%I A045799
%S A045799 100,10001,10100,11000,100100,1000011,1001001,1001010,1001100,1010010,
%T A045799 1011000,1100001,1100100,1101000,1110000,10101010,11001100,11011000,
%U A045799 11110000,100000111,100001101,100010101,100010110,100011001,100011100
%N A045799 In the list of divisors of n (in binary), each digit 0-1 appears equally 
               often.
%C A045799 E.g. divisors of 10100 are (1, 10, 100, 101, 1010, 10100); the numbers 
               of digits (0-1) are [ 0(9),1(9) ]
%H A045799 N. Nomoto, <a href="http://www.geocities.co.jp/Technopolis/1793/09digit.htm">
               In the list of divisors of n,... </a>
%Y A045799 Cf. A038564, A038565, A045810.
%Y A045799 Sequence in context: A029794 A029801 A098608 this_sequence A096885 A027576 
               A099374
%Y A045799 Adjacent sequences: A045796 A045797 A045798 this_sequence A045800 A045801 
               A045802
%K A045799 easy,nonn,base
%O A045799 1,1
%A A045799 Naohiro Nomoto (6284968128(AT)geocities.co.jp)