Search: id:A072557
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%I A072557
%S A072557 5,11,16,17,18,23,29,34,35,36,41,47,52,53,54,59,65,70,71,72,77,83,88,
%T A072557 89,90,95,101,106,107,108,113,119,124,125,126,131,137,142,143,144,149,
%U A072557 155,160,161,162,167,173,178,179,180,185,191,196,197,198,203,209,214
%N A072557 Let w(n) be defined by the following recurrence: w(1)=w(2)=w(3)=1, w(n)=(w(n-1)*w(n-2)+(w(n-1)+w(n-2))/
               3) / w(n-3); sequence gives values of n such that w(n) is an integer.
%C A072557 Denominators of w(k) are = 1,3 or 9 only.
%F A072557 lim n -> infinity a(n)/n = 18/5. sequence contains numbers of form (5+18k), 
               (11+18k), (16+18k), (17+18k), (18+18k) k>=0.
%e A072557 First 11 values of w(n) are 5/3, 23/9, 17/3, 31/3, 25, 143/3, 353/3, 
               2039/9, 1685/3, 3251/3, 2689 which are integers fo k= 5 and 11 hence 
               a(1)=5 a(2)=11
%Y A072557 Cf. A072560, A072561.
%Y A072557 Sequence in context: A137010 A137007 A137012 this_sequence A035108 A022136 
               A042385
%Y A072557 Adjacent sequences: A072554 A072555 A072556 this_sequence A072558 A072559 
               A072560
%K A072557 nonn
%O A072557 1,1
%A A072557 Benoit Cloitre (benoit7848c(AT)orange.fr), Aug 06 2002

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