If I define the "bind" function like this:
(>>=) :: M a > (a > M' b) > M' b
Will this definition help me if I want the result to be of a new Monad type, or I should use same Monad but with b in the same Monad box as before?
As I've mentioned in the comment, I don't think such operation can be safely defined for general monads (e.g. However, if the M is safely convertible to M', then this bind can be defined as:
And conversely,
Some of such safe conversion methods are 


Not only will that definition not help, but it will seriously confuse future readers of your code, since it will break all expectations of use for it. For instance, are both M and M' supposed to be Monads? If so, then how are they defined? Remember: the definition of Also, do you get to choose which M and M' you use, or does the computer? If so, then how do you choose? Does it work for any two Monad instances, or is there some subset of Monad that you want  or does the choice of M determine the choice of M'? It's possible to make a function like what you've written, but it surely is a lot more complicated than 


This can be a complicated thing to do, but it is doable in some contexts. Basically, if they are monads you can see inside (such as One thing which is sometimes quite handy (in GHC) is to replace the
You can then control which types can be sequenced using the bind operator based on which instances of For instance, perhaps you have some operations in your monad which absolutely cannot be followed by any other operations. Want to enforce that statically? Define an empty datatype This approach is not good for transposing from (say) If you really do want to change monads, you can modify the class definitions above into something like
I've used the former style to useful ends, though I imagine that this latter idea may also be useful in certain contexts. 


You may want to look at this sample from Oleg: http://okmij.org/ftp/Computation/monads.html#parammonad 


M
andM'
aren't (just) monads. – KennyTM Jul 16 '10 at 18:36IO (Maybe a)
), though. – KennyTM Jul 16 '10 at 18:48