I am a little confused about what the "partial" application of flip might do.

Since the type of the `flip`

function is:

```
flip :: (a -> b -> c) -> b -> a -> c
```

which we can write without the parenthesis as:

```
flip :: a -> b -> c -> b -> a -> c
```

How can I partially apply it to only the first argument `a`

? To get a function with the type:

```
flipa :: b -> c -> b -> a -> c
```

Or it doesn't make sense?

For example if I have something like:

```
let foo a b = (Just a, b)
:t foo
> foo:: a -> t -> (Maybe a, t)
```

It makes sense to partially apply it:

```
let a = foo 1
:t a
a :: t -> (Maybe Integer, t)
```

`(->)`

is right-associative, not left-associative: the`flipa`

you describe is an entirely different function (AFAIK the type dictates it must be`flipa _ x _ _ = x`

). – delnan Feb 24 '12 at 15:40`f :: (a → a) → a`

and`g :: a → a → a`

. By Curry-Howard isomorphism,`g`

represents theorem`a ⇒ a ⇒ a`

, i.e. if`a`

is true, then`a`

implies`a`

(which is true; it can be derived from`a ⇒ (b ⇒ a)`

(axiom of intuitionistic logic)). On the other hand,`(a ⇒ a) ⇒ a`

tells us nothing about`a`

(if`a`

implies`a`

then`a`

; but as you can see,`a`

could also be false and`a ⇒ a`

still holds). Indeed, if you have`f :: (a → a) → a`

, you can prove that false is true:`boom :: False; boom = f id`

(where False is empty data type) – Vitus Feb 24 '12 at 16:19