Search: id:A056842 Results 1-1 of 1 results found. %I A056842 %S A056842 1,6,14,64,237,1024,4254,18664,81865 %N A056842 Number of polydrafters: a(n) is the number of polydrafters with n cells. See the Paterson link for the definition. %C A056842 Restatement of the definition: A polydrafter is a polygon formed by joining 30-60-90 triangles, according to the following rules: %C A056842 (a) Two triangles may be joined along their short legs, with their right angles touching; %C A056842 (b) Two triangles may be joined along their long legs, with their right angles touching; %C A056842 (c) Two triangles may be joined along their hypotenuses, in either direction; %C A056842 (d) The short leg of triangle 1 may be joined to half of the hypotenuse of triangle 2, with the right angle of triangle 1 touching the midpoint of the hypotenuse of triangle 2. %D A056842 Ed Pegg, Jr., Polyform puzzles, in Tribute to a Mathemagician, Peters, 2005, pp. 119-125. %H A056842 D. Paterson, Pentominos & Dodecadudes %H A056842 M. Vicher, Polyforms %H A056842 M. Vicher, Tridrafters %H A056842 Eric Weisstein's World of Mathematics, Link to a section of The World of Mathematics. %e A056842 a(3) = 14 because there are 14 tridafters. The second Vicher link shows various arrangements of them. %Y A056842 Sequence in context: A032404 A059954 A139257 this_sequence A130263 A077401 A158965 %Y A056842 Adjacent sequences: A056839 A056840 A056841 this_sequence A056843 A056844 A056845 %K A056842 nonn,more %O A056842 1,2 %A A056842 James A. Sellers (sellersj(AT)math.psu.edu), Aug 28 2000 %E A056842 Edited by David R. Wasserman (wasserma(AT)spawar.navy.mil), Dec 01 2003 Search completed in 0.004 seconds