Everything Is Just Functions: 1 week with David Beazley and SICP

alternative take: everything is just sets

both can be a foundation for mathematics, and hence, a foundation for everything

what's interesting is how each choice affects what logic even means?

I learned functions in terms of sets. Domain and codomain are sets. Function is a set of ordered pairs between them.

How could we go the other way? A set can be "defined" by the predicate that tests membership, but then how do we model the predicates? Some formalism like the lambda calculus?