Trimagic Square
Trimagic squares of orders 12, 32, 64, 81 and 128 have been discovered so far; the only known trimagic square of order 12, given below, was found in June 2002 by German mathematician Walter Trump.
1 | 22 | 33 | 41 | 62 | 66 | 79 | 83 | 104 | 112 | 123 | 144 |
9 | 119 | 45 | 115 | 107 | 93 | 52 | 38 | 30 | 100 | 26 | 136 |
75 | 141 | 35 | 48 | 57 | 14 | 131 | 88 | 97 | 110 | 4 | 70 |
74 | 8 | 106 | 49 | 12 | 43 | 102 | 133 | 96 | 39 | 137 | 71 |
140 | 101 | 124 | 42 | 60 | 37 | 108 | 85 | 103 | 21 | 44 | 5 |
122 | 76 | 142 | 86 | 67 | 126 | 19 | 78 | 59 | 3 | 69 | 23 |
55 | 27 | 95 | 135 | 130 | 89 | 56 | 15 | 10 | 50 | 118 | 90 |
132 | 117 | 68 | 91 | 11 | 99 | 46 | 134 | 54 | 77 | 28 | 13 |
73 | 64 | 2 | 121 | 109 | 32 | 113 | 36 | 24 | 143 | 81 | 72 |
58 | 98 | 84 | 116 | 138 | 16 | 129 | 7 | 29 | 61 | 47 | 87 |
80 | 34 | 105 | 6 | 92 | 127 | 18 | 53 | 139 | 40 | 111 | 65 |
51 | 63 | 31 | 20 | 25 | 128 | 17 | 120 | 125 | 114 | 82 | 94 |
Read more about this topic: Multimagic Square
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“This house was designed and constructed with the freedom of stroke of a foresters axe, without other compass and square than Nature uses.”
—Henry David Thoreau (18171862)