%I A033292
%S A033292 1,2,5,6,9,12,13,16,19,22,23,26,29,32,35,36,39,42,45,48,51,52,55,58,61,
               64,67,
%T A033292 70,71,74,77,80,83,86,89,92,93,96,99,102,105,108,111,114,117,118,121,124,
               127,
%U A033292 130,133,136,139,142,145,146,149,152,155,158,161,164,167,170,173,176,177,
               180
%N A033292 A Connell-like sequence: take 1 number = 1 (mod Q), 2 numbers = 2 (mod 
               Q), 3 numbers = 3 (mod Q), etc., where Q = 3.
%C A033292 Left border of the triangle (1, 2, 6, 13, 23, 36,...) = A143689 = A000326(n) 
               - 3n, where A000326 = the pentagonal numbers, right border. [From 
               Gary W. Adamson (qntmpkt(AT)yahoo.com), Aug 29 2008]
%C A033292 Row sums = A143690: (1, 7, 27, 70, 145, 261, 427, 652,...). [From Gary 
               W. Adamson (qntmpkt(AT)yahoo.com), Aug 29 2008]
%H A033292 Douglas E. Iannucci and Donna Mills-Taylor, <a href="http://www.cs.uwaterloo.ca/
               journals/JIS/index.html">On Generalizing the Connell Sequence</a>
               , J. Integer Sequences, Vol. 2, 1999, #99.1.7.
%H A033292 Gary E. Stevens, <a href="http://www.cs.uwaterloo.ca/journals/JIS/index.html">
               A Connell-Like Sequence</a>, J. Integer Sequences, 1 (1998), #98.1.4.
%Y A033292 Sequence in context: A024516 A055938 A047323 this_sequence A090500 A050487 
               A046962
%Y A033292 Adjacent sequences: A033289 A033290 A033291 this_sequence A033293 A033294 
               A033295
%K A033292 nonn,easy,nice,tabl
%O A033292 0,2
%A A033292 Gary E. Stevens (StevensG(AT)Hartwick.edu)
%E A033292 More terms from jeroen.lahousse(AT)icl.com.