000 02083cam a22002893u 4500
001 2583
003 UtSlPG
005 20260610133100.0
006 m
007 cr n
008 260607r2001||||utu|||||o|||||||||||||| d
040 _aUtSlPG
041 7 _aen
_2iso639-1
050 4 _aQA
100 1 _aPlouffe, Simon,
_d1956-
245 1 4 _aThe Value of Zeta(3) to 1,000,000 places
264 1 _aSalt Lake City, UT :
_bProject Gutenberg,
_c2001
300 _a1 online resource :
_bmultiple file formats
336 _atext
_btxt
_2rdacontent
337 _acomputer
_bc
_2rdamedia
338 _aonline resource
_bcr
_2rdacarrier
500 _aRelease date is 2001-04-01
520 _a"The Value of Zeta(3) to 1,000,000 Places" by Simon Plouffe is a scientific publication likely written in the late 20th century. This work focuses on the mathematical constant Zeta(3), defined as the sum of the inverses of the cubes, and delves into its value computed to an astonishing one million decimal places. The publication provides an in-depth view of the methods and computations involved in deriving this value, showcasing the advancement of mathematical research in this area. The opening of the work introduces the foundational concept of Zeta(3) and highlights its significance in mathematics, particularly in number theory. It reveals the precise value of Zeta(3), complemented by a detailed mathematical formula for its computation. Furthermore, it credits Sebastian Wedeniwski for calculating over 128 million digits of this constant using a more efficient algorithm developed by Theodor Amdeberhan and Doron Zeilberger. The text also references previous key works that contributed to advancements in the methodology of hypergeometric series evaluation. Overall, the beginning sets the stage for a thorough mathematical exploration, underlining the rigorous computation involved in understanding Zeta(3). (This is an automatically generated summary.)
534 _nOriginal publication data not identified
653 _aMathematics
856 4 0 _uhttps://www.gutenberg.org/ebooks/2583
999 _c44664
_d44664