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Revision History for A276594

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Showing entries 1-10 | older changes

A276594

Numerator of the rational part of the sum of reciprocals of even powers of even numbers, i.e., Sum_{k>=1} 1/(2*k)^(2*n).
(history; published version)

#12 by Alois P. Heinz at Sun Jul 16 15:17:59 EDT 2017

STATUS

proposed

approved

#11 by Jon E. Schoenfield at Sun Jul 16 15:07:20 EDT 2017

STATUS

editing

proposed

#10 by Jon E. Schoenfield at Sun Jul 16 15:07:16 EDT 2017

NAME

Numerator of the rational part of the sum of reciprocals of even powers of even numbers, i. e. , Sum_{k>=1..infinity} 1/(2*k)^(2*n).

STATUS

approved

editing

#9 by N. J. A. Sloane at Wed Sep 07 10:50:44 EDT 2016

STATUS

proposed

approved

#8 by Martin Renner at Wed Sep 07 09:13:18 EDT 2016

STATUS

editing

proposed

#7 by Martin Renner at Wed Sep 07 09:12:48 EDT 2016

NAME

Numerator of the rational part of the sum of reciprocals of even powers of even numbers, i. e. Sum_{k=1..infinity}{1/(2*k)^(2*n)}.

#6 by Martin Renner at Wed Sep 07 09:09:33 EDT 2016

KEYWORD

nonn,changed,frac

STATUS

proposed

editing

#5 by Martin Renner at Wed Sep 07 08:50:43 EDT 2016

STATUS

editing

proposed

#4 by Martin Renner at Wed Sep 07 08:49:34 EDT 2016

NAME

Numerator of the rational part of the sum of reciprocals of even powers of even numbers, i. e. sum(1/(2*k)^(2*n),Sum_{k=1..infinity}{1/(2*k)^(2*n)}.

FORMULA

A276592(n)/A276593 (n) + a(n)/A276595 (n) = A046988(n)/A002432(n).

STATUS

proposed

editing

#3 by Martin Renner at Wed Sep 07 07:53:05 EDT 2016

STATUS

editing

proposed

Discussion

Wed Sep 07

08:46

Michel Marcus: see A276592