NEW MAGIC SQUARES WHEEL METHOD - SPOKE SHIFT

Picture of a wheel

How to Spoke Shift 9x9 Magic Squares-(Part D)

A magic square is an arrangement of numbers 1,2,3,... n2 where every row, column and diagonal add up to the same magic sum S and n is also the order of the square. A magic square having all pairs of cells diametrically equidistant from the center of the square and equal to the sum of the first and last terms of the series n2 + 1 is also called associated or symmetric. In addition, the center of this type of square must always contain the middle number of the series, i.e., ½(n2 + 1).

This site introduces a two new methods used for the construction of wheel type squares except that the initial spoke parts are added in a somewhat different manner than in the original wheel method. The first method consists of pairing numbers in complementary fashion, partitioning these complementary pairs into groups, generating in the spoke and then filling in the non spoke cells with the remaining complementary pairs as was done in the original method. The difference between this type of square and the original is that numbers less than or equal to 0 and their complements are can be part of the square. Since the number of cells in an nxn magic squares is n then a complementary pair containing 0 and/or negative numbers are required for generating these type of magic squares.

The second method consists of transposing rows and columns around to generate a magic square where the spoke numbers have been inverted. Method one generates border squares where the internal squares and the external squares are magic. Method 2 produces only one magic square, the external one. The internal squares are all non magic.

In addition, the diagonal pairs are obtained from the complementary table using what I call a "Cross-Over" method shown below. For a square with n = 9, there are 25 sets of pairs. These pairs and their complements make up entries to the diagonal cells. A diagram of the {22,24,26,28} and {27,29,31,33} connectivity is shown below in Figure A.

The new magic squares with n = 9 are constructed as follows using a complimentary table as a guide (where 21 follows 20 on the third line).


0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
 
82 81 80 79 78 77 76 75 74 73 72 71 70 69 68 67 66 65 64 63 62
 
21 22 23 24 25 26 27 28 29 30 3132 33 34 35 36 37 38 39 40
41
61 60 59 58 57 56 55 54 53 52 51 50 49 48 47 46 45 44 43 42
  1. The center column is filled with the group of numbers ½ (n2-n+2) to ½(n2+n) in consecutive order starting at the bottom cell and proceeding to the top cell from the numbers listed in the complementary table described above, for example using n = 9. For a 9x9 square the numbers in the center column correspond to 37 → 38 → 39 → 40 → 41 → 42 → 43 → 44 → 45 starting from the bottom (Square A1).
  2. 24 pairs are left with which to construct the spoke and fill in the non-spoke cells. Table Fa tells us that for n = 9 there are 25 sets that can generate a "Cross-Over" of evenly spaced numbers. The spoke cells are chosen from a group of 25 pairs of evenly spaced numbers. In this exercise we pick the 22nd pair (33 → 31 → 29 → 27) and (22 → 24 → 26 → 28) where the crossover point between (27,28) is the "Cross-Over". The first set (with complements) corresponds to the left diagonal and the second set to the right as shown in Square A2. The numbers 33, 31, 29 and 27 are added, in that order, down to the right and 23, 24, 26 and 28 are added, in that order, up right as shown.
  3. This is followed by adding the pairs {14,15,16,17} to the center row with 0 to the right of 41, adding the next numbers consecutively to the right hand side of the square and finishing of with their complements {65,66,67,68} to the left of 41 (Square A3).
  4. To fill up the rest of the square work with the internal square first, i.e., 5x5 where (2 is paired with 7) and (9 with 10) along with their complements in the same row or column to form Square A4. Note that {9,10} are adjacent on the complementary table while {2,7} are 5 units away.
  5. Fill in the next internal square 7x7 by pairing {3 with 8}, {18 with 23}, {11 with 12}, and {20 with 21}.
  6. Fill in the external square 9x9 by pairing {13 with 19}, {1 with 5}, {25 with 30}, {32 with 36}, {4 with 6},and {34 with 35}. All the complementary pairs are used for this square. The picture below shows the physical connectivity.
  7. The portion of the complementary table (just the top set of numbers since the same applies to the bottom set) showing the connectivity of the non-spoke numbers and the "Cross-Over" is shown as a little red cross is summarized as:

    Picture of a wheel
  8. The result of these operations is a wheel with a shifted spoke where the numbers in the diagonal of the regular wheel 37 → 38 → 39 → 40 → 41 → 42 → 43 → 44 → 45 have been transposed or shifted to a column.
  9. The square that is produced via this method is a border square, since the 3x3 square has an S = 123, the 5x5 has an S = 205, the 7x7 has an S = 287 and the 9x9 has an S = 369. These border squares are shown in Square A6.
A1
45
44
43
42
41
40
39
38
37
A2
33 45 60
31 44 58
29 43 56
27 42 54
41
28 40 55
26 39 53
24 38 51
22 37 49
A3
33 45 60
31 44 58
29 43 56
27 42 54
65 66 67 68 41 14 1516 17
28 40 55
26 39 53
24 38 51
22 37 49
A4
33 45 60
31 44 58
292 43 75 56
10 27 42 54 72
65 66 67 68 41 14 1516 17
7328 40 55 9
26 80 39 7 53
24 38 51
22 37 49
A5
33 45 60
31 318 44 59 74 58
12292 43 75 56 70
2110 27 42 54 72 61
65 66 67 68 41 14 1516 17
627328 40 55 920
7126 80 39 7 53 11
24 79 64 38 238 51
22 37 49
A6
33 13 125 45 5277 63 60
36 31 3 18 4459 74 58 46
412 292 43 75 56 70 78
3521 10 27 42 54 72 6147
65 66 67 68 41 14 1516 17
486273 28 40 55 9 2034
7671 26 80 39 7 53 116
5024 79 64 38 238 51 32
22 69 8157 37 305 19 49
A6 Border
33 13 125 45 5277 63 46
36 31 318 44 59 74 58 46
412 292 43 75 56 70 78
3521 10 27 42 54 72 6147
6566 67 68 41 14 151617
4862 7328 40 55 92034
7671 26 80 39 7 53 116
5024 79 64 38 238 51 32
22 69 8157 37 30 5 19 49
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21
 
81 80 79 78 77 76 75 74 73 72 71 70 69 68 67 66 65 64 63 62 61
 
22 23 24 25 26 27 28 29 30 3132 33 34 35 36 37 38 39 40
41
60 59 58 57 56 55 54 53 52 51 50 49 48 47 46 45 44 43 42

Conversion of the 9x9 into its transposed opposite

Generation of a 9x9 transposed opposite can also follow the route used above. Unfortunately as n > 5 their generation becomes more and more complicated. A method that obviates this is to transpose columns followed by rows. This generates a new square which is not a border square. Only the external square is magic.

  1. Take square A6 and transpose (column 1 with column 4), (column 2 with column 3), (column 6 with column 9) and (column 7 with column 8) to get Square A7.
  2. Take square A7 and transpose (row 1 with row 4), (row 2 with row 3), (row 6 with row 9) and (row 7 with row 8) to get Square A8.
  3. In a sense A6 has been imploded or everted into A8, i.e., A6 and A8 below are opposites.
A6
33 13 125 45 5277 63 60
36 31 3 18 4459 74 58 46
412 292 43 75 56 70 78
3521 10 27 42 54 72 6147
65 66 67 68 41 14 1516 17
486273 28 40 55 9 2034
7671 26 80 39 7 53 116
5024 79 64 38 238 51 32
22 69 8157 37 305 19 49
A7
25 1 1333 45 6063 77 52
18 3 31 36 44 46 58 74 59
229 124 43 78 70 56 75
2710 21 35 42 47 61 7254
6867 66 65 41 17 161514
287362 48 40 34 20 955
8026 71 76 39 6 11 537
6479 24 50 38 3251 8 23
57 81 6922 37 49 195 30
A8
2710 21 35 42 47 61 7254
229 124 43 78 70 56 75
18 3 31 36 44 46 58 74 59
25 1 1333 45 6063 77 52
6867 66 65 41 17 161514
57 81 6922 37 49 195 30
6479 24 50 38 3251 8 23
8026 71 76 39 6 11 537
287362 48 40 34 20 955

The result is a new square conforming to the same complementary table above which obviates the need to go thru the complicared rigmarole of filling in the non-spoke cells which appears to be more difficult to do.

This completes Part D of a 9x9 Magic Square Wheel Spoke Shift method.To go forward to 9x9 Part E.
To go back to 9x9 Part C.
Go back to homepage.


Copyright © 2014 by Eddie N Gutierrez. E-Mail: Fiboguti89@Yahoo.com