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 A084644 #20 Jul 06 2023 17:50:58 %S A084644 2,3,4,7,19,37,55,85,121,147,148,150,151,187,188,190,191,192,193,198, %T A084644 199,235,241,264,267,269,270,291,292,293,294,295,343,346,347,348,349, %U A084644 408,409,412,414,415,417,418,419,420,421,481,499,564,565,649,689,690,721 %N A084644 Best packings of m>1 equal circles into a larger circle setting a new density record. %C A084644 Sequence terms for n>5 are only conjectures. The arrangement of 37 circles consists of one central circle surrounded by 3 rings of 6,12 and 18 circles. For n=7, 49 of the 55 circles are arranged in a rigid hexagonal lattice with 6 "rattlers" inserted in gaps at the circumference. %D A084644 List of references given by E. Specht; see corresponding link. %H A084644 Robert G. Wilson v, <a href="/A084644/b084644.txt">Table of n, a(n) for n = 1..85</a> %H A084644 Jerry Donovan, <a href="http://web.archive.org/web/20040216031401/http://home.att.net/~donovanhse/Packing/index.html">Packing Circles in Squares and Circles Page.</a> %H A084644 Hugo Pfoertner, <a href="http://www.randomwalk.de/sequences/a084618.pdf">Minimum area of circle needed to cover n circles of area 1</a> %H A084644 E. Specht, <a href="http://hydra.nat.uni-magdeburg.de/packing/cci/cci.html">The best known packings of equal circles in the unit circle</a> %H A084644 E. Specht, <a href="http://web.archive.org/web/20121025181955/http://hydra.nat.uni-magdeburg.de/packing/cci/txt/records.txt">The sequence of N's that establish density records</a> - provides continuation of the sequence. %e A084644 a(4)=7 because the density 0.7777.. of the best packing of 7 circles (1 central circle surrounded by 6 neighbors) exceeds the density 0.68629.. of the packing of 4 circles arranged in a square. %Y A084644 Cf. A051657 (density records for circles packed into square), A084618, A023393. %K A084644 nonn %O A084644 1,1 %A A084644 _Hugo Pfoertner_, Jun 01 2003 %E A084644 More terms from _Robert G. Wilson v_, Nov 07 2012