cube does not have a fixed orientation in space, and that the permutations resulting from rotating the cube without twisting it are considered identical, the number of permutations is reduced by a factor of 24. This is because the 24 possible positions and orientations of the first corner are equivalent because of the lack of fixed centers. This factor does not appear when calculating the permutations of N×N×N cubes where N is odd, since those puzzles have fixed centers which identify the cube's spatial orientation.

This gives a total number of permutations of

${\displaystyle {\frac {8!\times 3^{7}\times 24!^{6}}{24^{25}}}\approx 1.57\times 10^{116}}$

The entire number is 157 152 858 401 024 063 281 013 959 519 483 771 508 510 790 313 968 742 344 694 684 829 502 629 887 168 573 442 107 637 760 000 000 000 000 000 000 000 000 (around 157 novemdecillion on the long scale or 157 septentrigintillion on the short scale).^[2]

One of the center pieces is marked with a V, which distinguishes it from the other three in its set. This increases the number of patterns by a factor of four to 6.29×10¹¹⁶, although any of the four possible positions for this piece could be regarded as correct.

There are numerous ways to solve the V-Cube 6. Some of the popular ones are given below.

The world record for single solve is 57.69 seconds, set by Max Park of the United States at Burbank Big Cubes 2025 in Burbank, California.^[3]

The world record for mean of three solves is 1 minute, 5.04 seconds, also set by Max Park of the United States at Nub Open Trabuco Hills Fall 2025 in Mission Viejo, California, with times of 1:04.60, 1:04.80, and 1:05.73.^[3]

Top 10 solvers by single solve

^[4]

More information Rank, Name ...

Rank	Name	Result	Competition
1	Max Park	57.69s	Burbank Big Cubes 2025
2	Seung Hyuk Nahm (남승혁)	1:00.40	Seoul Winter 2026
3	Tymon Kolasiński	1:00.80
4	Lim Hung (林弘)	1:02.16	MYHM HaNxNoi 2026
5	Timofei Tarasenko	1:02.36
5	Ziyu Wu (吴子钰)	1:03.30	Guangzhou Big Cubes 2025
6	Henry Lichner	1:03.43	Rubik's WCA World Championship 2025
7	Emmanuel Kao	1:03.91	Singapore Warm Up January 2026
8	Ciarán Beahan	1:06.19	Lets Go Carlow 2026
9	Đỗ Quang Hưng	1:05.66	MYHM HaNxNoi 2026

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Top 10 solvers by mean of three solves

^[5]

More information Rank, Name ...

Rank	Name	Result	Competition	Times
1	Max Park	1:05.04	Nub Open Trabuco Hills Fall 2025	1:04.60, 1:04.80, 1:05.73
2	Timofei Tarasenko	1:06.37	MYHM HaNxNoi 2026	1:07.29, 1:02.36, 1:09.47
3	Seung Hyuk Nahm (남승혁)	1:06.46	Daegu Cold Winter 2024	1:08.52, 1:02.67, 1:08.18
4	Tymon Kolasiński	1:06.98	Polish Championship 2025	1:08.80, 1:02.12, 1:10.01
5	Đỗ Quang Hưng	1:07.77	NxN in Hanoi 2025	1:07.83, 1:07.88, 1:07.60
6	Ziyu Wu (吴子钰)	1:09.27	Guangzhou Big Cubes 2025	1:11.11, 1:03.30, 1:13.39
7	Ciarán Beahan	1:09.67	Manchester 5x5 Day 2025	1:10.68, 1:10.11, 1:08.23
8	Lim Hung (林弘)	1:09.82	MYHM HaNxNoi 2026	1:16.29, 1:11.02, 1:02.16
9	Henry Lichner	1:10.64	Machesney Park Fall 2025	1:10.76, 1:15.76, 1:05.39
10	Emmanuel Kao	1:11.85	Singapore Megaland July 2025	1:18.74, 1:06.80, 1:10.02

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• In the movie Snowden, a 6×6×6 cube, specifically a V-Cube 6, is seen, along with the standard Rubik's Cube and its variants in Hank Forrester's puzzle collection.^[6]

• Pocket Cube (2×2×2)
• Rubik's Cube (3×3×3)
• Rubik's Revenge (4×4×4)
• Professor's Cube (5×5×5)
• V-Cube 7 (7×7×7)
• V-Cube 8 (8×8×8)
• Combination puzzles