We can imagine that you ask the name in order to print it, then let's rewrite it.
In pseudo code, we have
print "what is your name"
bind varname with userReponse
Your question then concern the second instruction.
Take a look about the semantic of this one.
- userReponse is a function which return the user input (getLine)
- varname is a var
- bind var with fun : is a function which associate a var(varname) to the output of a function(getLine)
Or as you know in haskell everything is a function then our semantic is not well suited.
We need to revisit it in order to respect this idiom. According to the later reflexion the semantic of our bind function become bind fun with fun
As we cannot have variable, to pass argument to a function, we need, at a first glance, to call another function, in order to produce them. Thus we need a way to chain two functions, and it's exactly what's bind is supposed to do. Furthermore, as our example suggest, an evaluation order should be respected and this lead us to the following rewriting with fun bind fun
That's suggest that bind is more that a function it's an operator.
Then for all function f and g we have with f bind g.
In haskell we note this as follow
f >>= g
Furthermore, as we know that a function take 0, 1 or more argument and return 0, 1 or more argument.
We could refine our definition of our bind operator.
In fact when f doesn't return any result we note >>= as >>
Applying, theses reflexions to our pseudo code lead us to
main = print "what's your name" >> getLine >>= print
Wait a minute, How the bind operator differ from the dot operator use for the composition of two function ?
It's differ a lot, because we have omit an important information, bind doesn't chain two function but it's chain two computations unit. And that's the whole point to understand why we have define this operator.
Let's write down a global computation as a sequence of computation unit.
f0 >>= f1 >> f2 >> f3 ... >>= fn
As this stage a global computation could be define as a set of computation unit with two operator >>=, >>.
How do we represent set in computer science ?
Usually as container.
Then a global computation is a container which contain some computation unit. On this container we could define some operator allowing us to move from a computation unit to the next one, taking into account or not the result of the later, this is ours >>= and >> operator.
As it's a container we need a way to inject value into it, this is done by the return function. Which take an object and inject it into a computation, you could check it through is signature.
return :: a -> m a -- m symbolize the container, then the global computation
As it's a computation we need a way to manage a failure, this done by the fail function.
In fact the interface of a computation is define by a class
return -- inject an objet into a computation
>>= -- chain two computation
>> -- chain two computation, omitting the result of the first one
fail -- manage a computation failure
Now we can refine our code as follow
main :: IO ()
main = return "What's your name" >>= print >> getLine >>= print
Here I have intentionally include the signature of the main function, to express the fact that we are in the global IO computation and the resulting output with be () (as an exercise enter $ :t print in ghci).
If we take more focus on the definition for >>=, we can emerge the following syntax
f >>= g <=> f >>= (\x -> g) and f >> g <=> f >>= (\_ -> g)
And then write
main :: IO ()
return "what's your name" >>= \x ->
print x >>= \_ ->
getLine >>= \x ->
As you should suspect, we certainly have a special syntax to deal with bind operator in computational environment. You're right this is the purpose of do syntax
Then our previous code become, with do syntax
main :: IO ()
main = do
x <- return "what's your name"
_ <- print x
x <- getLine
If you want to know more take a look on monad
As mentioned by leftaroundabout, my initial conclusion was a bit too enthusiastic
You should be shocked, because we have break referential transparency law (x take two different value inside our sequence of instruction), but it doesn't matter anymore,because we are into a computation, and a computation as defined later is a container from which we can derive an interface and this interface is designed to manage, as explain, the impure world which correspond to the real world.