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Search: id:A111451
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| A111451 |
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Number of partitions of P where P=(5*n + 1) if n is even and P=((5*n + 1)/2) if n is odd. |
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+0
2
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| 1, 3, 56, 22, 792, 101, 6842, 385, 44583, 1255, 239943, 3718, 1121505, 10143, 4697205, 26015, 18004327, 63261, 64112359, 147273, 214481126, 329931, 679903203, 715220, 2056148051, 1505499, 5964539504, 3087735, 16670689208
(list; graph; listen)
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OFFSET
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0,2
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EXAMPLE
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If n=12 then P(5*n + 1) = 1121505.
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MATHEMATICA
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Table[ PartitionsP@If[EvenQ[n], 5n + 1, (5n + 1)/2], {n, 0, 30}] (* Robert G. Wilson v *)
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PROGRAM
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(MuPAD): for n from 1 to 20 do if n/2 = trunc(n/2) then a := 5*n+1; end_if; if n/2 <> trunc(n/2) then a := (5*n+1)/2; end_if; print(combinat::partitions::count(a)); end_for; (Steinerberger)
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CROSSREFS
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Cf. A111329.
Sequence in context: A110058 A083869 A119188 this_sequence A070731 A132489 A051227
Adjacent sequences: A111448 A111449 A111450 this_sequence A111452 A111453 A111454
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KEYWORD
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nonn
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AUTHOR
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Parthasarathy Nambi (PachaNambi(AT)yahoo.com), Nov 14 2005
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EXTENSIONS
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More terms from Robert G. Wilson v (rgwv(at)rgwv.com) and Stefan Steinerberger (hansibal(AT)hotmail.com), Nov 15 2005
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