# Convert Algebraic Expression directly into Binary Tree Structure (sans prefix / postfix)

I am looking all over internet to find a logic to convert an Algebraic Expression into a Binary Tree.

I could only find ones where you first convert the algebra expression to postfix or prefix and then convert it to Binary Tree.

I did try come with logic , but it didnt work in all cases, the issue was with choosing the correct Operand as the Root Parent node. I coudnt find a generalized logic to crack that.

I am just curious to know , if its possible.

Any pointers to external links or logical answers to put me in the right direction ?

## Edit

yes A Syntax Tree

So this expression

``````A+(B-C)*D+E*F
``````

should be translated into

``````              |-(+)-|
|     |
|---(*)---|     |---(*)---|
|         |     |         |
|---(+)---|   D     E         F
|         |
|         |
A   |--( - )--|
|         |
B          C
``````
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Can you provide an example? What do you mean by "convert an Algebraic Expression into a Binary Tree" Do you mean some kind of syntax-tree related to the Algebraic Expression? –  MrSmith42 Aug 9 '13 at 11:03
What have you tried? What kind of algebraic Expressions? –  barak1412 Aug 9 '13 at 11:14
Just for correctness: This translation is wrong since * has a higher precedence then +. The syntax tree is equivalent to (A+(B-C))*D+E*F –  m47h Aug 16 '13 at 11:11

My simple suggestion is to:

• Parse the expression and separate it like this `A`, `+(B-C)*D` and `+E*F`.
• Try to group those groups by number of variables/operations so that you can roughly split the expression in half - for example group `A` and `-(E*F)` in one group - `A - E*F` and the other is `+(B-C)*D`. Now you could split every group recursively into nodes and leaves.

EDIT:

It would result in something like this

step 1:

``````String left = "A - E*F";
String right = "+(B-C)*D";
``````

step 2:

``````    |------------(+)---------|
|                        |
|---(-)---|             |---(*)---|
|         |             |         |
|         |             |         D
A   |--(*)--|      |---(-)---|
|       |      |         |
E       F      B         C
``````

Of course, all this means that your parser should be aware of the Order of operations

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