Trimagisch 12x12 vierkant
Onderstaand 12x12 magisch vierkant is het kleinste trimagische (= multimagisch-3) vierkant. Trimagisch wil zeggen dat het niet alleen kloppend is als gewoon magisch vierkant, maar ook als je in plaats van de getallen de tweede macht van de getallen (= kwadraat ofwel getal x getal) of de derde macht van de getallen (= getal x getal x getal) invult. Ik heb dit magisch vierkant overgenomen vanuit het boek van Arno van den Essen.
| 870 | 870 | 870 | 870 | 870 | 870 | 870 | 870 | 870 | 870 | 870 | 870 | |||
| 870 | 870 | |||||||||||||
| 870 | 1 | 22 | 33 | 41 | 62 | 66 | 79 | 83 | 104 | 112 | 123 | 144 | ||
| 870 | 9 | 119 | 45 | 115 | 107 | 93 | 52 | 38 | 30 | 100 | 26 | 136 | ||
| 870 | 75 | 141 | 35 | 48 | 57 | 14 | 131 | 88 | 97 | 110 | 4 | 70 | ||
| 870 | 74 | 8 | 106 | 49 | 12 | 43 | 102 | 133 | 96 | 39 | 137 | 71 | ||
| 870 | 140 | 101 | 124 | 42 | 60 | 37 | 108 | 85 | 103 | 21 | 44 | 5 | ||
| 870 | 122 | 76 | 142 | 86 | 67 | 126 | 19 | 78 | 59 | 3 | 69 | 23 | ||
| 870 | 55 | 27 | 95 | 135 | 130 | 89 | 56 | 15 | 10 | 50 | 118 | 90 | ||
| 870 | 132 | 117 | 68 | 91 | 11 | 99 | 46 | 134 | 54 | 77 | 28 | 13 | ||
| 870 | 73 | 64 | 2 | 121 | 109 | 32 | 113 | 36 | 24 | 143 | 81 | 72 | ||
| 870 | 58 | 98 | 84 | 116 | 138 | 16 | 129 | 7 | 29 | 61 | 47 | 87 | ||
| 870 | 80 | 34 | 105 | 6 | 92 | 127 | 18 | 53 | 139 | 40 | 111 | 65 | ||
| 870 | 51 | 63 | 31 | 20 | 25 | 128 | 17 | 120 | 125 | 114 | 82 | 94 |
| 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | 83810 | |||
| 83810 | 83810 | |||||||||||||
| 83810 | 1 | 484 | 1089 | 1681 | 3844 | 4356 | 6241 | 6889 | 10816 | 12544 | 15129 | 20736 | ||
| 83810 | 81 | 14161 | 2025 | 13225 | 11449 | 8649 | 2704 | 1444 | 900 | 10000 | 676 | 18496 | ||
| 83810 | 5625 | 19881 | 1225 | 2304 | 3249 | 196 | 17161 | 7744 | 9409 | 12100 | 16 | 4900 | ||
| 83810 | 5476 | 64 | 11236 | 2401 | 144 | 1849 | 10404 | 17689 | 9216 | 1521 | 18769 | 5041 | ||
| 83810 | 19600 | 10201 | 15376 | 1764 | 3600 | 1369 | 11664 | 7225 | 10609 | 441 | 1936 | 25 | ||
| 83810 | 14884 | 5776 | 20164 | 7396 | 4489 | 15876 | 361 | 6084 | 3481 | 9 | 4761 | 529 | ||
| 83810 | 3025 | 729 | 9025 | 18225 | 16900 | 7921 | 3136 | 225 | 100 | 2500 | 13924 | 8100 | ||
| 83810 | 17424 | 13689 | 4624 | 8281 | 121 | 9801 | 2116 | 17956 | 2916 | 5929 | 784 | 169 | ||
| 83810 | 5329 | 4096 | 4 | 14641 | 11881 | 1024 | 12769 | 1296 | 576 | 20449 | 6561 | 5184 | ||
| 83810 | 3364 | 9604 | 7056 | 13456 | 19044 | 256 | 16641 | 49 | 841 | 3721 | 2209 | 7569 | ||
| 83810 | 6400 | 1156 | 11025 | 36 | 8464 | 16129 | 324 | 2809 | 19321 | 1600 | 12321 | 4225 | ||
| 83810 | 2601 | 3969 | 961 | 400 | 625 | 16384 | 289 | 14400 | 15625 | 12996 | 6724 | 8836 |
| 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | 9082800 | |||
| 9082800 | 9082800 | |||||||||||||
| 9082800 | 1 | 10648 | 35937 | 68921 | 238328 | 287496 | 493039 | 571787 | 1124864 | 1404928 | 1860867 | 2985984 | ||
| 9082800 | 729 | 1685159 | 91125 | 1520875 | 1225043 | 804357 | 140608 | 54872 | 27000 | 1000000 | 17576 | 2515456 | ||
| 9082800 | 421875 | 2803221 | 42875 | 110592 | 185193 | 2744 | 2248091 | 681472 | 912673 | 1331000 | 64 | 343000 | ||
| 9082800 | 405224 | 512 | 1191016 | 117649 | 1728 | 79507 | 1061208 | 2352637 | 884736 | 59319 | 2571353 | 357911 | ||
| 9082800 | 2744000 | 1030301 | 1906624 | 74088 | 216000 | 50653 | 1259712 | 614125 | 1092727 | 9261 | 85184 | 125 | ||
| 9082800 | 1815848 | 438976 | 2863288 | 636056 | 300763 | 2000376 | 6859 | 474552 | 205379 | 27 | 328509 | 12167 | ||
| 9082800 | 166375 | 19683 | 857375 | 2460375 | 2197000 | 704969 | 175616 | 3375 | 1000 | 125000 | 1643032 | 729000 | ||
| 9082800 | 2299968 | 1601613 | 314432 | 753571 | 1331 | 970299 | 97336 | 2406104 | 157464 | 456533 | 21952 | 2197 | ||
| 9082800 | 389017 | 262144 | 8 | 1771561 | 1295029 | 32768 | 1442897 | 46656 | 13824 | 2924207 | 531441 | 373248 | ||
| 9082800 | 195112 | 941192 | 592704 | 1560896 | 2628072 | 4096 | 2146689 | 343 | 24389 | 226981 | 103823 | 658503 | ||
| 9082800 | 512000 | 39304 | 1157625 | 216 | 778688 | 2048383 | 5832 | 148877 | 2685619 | 64000 | 1367631 | 274625 | ||
| 9082800 | 132651 | 250047 | 29791 | 8000 | 15625 | 2097152 | 4913 | 1728000 | 1953125 | 1481544 | 551368 | 830584 |
Ik heb het geheim van dit magisch vierkant niet kunnen achterhalen, maar ik vond dat dit magisch vierkant niet op mijn website mocht ontbreken.
Zie op deze website bimagisch 8x8, 9x9, 16x16, 25x25 en 32x32 en trimagisch 12x12
