[2] In both of these antimagic squares of order 4, the rows, columns and diagonals sum to ten different numbers in the range 29–38.
[2] In the antimagic square of order 5 on the left, the rows, columns and diagonals sum up to numbers between 60 and 71.
[2] In the antimagic square on the right, the rows, columns and diagonals add up to numbers in the range 59–70.
[3] If the diagonals are included in the set of consecutive integers, the array is known as a sparse totally anti-magic square (STAM).
[4] (Thus, they are the relaxation in which no particular values are required for the row, column, and diagonal sums.)