Sum with alternate signs
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02-06-2015, 05:10 PM
(This post was last modified: 02-06-2015 05:17 PM by retoa.)
Post: #5
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RE: Sum with alternate signs
I also tried to decompose it in
\( \sum_{k=1}^{\infty}(\frac{1}{(2k-1)^2}-\frac{1}{(2k)^2}) \) to avoid the (-1)^(k+1), but I did not get the wanted result. Still the Psi(1/2,1) |
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Messages In This Thread |
Sum with alternate signs - salvomic - 02-06-2015, 02:26 PM
RE: Sum with alternate signs - retoa - 02-06-2015, 04:47 PM
RE: Sum with alternate signs - salvomic - 02-06-2015, 04:49 PM
RE: Sum with alternate signs - Gilles - 02-06-2015, 05:08 PM
RE: Sum with alternate signs - salvomic - 02-06-2015, 05:18 PM
RE: Sum with alternate signs - retoa - 02-06-2015 05:10 PM
RE: Sum with alternate signs - parisse - 02-06-2015, 06:55 PM
RE: Sum with alternate signs - salvomic - 02-06-2015, 07:03 PM
RE: Sum with alternate signs - parisse - 02-07-2015, 06:46 AM
RE: Sum with alternate signs - salvomic - 02-07-2015, 10:11 AM
RE: Sum with alternate signs - salvomic - 05-13-2015, 08:09 PM
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