Putnam 2024 Testsolve
(David here!) Putnam 2024 was released recently, so I decided to try a bunch of the problems while on the plane ride from NYC to Chicago. (A3) Let $T$ be a (uniformly) random bijection $$ T: \{1,\,2,\,3\}\times\{1,\,2,\,\ldots,\,2024\}\to\{1,\,2,\,\ldots,\,6072\} $$ conditioned on $T$ being increasing in both arguments. Does there exist indices $(a,b)$ and $(c,d)$ such that $$1/3 \le P(T(a,b)\lt T(c,d)) \le 2/3?$$ I took some liberties with reformulating it probabilistically here. My initial reaction was that this was probably true. My first idea was that if $(a,b) \lneq (c,d)$, then the probability is 0, and flipped around it is 1. So maybe we can take some intermediate sequence of indices that slowly switches them? Didn't get very far with this. Well, thinking slightly meta, the problem can't possibly be that hard - there is no way we're figuring out exactly how many $T$ satisfy $T(a,b) \lt T(c,d)$, so maybe we should be looking for bijections (or partial bijecti...