Tweeted By @serkancabi
Can we state once and for all that any modestly sized combinatorial problem has more configurations than "atoms in the universe" so that we don't have to say it every single time?
— Serkan Cabi (@serkancabi) May 20, 2018
Can we state once and for all that any modestly sized combinatorial problem has more configurations than "atoms in the universe" so that we don't have to say it every single time?
— Serkan Cabi (@serkancabi) May 20, 2018