This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A241270 #27 Aug 11 2014 22:46:11 %S A241270 126,468,624,792,880,1056,1150,2900,3264,4606,5824,6375,6624,8320, %T A241270 9856,10388,11375,12798,13650,16400,16704,19250,20925,30135,32625, %U A241270 36720,39150,39900,53784,56446,56925,57000,59500,63455,65520,71400,71500,72471 %N A241270 Numbers with the property that in their factorization over distinct terms of A050376, the sums of prime and nonprime terms of A050376 are equal. %C A241270 The corresponding sequence of the sum over the primes, which equals the sum over the nonprimes, is 9, 13, 16, 13, 16, 16, 25, 29, 20, 49, 20, 25, 25, 20, 20, 53, 25, 81, 25, 41, 29, 25, 34, 49, 34, 25, 34, 29, 85, 169, 34, 29, 29, 49, 25, 29, 29, 49, ... - _Wolfdieter Lang_, Apr 25 2014 %D A241270 V. S. Shevelev, Multiplicative functions in the Fermi-Dirac arithmetic, Izvestia Vuzov of the North-Caucasus region, Nature sciences 4 (1996), 28-43 [Russian]. %H A241270 Peter J. C. Moses, <a href="/A241270/b241270.txt">Table of n, a(n) for n = 1..2000</a> %H A241270 S. Litsyn and V. S. Shevelev, <a href="http://www.emis.de/journals/INTEGERS/papers/h33/h33.Abstract.html">On factorization of integers with restrictions on the exponent</a>, INTEGERS: Electronic Journal of Combinatorial Number Theory, 7 (2007), #A33, 1-36. %e A241270 126 and 468 are in the sequence since the factorizations are 2*7*9 and 4*9*13 respectively, and 2+7=9, 4+9=13. %Y A241270 Cf. A187039, A187042, A177329, A177333, A177334. %K A241270 nonn %O A241270 1,1 %A A241270 _Vladimir Shevelev_, Apr 18 2014 %E A241270 More terms from _Peter J. C. Moses_, Apr 18 2014 %E A241270 New extension from _Wolfdieter Lang_, Apr 25 2014