%I A079585
%S A079585 2,3,8,1,9,6,6,0,1,1,2,5,0,1,0,5,1,5,1,7,9,5,4,1,3,1,6,5,6,3,4,3,6,1,8,
%T A079585 8,2,2,7,9,6,9,0,8,2,0,1,9,4,2,3,7,1,3,7,8,6,4,5,5,1,3,7,7,2,9,4,7,3,9,
%U A079585 5,3,7,1,8,1,0,9,7,5,5,0,2,9,2,7,9,2,7,9,5,8,1,0,6,0,8,8,6,2,5,1,5,2,4
%N A079585 Decimal expansion of c = (1/2)*(7-sqrt(5)) = 2.3819660112501...
%D A079585 J.-P. Allouche & J. Shallit, Automatic sequences, Cambridge Univeristy 
               Press, 2003, p 65
%H A079585 Stanley Rabinowitz, <a href="http://www.ams.org/mathscinet-getitem?mr=1651231">
               A note on the sum 1/w_{k2^n}</a>, Missouri J. Math. Sci. vol. 10, 
               no. 3 (1998) pp 141-146.
%H A079585 Weisstein, Eric W., <a href="http://mathworld.wolfram.com/MillinSeries.html"> 
               Millin Series</a>, [From Rick L. Shepherd (rshepherd2(AT)hotmail.com), 
               Aug 13 2009]
%F A079585 c=sum(k>=0, 1/F(2^k) ) where F(k) denotes the k-th Fibonacci number; 
               c=sum(k>=0, 1/A058635(k))
%Y A079585 Cf. A058635.
%Y A079585 c = 4 - A001622 = 7/2 - 10*A020837.
%Y A079585 Sequence in context: A131959 A021046 A138180 this_sequence A058485 A011326 
               A154826
%Y A079585 Adjacent sequences: A079582 A079583 A079584 this_sequence A079586 A079587 
               A079588
%K A079585 cons,nonn
%O A079585 1,1
%A A079585 Benoit Cloitre (benoit7848c(AT)orange.fr), Jan 26 2003