# Is it possible to use unary function instead of binary in `flip`?

The type of the `Prelude` function `flip` is:

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

I.e., it takes one binary function and two arguments.

The type of the `Prelude` function `id` is:

``````id :: a -> a
``````

But the type of `flip id` is:

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

How is it possible to apply `flip` to `id` when `id` is a unary function and `flip` requires binary function for the first arg?

btw. `flip id` is similar to `\ x f -> f x`

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Haskell makes `id` fit the type of the first argument to `flip` by setting `a = b -> c`. So:

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

where `id` is taken to be of type

``````id :: (b -> c) ->  b -> c
``````

which is equivalent to

``````id :: (b -> c) -> (b -> c)
``````

i.e. a specialisation of `id` that only applies to unary functions.

Edit: I think I might rephrase my first line as:
Haskell deduces that `id` fits the type of the first argument to `flip` if `a = b -> c`.
In case that's any clearer.

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I forgot that the general type identifier `a` can be a function too, thanks. –  tomp Nov 11 '09 at 14:46

Nefrubyr explains it very well.
Another way to (hopefully) make this a bit more intuitive is to think of the function application operator `(\$)`.

`(\$)` is a specialized form of `id`:

``````(\$) :: (a -> b) -> (a -> b)
(\$) = id
``````

I've seen the definition `(#) = flip (\$)`, such that you can write the argument before the function its applied to: `obj # show`.

Obviously, since `(\$)` is just a specialized form of `id`, you could also write: `(#) = flip id`

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