%I A119924
%S A119924 3,64,1023,1,62,1,
%T A119924 2956877843716700615054368870306427918994244645704077125294997931159022574838534757,
%U A119924 1,2,122,1,69,1,6,2,4,2,1,2,2,6,1,2,9,1,4,2,3,1,2,2,3,1,1,9,1,1,1,6,1,
               1
%N A119924 Continued fraction expansion of the value of Minkowski's question mark 
               function at Pi.
%C A119924 Due to the unusually large early term, this value is very nearly 3 + 
               (2^16 - 1)/2^22. Decimal expansion given by A119925.
%H A119924 <a href="Sindx_Me.html#MinkowskiQ">Index entries for Minkowski's question 
               mark function</a>
%H A119924 <a href="Sindx_Me.html#MinkowskiQ">Index entries for sequences related 
               to Minkowski's question mark function</a>
%t A119924 ContinuedFraction[(cf = ContinuedFraction[Pi,80(*arbitrary precision*)]; 
               IntegerPart[Pi] + Sum[(-1)^(k)/2^(Sum[cf[[i]], {i, 2, k}] - 1), {k, 
               2, Length[cf]}])]
%Y A119924 Cf. A119925.
%Y A119924 Sequence in context: A092901 A105459 A099338 this_sequence A084883 A112000 
               A012804
%Y A119924 Adjacent sequences: A119921 A119922 A119923 this_sequence A119925 A119926 
               A119927
%K A119924 cofr,nonn
%O A119924 0,1
%A A119924 Joseph Biberstine (jrbibers(AT)indiana.edu), May 29 2006