Nothing is more perfect than perfect numbers
Nothing is as everlasting as infinity (but some types are bigger than others)
No proof can be disproven (that is if the axioms remain the same)
And set theory's a mess but that one can be overlooked and left to function in the background
Number theory the best
Nothing is as everlasting as infinity (but some types are bigger than others)
No proof can be disproven (that is if the axioms remain the same)
And set theory's a mess but that one can be overlooked and left to function in the background
Number theory the best
Comments
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also have you heard of category theory yet
(i have but i have no idea how to even begin learning about it) -
i mean for the third one if the axioms are inconsistent it can sort of be disproven -
the problem with language is that it is very interpretable. don't remember what I meant by that 3rd one but it wasn't to do with what you said
- categories have objects and morphisms between those objects
- functors and monads exist
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