The expressions `f`

and `\x -> f x`

do, for most purposes, mean the same thing. However, the scope of a lambda expression extends as far to the right as possible, i.e. `m >>= (\x -> (f x >>= g))`

.

If the types are `m :: m a`

, `f :: a -> m b`

, and `g :: b -> m c`

, then on the left we have `(m >>= f) :: m b`

, and on the right we have `(\x -> f x >>= g) :: a -> m c`

.

So, the difference between the two expressions is just which order the `(>>=)`

operations are performed, much like the expressions `1 + (2 + 3)`

and `(1 + 2) + 3`

differ only in the order in which the additions are performed.

The monad laws require that, like addition, the answer should be the same for both.