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| -- This exercise covers the first 6 chapters of "Learn You a Haskell for Great Good!" | |
| -- Chapter 1 - http://learnyouahaskell.com/introduction | |
| -- Chapter 2 - http://learnyouahaskell.com/starting-out | |
| -- Chapter 3 - http://learnyouahaskell.com/types-and-typeclasses | |
| -- Chapter 4 - http://learnyouahaskell.com/syntax-in-functions | |
| -- Chapter 5 - http://learnyouahaskell.com/recursion | |
| -- Chapter 6 - http://learnyouahaskell.com/higher-order-functions | |
| -- Download this file and then type ":l Chapter-1-6.hs" in GHCi to load this exercise | |
| -- Some of the definitions are left "undefined", you should replace them with your answers. | |
| -- Find the penultimate (second-to-last) element in list xs | |
| penultimate xs = last (init xs) | |
| -- Find the antepenultimate (third-to-last) element in list xs | |
| antepenultimate xs = last (init (init xs)) | |
| -- Left shift list xs by 1 | |
| -- For example, "shiftLeft [1, 2, 3]" should return "[2, 3, 1]" | |
| shiftLeft [] = [] | |
| shiftLeft (x:xs) = xs ++ [x] | |
| -- Left shift list xs by n | |
| -- For example, "rotateLeft 2 [1, 2, 3]" should return "[3, 1, 2]" | |
| rotateLeft 0 xs = xs | |
| rotateLeft n xs = rotateLeft (n - 1) (shiftLeft xs) | |
| -- Insert element x in list xs at index k | |
| -- For example, "insertElem 100 3 [0,0,0,0,0]" should return [0,0,0,100,0,0] | |
| insertElem x 0 xs = x:xs | |
| insertElem x k (xx:xs) = xx:(insertElem x (k - 1) xs) | |
| -- Here we have a type for the 7 days of the week | |
| -- Try typeclass functions like "show" or "maxBound" on them | |
| data Day = Mon | Tue | Wed | Thu | Fri | Sat | Sun | |
| deriving (Eq, Ord, Show, Bounded, Enum) | |
| -- Note that if you try "succ Sun", you should get an error, because "succ" is not defined on "Sun" | |
| -- Define "next", which is like "succ", but returns "Mon" on "next Sun" | |
| next :: Day -> Day | |
| next Sun = Mon | |
| next x = succ x | |
| -- Return "True" on weekend | |
| isWeekend :: Day -> Bool | |
| isWeekend Sat = True | |
| isWeekend Sun = True | |
| isWeekend _ = False | |
| data Task = Work | Shop | Play deriving (Eq, Show) | |
| -- You are given a schedule, which is a list of pairs of Tasks and Days | |
| schedule :: [(Task, Day)] | |
| schedule = [(Shop, Fri), (Work, Tue), (Play, Mon), (Play, Fri)] | |
| -- However, the schedule is a mess | |
| -- Sort the schedule by Day, and return only a list of Tasks. | |
| -- If there are many Tasks in a Day, you should keep its original ordering | |
| -- For example, "sortTask schedule" should return "[(Play, Mon), (Work, Tue), (Shop, Fri), (Play, Fri)]" | |
| sortTask :: [(Task, Day)] -> [(Task, Day)] | |
| sortTask xs = [minBound..maxBound] >>= \day -> filter ((day ==) . snd) xs | |
| -- This function converts days to names, like "show", but a bit fancier | |
| -- For example, "nameOfDay Mon" should return "Monday" | |
| nameOfDay :: Day -> String | |
| nameOfDay Mon = "Monday" | |
| nameOfDay Tue = "Tuesday" | |
| nameOfDay Wed = "Wednesday" | |
| nameOfDay Thu = "Thursday" | |
| nameOfDay Fri = "Friday" | |
| nameOfDay Sat = "Saturday" | |
| nameOfDay Sun = "Sunday" | |
| -- You shouldn't be working on the weekends | |
| -- Return "False" if the Task is "Work" and the Day is "Sat" or "Sun" | |
| labourCheck :: Task -> Day -> Bool | |
| labourCheck Work Sat = False | |
| labourCheck Work Sun = False | |
| labourCheck _ _ = True | |
| -- Raise x to the power y using recursion | |
| -- For example, "power 3 4" should return "81" | |
| power :: Int -> Int -> Int | |
| power _ 0 = 1 | |
| power x y = x * (power x (y - 1)) | |
| -- Convert a list of booleans (big-endian) to a interger using recursion | |
| -- For example, "convertBinaryDigit [True, False, False]" should return 4 | |
| convertBinaryDigit :: [Bool] -> Int | |
| convertBinaryDigit bits = f bits 0 | |
| where f [] acc = acc | |
| f (x:xs) acc = f xs (acc * 2 + (if x then 1 else 0)) | |
| -- Create a fibbonaci sequence of length N in reverse order | |
| -- For example, "fib 5" should return "[3, 2, 1, 1, 0]" | |
| fib :: Int -> [Int] | |
| fib 0 = [] | |
| fib 1 = [0] | |
| fib 2 = [1, 0] | |
| fib n = (x + y):all | |
| where all@(x:y:xs) = fib (n - 1) | |
| -- Determine whether a given list is a palindrome | |
| -- For example, "palindrome []" or "palindrome [1, 3, 1]" should return "True" | |
| palindrome :: Eq a => [a] -> Bool | |
| palindrome xs = xs == (reverse xs) | |
| -- Map the first component of a pair with the given function | |
| -- For example, "mapFirst (+3) (4, True)" should return "(7, True)" | |
| mapFirst :: (a -> b) -> (a, c) -> (b, c) | |
| mapFirst f (x, y) = (f x, y) | |
| -- Devise a function that has the following type | |
| someFunction :: (a -> b -> c) -> (a -> b) -> a -> c | |
| someFunction f g a = f a (g a) |
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