# Assigning “bare” numbers to newtypes

Note the second line in this GHCi session. What is it about the Latitude type that allows me to use a "bare" number as a value, instead of having to invoke a constructor? I would like to do something similar with some of my own types.

``````λ> :m + Data.Geo.GPX.Type.Latitude
λ> let t = 45 :: Latitude
λ> t
45.0
``````

I've examined the source code for the Latitude type, but I had trouble figuring it out at first. Eventually I found the answer, so I thought I'd document it here. See my answer below.

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According to the Haskell98 standard, numeric literals are actually calls to `fromInteger` and `fromRational`. This allows them to be converted to any type that implements those functions (fromInteger is in the Prelude.Num typeclass and fromRational is in the Prelude.Fractional typeclass).

The syntax of numeric literals is given in Section 2.5. An integer literal represents the application of the function fromInteger to the appropriate value of type Integer. Similarly, a floating literal stands for an application of fromRational to a value of type Rational (that is, Ratio Integer). Given the typings:

fromInteger :: (Num a) => Integer -> a

fromRational :: (Fractional a) => Rational -> a

integer and floating literals have the typings (Num a) => a and (Fractional a) => a, respectively. Numeric literals are defined in this indirect way so that they may be interpreted as values of any appropriate numeric type. See Section 4.3.4 for a discussion of overloading ambiguity.

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What makes this work is that the type is a Num. The easiest way to do that is to use "deriving Num", in which case I need the language pragma GeneralizedNewtypeDeriving. So I can create a type like the following,

``````newtype Seconds = Seconds Double deriving (Eq, Ord, Enum, Num, Fractional, Floating, Real, RealFrac, RealFloat, Show)
``````

And then in GHCi,

``````λ> let s = 5 :: Seconds
λ> s
Seconds 5.0
``````

Alternatively, I could explicitly implement Num.

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To be exact, it's the fact that `Seconds` is in the `Num` class that makes it work. It doesn't matter how it became a member of the `Num` class. –  augustss Apr 17 '12 at 13:09
It would also work if the instance were explicitly provided rather than derived. All you need is an `instance Num`. –  Daniel Fischer Apr 17 '12 at 13:10
Thank you augustss and Daniel. I've updated the answer. –  mhwombat Apr 17 '12 at 13:20
so does the literal number desugar to `fromInteger n`? Is there similar functionality for other numeric class instances, e.g. a literal floating point number? –  jberryman Apr 17 '12 at 16:26
@jberryman see missingno's answer. Floating point literals have an implicit `fromRational`, similar to how integral literals have an implicit `fromInteger`. Those are the only two cases of automagical number transformation that I know of. –  Dan Burton Apr 18 '12 at 2:28