If you think `x :: Int`

is confusing, you are mistaken. The real confusion here is that you perceive `x <- Just 5`

as *assignment*. In order to assign anything, you first need to be able to extract the value. This is possible for some monads, but not all monads. For example, `Maybe a`

stores just one value in it, so you can imagine `x <- Just 5`

"extracts" a value from `Maybe Int`

; but the analogy fails once you consider even just a list: `[a]`

, where `x <- [1..5]`

no longer has a direct correspondence to a assignment. This is also the reason why there is no function that extracts values from arbitrary monads - how do you "extract" a `Int`

from a `[Int]`

? how do you "extract" a `Int`

from a `Cont a Int`

?

You need to work through several examples to understand what it means to be a functor or a monad. It is better to think of `m Int`

not as "a container with Int", but rather "`m`

with some `Int`

-ness in it". This is to say that it is some `m`

that has behaviours specific to `m`

, and behaviours specific to `Int`

. The monadic operations must obey particular laws, so you can consistently modify "`m`

with some `Int`

-ness in it" to be, for example, "`m`

with some `Char`

-ness in it".

I think it is better to consider `<=<`

, which is a "funny composition", rather than `>>=`

or `<-`

, which can be mistaken for "extraction of a value".

`g = Just 5 >>= \x -> Just x`

to`g = Just 5`

– wit Sep 21 '13 at 15:41