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Happy Pi day everyone!!
03-14-2019, 10:12 PM
Post: #7
RE: Happy Pi day everyone!!




He uses the solution of the Basel problem and a bunch of his new book to calculate an estimate of \(\pi\):

\(\sum_{n=1}^{\infty }{\frac {1}{n^{2}}}={\frac {\pi^{2}}{6}}\)

BTW: Basel is a town close to Allschwil, as some of you may know.

Cheers
Thomas
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Messages In This Thread
Happy Pi day everyone!! - Namir - 03-14-2019, 12:25 PM
RE: Happy Pi day everyone!! - ttw - 03-14-2019, 12:34 PM
RE: Happy Pi day everyone!! - Dieter - 03-14-2019, 08:09 PM
RE: Happy Pi day everyone!! - Thomas Klemm - 03-14-2019 10:12 PM
RE: Happy Pi day everyone!! - DA74254 - 03-14-2019, 10:34 PM
RE: Happy Pi day everyone!! - mpark - 03-15-2019, 05:11 PM
RE: Happy Pi day everyone!! - EdS2 - 03-16-2019, 07:50 AM
RE: Happy Pi day everyone!! - Carsen - 03-15-2019, 04:31 AM
RE: Happy Pi day everyone!! - Carsen - 03-16-2019, 06:27 AM
RE: Happy Pi day everyone!! - Thomas Okken - 03-17-2019, 12:38 AM
RE: Happy Pi day everyone!! - Thomas Klemm - 03-16-2019, 03:18 PM
RE: Happy Pi day everyone!! - EdS2 - 03-18-2019, 08:07 AM
RE: Happy Pi day everyone!! - ttw - 03-16-2019, 04:23 PM
RE: Happy Pi day everyone!! - Thomas Klemm - 03-16-2019, 05:11 PM
RE: Happy Pi day everyone!! - Thomas Klemm - 03-16-2019, 06:14 PM
RE: Happy Pi day everyone!! - ttw - 03-17-2019, 12:56 AM
RE: Happy Pi day everyone!! - Thomas Klemm - 03-18-2019, 05:40 PM



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