One crucial reason for the explicit use of
rec is to do with Hindley-Milner type inference, which underlies all staticly typed functional programming languages (albeit changed and extended in various ways).
If you have a definition
let f x = x, you'd expect it to have type
'a -> 'a and to be applicable on different
'a types at different points. But equally, if you write
let g x = (x + 1) + ..., you'd expect
x to be treated as an
int in the rest of the body of
The way that Hindley-Milner inference deals with this distinction is through an explicit generalisation step. At certain points when processing your program, the type system stops and says "ok, the types of these definitions will be generalised at this point, so that when someone uses them, any free type variables in their type will be freshly instantiated, and thus won't interfere with any other uses of this definition."
It turns out that the sensible place to do this generalisation is after checking a mutually recursive set of functions. Any earlier, and you'll generalise too much, leading to situations where types could actually collide. Any later, and you'll generalise too little, making definitions that can't be used with multiple type instantiations.
So, given that the type checker needs to know about which sets of definitions are mutually recursive, what can it do? One possibility is to simply do a dependency analysis on all the definitions in a scope, and reorder them into the smallest possible groups. Haskell actually does this, but in languages like F# (and OCaml and SML) which have unrestricted side-effects, this is a bad idea because it might reorder the side-effects too. So instead it asks the user to explicitly mark which definitions are mutually recursive, and thus by extension where generalisation should occur.