(Note: this answers to the "how to explain how `IO`

works to a beginner part". It does NOT attempt to explain the `RealWorld#`

hack GHC uses. Indeed, the latter is not a good way to introduce `IO`

.)

There are many ways to explain the IO monad to beginners. It is hard because different people mentally associate monads to different ideas. You can use category theory, or describe them as programmable semicolons, or even as burritos.

Because of this, when I tried to do that in the past, I generally tried many approaches until one of them "clicks" into the mental pattern of the learner. Knowing their background helps a lot.

# Imperative closures

For instance, when the learner is already familiar with some imperative language with closures, e.g. JavaScript, I tend to tell them they can pretend that the whole point of a Haskell program is to generate a JavaScript closure, which is then run using a JavaScript implementation. In this make-believe explanation, a `IO T`

type stands for an opaque type encapsulating a JavaScript closure, which, when run, will produce a value of type `T`

, possibly after causing some side effects -- as JavaScript can do.

So, a value `f :: IO String`

could be implemented as

```
let f = () => {
print("side effect");
return "result";
};
```

and `g :: IO ()`

could be implemented as

```
let g = () => {
print("g here");
return {};
};
```

Now, assuming to have such `f`

closure, how to invoke it from Haskell? Well, one can not directly do that, since Haskell wants to keep side effects under control. That is, we can not do `f ++ "hi"`

or `f() ++ "hi"`

.

Instead, to "invoke a closure" we can bind it to `main`

```
main :: IO ()
main = g
```

Indeed, `main`

is the JavaScript closure which is generated by the whole Haskell program, and this will be invoked by the Haskell implementation.

OK, now the question becomes: "how to invoke more than one closure?". For that, one can introduce `>>`

and pretend that it is implemented as

```
function andThenSimple(f, g) {
return () => {
f();
return g();
};
}
```

or, for `>>=`

:

```
function andThen(f, g) {
return () => {
let x = f();
return g(x)(); // pass x, and then invoke the resulting closure
};
}
```

`return`

is easier

```
function ret(x) {
return () => x;
}
```

These function take a while to explain, but it is not that hard to grasp them if one understands closures.

# Pure functional (AKA stay free)

Another option is to keep everything pure. Or at least as pure as possible. One can pretend that `IO a`

is an opaque type defined as

```
data IO a
= Return a
| Output String (IO a)
| Input (String -> IO a)
-- ... other IO operations here
```

and then pretend that the value `main :: IO ()`

is then "run" by some imperative engine later on. A program like

```
foo :: IO Int
foo = do
l <- getLine
putStrLn l
putStrLn l
return (length l)
```

actually means, according to this interpretation,

```
foo :: IO Int
foo = Input (\l -> Output l (Output l (Return (length l))))
```

Of course here `return = Return`

, and defining `>>=`

is a nice exercise.

# Currying impurity

Forget IO, monads, and all that stuff. One could understand better two simple concepts

```
a -> b -- pure function type
a ~> b -- impure function type
```

the latter being a make-believe Haskell type. Most programmers should be able to have a strong intuition about what these types represent.

Now, in functional programming, we have currying, which is an isomorphism between

```
(a, b) -> c
```

and

```
a -> b -> c
```

After some thinking, one can see that impure functions should admit some currying as well. One can indeed be convinced that there should be some isomorphism similar to

```
(a, b) ~> c
<===>
a ~> b ~> c
```

With some more thought, one can even understand that the first `~>`

in `a ~> b ~> c`

is actually inaccurate. The curried function above does not really perform side effects when `a`

alone is being passed -- it is the passing of `b`

which triggers the execution of the original uncurried function, causing side effects.

So, with this in mind, we can think of currying as

```
(a, b) ~> c
<===>
a -> b ~> c
--^^-- pure!
```

As a particular case, we get the isomorphism

```
(a, ()) ~> c
<===>
a -> () ~> c
```

Further, since `(a, ())`

is isomorphic to `a`

(some more convincing required here), we can interpret currying as

```
a ~> c
<===>
a -> () ~> c
```

Now, if we baptize `() ~> c`

as `IO c`

, we get

```
a ~> c
<===>
a -> IO c
```

Ah-ha! This tells us that we do not really need the general impure function type `a ~> c`

. As long as we have its special case `IO c = () ~> c`

, we can represent (up to isomorphism) any `a ~> c`

function.

From here, one can start to draw a mental picture about how `IO c`

should work, and eventually realize its monadic structure. Essentially, this interpretation of `IO c`

is now very similar to the one exploiting closures given above.

`IO`

on your own using only operations guaranteed by the Haskell Report (except, of course,`andThen = (>>=)`

, which doesn't really address the pedagogical goals). You have to think of`IO`

as built-into-the-compiler magic... because it is. Even the "code" you see when you click source links on Hackage which appears to implement IO eventually bottoms out at calls to things that are even more primitive magic, and which require the existence of the GHC runtime (written in C). – Daniel Wagner Aug 9 at 15:33`IO`

; That all happens through compiler magic. Youcanimplement a sort of fake IO with simulated files and in/outputs and basically make a`State`

using these though. – Cubic Aug 9 at 15:35totally bogusidea that`IO`

is just like a state transformer where the state being transformed is the state of the real world (which has type`State# RealWorld`

). The implementation of`ST`

is similar, but requires the actions run to be polymorphic in the`State# s`

. As it turns out, the fiction works out much less badly for`ST`

than for`IO`

(although we'd need linear types to make it bulletproof). If you seek nice`Monad`

examples that can express`IO`

-like things, I suggest you look at "operational monads". – dfeuer Aug 9 at 15:38`andThenIO`

is too lazy. Consider`andThenIO (putStrLn "Hello") (\_ -> putStrLn "Goodbye")`

: this will just print "Goodbye" and ignore the first`putStrLn`

altogether. That's usually the danger of`unsafePerformIO`

. You'll need`seq`

in there to make it work. – sepp2k Aug 9 at 15:40`pseq`

since we care about evaluation order, which`seq`

does not guarantee (IIRC). – chi Aug 9 at 20:10