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Search: id:A113689
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| A113689 |
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Number of semiprimes in clumps of size >1 through n^2 in the semiprime spiral. |
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5
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| 0, 0, 0, 2, 6, 9, 13, 17, 21, 23, 30, 36, 44, 53, 58, 71, 77, 82, 91, 103, 119, 124, 126, 148, 166, 182, 185, 201, 221
(list; graph; listen)
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OFFSET
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0,4
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COMMENT
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Write the integers 1, 2, 3, 4, ... in a counterclockwise square spiral. Analogous to Ulam coloring in the primes in the spiral and discovering unexpectedly many connected diagonals, we construct a semiprime spiral by coloring in all semiprimes (A001358). Each integer has 8 adjacent integers in the spiral, horizontally, vertically, and diagonally. Curious extended clumps coagulate, slightly denser towards the origin, of semiprimes connected by adjacency. This sequence, A113689, gives an enumeration of the number of semiprimes in clumps of size >1 through n^2, not looking past the square boundary. A113688 gives isolated semiprimes in the semiprime spiral, namely those semiprimes none of whose adjacent integers in the spiral are semiprimes.
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REFERENCES
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Stein, M. and Ulam, S. M. "An Observation on the Distribution of Primes." Amer. Math. Monthly 74, 43-44, 1967.
Stein, M. L.; Ulam, S. M.; and Wells, M. B. "A Visual Display of Some Properties of the Distribution of Primes." Amer. Math. Monthly 71, 516-520, 1964.
S. M. Ellerstein, The square spiral, J. Recreational Mathematics 29 (#3, 1998) 188; 30 (#4, 1999-2000), 246-250.
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LINKS
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Eric Weisstein's World of Mathematics, "Prime Spiral".
Eric Weisstein's World of Mathematics, "Semiprime."
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EXAMPLE
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a(3) = 2 because there is one visible clump through 3^2 = 9, {4,6}, which two semiprimes are diagonally connected. a(4) = 6 because there are 6 semiprimes in the 2 visible clumps through 4^2 = 16, {4, 6, 14, 15}, {9, 10}. a(5) = 9 because there are 9 semiprimes in the 3 visible clumps through 5^2 = 25, {4, 6, 14, 15}, {9, 10, 25}, {21, 22}.
......................
... 17 16 15 14 13 ...
... 18 5 4 3 12 ...
... 19 6 1 2 11 ...
... 20 7 8 9 10 ...
... 21 22 23 24 25 ...
......................
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CROSSREFS
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Cf. A001107, A001358, A002939, A002943, A004526, A005620, A007742, A033951-A033954, A033988, A033989-A033991, A033996, A063826, A113688.
Sequence in context: A003145 A047276 A054770 this_sequence A020960 A076522 A094111
Adjacent sequences: A113686 A113687 A113688 this_sequence A113690 A113691 A113692
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KEYWORD
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easy,nonn
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AUTHOR
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Jonathan Vos Post (jvospost2(AT)yahoo.com), Nov 05 2005
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