|
<![CDATA[Project Gutenberg's Miscellaneous Mathematical Constants, by Various
This eBook is for the use of anyone anywhere at no cost and with
almost no restrictions whatsoever. You may copy it, give it away or
re-use it under the terms of the Project Gutenberg License included
with this eBook or online at www.gutenberg.net
Title: Miscellaneous Mathematical Constants
Author: Various
Editor: Simon Plouffe
Posting Date: August 13, 2008 [EBook #634]
Release Date: August, 1996
Language: English
Character set encoding: ASCII
*** START OF THIS PROJECT GUTENBERG EBOOK MISCELLANEOUS MATHEMATICAL CONSTANTS ***
Produced by Simon Plouffe.
This is a collection of mathematical constants...
These numbers have been downloaded from:
"http://www.cecm.sfu.ca/projects/ISC/I_d.html"
An index of high precision tables of functions can be found at:
"http://www.cecm.sfu.ca/projects/ISC/rindex.html"
You can find information about some of the constants below at:
"http://www.mathsof.com/asolve/constant/constant.html"
Thank you to Simon Plouffe (from Simon Fraser University)
for his kind permission to distribute this collection of constants.
-----------------------------------------------------------------------------
Contents
--------
1-6/(Pi^2) to 5000 digits.
1/log(2) the inverse of the natural logarithm of 2 to 2000 places.
1/sqrt(2*Pi) to 1024 digits.
sum(1/2^(2^n),n=0..infinity). to 1024 digits.
3/(Pi*Pi) to 2000 digits.
arctan(1/2) to 1000 digits.
The Artin's Constant = product(1-1/(p**2-p),p=prime)
The Backhouse constant
The Berstein Constant
The Catalan Constant
The Champernowne Constant
Copeland-Erdos constant
cos(1) to 15000 digits.
The cube root of 3 to 2000 places.
2**(1/3) to 2000 places
Zeta(1,2) ot the derivative of Zeta function at 2.
The Dubois-Raymond constant
exp(1/e) to 2000 places.
Gompertz (1825) constant
exp(2) to 5000 digits.
exp(E) to 2000 places.
exp(-1)**exp(-1) to 2000 digits.
The exp(gamma) to 1024 places.
exp(-exp(1)) to 1024 digits.
exp(-gamma) to 500 digits.
exp(-1) =
exp(Pi) to 5000 digits.
exp(-Pi/2) also i**i to 2000 digits.
exp(Pi/4) to 2000 digits.
exp(Pi)-Pi to 2000 digits.
exp(Pi)/Pi**E to 1100 places.
Feigenbaum reduction parameter
Feigenbaum bifurcation velocity constant
Fransen-Robinson constant.
gamma or Euler constant
GAMMA(1/3) to 256 digits.
GAMMA(1/4]]>
|