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Miscellaneous Mathematical Constants
"Miscellaneous Mathematical Constants" is a collection of mathematical constants. The constants include The Backhouse constant, The Berstein Constant, The Catalan Constant, The Champernowne, Constant Copeland-Erdos constant cos (1) to 15000 digits among others as compiled and presented by the famed mathematician Simon Plouffe. Simon Plouffe is a mathematician who discovered the Bailey–Borwein–Plouffe formula (BBP algorithm) which permits the computation of the nth binary digit of π, in 1995.
Miscellaneous Mathematical Constants
Miscellaneous Mathematical Constants by Simon Plouffe
The First 498 Bernoulli Numbers
The First 498 Bernoulli Numbers by Simon Plouffe
The First 1000 Euler Numbers
The First 1000 Euler Numbers by Simon Plouffe
The Value of Zeta(3) to 1,000,000 Places
The Value of Zeta(3) to 1,000,000 places by Simon Plouffe
The First 1001 Fibonacci Numbers
The First 1001 Fibonacci Numbers by Simon Plouffe
Pi - Unleashed
In the 4,000-year history of research into Pi, results have never been as prolific as present. This book describes, in easy-to-understand language, the latest and most fascinating findings of mathematicians and computer scientists in the field of Pi. Attention is focused on new methods of high-speed computation.
Organic Mathematics
This volume is the hardcopy version of the electronic manuscript, "Proceedings of the Organic Mathematics Workshop" held at Simon Fraser University in December 1995 (www.cecm.sfu.ca/organics). The book provides a fixed, easily referenced, and permanent version of what is otherwise an evolving document. Contained in this work is a collection of articles on experimental and computational mathematics contributed by leading mathematicians around the world. The papers span a variety of mathematical fields - from juggling to differential equations to prime number theory. The book also contains biographies and photos of the contributing mathematicians and an in-depth characterization of organic mathematics.
