Dismiss
Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

# How do you define a function of signature h :: M Int -> M Int -> M Int so that h (M x) (M y) = M (x+y) without unwrapping the monad?

``````h x y = x >>= (\x -> g x y)
``````

or equivalently ( in context of the article )

``````h :: W Int -> W Int -> W Int
h x y = bind ( \x-> g x y ) x
``````

where g is

``````g :: Int -> W Int -> W Int
g x y = y >>= (return . (+x))
``````

`data W a = W a deriving Show`

Now I am a little confused, how can you put x in g if it takes an `Int` as first parameter but x is `W Int`?

-

There are two different `x` variables and the inner one is shadowing the outer one inside the lambda expression. A clearer way to write the code would be something like
``````h mx my = mx >>= (\x -> g x my)
Missingno noted a crucial step, but the answer to the titular question is: `liftM2 (+)`.