%I A152432
%S A152432 1,0,1,1,1,2,2,2,4,5,7,0,8,15,15,26,7,8,35,60,52,109,19,22,55,165,
%T A152432 260,203,500,90,16,110,330,832,1218,877,2485,410,164,70,660,1976,
%U A152432 4466,6139,4140,13262,2075,656,480,870,4264,12180,25433,33120,21147
%V A152432 1,0,1,1,-1,2,2,2,-4,5,7,0,8,-15,15,26,7,-8,35,-60,52,109,19,22,-55,165,
%W A152432 -260,203,500,90,16,110,-330,832,-1218,877,2485,410,164,-70,660,-1976,
%X A152432 4466,-6139,4140,13262,2075,656,480,-870,4264,-12180,25433,-33120,21147
%N A152432 Triangle read by rows, inverse binomial transform of A152432
%C A152432 Row sums = the Bell numbers, A000110: (1, 1, 2, 5, 15, 52, 203,...).
%F A152432 A007318^(-1) * A152432 as infinite lower triangular matrices.
%e A152432 First few rows of the triangle =
%e A152432 1;
%e A152432 0, 1;
%e A152432 1, -1, 2;
%e A152432 2, 2, -4, 5;
%e A152432 7, 0, 8, -15, 15;
%e A152432 26, 7, -8, 35, -60, 52;
%e A152432 109, 19, 22, -55, 165, -260, 203;
%e A152432 500, 90, 16, 110, -330, 832, -1218, 877;
%e A152432 2485, 410, 164, -70, 660, -1976, 4466, -6139, 4140;
%e A152432 13262, 2075, 656, 480, -870, 4264, -12180, 25433, -33120, 21147;
%e A152432 ...
%Y A152432 A152431, A000110
%Y A152432 Sequence in context: A008282 A074765 A029045 this_sequence A057591 A024405 
               A082547
%Y A152432 Adjacent sequences: A152429 A152430 A152431 this_sequence A152433 A152434 
               A152435
%K A152432 tabl,sign
%O A152432 0,6
%A A152432 Gary W. Adamson (qntmpkt(AT)yahoo.com), Dec 04 2008