I am writing a function to find the integer divisors of a real number. When I run the code, I get the following errors:

```
Clean solutions.hs:70:33:
Could not deduce (Integral a) arising from a use of `truncate'
from the context (RealFrac a)
bound by the type signature for divisors :: RealFrac a => a -> [a]
at Clean solutions.hs:70:1-74
Possible fix:
add (Integral a) to the context of
the type signature for divisors :: RealFrac a => a -> [a]
In the first argument of `(==)', namely `(truncate (n / x))'
In the expression: (truncate (n / x)) == (n / x)
In the first argument of `filter', namely
`(\ x -> (truncate (n / x)) == (n / x))'
Clean solutions.hs:70:59:
Could not deduce (Enum a)
arising from the arithmetic sequence `2.0, 3.0 .. n / 2'
from the context (RealFrac a)
bound by the type signature for divisors :: RealFrac a => a -> [a]
at Clean solutions.hs:70:1-74
Possible fix:
add (Enum a) to the context of
the type signature for divisors :: RealFrac a => a -> [a]
In the second argument of `filter', namely `[2.0, 3.0 .. n / 2]'
In the second argument of `(:)', namely
`filter (\ x -> (truncate (n / x)) == (n / x)) [2.0, 3.0 .. n / 2]'
In the expression:
1
: filter (\ x -> (truncate (n / x)) == (n / x)) [2.0, 3.0 .. n / 2]
```

I am finding it hard to understand what I'm doing wrong, despite spending an hour or two brushing up on types in Haskell. My code is below:

```
divisors :: RealFrac a => a -> [a]
divisors n = 1 : filter (\x -> (truncate (n/x)) == (n/x)) [2.0, 3.0.. n/2]
```

Thanks, Sam.

`RealFrac`

for. It's more of an integral thing, so`divisors :: Integral a => a -> [a]`

would be more appropriate. I suspect you went to`RealFrac`

because of dividing with`/`

. If that's right, use`quot`

(or possibly`div`

) to divide integral types, and`rem`

(or`mod`

, if you want positive remainders for negative numbers) for the remainder,`divisors n = 1 : filter ((== 0) . (n `rem`)) [2 .. n `quot` 2]`

would be the corresponding (inefficient) implementation for your attempt. – Daniel Fischer Jul 14 '13 at 18:41