# Show basic arithmetic functions as string

for a homework assignment, a subtask is to make the arithmetic functions `(+)`, `(-)`, `(*)` and `div` showable.

We're solved the rest of the assignment, but we're stuck here. Right now we're using the solution to this question here to distinguish between the operations:

``````showOp op = case op 3 3 of
6 -> "plus"
0 -> "minus"
9 -> "times"
1 -> "divide"
_ -> "undefined"
``````

However, this strikes me as kind of ugly as things like `showOp (\a b -> a * 3 - y)` yield `"plus"`.

Is there any way to better distinguish between the operators?

We are using winhugs atm with the appropriate switches `-98 +o` in order to be able to use the needed extensions.

Edit: As requested, the actual assignment has to do with Arrays (specifically `Array Int (Int -> Int -> Int)`). It has to do with generating arrays of operators that fulfill certain conditions.

The assignment states:

Make the data type `Array Int (Int->Int-Int)` an Instance of `Show`. The arithmetic operations from the previous exercises should be represented as "plus", "minus", "times" and "div".

thx for any help in advance

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I would be nice to see some more context from the assignment, because making functions themselves showable seems like a strange requirement for homework. –  shang May 3 '13 at 9:13
If the requirement is explicitly for `Int->Int->Int`, there is little better you can do than such a heuristic unsafe case table. (It would be possible to make it much nicer if general `(Num a) => a->a->a` was allowed...) –  leftaroundabout May 3 '13 at 9:34
I think that is as good as you are going to see--I think it is absolutely impossible to check equality for functions, which means that you need to check for operational equivalence. You could expand the range of tests to catch more undefined functions, but not much more. –  isturdy May 3 '13 at 15:35
@isturdy: You could check functions of type `Int -> Int -> Int` for extensional equality easily enough. You just need to apply both functions to all possible arguments and check that they produce the same result! It might take a while, though. –  C. A. McCann May 3 '13 at 16:55
True, I forgot that `Int` is bounded. But I do get somewhat impatient... –  isturdy May 3 '13 at 18:54

Use induction :)

``````{-# LANGUAGE FlexibleInstances #-}

instance Eq (Int-> Int -> Int) where
f == g = induce f g where
base = 1
n = 2
induce f g = and [f 1 n' == g 1 n' | n' <- [base, n, n+1]]

instance Show (Int-> Int -> Int) where
show a = showOp a where
showOp op = case lookup op ops of
Just a -> a
otherwise  -> "undefined"
ops = [((+),"plus")
,((-),"minus")
,((*),"times")
,(div,"divide")]
``````

Output:

``````*Main> (\a b -> a * 3 - b) :: (Int->Int->Int)
undefined
``````
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`all (==True)` is better expressed as `all id` –  is7s May 18 '13 at 21:19
@is7s awesome! thanks for the tip –  גלעד ברקן May 18 '13 at 23:04
@is7s: Or even better, `and`. –  hammar May 18 '13 at 23:07
@hammar ..cool! –  גלעד ברקן May 18 '13 at 23:09