I am trying to implement something like this:

``````mymin (x:[]) = x
mymin (x:y:xs) = mymin ((if x < y then x else y):xs)

mysort [] = []
mysort (x) = mymin x (mysort othervalues)
``````

i know this code is wrong but its just the idea. How can i concat the rest of values with the min value that return the recursion. input will be like

mysort [7,9,3,7,1,2]

``````[1,**7,9,3,7,2**]
[1,2,**7,9,3,7**]
[1,2,3,**7,9,7**]
[1,2,3,7,**7,9**]
[1,2,3,7,7,**9**]
[1,2,3,7,7,9]
``````
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I think you are trying to implement selection sort.

It is better for `mymin` to return the minimum element along with rest of the elements of the list.

``````mymin :: Ord a => [a] -> (a,[a])
mymin [x] = (x,[])
mymin (x:xs) = let (min,rest) = mymin xs
in if x < min then (x,min:rest) else (min,x:rest)

mysort :: Ord a => [a] -> [a]
mysort [] = []
mysort xs = let (min,rest) = mymin xs
in min:mysort rest
``````
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thank you. one question i always have to define the type a? –  Urah Dec 10 '12 at 9:14
@Urah No, you don't need to. `a` is just any type which belong to typeclass `Ord`. It is just to make your function polymorphic over `Ord` class. But it is better practice to write types before writing function definitions. Also by writing types you can provide compiler with certain hints with which it can perform certain kind of optimizations. –  Satvik Dec 10 '12 at 11:43

You need to remove the first occurence of the min from your list and concat it to the front of the rest

``````mymin :: (Ord a) => [a] -> a
mymin [x] = x
mymin (x:y:xs) | x < y     = mymin (x:xs)
| otherwise = mymin (y:xs)

myremove :: (Eq a) => a -> [a] -> [a]
myremove x []  = []
myremove x (y:ys) | x == y    = ys
| otherwise = y: myremove x ys

mysort :: (Ord a) => [a] -> [a]
mysort []  = []
mysort [x] = [x]
mysort xs  = x : mysort (myremove x xs) where x = mymin xs
``````
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Building on Satvik's answer, you could avoid explicit recursion by writing `mymin` as

``````mymin :: Ord a => [a] -> (a, [a])
mymin (x : xs) = foldr f (x, []) xs where
f z (y, ys) = if y < z then (y, z : ys) else (z, y : ys)
``````
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