%I A008995
%S A008995 4,10,28,96,126,540,906,1150,1360,9586,15726,19660,31468,156006,
%T A008995 360748,370372,492226,1349650,1357332,2010880,4652506,17051886,
%U A008995 20831532,47326912,122164968,189695892,191913030
%N A008995 Increasing length runs of consecutive composite numbers (endpoints).
%D A008995 Netnews group rec.puzzles, circa Mar 01 1996 (I would like to get the 
               exact reference).
%H A008995 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               PrimeGaps.html">Link to a section of The World of Mathematics.</a>
%Y A008995 Cf. A008950, A008996. Also A008995(n) = A000101(n+1)-1.
%Y A008995 Sequence in context: A103457 A083587 A061639 this_sequence A111236 A164361 
               A006907
%Y A008995 Adjacent sequences: A008992 A008993 A008994 this_sequence A008996 A008997 
               A008998
%K A008995 nonn
%O A008995 1,1
%A A008995 Mark Cramer (m.cramer(AT)qut.edu.au). Computed by Dennis Yelle (dennis(AT)netcom.com).