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Since Pi is infinite and non-repeating, would that mean any finite sequence of non-repeating numbers should appear somewhere in Pi? (lemmy.dbzer0.com)

submitted 2 days ago* (last edited 2 days ago) by Melatonin@lemmy.dbzer0.com to c/asklemmy@lemmy.ml

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How about ANY FINITE SEQUENCE AT ALL?

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[–] vrighter@discuss.tchncs.de 26 points 1 day ago (1 children)

it's actually unknown. It looks like it, but it is not proven

[–] HiddenLayer555@lemmy.ml 10 points 1 day ago (2 children)

Also is it even possible to prove it at all? My completely math inept brain thinks that it might be similar to the countable vs uncountable infinities thing, where even if you mapped every element of a countable infinity to one in the uncountable infinity, you could still generate more elements from the uncountable infinity. Would the same kind of logic apply to sequences in pi?

[–] AHemlocksLie@lemmy.zip 8 points 21 hours ago

Man, you're giving me flashbacks to real analysis. Shit is weird. Like the set of all integers is the same size as the set of all positive integers. The set of all fractions, including whole numbers, aka integers, is the same size as the set of all integers. The set of all real numbers (all numbers including factions and irrational numbers like pi) is the same size as the set of all real numbers between 0 and 1. The proofs make perfect sense, but the conclusions are maddening.

[–] zeca@lemmy.eco.br 1 points 18 hours ago

its been proven for some other numbers, but not yet for pi.