Square multimagic
In Mathematical, a square p - multimagic is a magic square which remains magic even if all its numbers are replaced by their K - ième power . Thus, a magic square is bimagic if it is 2-multimagic, and trimagic if it is 3-multimagic.
The first 4-magic square, of order 512, was built in May 2001 by André Viricel and Christian Boyer; then, one month later, in June 2001, Viricel and Boyer presented the first 5-magic square, of order 1024. They also presented a 4-magic square of order 256 in January 2003, and another 5-magic square, of order 729, was built in June 2003 by the Mathématicien Chinese Li Wen.
See too
-
Cubic magic
- Cubic multimagic
External bond
-
multimagie.com
| Random links: | Convention on the European patent | Star TV | Henri Laforest | Bold Albright | Peninsula of Dakhla | Stimuler,_le_Missouri |