(**) Truth tables for logical expressions (3).
Generalize problem P47 in such a way that the logical expression may contain any number of logical variables. Define table/2 in a way that table(List,Expr) prints the truth table for the expression Expr, which contains the logical variables enumerated in List.
import Control.Monad (replicateM) -- functions as in solution 46 infixl 4 `or'` infixl 4 `nor'` infixl 5 `xor'` infixl 6 `and'` infixl 6 `nand'` infixl 3 `equ'` -- was 7, changing it to 3 got me the same results as in the original question :( tablen :: Int -> ([Bool] -> Bool) -> IO () tablen n f = mapM_ putStrLn [toStr a ++ " => " ++ show (f a) | a <- args n] where args n = replicateM n [True, False] toStr = unwords . map (\x -> show x ++ space x) space True = " " space False = " "