%I A158469
%S A158469 1,3,189,3,2,2,1,5,4,1,1,3,1,1,1,5,8,12,1,22,7,14,1,2,1,5,1,4,222,1,1,
               2,
%T A158469 3,24,6,27,1,15,1,9,1,1,18,6,24,2,1,7,1,4,2,2,1,1,84,1,1,1,3,1,1,1,1,1,
%U A158469 5,15,3,13,3,2,14,1,1,1,10,15,10,1,6,120,1,31,2,4,2,7,2,2,1,1,1,1,1,3,
               7
%N A158469 Continued fraction for hz = limit_{k->infinity} 1 +k -Sum_{j=-k..k} exp(-2^j).
%F A158469 1.33274738243289922500860109837389970441674398225984453657972 ...
%p A158469 with (numtheory): hz:= limit (1+k -sum (exp (-2^j), j=-k..k), k=infinity): 
               cfrac (evalf (hz, 130), 100, 'quotients')[];
%Y A158469 Cf. A158468 (decimal expansion).
%Y A158469 Sequence in context: A157590 A157236 A058856 this_sequence A032594 A159658 
               A093978
%Y A158469 Adjacent sequences: A158466 A158467 A158468 this_sequence A158470 A158471 
               A158472
%K A158469 cofr,nonn
%O A158469 1,2
%A A158469 Alois P. Heinz (heinz(AT)hs-heilbronn.de), Mar 19 2009