1.306377883863080690468614492602605712916784585156713644368053759966434
This is Mills constant, it is such that if A is the constant
then
[A^(3^n)] = f(n)
f(n) is prime for all n > 0
It was found in 1947 by Mill
W. H. Mills, "A prime representing function," Bull. Amer. Math. Soc., 53 604.
for other accounts see The Favorite Math Constants page
http://pauillac.inria.fr/algo/bsolve/mills/mills.html
and also a short proof by Chris Caldwell in
http://www.utm.edu/research/primes/notes/proofs/A3n.html
The primes in this case are
11,1361,2521008887,16022236204009818131831320183,
4113101149215104800030529537915953170486139623539759933135949994882770404074832568499
Note : A is determined by the primes and NOT the contrary.
# This is the electronic signature for Plouffe's Inverter #
# Ceci est la signature électronique pour l'Inverseur de Plouffe #
# Copyright : Simon Plouffe/Plouffe's Inverter (c) 1986. #
# http://www.lacim.uqam.ca/pi #