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Pi Calculated To Record 2.5 Trillion Digits

Posted by samzenpus on from the almost-there dept.

Joshua writes "Researchers from Japan have calculated Pi to over 2.5 trillion decimals using the T2K Open Supercomputer (which is currently ranked 47th in the world according to a June, 2009 report from Top500.org). This new number more than doubles the previous record of about 1.2 trillion decimals set in 2002 by another Japanese research team. Unfortunately, there still seems to be no pattern."

3 of 432 comments (clear)

  1. Re:Well... by Antique+Geekmeister · · Score: 5, Interesting

    Of course there's a pattern, even a simple and elegant one. It's equal to:

    4 * (1 -1/3 + 1/5 -1/7 +1/9 -1/11 +1/13 -1/15 etc., etc., etc.)

    Just because the pattern doesn't come out pretty in a decimal representation doesn't mean it's not elegant or not a pattern.

  2. Re:Well... by telso · · Score: 5, Interesting

    I always found the Basel problem to be the most elegant converging series involving pi (being the square root of six times the sum of the reciprocals of the squares), probably because there are so many (elegant) proofs of this (pdf), because it's so simple to understand yet not so simple to prove on a cursory inspection, and because it's the specific case that generalized to one of the most important unsolved problems in mathematics.

  3. Re:I've got an even more simple pattern by LUH+3418 · · Score: 5, Interesting

    Well, I'm not a mathematician, but it seems to me that's precisely why there isn't a repetitive pattern in the numerical representation. If there was, that would mean the ratio can be exactly defined by a finite amount of information. It seems to me that asking for a finite decimal represensation of pi is similar to asking someone to exactly represent a circle out of line segments (or to exactly define a circle using a finite set of points). The circumference of the circle is the sum of the length of line segments delineating the circle. The problem is that you need infinitely many of them to exactly define the circle.