scmbradley on Nostr: npub1z2qdm…u3yuf this got me thinking (sort of tangentially to your point). An ...

npub1z2qdmfzhs2uwg8kmsh37xavt2hq48gch63e787ggd3s6mt8waxgsxu3yuf (npub1z2q…3yuf) this got me thinking (sort of tangentially to your point). An irrational number is never repeating in every base! And every rational number has a finite representation in some base (x/y has a finite representation in base y, for example). So this means that every infinite, but repeating number, has a finite representation in some base. I don't really have a conclusion, I was just sort of surprised by that.