hammar's answer is perfectly adequate for the problem. But for the sake of answering the precise question asked, I couldn't help but investigate a bit. Let's use `forAll`

.

```
prop_bang x = x >= 0 ==> forAll (listLongerThan x) $ \xs ->
element_at xs x == xs !! x
```

So now we need a function, `listLongerThan :: Int -> Gen [Int]`

. It takes a length, x, and produces a generator which will produce lists of length greater than `x`

.

```
listLongerThan :: Int -> Gen [Int]
listLongerThan x = replicateM (x+1) arbitrary
```

It's rather straightforward: we simply take advantage of the Monad instance of `Gen`

. If you run `quickCheck prop_bang`

, you'll notice it starts taking quite a long time, because it begins testing absurdly long lists. Let's limit the length of the list, to make it go a bit faster. Also, right now `listLongerThan`

only generates a list that is exactly `x+1`

long; let's mix that up a bit, again utilizing the Monad instance of Gen.

```
prop_bang =
forAll smallNumber $ \x ->
forAll (listLongerThan x) $ \xs ->
element_at xs x == xs !! x
smallNumber :: Gen Int
smallNumber = fmap ((`mod` 100) . abs) arbitrary
listLongerThan :: Int -> Gen [Int]
listLongerThan x = do
y <- fmap (+1) smallNumber -- y > 0
replicateM (x+y) arbitrary
```

You can use `sample smallNumber`

or `sample (listLongerThan 3)`

in ghci to make sure it is generating the correct stuff.