%I A060795
%S A060795 1,2,5,14,42,165,714,3094,14858,79534,447051,2714690,17395070,
%T A060795 114371070,783152070,5708587335,43848093003,342444658094,2803119896185,
%U A060795 23619540863730,201813981102615,1793779293633437,16342050964565645
%N A060795 Write product of first n primes as x*y with x<y and x maximal; sequence 
               gives value of x.
%C A060795 Or, lower central divisor of n-th primorial.
%F A060795 a(n)=A060775[A002110(n)] - Labos E. (labos(AT)ana.sote.hu), Apr 27 2001
%e A060795 n=8: q(8)=2.3.5.7.11.13.17.19=9699690. Its 64th and 65th divisors are 
               {3094,3135}: a(8)=3094 and 3094<A000196(9699690)=3114<3135.
%e A060795 2*3*5*7 = 210 = 14*15 with difference of 1, so a(4) = 14.
%Y A060795 Cf. A061055-A061060, A061030-A061033.
%Y A060795 Cf. A060755, A000196, A033677.
%Y A060795 Sequence in context: A047046 A063545 A061058 this_sequence A071743 A071747 
               A071751
%Y A060795 Adjacent sequences: A060792 A060793 A060794 this_sequence A060796 A060797 
               A060798
%K A060795 nonn
%O A060795 1,2
%A A060795 Labos E. (labos(AT)ana.sote.hu), Apr 27 2001
%E A060795 More terms from Ed Pegg Jr (ed(AT)mathpuzzle.com), May 28 2001
%E A060795 Terms 16 through 37 computed by Jud McCranie (j.mccranie(AT)comcast.net) 
               Apr 15 2000.