-
giving these subsquares dimensions of 2.5' of
latitude by 5' of longitude. The
letters used are "A"
through "X". The
resulting Maidenhead subsquare locator...
-
containing the
numbers 1 to n2 with two
additional properties: Each 2 × 2
subsquare sums to 2s,
where s = n2 + 1. All
pairs of
integers distant n/2 along...
-
contained only the
numbers 1–9, but did not mark the
subsquares.
Although they were unmarked, each 3×3
subsquare did
indeed comprise the
numbers 1–9, and the...
-
congruent subsquares in a 3-by-3 grid, and the
central subsquare is removed. The same
procedure is then
applied recursively to the
remaining 8
subsquares, ad...
-
magic subsquare will have the same
magic constant. Let n be the
order of the main
square and m the
order of the
equal subsquares. The
subsquares are filled...
- method)
complete the
individual magic squares of odd
order 2k + 1 in
subsquares A, B, C, D,
first filling up the sub-square A with the
numbers 1 to n2/4...
-
squares must be
translationally symmetric to the form
Since each 2 × 2
subsquare sums to the
magic constant, 4 × 4
pandiagonal magic squares are most-perfect...
- a
square and then (deterministically)
interpreting a
relatively large subsquare as the more
probable outcome. A
distinction is
generally made between...
-
imposes the
additional restriction that nine
particular 3×3
adjacent subsquares must also
contain the
digits 1–9 (in the
standard version). See also Mathematics...
- a
partial transversal of
order at
least n − 1.
Describe how all
Latin subsquares in
multiplication tables of
Moufang loops arise. Proposed: by Aleš Drápal...
