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#22 by N. J. A. Sloane at Thu Jan 30 21:29:18 EST 2020
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D-finite with recurrence: n*a(n) +6*(-288*n+289)*a(n-1)=0. - R. J. Mathar, Jan 17 2020
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Discussion
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| Thu Jan 30
| 21:29
| OEIS Server: https://oeis.org/edit/global/2847
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#21 by R. J. Mathar at Fri Jan 17 13:17:12 EST 2020
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#20 by R. J. Mathar at Fri Jan 17 13:17:09 EST 2020
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D-finite: n*a(n) +6*(-288*n+289)*a(n-1)=0. - R. J. Mathar, Jan 17 2020
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approved
editing
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#19 by Vaclav Kotesovec at Sat Jun 16 03:23:34 EDT 2018
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#18 by Vaclav Kotesovec at Sat Jun 16 03:23:29 EDT 2018
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a(n) ~ -2^(6*n - 5) * 3^(3*n - 2) / (Gamma(287/288) * n^(289/288)). - Vaclav Kotesovec, Jun 16 2018
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approved
editing
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#17 by Alois P. Heinz at Fri Jun 15 09:02:42 EDT 2018
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#16 by Seiichi Manyama at Fri Jun 15 07:32:18 EDT 2018
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#15 by Seiichi Manyama at Fri Jun 15 07:32:15 EDT 2018
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a(n) = 6^n/n! * productProduct_{k=0..n-1} (288*k - 1) for n > 0.
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proposed
editing
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#14 by Seiichi Manyama at Fri Jun 15 07:30:27 EDT 2018
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#13 by Seiichi Manyama at Fri Jun 15 07:30:18 EDT 2018
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(PARI) N=9920; x='x+O('x^N); Vec((1-1728*x)^(1/288))
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approved
editing
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Discussion
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| Fri Jun 15
| 07:30
| Seiichi Manyama: Minor edit.
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