Perfect magic cube explained

In mathematics, a perfect magic cube is a magic cube in which not only the columns, rows, pillars, and main space diagonals, but also the cross section diagonals sum up to the cube's magic constant.[1] [2] [3]

Perfect magic cubes of order one are trivial; cubes of orders two to four can be proven not to exist,[4] and cubes of orders five and six were first discovered by Walter Trump and Christian Boyer on November 13 and September 1, 2003, respectively.[5] A perfect magic cube of order seven was given by A. H. Frost in 1866, and on March 11, 1875, an article was published in the Cincinnati Commercial newspaper on the discovery of a perfect magic cube of order 8 by Gustavus Frankenstein. Perfect magic cubes of orders nine and eleven have also been constructed.The first perfect cube of order 10 was constructed in 1988 (Li Wen, China).

An alternative definition

In recent years, an alternative definition for the perfect magic cube was proposed by John R. Hendricks. By this definition, a perfect magic cube is one in which all possible lines through each cell sum to the magic constant. The name Nasik magic hypercube is another, unambiguous, name for such a cube. This definition is based on the fact that a pandiagonal magic square has traditionally been called 'perfect', because all possible lines sum correctly.[6]

This same reasoning may be applied to hypercubes of any dimension. Simply stated; in an order m magic hypercube, if all possible lines of m cells sum to the magic constant, the hypercube is perfect. All lower dimension hypercubes contained in this hypercube will then also be perfect. This is not the case with the original definition, which does not require that the planar and diagonal squares be a pandiagonal magic cube. For example, a magic cube of order 8 has 244 correct lines by the old definition of "perfect", but 832 correct lines by this new definition.

The smallest perfect magic cube has order 8, and none can exist for double odd orders.

Gabriel Arnoux constructed an order 17 perfect magic cube in 1887. F.A.P.Barnard published order 8 and order 11 perfect cubes in 1888.[7]

By the modern (given by J.R. Hendricks) definition, there are actually six classes of magic cube; simple magic cubes, pantriagonal magic cubes, diagonal magic cubes, pantriagonal diagonal magic cubes, pandiagonal magic cubes, and perfect magic cubes.

Examples

1. Order 4 cube by Thomas Krijgsman, 1982; magic constant 130.[8]

32
5 52 41
3 42 31 54
61 24 33 12
34 59 14 23
10
35 22 63
37 64 9 20
27 2 55 46
56 29 44 1
49
28 45 8
30 7 50 43
36 57 16 21
15 38 19 58
39
62 11 18
60 17 40 13
6 47 26 51
25 4 53 48

2. Order 5 cube by Walter Trump and Christian Boyer, 2003-11-13; magic constant 315.

25
16 80 104 90
115 98 4 1 97
42 111 85 2 75
66 72 27 102 48
67 18 119 106 5
91
77 71 6 70
52 64 117 69 13
30 118 21 123 23
26 39 92 44 114
116 17 14 73 95
47
61 45 76 86
107 43 38 33 94
89 68 63 58 37
32 93 88 83 19
40 50 81 65 79
31
53 112 109 10
12 82 34 87 100
103 3 105 8 96
113 57 9 62 74
56 120 55 49 35
121
108 7 20 59
29 28 122 125 11
51 15 41 124 84
78 54 99 24 60
36 110 46 22 101

See also

References

External links

Notes and References

  1. Web site: Perfect Magic Cube. W.. Weisstein, Eric. mathworld.wolfram.com. en. 2016-12-04.
  2. Web site: Perfect Magic Cubes of Order 4m. Alspach. Brian. Brian Alspach. Heinrich. Katherine. Katherine Heinrich . December 3, 2016.
  3. Book: Weisstein, Eric W.. CRC Concise Encyclopedia of Mathematics, Second Edition. 2002-12-12. CRC Press. 9781420035223. en.
  4. Book: Pickover, Clifford A.. The Zen of Magic Squares, Circles, and Stars: An Exhibition of Surprising Structures across Dimensions. 2011-11-28. Princeton University Press. 978-1400841516. en.
  5. Web site: Perfect Magic Cubes. www.trump.de. 2016-12-04.
  6. Web site: Magic Cubes Index Page. www.magic-squares.net. 2016-12-04.
  7. Web site: Magic Cube Timeline. www.magic-squares.net. 2016-12-04.
  8. Web site: Archived copy . 28 January 2012 . 4 March 2016 . https://web.archive.org/web/20160304034747/http://www.pythagoras.nu/pyth/nummer.php?id=253 . dead .