# Difference between `(Integer a) => a -> Bool` and ` Integer -> Bool`?

I wrote my first program in Haskell today. It compiles and runs successfully. And since it is not a typical "Hello World" program, it in fact does much more than that, so please congrats me :D

Anyway, I've few doubts regarding my code, and the syntax in Haskell.

Problem:

My program reads an integer `N` from the standard input and then, for each integer `i` in the range `[1,N]`, it prints whether `i` is a prime number or not. Currently it doesn't check for input error. :-)

Solution: (also doubts/questions)

To solve the problem, I wrote this function to test primality of an integer:

``````is_prime :: Integer -> Bool
is_prime n = helper n 2
where
helper :: Integer -> Integer -> Bool
helper n i
| n < 2 * i = True
| mod n i > 0 = helper n (i+1)
| otherwise = False
``````

It works great. But my doubt is that the first line is a result of many hit-and-trials, as what I read in this tutorial didn't work, and gave this error (I suppose this is an error, though it doesn't say so):

``````prime.hs:9:13:
Type constructor `Integer' used as a class
In the type signature for `is_prime':
is_prime :: Integer a => a -> Bool
``````

According to the tutorial (which is a nicely-written tutorial, by the way), the first line should be: (the tutorial says `(Integral a) => a -> String`, so I thought `(Integer a) => a -> Bool` should work as well.)

``````is_prime :: (Integer a) => a -> Bool
``````

which doesn't work, and gives the above posted error (?).

And why does it not work? What is the difference between this line (which doesn't work) and the line (which works)?

Also, what is the idiomatic way to loop through `1` to `N`? I'm not completely satisfied with the loop in my code. Please suggest improvements. Here is my code:

``````--read_int function
line <- getLine

--is_prime function
is_prime :: Integer -> Bool
is_prime n = helper n 2
where
helper :: Integer -> Integer -> Bool
helper n i
| n < 2 * i = True
| mod n i > 0 = helper n (i+1)
| otherwise = False

main = do
dump 1 n
where
dump i x = do
putStrLn ( show (i) ++ " is a prime? " ++ show (is_prime i) )
if i >= x
then putStrLn ("")
else do
dump (i+1) x
``````
-
Do you mean `Integral a`? –  Heatsink Jun 30 '12 at 16:41
@Heatsink: No. I don't even know if `Integral` exists. Does it? Is it supposed to be `Integral`? –  Nawaz Jun 30 '12 at 16:43
It probably is supposed to be `Integral`. Also, your two hyperlinks go to the same URL, is that intentional? –  Heatsink Jun 30 '12 at 16:45
@Heatsink: Hyperlinks are corrected. –  Nawaz Jun 30 '12 at 16:46
Just a few things not strictly related to the problem you're having: function application in Haskell is just juxtaposition, so `show (i)` = `show i`, `putStrLn ("")` = `putStrLn ""`; dominant naming convention is camelCase (basically all libraries use it) and `read_int` is already in `Prelude` under the name `readLn`. –  Vitus Jun 30 '12 at 16:49

You are misreading the tutorial. It would say the type signature should be

``````is_prime :: (Integral a) => a -> Bool
--       NOT Integer a
``````

These are different types:

• `Integer -> Bool`
• This is a function that takes a value of type `Integer` and gives back a value of type `Bool`.
• `Integral a => a -> Bool`
• This is a function that takes a value of type `a` and gives back a value of type `Bool`.
• What is `a`? It can be any type of the caller's choice that implements the `Integral` type class, such as `Integer` or `Int`.

(And the difference between `Int` and `Integer`? The latter can represent an integer of any magnitude, the former wraps around eventually, similar to `int`s in C/Java/etc.)

The idiomatic way to loop depends on what your loop does: it will either be a map, a fold, or a filter.

Your loop in `main` is a map, and because you're doing i/o in your loop, you need to use `mapM_`.

``````let dump i = putStrLn ( show (i) ++ " is a prime? " ++ show (is_prime i) )
in mapM_ dump [1..n]
``````

Meanwhile, your loop in `is_prime` is a fold (specifically `all` in this case):

``````is_prime :: Integer -> Bool
is_prime n = all nondivisor [2 .. n `div` 2]
where
nondivisor :: Integer -> Bool
nondivisor i = mod n i > 0
``````

(And on a minor point of style, it's conventional in Haskell to use names like `isPrime` instead of names like `is_prime`.)

-
+1. Great answer. :-) –  Nawaz Jun 30 '12 at 17:08
Nitpick: `coprime` is a misleading name. It turns out that it is actually only called for `i` where the result corresponds to the name, but without short-circuiting, `is_prime 18` would call `coprime 8` which then would evaluate to `True` although 8 and 18 aren't coprime. Call it `nondivisor` or so. –  Daniel Fischer Jun 30 '12 at 18:36
@DanielFischer Good point, fixed. –  dave4420 Jun 30 '12 at 19:50
@dave4420: I didn't understand your definition of `is_prime` . What is `i` in `[2 .. i `div` 2]`? How does its initial value get decided? How does it get incremented? And upto what value? –  Nawaz Jul 1 '12 at 5:36
Ohh.. I think you meant `n` instead of `i` (in the list)? –  Nawaz Jul 1 '12 at 5:52

Part 1: If you look at the tutorial again, you'll notice that it actually gives type signatures in the following forms:

``````isPrime :: Integer -> Bool
-- or
isPrime :: Integral a => a -> Bool
isPrime :: (Integral a) => a -> Bool -- equivalent
``````

Here, `Integer` is the name of a concrete type (has an actual representation) and `Integral` is the name of a class of types. The `Integer` type is a member of the `Integral` class.

The constraint `Integral a` means that whatever type `a` happens to be, `a` has to be a member of the `Integral` class.

Part 2: There are plenty of ways to write such a function. Your recursive definition looks fine (although you might want to use `n < i * i` instead of `n < 2 * i`, since it's faster).

If you're learning Haskell, you'll probably want to try writing it using higher-order functions or list comprehensions. Something like:

``````module Main (main) where

isPrime :: Integer -> Bool
isPrime n = all (\i -> (n `rem` i) /= 0) \$ takeWhile (\i -> i^2 <= n) [2..]

main :: IO ()
main = do n <- readLn
forM_ [1..n] \$ \i ->
putStrLn (show (i) ++ " is a prime? " ++ show (isPrime i))
``````
-
+1. Awesome :-) –  Nawaz Jun 30 '12 at 17:10
Your code gave error : ideone.com/J2tSu ... What is the problem? –  Nawaz Jun 30 '12 at 17:13
`import Control.Monad` :) –  Vitus Jun 30 '12 at 17:16
@Vitus: Ohh I need to import that. I've not come across `import` yet. thanks :-) –  Nawaz Jun 30 '12 at 17:19
`\i ->` introduces an anonymous function taking one argument (named `i` inside function body). `n `rem` i` is just another way of writing `rem n i`. You can turn any function into infix operator by surrounding it in backticks. –  Vitus Jun 30 '12 at 17:22
1. It is `Integral a`, not `Integer a`. See http://www.haskell.org/haskellwiki/Converting_numbers.

2. `map` and friends is how you loop in Haskell. This is how I would re-write the loop:

``````main :: IO ()
main = do