# Scheme - find most deeply values nested lists

I asked several days ago about finding the most deeply nested lists. I implemented the idea that was given, and it works.

But there is another problem: I also need to build a list from the nested list. meaning: If I change `(8)` and `(10 11 12)`, to leaf1 and leaf2, I need to return: `'(ans (leaf1 (8)) (leaf2 (10 11 12))`. /ans is a quote

In other words: my function will get `(1 (2 3) (4 (5) (7 (8) (10 11 12))))))` => the most nested lists are `(8)` and `(10 11 12)` => my function will return `'(ans (leaf1 (8)) (leaf2 (10 11 12))`.

I am trying to find an idea, not an implementation. Thanks.

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Yes, this is easy to do. Currently (if I understand correctly) you have a recursive function that descends a tree and uses `cons` to build a modified copy (in which the most deeply-nested lists are replaced with something). This is a common pattern for tree-recursive functions, but there's no reason they have to return a value with a similar structure to the input they recur on. For example, you could write a function to walk a tree of numbers and return their sum.
In this case it sounds like you probably want to keep the basic structure of your tree-recursive function, but use `cons` or possibly `append` to build a flat list of the most-deeply-nested-lists you've found.
I can't quite tell from your question, but you might also be looking for a way to write a function that returns two separate values: one being the tree with deeply-nested-lists replaced by something else, and the other being the flat list of the replaced bits themselves. In this case you might want to look into the Scheme procedures `values` and `call-with-values`, and maybe the library form `let-values` if your Scheme has it. See the Schemewiki FAQ here for more info (scroll down).
@AdamSh: you certainly can build a new list in a recursive function: that's how most of the standard functions like `map` and `filter` work. It's hard to give better advice without seeing your code, but here are two toy problems which might be helpful: (1) write a function to take a tree of integers and return a similar tree with each number doubled (without modifying the original tree); (2) modify this function to add up all the numbers instead, or make a flat list of them. If you have trouble with this, I'd suggest getting a copy of The Little Schemer and working through it. Good luck! –  Jon O. Dec 11 '11 at 7:54