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%I #6 Sep 07 2015 13:20:04
%S 4,1,6,4,15,6,3,10,13,6,11,13,14,12,12,5,10,3,7,2,1,4,4,6,6,1
%N One winning solution (out of 6816) in 15-hole triangular peg solitaire that leaves a peg in the original empty hole (apex).
%C Number hole 1 at the apex of the triangle and thereafter from left to right on the next lower row, etc.
%H G. I. Bell, <a href="https://cs.uwaterloo.ca/journals/JIS/VOL11/Bell/bell2.html">Solving Triangular Peg Solitaire</a>, JIS 11 (2008) 08.4.8
%H <a href="http://www.crackerbarrel.com/games/game_peg/easypeg.html">Peg Game</a>
%e E.g. a(1)=4 and a(2)=1 because peg at hole 4 jumps to hole 1 and peg at hole 2 is removed, etc.
%K fini,full,nonn
%O 1,1
%A _G. L. Honaker, Jr._, Jul 10 2006
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