The implementation of Monoid:

class Monoid a where
        mempty  :: a
        -- ^ Identity of 'mappend'
        mappend :: a -> a -> a
        -- ^ An associative operation
        mconcat :: [a] -> a

        -- ^ Fold a list using the monoid.
        -- For most types, the default definition for 'mconcat' will be
        -- used, but the function is included in the class definition so
        -- that an optimized version can be provided for specific types.

        mconcat = foldr mappend mempty

instance Monoid [a] where
        {-# INLINE mempty #-}
        mempty  = []
        {-# INLINE mappend #-}
        mappend = (++)
        {-# INLINE mconcat #-}
        mconcat xss = [x | xs <- xss, x <- xs]

"A monad is just a monoid in the category of endofunctors"

xs >>= f = concatMap f xs

Similarly, mconcat for lists is just concat. Here in Base, however, we don't have concatMap, and we'll refrain from adding it here so it won't have to be hidden in imports. Instead, we use GHC's list comprehension desugaring mechanism to define mconcat and the Applicative and Monad instances for lists. We mark them INLINE because the inliner is not generally too keen to inline build forms such as the ones these desugar to without our insistence.

Defining these using list comprehensions instead of foldr has an additional potential benefit, as described in compiler/deSugar/DsListComp.lhs: if optimizations needed to make foldr/build forms efficient are turned off, we'll get reasonably efficient translations anyway.

instance Monoid b => Monoid (a -> b) where
        mempty _ = mempty
        mappend f g x = f x `mappend` g x

instance Monoid () where
        -- Should it be strict?
        mempty        = ()
        _ `mappend` _ = ()
        mconcat _     = ()

instance (Monoid a, Monoid b) => Monoid (a,b) where
        mempty = (mempty, mempty)
        (a1,b1) `mappend` (a2,b2) =
                (a1 `mappend` a2, b1 `mappend` b2)

I think what it's saying (on the last instance) is that a tuple of monoids is a monoid of tuples...

And defines it for up to five of them...

Looks like this is a shorthand for importing?

Prelude> :m + Data.Monoid
Prelude Data.Monoid>

λ: :m + Data.Monoid
λ: :show imports
import Prelude -- implicit
import Data.Monoid
λ: :m - Data.Monoid
λ: :show imports
import Prelude -- implicit
λ:

So in GHCI you can unimport stuff... neato.

I found this talk not unwatchable:

Brandon.Si(mmons) blog: The Monoid Instance for Ordering