# Repeat Function N times error

``````multi::(Num n)=>n->((a->a)->(a->a))
(multi 0) f x=x
(multi n) f x=(multi n-1) f (f x)
``````

Hoping to get a function that would repeat another function a number of times. In ghci I got this:

``````[1 of 1] Compiling Main             ( pad.hs, interpreted )

Could not deduce (Eq n) arising from the literal `0'
from the context (Num n)
bound by the type signature for
multi :: Num n => n -> (a -> a) -> a -> a
Possible fix:
add (Eq n) to the context of
the type signature for multi :: Num n => n -> (a -> a) -> a -> a
In the pattern: 0
In an equation for `multi': multi 0 f x = x

Could not deduce (Num ((a -> a) -> a -> a))
arising from a use of `-'
from the context (Num n)
bound by the type signature for
multi :: Num n => n -> (a -> a) -> a -> a
Possible fix:
add an instance declaration for (Num ((a -> a) -> a -> a))
In the expression: multi n - 1
In the expression: (multi n - 1) f (f x)
In an equation for `multi': multi n f x = (multi n - 1) f (f x)
``````

I am a newbie to haskell. What do I do?

-

You almost did it. A minimal fix is to add parentheses around `n - 1` and remove the signature:

``````(multi 0) f x=x
(multi n) f x=(multi (n-1)) f (f x)
``````
-
Very nice for brevity. The other questions did put in their code, but you were the only one to explicitly say to do `(n-1)` instead of `n-1`. –  PyRulez Oct 31 '13 at 21:47

Couple things. You can't check `Num` s for equality. You are probably looking for an `Int`. Second you don't need the parantheses around multi and it's argument. And some other formatting.

``````multi :: Int -> (a -> a) -> a -> a
multi 0 f x = x
multi n f x = multi (n-1) f (f x)
``````

You could make this type signature more generic, but we will just stick with that. But you can write this whole thing with higher order functions.

``````multi :: Int -> (a -> a) -> a -> a
multi n f a = foldl (\v _ -> f v) a [1..n]
``````
-
In your second implementation, wouldn't foldr be more lazy? –  cheecheeo Oct 31 '13 at 23:04

The smallest change I can make to your program that makes it compile is:

``````multi::(Eq n, Num n)=>n->((a->a)->(a->a))
(multi 0) f x=x
(multi n) f x=(multi (n-1)) f (f x)
``````

The `Num` type class doesn't require members to already be members of `Eq`, so we have to specify that as well. Additionally, we want to pass `n-1` as an argument to `multi`.

This problem is normally done in Haskell land with `iterate` and `!!`.

-

There are a couple things wrong here.

`Num n` does not imply `Eq n`, meaning there is no `Eq n => Num n` constraint in the `Num` typeclass definition. In order to pattern match on `0` you need the `n` type to be an instance of `Eq`. I would just explicitly change this to `Int`, there is no reason for the extra generality in this piece of code.

Next, `(multi n-1)` applies `multi` to `n` then subtracts `1`.b I've also cleaned up the code and put the parens in the right places.

``````multi:: Int -> (a -> a) -> a -> a
multi 0 _ x = x
multi n f x = multi (n-1) f (f x)
``````

As Cirdec points out you can do this with `iterate f a !! n`.

Edit:

If what you're trying to do is get a function that is `f` applied `n` times you can do something like this. Replacing `10` with `n` and `(1+)` with whatever function you wanted repeated. (or just partially apply `multi`)

``````let f = foldr1 (.) (take 10 \$ repeat (1+))
``````
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pastebin.com/ECrSKmYT –  PyRulez Oct 31 '13 at 21:38
Also, I conceptually think of it as "multiplying a function." I then define this function. If I used it, it would be just passing the repeated function. –  PyRulez Oct 31 '13 at 21:39
The line in the error message is incorrect. `(multi n - 1)` applies `multi` to `n` then subtracts `1` from the result. i.e. tries to subtract 1 from a partially applied function. Note that I changed it to `multi (n - 1)`. –  Andrew Myers Oct 31 '13 at 21:39
`->` is right associative, so the type signature `Int->(a->a)->a->a` is actually the same as `Int->((a->a)->(a->a))`. –  Cirdec Oct 31 '13 at 21:41
I know, it just fits with my conceptions when I right it out. –  PyRulez Oct 31 '13 at 21:41