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#18 by Alois P. Heinz at Thu Nov 16 15:22:33 EST 2017
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#17 by Michel Marcus at Thu Nov 16 12:58:52 EST 2017
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#16 by Michel Marcus at Thu Nov 16 12:58:46 EST 2017
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| EXAMPLE
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where F(x)/x = 1/6 + 5/(6-x)^2 + 5^2/(6-2*x)^3 + 5^3/(6-3*x)^4 + 5^4/(6-4*x)^5 +...
F(x)/x = 1/6 + 5/(6-x)^2 + 5^2/(6-2*x)^3 + 5^3/(6-3*x)^4 + 5^4/(6-4*x)^5 +...
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| STATUS
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proposed
editing
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#15 by G. C. Greubel at Thu Nov 16 12:58:06 EST 2017
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#14 by G. C. Greubel at Thu Nov 16 12:57:55 EST 2017
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| LINKS
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G. C. Greubel, <a href="/A259066/a259066b259066.txt">TITLETable of FORn, a(n) for LINKn = 1..295</a>
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#13 by G. C. Greubel at Thu Nov 16 12:57:05 EST 2017
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| LINKS
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G. C. Greubel, <a href="/A259066/a259066.txt">TITLE FOR LINK</a>
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| STATUS
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approved
editing
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#12 by Vaclav Kotesovec at Fri Jun 19 04:21:33 EDT 2015
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#11 by Vaclav Kotesovec at Fri Jun 19 04:20:48 EDT 2015
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| FORMULA
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a(n) ~ (c/(6*exp(1)))^n * n^(n-1) / (sqrt(c+1) * (c-1)^(2*n-1)), where c = LambertW(6*exp(1)/5). - Vaclav Kotesovec, Jun 19 2015
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#10 by Vaclav Kotesovec at Fri Jun 19 04:20:28 EDT 2015
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| MATHEMATICA
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Rest[CoefficientList[InverseSeries[Series[6*x - 5*x*E^x, {x, 0, 20}], x], x] * Range[0, 20]!] (* Vaclav Kotesovec, Jun 19 2015 *)
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| STATUS
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approved
editing
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#9 by Paul D. Hanna at Thu Jun 18 23:15:00 EDT 2015
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