Pm_tut> :t negate
negate :: Num a => a -> a
####
Pm_tut> :t (-)
(-) :: Num a => a -> a -> a
##
##
nats = [0..]
##
##
Pm_tut> take 10 nats
[0,1,2,3,4,5,6,7,8,9]
##
##
open FH, '<', $file or die "Can't open $file for reading: $!\n";
##
##
const x y = x
##
##
(-) :: Num a => a -> a -> a
##
##
(-) :: Num a => (a, a) -> a
##
##
(-) :: Num a => a -> (a -> a)
##
##
(5-)
##
##
Pm_tut> putStr "Hello, world!\n"
Hello, world!
Pm_tut>
##
##
factorial n = if n == 0 then 1
else n * factorial (n-1)
##
##
Pm_tut> :t factorial
factorial :: Num a => a -> a
##
##
factorial 0 = 1
factorial n = n * factorial (n-1)
##
##
factorial n = n * factorial (n-1)
factorial 0 = 1
##
##
factorial 0 = 1
factorial (n+1) = (n+1) * factorial n
##
##
factorial n = tr n 1 where
tr 0 f = f
tr n f = tr (n-1) (n*f)
##
##
factorial n = product [1..n]
##
##
product = foldl (*) 1
##
##
foldl f z [] = z
foldl f z (x:xs) = foldl f (f z x) xs
##
##
product xs = foldl (*) 1 xs
##
##
sum xs = foldl (+) 0 xs -- this is in the Standard Prelude, too
##
##
or xs = foldl (||) False xs -- this is also in the Prelude
##
##
and xs = foldl (&&) True xs -- so is this
##
##
anyprime xs = or (map prime xs) -- map does what you'd expect
allprime xs = and (map prime xs)
##
##
foldl :: (a -> b -> a) -> a -> [b] -> a
##
##
andprime p n = p && prime n
allprime xs = foldl andprime True xs
##
##
allprime xs = foldl (\p n -> p && prime n) True xs
##
##
factorials = scanl (*) 1 [1..]
##
##
Pm_tut> take 10 factorials
[1,1,2,6,24,120,720,5040,40320,362880]
Pm_tut> factorials !! 24
620448401733239439360000
##
##
Pm_tut> factorials !! 65536
ERROR - Garbage collection fails to reclaim sufficient space
Pm_tut>