# Not expression conversion but conversion from preorder to Inorder (not expression)

I am not asking for a expression conversion

conversion from infix to prefix

I am just asking that for a BST, if the input is given in the form of prefix notation, i.e,preorder traversal of BST, Then how do i convert the sequence of values to infix notation, i.e Inorder traversal of a BST.

``````                 8
/  \
1    12
\     /
5   9
/   \
4     7
/
6
``````

for example the preorder traversal would give 8 1 5 4 7 6 12 9

how do i convert these sequence of values(inputs) to a inorder traversal expression 1 4 5 6 7 8 9 12.

AS in some cases inorder expression is easier to handle...

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"I am not asking for a expression conversion" - um, you are. –  user529758 Nov 15 '12 at 20:13
I would expect the pre-order traversal to be: 1 4 5 6 7 8 9 12, using 'left subtree, node, right subtree`. –  Thomas Matthews Nov 15 '12 at 20:44

Let

V = Vertex

L = Left Subtree

R = Right Subtree

Preorder = VLR

Inorder = LVR

Postorder = LRV

(Just switch order to fix and it's the same)

One way to put them back to make prefix values to infix values is to create a Binary Search Tree again with prefix values and do the Inorder traversal.

OR!

Just sort dude... (BST is always sorted if u squash them to a line (squash from top to bottom))

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lol question is 3 months old! hahahhaha oh gawd hahahha –  LarsChung Mar 5 '13 at 14:18

With a BST:
Prefix: Left subtree, node, right subtree.
Infix: Node, left subtree, right subtree.
Postfix: right subtree, left subtree, node.

The conversion depends on how you traverse the tree.

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I know that but i just wanted to know , if a sequence is given in prorder form , how do i convert the sequence of values into inorder form. –  Sumit Kumar Saha Nov 15 '12 at 20:27
Put it into a sorted BST, with left-most leaf containing the first node and the right-most leaf containing the maximum value. Then traverse it. Otherwise re-order the nodes (organizing into a new tree often helps vs. inplace re-ordering). –  Thomas Matthews Nov 15 '12 at 20:40
For your application, you should not tailor the tree to pre-order, but something more generic. –  Thomas Matthews Nov 15 '12 at 20:41
can you please elaborate your point , i didn't get you. –  Sumit Kumar Saha Nov 15 '12 at 20:55
BSTs can be in any order. Sorted BSTs can produce different results by how you traverse them. Take a pen and paper and try the different methods I posted. When "node" is encountered, write the number. –  Thomas Matthews Nov 15 '12 at 20:57