Note: I am trying to implement this without using library functions

This is not a good idea in general. A better exercise is this:

- Figure out how to implement it using library functions.
- Figure out how to implement whichever library functions you used in step 1 on your own.

This way you're learning three key skills:

- What are the standard library functions, and examples of when they are useful.
- How to break problems into smaller pieces
- How to write basic functions like the ones in the libraries.

In this case, however, your `whatIndex`

is more or less the same function as `elemIndex`

in `Data.List`

, so your problem reduces to writing your own version of this library function.

The trick here is that you want to increment a counter while you recurse down the list. There is a standard technique for writing tail recursive functions, which is called an **accumulating parameter**. It works like this:

- You write an
*auxiliary* function that, compared to the "front-end" function, takes an extra parameter (or more) to keep track of the extra information.
- You then define the "real" function as a call to the auxiliary one.

So for `elemIndex`

, the auxiliary function would be something like this (with `i`

as the accumulating parameter for the current element index):

```
-- I'll leave the blanks for you to fill.
elemIndex' i x [] = ...
elemIndex' i x (x':xs) = ...
```

Then the "driver" function is this:

```
elemIndex x xs = elemIndex 0 x xs
```

But there is a serious problem here that I must mention: **getting this function to perform well in Haskell is tricky**. Tail recursion is a useful trick in *strict* (non-lazy) functional languages, but not so much in Haskell, because:

- A tail-recursive function in Haskell can still blow the stack,
- A non-tail-recursive function can run in constant space.

This older answer of mine shows an example of the second point.

So in your case, a non-tail-recursive solution is probably the easiest one you can give that will run in constant space (i.e., not blow the stack on a long list):

```
elemIndex x xs = elemIndex' x (zip xs [0..])
elemIndex' x pairs = snd (find (\(x', i) -> x == x') pairs)
-- | Combine two lists by pairing together their first elements, their second
-- elements, etc., until one of the lists runs out.
--
-- EXERCISE: write this function on your own!
zip :: [a] -> [b] -> [(a, b)]
zip xs ys = ...
-- | Return the first element x of xs such that pred x == True. Returns Nothing if
-- there isn't one, Just x if there is one.
--
-- EXERCISE: write this function on your own!
find :: (a -> Bool) -> [a] -> Maybe a
find pred xs = ...
```

`Learn You a Haskell for Great Good!`

is what I am currently using to learn Haskell. You should not make comments assuming things you are no position to assume. Questions that may seem trivial to you, may not be trivial to others. So I recommend you keep such 'spam' comments to yourself ;) – AnchovyLegend Feb 13 '13 at 1:02