What makes modular arithmetic, and there by p-adic numbers, so fundamental to number theory?
I get that there are a lot of important results that follow with modular arithmetic, but why would one suspect that it would be so fundamental in the first place. If i don't know the results that follow, I don't think its importance would see that obvious to me.
I get that there are a lot of important results that follow with modular arithmetic, but why would one suspect that it would be so fundamental in the first place. If i don't know the results that follow, I don't think its importance would see that obvious to me.
