From a gentle introduction to Haskell, there are the following monad laws. Can anyone intuitively explain what they mean?

```
return a >>= k = k a
m >>= return = m
xs >>= return . f = fmap f xs
m >>= (\x -> k x >>= h) = (m >>= k) >>= h
```

Here is my attempted explanation:

We expect the return function to wrap

`a`

so that its monadic nature is trivial. When we bind it to a function, there are no monadic effects, it should just pass`a`

to the function.The unwrapped output of

`m`

is passed to`return`

that rewraps it. The monadic nature remains the same. So it is the same as the original monad.The unwrapped value is passed to

`f`

then rewrapped. The monadic nature remains the same. This is the behavior expected when we transform a normal function into a monadic function.I don't have an explanation for this law. This does say that the monad must be "almost associative" though.