# Is it square check

I am trying to write function to check if the argument is square of integer:

``````isSquare :: Int -> Bool
isSquare x = truncate(sqrt(x)) * truncate(sqrt(x)) == x
``````

``````Prelude> :load "some.hs"
[1 of 1] Compiling Main             ( some.hs, interpreted )

some.hs:2:13:
No instance for (RealFrac Int)
arising from a use of `truncate' at some.hs:2:13-29
Possible fix: add an instance declaration for (RealFrac Int)
In the first argument of `(*)', namely `truncate (sqrt (x))'
In the first argument of `(==)', namely
`truncate (sqrt (x)) * truncate (sqrt (x))'
In the expression: truncate (sqrt (x)) * truncate (sqrt (x)) == x

some.hs:2:22:
No instance for (Floating Int)
arising from a use of `sqrt' at some.hs:2:22-28
Possible fix: add an instance declaration for (Floating Int)
In the first argument of `truncate', namely `(sqrt (x))'
In the first argument of `(*)', namely `truncate (sqrt (x))'
In the first argument of `(==)', namely
`truncate (sqrt (x)) * truncate (sqrt (x))'
``````

But if i try to execute:

``````Prelude> truncate(sqrt(9))*truncate(sqrt(9))==9
True
``````

all is fine.

Why I get the error and how to fix it ?

-
Same reason as stackoverflow.com/questions/1970484/… –  KennyTM Dec 2 '10 at 9:35

You're getting the errors because of type mismatches. The type of `sqrt` is `sqrt :: Floating a => a -> a`, and the type of `truncate` is `truncate :: (RealFrac a, Integral b) => a -> b`. The former says that `sqrt` takes as input any floating-point number, and returns one of the same type as output; the latter says it can truncate any real fractional number1 into any integral number. However, you assert that `x` is an `Int`, and an `Int` isn't a floating-point number. Thus, the second error: "No instance for `(Floating Int)` arising from a use of ``sqrt`'". This says that because of `sqrt x`, it wanted `Int` to be a floating-point number, but there's no definition for that. Your first error is similar: since `sqrt :: Floating a => a -> a`, its output is the same as its input, so you're trying to call `truncate` on an integer. This of course makes no sense, since `Int` is not a `RealFrac`, and that's why you get the first error. Fixing this is easy:

``````isSquare :: Int -> Bool
isSquare x = let x' = truncate \$ sqrt (fromIntegral x :: Double) in x'*x' == x
``````

The `fromIntegral` function has the type `fromIntegral :: (Integral a, Num b) => a -> b`; it can convert any integral number into any number at all. This is why we need to tell Haskell that we want it to produce a `Double`; it'd default to that anyway, but it's nice to be clear (though not necessary). `Double` is an instance both of `Floating` and `RealFrac`, so you can `sqrt` and `truncate` it. I also rearranged your code a little; the way it is up there is how I'd write it, since this way we only compute the `truncation` and `sqrt` once. Also, note that if you remove the type signature, Haskell will infer the more general type `isSquare :: Integral a => a -> Bool`, since you never assume that `x` is precisely an `Int`.

The reason that `truncate(sqrt(9))*truncate(sqrt(9))==9` successfully returned `True` is because of the type of `9`. You can ask GHCi to tell you this:

``````Prelude> :t 9
9 :: (Num t) => t
``````

In Haskell, all integral numeric literals have the type `Num t => t` (`9.0`, or any number with a decimal point, has the type `Fractional t => t`). This means that they can be any kind of number at all, which is a good thing. Otherwise, `9` would have to just be an `Int` or `Integer`, and defining new number types—or even using both `Int` and `Integer`!2—would be a royal pain. Thus, when you write `truncate(sqrt(9))`, GHCi determines that `9` must be an instance of `Floating` (from `sqrt`) and `RealFrac` (from `truncate`), which it defaults to `Double`, making everything work. This defaulting is standard behavior for numeric types (it's why you could leave out the `:: Double` in my definition of `isSquare`), though not for anything else (except in GHCi, which extends it for convenience). Since `9` isn't just an `Int`, but `x` is, you don't need to convert `9`, but you do need to convert `x`.

1: The difference between `Floating` and `RealFrac` is that, for instance, `Complex Double` is an instance of `Floating` but not `RealFrac`, and `Rational` is an instance of `RealFrac` but not `Floating`. `Float` and `Double` are instances of both.

2: In case you haven't come across this, the difference is that `Int` is finite-precision, and `Integer` is arbitrary-precision.

-

You're treating integers as floats. Hence, the types don't match.

Use `fromIntegral`:

``````isSquare :: Int -> Bool
isSquare n = truncate(sqrt(x)) * truncate(sqrt(x)) == n
where x = fromIntegral n
``````
-
``````isSquare x = x == head (dropWhile (< x) squares)
@wnoise: No it doesn't. Try evaluating `take 10 \$ scanl1 (+) [1,3..]` in GHCi – the result is `[1,4,9,16,25,36,49,64,81,100]`. –  ephemient Dec 9 '10 at 15:09