So I'm playing around with this:

```
factors :: Integral a => a -> [a]
factors n = filter (\d -> n `rem` d == 0) . takeWhile (\d -> d*d <= n) $ [ 1 .. ]
abundants_perfects_deficients :: Integral a => ([a],[a],[a])
abundants_perfects_deficients = foldr switch ([],[],[]) [1..]
where switch :: Integral a => a -> ([a],[a],[a]) -> ([a],[a],[a])
switch n (as,ps,ds) =
let t = sum (factors n) in
if t < n then (as,ps,n:ds)
else if t == n then (as,n:ps,ds)
else (n:as,ps,ds)
```

And while I've got `abundants_perfects_deficients`

, I'd rather have three values: `abundants`

, `perfects`

, and `deficients`

all of type `Integral a -> [a]`

.

One thing that doesn't work is:

```
abundants,perfects,deficients :: Integral a => [a]
(abundants,perfects,deficients) = abundants_perfects_deficients
```

Because this constrains the three to all be over the same `a`

.

I tried something to do them one-by-one, so they wouldn't mutually constrain, but that didn't work either:

```
perfects :: Integral a => [a]
(_,perfects,_) = abundants_perfects_deficients
```

Because the compiler couldn't figure out how to convert a value of type `forall a. Integral a => ([a],[a],[a])`

to type `(t1, forall a. Integral a => [a], t2)`

.

Which seems cromulent enough.

Now I know I could implement them separately (just `perfects = filter isPerfect [1..]`

), or constrain them to all be of the same type (`(abundants,perfects,deficients) = abundants_perfects_deficients`

works fine if `abundants,perfects,deficients :: [Integer]`

), but

- I like using the shared information to build all three
- I want to not just be constrained to
`Integer`

s

ideas?

**Edit**: Fascinatingly enough this works:

```
abundants :: Integral a => [a]
abundants = f as
where as :: [Integer]
(as,_,_) = abundants_perfects_deficients
f :: Integral a => [Integer] -> [a]
f = map fromInteger
```

But this doesn't:

```
abundants_perfects_deficients' :: (Integral a,Integral p, Integral d) => ([a],[p],[d])
abundants_perfects_deficients' = (f as, f ps, f ds)
where as,ps,ds :: [Integer]
(as,ps,ds) = abundants_perfects_deficients
f :: Integral a => [Integer] -> [a]
f = map fromInteger
abundants,perfects,deficients :: (Integral a) => [a]
(abundants,perfects,deficients) = abundants_perfects_deficients'
```

I have no idea why.