# pre, in, and post order of an arithmetic tree [scheme/racket]

Imagine an arithmetic expression such as (+ 1 (* 2 (- 3 5))) being thought of as a tree-like structure with numbers at the leaves and operator symbols at the interior nodes like below:

``````     +
/   \
1     *
/  \
2    -
/  \
3    5
``````

I have these functions already defined to access certain parts of the tree:

``````;; returns tree node
(define (operator lst)

;; returns left tree
(define (left-op lst)
(car lst))

;; returns right tree
(define (right-op lst)
(cddr lst))
``````

I am trying to write 3 functions `preorder`, `inorder`, and `postorder` that return a list of the tree traversed in the order they were encountered

I know how the tree traversal works from previous java programming but am having trouble coding this

ex for above: `(preorder '(+ 1 (* 2 (- 3 5))))` => `(+ 1 * 2 - 3 5)`

-

Your implementation of trees is not quite right, you need to represent a leaf (a number in the examples) as another tree with null left and right subtrees. Also, it's useful having a `make-tree` "constructor". Let's go step-by-step - first, a correct abstraction for representing trees:

``````(define (make-tree value left right)
(list left value right))

(define (operator tree)

(define (left-op tree)
(car tree))

(define (right-op tree)
``````

Now for the traversals. I'll help you with the first one, `preorder`:

``````(define (preorder tree)
(if (null? tree)
'()
(append (list (operator tree))
(preorder (left-op tree))
(preorder (right-op tree)))))
``````

The tree in the question would look like this:

``````(define tree
(make-tree '+
(make-tree 1 '() '())
(make-tree '*
(make-tree 2 '() '())
(make-tree '-
(make-tree 3 '() '())
(make-tree 5 '() '())))))
``````

Use it like this:

``````(preorder tree)
> '(+ 1 * 2 - 3 5)
``````

The other two traversals are very similar, just rearrange the three arguments for `append` in the correct order for each case - I'll let that as an exercise for the reader.

-
No problem, I updated my answer - thanks to data abstraction, you only need to change the accessor procedures, the algorithm remains unchanged. –  Óscar López Oct 12 '12 at 1:26
The above code works, copy-paste all of it and try again - you have a typo somewhere. –  Óscar López Oct 12 '12 at 1:33
Are you using `#lang racket` ? It's the only think I can think of, sorry, but it works for me. –  Óscar López Oct 12 '12 at 1:37
Didn't you read the answer? the sample tree in my code is exactly that tree! you can't pass `(+ 1 (* 2 (- 3 5)))` to the `preorder` procedure and expect it to work, you have to use `make-tree` to create the tree, as explained above! –  Óscar López Oct 12 '12 at 1:43
no problem, glad to know that everything is working fine now –  Óscar López Oct 12 '12 at 1:47
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