# Infix expression evaluation [closed]

I would like to evaluate(not convert) infix expression in C++. If you posses algorithm or even implementation of such algorithm(may be not C++, any language... I will try to rewrite it to C++) share please.

Evaluation means give the value of expression. (2+2)*3 is 12

I am sorry, I forgot that I am talking about stack solution, cause I know the tree solution and It is not suitable this time : (.

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It's not clear what you want to do. Could you explain more what you mean by "evaluate infox expression"? –  sth Aug 25 '12 at 13:00

## closed as not a real question by Kerrek SB, John Palmer, j0k, gion_13, AnteruAug 26 '12 at 12:18

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How do you got the expression? If you got it like `(3 + 4) - (1 * 2) + 1 =`

``````                  +
/          \
-            1
/          \
+            *
/     \      /    \
3      4    1       2
``````

http://cboard.cprogramming.com/cplusplus-programming/32682-inserting-infix-into-binary-tree.html

do a tree transversal of the tree like `Left Root Right` so it will be sth like this: 3 + 4 the result - the result of 1 * 2 the result + 1.

If you got the expression like `34+12*-1+` you can simulate assembly like do a stack and if you get to an operator pop the last 2 elements in the stack and apply the operator: put 3 in stack, put 4 in stack, get op. + so pop the last 2 elements and use the operator. Now you got only 7 in stack. Now read until get an operator so in the stack you will have 7 1 2 after op. * in stack you got 7 2 after op. - you get only 5 in stack add 1 in stack: Stack 5 1, use the last operator + and get the final result 6.

Ok, here is the code:

``````#include <STACK>

int GetResult( char * rpn )
{
std::stack<int> myStack;

int nr1, nr2; int length = strlen(rpn);

for (int i = 0; i < length; i++)
{
if (isdigit(rpn[i]))
{
myStack.push(rpn[i] - '0');
}
else
{
switch(rpn[i])
{
case '+':
nr1 = myStack.top();
myStack.pop();
nr2 = myStack.top();
myStack.pop();
myStack.push(nr2 + nr1);
break;

case '-':
nr1 = myStack.top();
myStack.pop();
nr2 = myStack.top();
myStack.pop();
myStack.push(nr2 - nr1);
break;

case '*':
nr1 = myStack.top();
myStack.pop();
nr2 = myStack.top();
myStack.pop();
myStack.push(nr2 * nr1);
break;

case '/':
nr1 = myStack.top();
myStack.pop();
nr2 = myStack.top();
myStack.pop();
myStack.push(nr2 / nr1);
break;
default:
break;
}
}
}

return myStack.top();
}

int main(int argc, char* argv[])
{
char *rpn = "34+12*-1+";

int rez = GetResult(rpn);

printf("%i", rez);

return 0;
}
``````
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I am sorry I forgat that I am talking with stack solution. I know the tree solution. –  Yoda Aug 25 '12 at 13:11
@RobertKilar I don't understand. Rephrase please! –  Thanatos Aug 25 '12 at 13:13
I ment that I know the Tree traversal solution(I have already done it), but I need the stack one(kind of which we use for RPN- reverse polish noation). –  Yoda Aug 25 '12 at 13:15
So do you want me to post the stack solution? Because I already explained it? –  Thanatos Aug 25 '12 at 13:17
If it possible please post it : ). Sorry, I am reading all the advices and links i got from all of you. It would help a lot. Now i found java solution but it is with some issues, so I am trying to understand it and correct it. –  Yoda Aug 25 '12 at 13:24
show 1 more comment

By far the easiest way is to convert the infix expression to postfix notation using Dijkstra's Shunting-yard algorithm, and evaulate the result, which is, like, trivial. There are code samples of this all over the internet (take a look at Rosetta code or LiteratePrograms).

Alternatively, if you'd like to learn, and you'd like to enter the magical world of parsing and a bit of compiler theory, write a recursive descent parser. It's great fun.

Oh and, if you'd like something more robust, you could take a look at Pratt parsing, which is awesome. Here's a great article about it.

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