SRINIVASA RAMANUJAN MAGIC SQUARE
RAMANUJAN was an Indian mathematician who lived during the British Raj though he had almost no formal training in pure mathematics.
During his short life Ramanujan independently complied nearly 3900 results.
Magic square is one of them.
He made a magic square on his birthday date 22 December 1889. In regard to magic sum, the problem of magic squares only requires the sum of each row, column and diagonal to be equal, it does not require the sum to be a particular value. Thus, although magic squares may contain negative integers, they are just variations by adding or multiplying a negative number to every positive integer in the original square.[3][4]
RAMANUJAN was an Indian mathematician who lived during the British Raj though he had almost no formal training in pure mathematics.
During his short life Ramanujan independently complied nearly 3900 results.
Magic square is one of them.
He made a magic square on his birthday date 22 December 1889. In regard to magic sum, the problem of magic squares only requires the sum of each row, column and diagonal to be equal, it does not require the sum to be a particular value. Thus, although magic squares may contain negative integers, they are just variations by adding or multiplying a negative number to every positive integer in the original square.[3][4]
Magic squares are also called normal magic squares, in the sense that there are non-normal magic squares[5] which integers are not restricted in . However, in some places, "magic squares" is used as a general term to cover both the normal and non-normal ones, especially when non-normal ones are under discussion. Moreover, the term "magic squares" is sometimes also used to refer to various types of word squares.
Magic squares have a long history, dating back to at least 650 BC in China. At various times they have acquired magical or mythical significance, and have appeared as symbols in works of art. In modern times they have been generalized a number of ways, including using extra or different constraints, multiplying instead of adding cells, using alternate shapes or more than two dimensions, and replacing numbers with shapes and addition with geometric operations.
My Magic Square Formula
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