While coding some algorithm problems, I've used these functions, and I wonder if there are any standard library analogues implementing their functionality:

Maps a list of functions to one value:

```
mapX :: a -> [a -> b] -> [b]
mapX _ [] = []
mapX x (f:fs) = [f x] ++ (mapX x fs)
```

Maps a binary function to two lists:

```
map2 :: (a -> b -> c) -> [a] -> [b] -> [c]
map2 _ [] [] = []
map2 f (ax:axs) (bx:bxs) = [f ax bx] ++ map2 f axs bxs
```

To me, it's kinda weird that `all [] == True`

:(

```
all' :: (a -> Bool) -> [a] -> Bool
all' _ [] = False
all' f l = all f l
```

Does the `^`

operator implement fast exponentiation?

```
fastPow :: Int -> Int -> Int
fastPow x 0 = 1
fastPow x a
| even a = exp2 * exp2
| odd a = exp2 * exp2 * x
where
exp2 = fastPow x (div a 2)
```

`all f xs && all f ys`

. Would you expect this to be equivalent to`all f (xs ++ ys)`

? This requires`all _ [] = True`

. The more general concept (and intuitive justification) is that`True`

is the identity for`(&&)`

. This is the same reason an empty product is 1 (e.g., 0!, x^0) and an empty sum is 0 (e.g., x * 0). – C. A. McCann Jul 5 '11 at 23:19`all [] == True`

in another language; you may implement it as`for item in list { if !item: return false }; return true`

– Daenyth Jul 6 '11 at 0:35`all`

in a particular context, where`all'`

felt more appropriate? Or just explore the libraries, and you thought it was kind of weird? – MatrixFrog Jul 6 '11 at 5:28