Talk:Polyabolo

Restriction
Does this article mention anything about polyabolos that are limited to 2 of the 3 diabolos inside them?? The 3 kinds of diabolos are:


 * 1) A square
 * 2) A big isosceles triangle
 * 3) An oblique parallelogram

This article talks about all polyabolos, but I think it would be nice to talk about the number of n-polyabolos that contain only the first 2 kinds of diabolos anywhere in them. The sequence in the article starts 1, 3, 4, 14... but the sequence of n-polyabolos with this restriction is 1, 2, 2, What comes next?? Georgia guy (talk) 20:39, 2 March 2013 (UTC)


 * The sequence begins 1, 2, 2, 6, 8, 22, 42, 112, 252, 650, 1584, 4091, 10369, 26938, 69651, 182116, 476272, 1253067, 3302187, 8733551… . —Bkell (talk) 01:02, 3 March 2013 (UTC)