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General Science / πRe: Must ∞ monkeys on ∞ typewriters really write everything given ∞ time?
« on: 20/02/2018 11:22:00 »
Some Simple and easy to understand Math:
The number of combinations you can make with 10 characters in 3 digits is= 10x10x10 (10^3) So there are 26 (+1 for a space) letters of the English alphabet so in a 3 letter long term there are= 27x27x27 (27^3) combinations. So, of course, ∞ monkies would produce an infinitely long term of letters which would be= 27^∞ combination. Which of course = infinity. And there is your final result, infinite combinations. The bible is just one combination of letters and if we have infinite combinations at some point (it might take infinite years to happen it will still happen) we will have a bible printed neatly by a group of Bonobos!
The number of combinations you can make with 10 characters in 3 digits is= 10x10x10 (10^3) So there are 26 (+1 for a space) letters of the English alphabet so in a 3 letter long term there are= 27x27x27 (27^3) combinations. So, of course, ∞ monkies would produce an infinitely long term of letters which would be= 27^∞ combination. Which of course = infinity. And there is your final result, infinite combinations. The bible is just one combination of letters and if we have infinite combinations at some point (it might take infinite years to happen it will still happen) we will have a bible printed neatly by a group of Bonobos!