A249524 - OEIS

%I #5 Oct 31 2014 08:16:16

%S 606,1572,4120,10834,28500,74886,196346,515066,1352304,3552428,

%T 9333678,24522392,64420184,169229954,444582618,1168011448,3068677974,

%U 8062255694,21181628238,55649517844,146205759750,384121780036,1009193088634

%N Number of length n+5 0..2 arrays with no six consecutive terms having five times any element equal to the sum of the remaining five

%C Column 2 of A249530

%H R. H. Hardin, <a href="/A249524/b249524.txt">Table of n, a(n) for n = 1..210</a>

%H R. H. Hardin, <a href="/A249524/a249524.txt">Empirical recurrence of order 92</a>

%F Empirical recurrence of order 92 (see link above)

%e Some solutions for n=6

%e ..0....2....2....2....2....0....1....0....2....0....1....2....1....2....1....0

%e ..2....0....1....1....2....2....1....0....0....1....2....1....0....0....0....1

%e ..0....0....0....1....1....0....0....2....1....1....1....1....0....1....0....2

%e ..2....2....2....2....0....1....2....0....2....1....0....1....2....2....1....0

%e ..0....0....1....1....0....1....1....2....0....0....0....0....2....1....2....1

%e ..1....2....2....2....0....0....0....2....0....0....0....0....0....1....1....1

%e ..0....2....1....1....1....0....0....0....2....1....2....1....0....0....1....0

%e ..2....2....2....1....1....1....2....0....2....0....0....0....2....0....2....0

%e ..2....1....1....2....2....0....0....2....2....1....0....2....0....0....2....2

%e ..2....1....0....0....0....2....2....1....2....0....2....2....2....2....2....0

%e ..2....1....1....2....1....0....1....2....0....2....1....2....0....2....2....0

%K nonn

%O 1,1

%A _R. H. Hardin_, Oct 31 2014