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The question is like this:

Write a function that takes an integer list and returns its length and the second largest integer in the list.

I can solve this with two functions but is there any solution that use only one function to do it?

Any help is appreciated! Thanks!

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1  
What's your definition of "1 function" vs "2 functions"? You can put the second one in a where clause of the first one, then it's only one function :) – us2012 Oct 1 '13 at 21:55
    
The general solution for finding the top k items (and therefore the kth largest item) in a single pass uses a priority queue, so you always know the top k so far at every step through the iteration. There's a blog post here. For very small k, a priority queue might be overkill in performance terms, but it's probably easiest to stick with it - don't optimise prematurely IOW. I'm sure there's a suitable priority queue in the Haskell library somewhere. – Steve314 Oct 1 '13 at 22:14
4  
@Steve314 I think that is unnecessary in Haskell, as the lazy evaluation means that using something like take k (sort xs) should be efficient. – Adam Oct 2 '13 at 0:52
3  
@Steve314 With GHC's implementation of sort, the take k (sort xs) trick is asymptotically optimal. – Daniel Wagner Oct 2 '13 at 1:03
2  
@Steve314 This is a win of laziness over strictness, not functional over imperative. See also my answer to this question which tries to explain the core advantage of laziness. – Daniel Wagner Oct 2 '13 at 1:05

Don't make it complicated.

f xs = (sort xs !! 1, length xs)

If you choose to make it complicated, make it complicated in the right way.

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1  
I interpreted 'second largest integer' to be in terms of magnitude. I.e. in [1,1,2,3,3], we'd want 2. (psst, your sort order is backwards ;) ). – jtobin Oct 2 '13 at 1:38
    
As Daniel hasn't fixed this yet - to change the sort order, use sortBy. Or, in the spirit of the existing code, use something like reverse . sort $ xs !! 1. Or, as length xs is being evaluated anyway, use sort xs !! (length xs - 2). – Steve314 Oct 3 '13 at 0:24

Edited to use @ThomasM.DuBuisson's suggestion

You can solve this the same way that you could finding the max: using a fold. Max can be pretty trivially implemented with

mymaximum :: Ord a => [a] -> a
mymaximum xs = foldl searcher (head xs) xs
    where
        searcher :: Ord a => a -> a -> a
        searcher a b
            | a > b     = a
            | otherwise = b

So we can implement it similarly by just keeping up with the two largest values (notice that we have to "seed" the fold with a tuple as well):

nextmaximum :: Ord a => [a] -> a
nextmaximum xs = fst $ foldl searcher (h, h) xs
    where
        h = head xs
        searcher :: (Ord a) => (a, a) -> a -> (a, a)
        searcher (s, f) x = (min f (max s x), max f x)
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3  
searcher (s,f) x = (min f (max s x), max f x) – Thomas M. DuBuisson Oct 2 '13 at 0:42
    
@ThomasM.DuBuisson Good suggestion, it'd be faster and it's much simpler. – bheklilr Oct 2 '13 at 0:52
1  
@zip Notice this solution is partial - it will raise an exception if passed a null list. It is easy enough to change this behavior (pattern match the argument to nextmaximum and handle the special case), but it isn't clear what you'd like done in this case. – Thomas M. DuBuisson Oct 2 '13 at 1:04
    
We can simplify, foldr searcher (head xs) xs == foldr1 searcher xs – viorior Oct 2 '13 at 7:22

You can just compose individual functions together. This is neither efficient nor robust, but it's sure easy to write:

f xs = maximum . filter (< maximum xs) $ xs
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head . (!!1) . group . sortBy (flip compare) $ [1,1,2,3,4,4,4,5,5,6,6,6,6]
5
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