Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I've just written this function which simply takes a pair whose second value is in some monad, and "pulls the monad out" to cover the whole pair.

unSndM :: Monad m => (a, m c) -> m (a, c)
unSndM (x, y) = do y' <- y
                   return (x, y')

Is there a nicer and/or shorter or point-free or even standard way to express this?

I've got as far as the following, with -XTupleSections turned on...

unSndM' :: Monad m => (a, m c) -> m (a, c)
unSndM' (x, y) = y >>= return . (x,)


share|improve this question
Rules of tag code-golf: stackoverflow.com/tags/code-golf/info –  Nakilon Oct 22 '10 at 23:53
Fair enough. The site let me add the tag without telling me there were rules associated with it. shrug –  gimboland Oct 23 '10 at 8:52

4 Answers 4

up vote 11 down vote accepted

One minor point: it's possible to write this using only fmap (no >>=), so you really only need a Functor instance:

unSndM :: (Functor f) => (a, f c) -> f (a, c)
unSndM (x, y) = fmap ((,) x) y

This version is a bit more general. To answer your question about a pointfree version, we can just ask pointfree:

travis@sidmouth% pointfree "unSndM (x, y) = fmap ((,) x) y"
unSndM = uncurry (fmap . (,))

So, yes, an even shorter version is possible, but I personally find uncurry a bit hard to read and avoid it in most cases.

If I were writing this function in my own code, I'd probably use <$> from Control.Applicative, which does shave off one character:

unSndM :: (Functor f) => (a, f c) -> f (a, c)
unSndM (x, y) = ((,) x) <$> y

<$> is just a synonym for fmap, and I like that it makes the fact that this is a kind of function application a little clearer.

share|improve this answer
The tupling also happens to be ordered conveniently, allowing a definition like unSmdM = uncurry $ fmap . (,). Interestingly, the type of this function is much more readable/descriptive than either implementation :) –  Anthony Oct 22 '10 at 15:45
I agree, but unSndM (x, y) = (x,) <$> y is pretty close. –  Travis Brown Oct 22 '10 at 15:56
Ooh, I didn't know about pointfree - nice, thanks! (I'd tried hoogle, of course.) Some nice versions here, without any extra imports or modifications to libraries ;-) - thank you. :-) –  gimboland Oct 22 '10 at 22:15
Thanks for the tip about pointfree. I've been using @pl with lambdabot on #haskell the whole time. –  Ollie Saunders Oct 22 '10 at 23:58
I just love pointfree. It should be part of every Haskell IDE. –  gawi Oct 23 '10 at 1:53

If the Traversable and Foldable instances for (,) x) were in the library (and I suppose I must take some blame for their absence)...

instance Traversable ((,) x) where
  traverse f (x, y) = (,) x <$> f y

instance Foldable ((,) x) where
  foldMap = foldMapDefault

...then this (sometimes called 'strength') would be a specialisation of Data.Traversable.sequence.

sequence :: (Traversable t, Monad m) => t (m a) -> m (t a)


sequence :: (Monad m) => ((,) x) (m a) -> m (((,) x) a)


sequence :: (Monad m) => (x, m a) -> m (x, a)

In fact, sequence doesn't really use the full power of Monad: Applicative will do. Moreover, in this case, pairing-with-x is linear, so the traverse does only <$> rather than other random combinations of pure and <*>, and (as has been pointed out elsewhere) you only need m to have functorial structure.

share|improve this answer
Sounds like the birth of a libraries@ proposal to me :-) –  sclv Oct 22 '10 at 17:37
Nice, and costrength is also sequence! hackage.haskell.org/packages/archive/category-extras/0.53.5/doc/… –  Sjoerd Visscher Oct 22 '10 at 21:06
Astonishing stuff. I knew it looked simple enough that a category theorist must have given it a name already. :-) –  gimboland Oct 22 '10 at 22:29
It's not much of a simplification, but there is a 'sequenceA :: (Traversable t, Applicative f) => t (f a) -> f (t a)' defined in (Data.)Traversible . I figured that since you mentioned "you only need ... functorial structure", you could use it. –  BMeph May 1 '11 at 0:48

I haven't seen it written in any Haskell library (though it's probably in category-extras), but it is generally known as the "tensorial strength" of a monad. See:



share|improve this answer

Hoogle is your friend. If one of the standard libraries had it then a hoogle for "Monad m => (a, m b) -> m (a,b)" would find it. Note the function could still be in a hackage package, but it often isn't worth an extra build-dep just for small functions like this.

share|improve this answer
"often isn't worth an extra build-dep just for small functions like this" <- this is such a sad thing :( –  Fresheyeball Jul 6 at 2:27

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.