A confusing title for a confusing question! I understand a) monads, b) the IO monad, c) the Cont monad (Control.Monad.Cont), and d) the ContT continuation transformer monad. (And I vaguely understand monad transformers in general -- though not enough to answer this question.) I understand how to write a program where *all* the functions are in the Cont monad (`Cont r a`

), and I understand how to write a program where *all* the functions are in the combined Cont/IO monad (`ContT r IO a`

).

But I'm wondering how I might write a program where *some* functions are in a combined Cont/IO monad (`ContT r IO a`

) and *other* functions are just in the Cont monad (`Cont r a`

). Basically, I want to write the whole program in continuation style, but only use the IO monad where necessary (much like in "regular" Haskell code, I only use the IO monad where necessary).

For example consider these two functions, in non-continuation style:

```
foo :: Int -> IO Int
foo n = do
let x = n + 1
print x
return $ bar x
bar :: Int -> Int
bar m = m * 2
```

Note that `foo`

requires IO but `bar`

is pure. Now I figured out how to write this code fully using the continuation monad, but I needed to thread IO through `bar`

as well:

```
foo :: Int -> ContT r IO Int
foo n = do
let x = n + 1
liftIO $ print x
bar x
bar :: Int -> ContT r IO Int
bar m = return $ m * 2
```

I *do* want all my code in continuation style, but I *don't* want to have to use the IO monad on functions that don't require it. Basically, I *would like* to define `bar`

like this:

```
bar :: Int -> Cont r Int
bar m = return $ m * 2
```

Unfortunately, I can't find a way to call a `Cont r a`

monad function (`bar`

) from inside a `ContT r IO a`

monad function (`foo`

). Is there any way to "lift" a non-transformed monad into a transformed one? i.e., how can I change the line "`bar x`

" in `foo`

so that it can correctly call `bar :: Int -> Cont r Int`

?