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Being new to Haskell I am having trouble to get an Order instance implemented for my datatype, namely:

data Polynom = Polynom ([Double])
deriving Show   
p0 = Polynom([3.9,4.2,2.7])
p1 = Polynom([0.0,0.2,-3.6,9.4])

Polynomes are being a list of doubles, where i.e. p0 = 2.7x² + 4.2x + 3.9. My problem is that I just couldn't figure out the correct syntax for declaring the various if-cases, starting something like:

instance Ord Polynom where
realLength(a) > realLength(b) = a > b
       where if realLength(a)) == realLength(b) = compare lastElement(a) lastElement(b)

I know this is a really bad pseudo-code, but I hope you get the idea.

I would really appreciate any hints on how to get started, I think I can figure out the different cases myself!

Edit: Figured instance Eq could be something like that, but compiler does not accept it.

instance Eq Polynom where
(realPolynom a) == (realPolynom b) = (Polynom a) == (Polynom b)

Code for realPolynom:

realPolynom :: Polynom -> Polynom
realPolynom (Polynom(m:ns)) 
| m==0.0 = realPolynom (Polynom(ns))
| otherwise = Polynom(m:ns)
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1 Answer 1

You may be looking for

instance Ord Polynom where
  compare (Polynom p) (Polynom q) = compare (length p, reverse p) (length q, reverse q)

this compares polynomials first by length (degree). When lengths coincide, coefficients are compared.

Note that this assumes the first coefficient (last in the list) of a polynomial is non-null. That is, Polynomial [0,1,0] is greater thanPolynomial [0,2] according to this ordering. You may wish to add a dropWhile (==0) to cope with this.

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Brilliant! Wouldnt have thought there is such an easy solution. Yes I thought about that problem, but i felt a had to write a function dropping the zeros from the end. Still: compiler states there is no instace (Eq, Polynom) which I thought would be automaticly generated –  Krismu May 18 '14 at 16:54
@Krismu just add deriving (Show, Eq) after the datatype declaration. –  chi May 18 '14 at 17:35

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