Search: id:A104237
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%I A104237
%S A104237 1,2,5,11,26,53,104,198,375,700,1299,2401,4432,8167,15038,27676,50925,
%T A104237 93686,172337,316999,583078,1072473,1972612,3628226,6673379,12274288,
%U A104237 22575967,41523709,76374044,140473803,258371642
%V A104237 1,-2,5,-11,26,-53,104,-198,375,-700,1299,-2401,4432,-8167,15038,-27676,
               50925,-93686,
%W A104237 172337,-316999,583078,-1072473,1972612,-3628226,6673379,-12274288,22575967,
               -41523709,
%X A104237 76374044,-140473803,258371642
%N A104237 G.f. (1+x^2-x^3+4x^4-3x^5+2x^6)/((x^5-x^4+2x^3+x+1)(x-1)(x+1)^2).
%C A104237 A floretion-generated sequence involving Tribonacci numbers. Formula 
               for the g.f. provided by Alec Mihailovs. See sequence A104187 for 
               the sequence generated without using a cyclic transformation (i->
               j, j->k, k->i), i.e. 1lesforrokseq (refer to FAMP Code).
%H A104237 <a href="Sindx_Rea.html#recLCC">Index entries for sequences related to 
               linear recurrences with constant coefficients</a>
%o A104237 Floretion Algebra Multiplication Program, FAMP Code: 1lesforcycrokseq[A*B} 
               with A = - .5'ii' + .5'jj' + .5'kk' + .5e and B = + 'kj'. 1vesforcycrokseq[A*B] 
               = A000004. ForType: 1A.
%Y A104237 Cf. A104187.
%Y A104237 Sequence in context: A001432 A127075 A053429 this_sequence A085945 A005469 
               A159929
%Y A104237 Adjacent sequences: A104234 A104235 A104236 this_sequence A104238 A104239 
               A104240
%K A104237 sign
%O A104237 0,2
%A A104237 Creighton Dement (creighton.k.dement(AT)uni-oldenburg.de), Apr 02 2005

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