%I A010856
%S A010856 17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,
%T A010856 17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,
%U A010856 17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17,17
%N A010856 Constant sequence.
%C A010856 Consider,from n^2-2=A008865,period 9:repeat 8,2,7,5,5,7,2,8,7=submitted 
               A152179. a(n)=A152179(3n)+A152179(3n+1)+A152179(3n+2). [From Paul 
               Curtz (bpcrtz(AT)free.fr), Nov 28 2008]
%C A010856 If A=[A158252] 289*n.^2-2*n (n>0, 287, 1152, 2595, ,.,); Y=[A010856] 
               17 (17, 17, 17 ,.,); X=[A158253] 289*n-1 (n>0, 288, 577, 866, .,), 
               we have, for all terms, Pell's equation X^2-A*Y^2=1. Example: 288^2-287*17^2=1; 
               577^2-1152*17^2=1; 866^2-2595*17^2=1. [From Vincenzo Librandi (vincenzo.librandi(AT)tin.it), 
               Mar 15 2009]
%C A010856 If A=[A158254] 289*n.^2+2*n (n>0, 291, 1160, 2607, ,.,); Y=[A010856] 
               17 (17, 17, 17 ,.,); X=[A158255] 289*n+1 (n>0, 290, 579, 868, .,), 
               we have, for all terms, Pell's equation X^2-A*Y^2=1. Example: 290^2-291*17^2=1; 
               579^2-1160*17^2=1; 868^2-2607*17^2=1. [From Vincenzo Librandi (vincenzo.librandi(AT)tin.it), 
               Mar 15 2009]
%H A010856 Tanya Khovanova, <a href="http://www.tanyakhovanova.com/RecursiveSequences/
               RecursiveSequences.html">Recursive Sequences</a>
%Y A010856 Cf. A158252, A158253 [From Vincenzo Librandi (vincenzo.librandi(AT)tin.it), 
               Mar 15 2009]
%Y A010856 Cf. A158254, A158255 [From Vincenzo Librandi (vincenzo.librandi(AT)tin.it), 
               Mar 15 2009]
%Y A010856 Sequence in context: A082123 A050256 A102423 this_sequence A060360 A081702 
               A040273
%Y A010856 Adjacent sequences: A010853 A010854 A010855 this_sequence A010857 A010858 
               A010859
%K A010856 nonn
%O A010856 0,1
%A A010856 N. J. A. Sloane (njas(AT)research.att.com).