1) The problem is that `sqrt`

has the type `(Floating a) => a -> a`

, but you try to use an Integer as argument. So you have to convert your Integer first to a Floating, e.g. by writing `sqrt (fromIntegral x)`

2) I see no reason why == shouldn't be lazy, but for testing for an empty collection you can use the `null`

function (which is definitely lazy, as it works on infinite lists):

```
isPrime :: Integer->Bool
isPrime x = null [y | y<-[2..floor (sqrt (fromIntegral x))], x `mod` y == 0]
```

But in order to get an more idiomatic solution, break the problem into smaller sub-problems. First, we need a list of all elements y with y*y <= x:

```
takeWhile (\y -> y*y <= x) [2..]
```

Then we need only the elements that divide x:

```
filter (\y -> x `mod`y == 0) (takeWhile (\y -> y*y <= x) [2..])
```

Then we need to check if that list is empty:

```
isPrime x = null (filter (\y -> x `mod`y == 0) (takeWhile (\y -> y*y <= x) [2..]))
```

And if this looks to lispy to you, replace some of the parens with $

```
isPrime x = null $ filter (\y -> x `mod` y == 0) $ takeWhile (\y -> y*y <= x) [2..]
```

For additional clarity you can "outsource" the lambdas:

```
isPrime x = null $ filter divisible $ takeWhile notTooBig [2..] where
divisible y = x `mod`y == 0
notTooBig y = y*y <= x
```

You can make it almost "human readable" by replacing null $ filter with not $ any:

```
isPrime x = not $ any divisible $ takeWhile notTooBig [2..] where
divisible y = x `mod`y == 0
notTooBig y = y*y <= x
```