%I A114331
%S A114331 4,6,10,12,14,18,22,26,30,34,38,42,46,51,58,60,62,69,72,74,82,86,94,
%T A114331 99,102,106,108,111,122,129,134,138,146,150,155,158,166,172,178,180,
%U A114331 183,192,194,198,206,218,226,228,232,237,240,249,254,262,267,270
%N A114331 Observe that A052248(n) = greatest prime divisor q (say) of all composite 
               numbers between p = prime(n) and next prime. There is only one composite 
               number in this range which is divisible by q. Sequence lists these 
               composite numbers.
%C A114331 The uniqueness follows from generalization of Bertrand's Postulate. - 
               Franklin T. Adams-Watters.
%H A114331 Leroy Quet, <a href="http://www.prism-of-spirals.net/">Home Page</a> 
               (listed in lieu of email address)
%H A114331 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               BertrandsPostulate.html">Bertrand's Postulate</a>
%Y A114331 Cf. A052248, A114349.
%Y A114331 Sequence in context: A120351 A137230 A134333 this_sequence A102070 A026402 
               A036438
%Y A114331 Adjacent sequences: A114328 A114329 A114330 this_sequence A114332 A114333 
               A114334
%K A114331 nonn
%O A114331 2,1
%A A114331 N. J. A. Sloane (njas(AT)research.att.com), based on correspondence from 
               Leroy Quet and Hugo Pfoertner, Feb 22 2006