%I A100592
%S A100592 1,8,18,30,43,48,60,72,91,108,132,155,120,144,192,168,216,236,227,180,
%T A100592 320,340,240,252,348,300,324,336,488,484,456,396,614,360,524,548,706,
%U A100592 468,536,656,628,420,624,576,612,588,540,600,648,768,732,800,832,660
%N A100592 Least positive integer that can be represented as the sum of exactly 
               two semiprimes in exactly n ways.
%F A100592 a(n) = min{i such that i = A001358(j) + A001358(k) in n ways}.
%e A100592 a(0) = 1 because 1 is the smallest positive integer that cannot be represented 
               as sum of two semiprimes (since 4 is the smallest semiprime). a(1) 
               = 8 because 8 is the smallest such sum of two semiprimes: 4 + 4. 
               Similarly a(2) = 18 because 18 = 14 + 4 = 9 + 9 where {4,9,14} are 
               semiprimes and there is no third such sum for 18.
%Y A100592 Cf. A001358, A076768, A100570, A072966.
%Y A100592 Sequence in context: A084394 A085248 A092163 this_sequence A028563 A120091 
               A098944
%Y A100592 Adjacent sequences: A100589 A100590 A100591 this_sequence A100593 A100594 
               A100595
%K A100592 easy,nonn
%O A100592 0,2
%A A100592 Jonathan Vos Post (jvospost3(AT)gmail.com), Nov 30 2004