I want to get the max and min value out of a List as a tuple by using recursion. I tried it with this code below and cant really figure out why it does not work. I would really appreciate a small hint what my error in reasoning is. Thanks much

seekMaxMin :: [Double] -> (Double,Double)
seekMaxMin [] = (0,0)
seekMaxMin [x] = (x,x)
seekMaxMin (x:rest) = (max x(seekMaxMin rest), min x(seekMaxMin rest))
  • 1
    "cant really figure out why it does not work." But you got a type error, didn't you? – user824425 Apr 30 '14 at 11:34

seekMaxMin returns a tuple of both the min and the max, but in your last equation you pretend first that it only returns the max and secondly that it only returns the min. You can use a pattern to extract them both and get rid of the redundant walk down the list as well.

seekMaxMin (x:rest) = (max x rmax, min x rmin)
    where (rmax, rmin) = seekMaxMin(rest)

I'm also a little bit opposed to making the min of an empty list of doubles be 0, but perhaps it's suitable for whatever purpose you have with this function.

  • thanks a lot, i did not know this syntax is possible. But im really a newbie in programming.. – user3588998 May 1 '14 at 8:00

Monocell's answer is the one I'd recommend. However, looking at your code, I think the logic you might have been thinking of is:

seekMaxMin :: [Double] -> (Double,Double)
seekMaxMin [] = (0,0)
seekMaxMin [x] = (x,x)
seekMaxMin (x:rest) = (maximum $ x:[fst $ seekMaxMin rest], minimum $ x:[snd $ seekMaxMin rest])
  • 2
    why are you using 2 recursive calls? – Simon Bergot Apr 30 '14 at 17:05
  • @Simon, good point, they could probably be refactored into a where. I'm not sure if that's premature optimization though (?) – ars-longa-vita-brevis Apr 30 '14 at 19:36
  • 1
    In this case no. The point of seekmaxmin is to compute max & min in one traversal. With your version, you get 2^n complexity which is hudge. Simply using built in maximum & minimum functions would still yield linear complexity. – Simon Bergot Apr 30 '14 at 20:32

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