# list manipulation with “no indata”

``````aaa ::  [[(Char, Float)]] -> Float ->  [[(Char, Float)]]
aaa [[]] a = error "no indata"
aaa [[(a,b)]] c = [[(a, b/c)]]
aaa ([(a,b)]:tail) c = [(a, b/c)] : (aaa tail c)
``````

How to make it work with:

``````aaa [[('a',3),('b',4),('c',5)],[('a',3),('b',4),('c',5)] ] 4
``````

the result:

``````[[('a',0.75),('b',1),('c',1.25)],[('a',0.75),('b',1),('c',1.25)]]
``````
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``````> let l = [[('a',3),('b',4),('c',5)],[('a',3),('b',4),('c',5)] ]
> let aaa list n = map (map (\(c,y) -> (c,(fromIntegral y) / n))) list
> aaa l 4.0
[[('a',0.75),('b',1.0),('c',1.25)],[('a',0.75),('b',1.0),('c',1.25)]]
``````

The types in your snippet down match. You try to apply functions defined on float on integers. You have to pass floats to the functions. That's why i convert the integers with (fromIntegral y) to floats before applying the floating point division "/" on them. The second argument has to be a floating point number too, so use 4.0 instead of 4.

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Thee is no `fromIntegral` needed, since the numbers in the list are already `Float`s. –  FUZxxl Oct 6 '11 at 11:19
`4` has a type of `(Num a) => a` which is to say, any number type. If you use `4` in a way that makes it clear that it means `4.0` the compiler will play along; Haskell is not Ocaml (no offense to any ML/ML-derivative users). –  BMeph Apr 17 '12 at 20:26

There is a number a ways you can achieve your goal. I think it is instructive to try to implement the recursion explicitly, as you have tried to do. However, I think your code will be more clear, if you split it up into smaller parts. Consider having two functions, with the following signatures:

``````innerTransform :: [(Char, Float)] -> Float -> [(Char, Float)]

aaa :: [[Char, Float]] -> Float -> [[(Char, Float)]]
``````

Then you can use `innerTransform` in your implementation of `aaa`.

When you have implemented `aaa` through explicit recursion, you can try to work towards implementing it with functions such as `map`, as described in another answer. As a middle step in that direction, try solving it by mapping `innerTransform` over the outer list. You need to fiddle around a bit with the argument order to innerTransform:

``````innerTransformFlipped :: Float -> [(Char, Float)] -> [(Char, Float)]
``````

and then partially apply that function to the float to obtain:

``````mappingFunction :: [(Char, Float)] -> [(Char, Float)]
``````

which you can use as an argument to `map`.

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Using list comprehension this could be something like :

``````aaa l v = [map (\(a,­b) -> (a,b/v))  x | x <- l]
``````
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