- all 3m
planar arrays must be
panmagic squares. The 6
oblique squares are
always magic.
Several of them may be
panmagic squares. A
proper pandiagonal...
- A
pandiagonal magic square or
panmagic square (also
diabolic square,
diabolical square or
diabolical magic square) is a
magic square with the additional...
-
determine a plane, a circle, and a parabola.
There are only
three distinct 4×4
panmagic squares.
Three of the five
Platonic solids have
triangular faces – the...
- 67 102 57 84 68 94 40 77 50 95 39 85 All most-perfect
magic squares are
panmagic squares.
Apart from the
trivial case of the
first order square, most-perfect...
-
greater degree of 'magic' than is
possible with
numerical types. Thus a
panmagic square is one in
which every diagonal,
including the so-called
broken diagonals...
- constant. They are also
called panmagic squares,
perfect squares,
diabolic squares, Jain squares, or
Nasik squares.
Panmagic squares do not
exist for singly...
-
standard form
Prime reciprocal magic square Trimagic square Multimagic square Panmagic square Satanic square Most-perfect
magic square Geometric magic square...
- type to
qualify for the next class.
Magic hypercube Nasik magic hypercube Panmagic square Space diagonal John R.
Hendricks Frost, Dr. A. H., On the General...
- way to
visualize a
broken diagonal is to
imagine a "ghost image" of the
panmagic square adjacent to the original: The set of
numbers {3, 12, 14, 5} of a...
-
Brett (2007), "Constructing
orthogonal pandiagonal Latin squares and
panmagic squares from
modular n {\displaystyle n} -queens solutions",
Journal of...
