# Overuse of fromIntegral in Haskell

Whenever I write a function using doubles and integers, I find this problem where I am constantly having to use 'fromIntegral' everywhere in my function. For example:

``````import Data.List

roundDouble
:: Double
-> Int
-> Double
roundDouble x acc = fromIntegral (round \$ x * 10 ** fromIntegral acc) / 10 ** fromIntegral acc
``````

Is there an easier way of writing this? (I know there may be easier ways of rounding a number and if there are please let me know! However I am mainly interested in how to avoid using so many 'fromIntegrals'.)

Thanks, Ash

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## 4 Answers

Sometimes I find a helper function useful:

``````roundDouble x acc = (round \$ x * 10 ^ acc) /. (10 ^ acc)
where
x /. y = fromIntegral x / fromIntegral y
``````

That helper function can also be written:

``````(/.) = (/) `on` fromIntegral
``````

Where `on` is from `Data.Function`.

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Wasn't aware of `on`, thanks for pointing it out! –  J Cooper Aug 11 '10 at 5:58
And its variant: stackoverflow.com/questions/3453608/… –  sastanin Aug 11 '10 at 13:52
The type of (/.) is (Integral a, Fractional b, Integral a1) => a -> a1 -> b whereas the type of (/) `on` fromIntegral is (Fractional b, Integral a) => a -> a -> b. If you need the more general type, on is not appropriate. –  Peaker Aug 17 '10 at 12:14
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You can use `^` instead of `**`. `^` takes any Integral as it's second argument, so you don't need to call `fromIntegral` on the second operand. So your code becomes:

roundDouble x acc = fromIntegral (round \$ x * 10 ^ acc) / 10 ^ acc

Which has only one `fromIntegral`. And that one you can't get rid off as `round` naturally returns an Integral and you can't perform non-integer division on an Integral.

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I have a similar problem with marshaling code, where `fromIntegral` is used to convert CInt to Int. I usually define `fI = fromIntegral` to make it easier. You may also need to give it an explicit type signature or use -XNoMonomorphismRestriction.

If you're doing a lot of math, you may want to look at the Numeric Prelude, which seems to have much more sensible relations between different numeric types.

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I was expecting to see the answer to be defining fI so I am glad to see someone else write it. I will check out the Numeric Prelude, it looks very useful, thanks! –  Ash Aug 10 '10 at 23:15
Defining fI isn't as slick as some other answers, but it has the broadest applicability compared to the other answers so far. –  John L Aug 11 '10 at 7:46
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Another idea, similar to luqui's. Most of my problems with `fromIntegral` are related to necessity to divide `Int` by `Double` or `Double` by `Int`. So this `(/.)` allows to divide any two `Real` types, not necessarily the same, an not necessarily `Integral` types like in luqui's solution:

``````(/.) :: (Real a, Real b, Fractional c) => a -> b -> c
(/.) x y = fromRational \$ (toRational x) / (toRational y)
``````

Example:

``````ghci> let (a,b,c) = (2::Int, 3::Double, 5::Int)
ghci> (b/.a, c/.a, a/.c)
(1.5,2.5,0.4)
``````

It works for any two `Real`s, but I suspect that rational division and conversion to/from `Rational` are not very effective.

Now your example becomes:

``````roundDouble :: Double -> Int -> Double
roundDouble x acc = (round \$ x * 10 ^ acc) /. (10 ^ acc)
``````
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