# Rotate char Matrix image in Haskell

I'm currently working on an assignment for my class and one of the requirements is to create a function called rotate90. This function basically takes in a [[Char]] and rotates it 90 degrees clockwise.

For example:

``````type Picture = [[Char]]
pic :: Picture
pic = [ "123",
"456",
"789" ]
``````

turns into:

``````[ "741",
"852",
"963" ]
``````

My code thus far looks something like this:

``````rotate90 :: Picture -> Picture
rotate90 (x:xs)
| (x:xs) == []          = []
| xs == [] && x /= []   = formRow ([[]]) (formCol x)
| xs /= []              = formRow (rotate90 xs) (formCol x)

formCol :: [Char] -> [[Char]]
formCol y = [[a] | a <- y]

formRow :: [[Char]] -> [[Char]] -> [[Char]]
formRow (x:xs) (y:ys)
| xs == [] || ys == []  = (x++y):[]
| otherwise             = (x++y):formRow xs ys
``````

Right now it only prints the first "line" of the matrix, which, from the example, is "741". How do I get it to print the rest of it?

-

A simple implementation in terms of `Data.List.transpose` is

``````-- | Rotate clockwise
cw = map reverse . transpose
-- | Rotate counter-clockwise
cw = reverse . transpose
``````

``````147
258
369
``````

and reversing each row results in the rotated picture

``````741
852
963
``````

In general, you can express mirroring and rotating in arbitrary directions using combinations of the following three functions:

``````transpose
map reverse -- mirror left <-> right
reverse -- mirror top <-> bottom
``````
-
Thats great Thanks! –  mys.celeste Feb 4 '13 at 12:30
Oh wait, is there another way to do it without using transpose? We're not supposed to use any built in function besides map and reverse. –  mys.celeste Feb 4 '13 at 12:31
You can always define `transpose` yourself, it relies only on pattern matching and recursion. The code can be found here. –  David Feb 4 '13 at 12:33
I think that should work! Thank you! –  mys.celeste Feb 4 '13 at 12:35
If you have trouble understanding the implementation of `transpose`: the first parenthesis of the last line takes the first element of all sub-lists, and groups them together into a list, which makes the first row of your transposed matrix. The recursion then transposes the rest. Transposing `[]` yields `[]`, transposing something that has an empty first line is simply ignoring that empty line. –  David Feb 4 '13 at 12:37