%I #16 Dec 30 2019 12:23:15
%S 3,8,6,8,6,9,7,0,7,4,4,1,2,3,9,1,3,2,6,0,7,4,6,0,6,9,7,4,0,0,5,0,9,7,
%T 4,9,9,7,2,4,8,7,3,2,0,6,8,2,5,0,8,5,3,4,5,3,2,1,6,4,6,2,3,7,5,9,1,7,
%U 5,8,4,0,9,2,1,4,3,6,9,7,4,7,7,8,1,2,9,5,6,0,4,6,1,3,0,1,4,3,1,8,8,8,9,0
%N Decimal expansion of the limit of the n-th continued fraction convergent, A083699(n)/A072999(n), which has the least prime denominator.
%C The first 66 terms of A083698 give over 210 decimals of this constant. - _M. F. Hasler_, Dec 29 2019
%e 0.38686970744123913260746069740050974997248732068250853453216462375917584092...
%o (PARI) my(c=contfracpnqn(A083698)); 1./c[1,1]*c[2,1] \\ Assuming that A083698 is a vector of initial terms of that sequence. - _M. F. Hasler_, Dec 29 2019
%Y Cf. A072999 (prime denominators), A083698 (partial quotients), A083699 (numerators).
%K cons,nonn
%O 0,1
%A _Paul D. Hanna_, May 04 2003
%E Name corrected by _Hugo Pfoertner_, Dec 29 2019