Given a boolean expression containing the symbols {true, false, and, or, xor}, count the number of ways to parenthesize the expression such that it evaluates to true.

For example, there is only 1 way to parenthesize 'true and false xor true' such that it evaluates to true.

Here is my algorithm

```
we can calculate the total number of parenthesization of a string
Definition:
N - the total number of
True - the number of parenthesizations that evaluates to true
False - the number of parenthesizations that evaluates to false
True + False = N
Left_True - the number of parenthesization in the left part that evaluates to True
same to Left_False, Right_True, Right_False
we iterate the input string from left to right and deal with each operator as follows:
if it is "and", the number of parenthesization leads to true is
Left_True * Right_True;
if it is "xor", the number of parenthesization leads to true
Left_True * Right_False + Left_False * Right_True
if it is 'or', the number is
N - Left_False * Right_False
Here is my psuedocode
n = number of operator within the String
int[n][n] M; // save number of ways evaluate to true
for l = 2 to n
for i = 1 to n-l+1
do j = i+l-1
// here we have different string varying from 2 to n starting from i and ending at j
for k = i to j-1
// (i,k-1) is left part
// (k+1, j) is right part
switch(k){
case 'and': // calculate, update array m
case 'or': // same
case 'xor':
}
we save all the solutions to subproblems and read them when we meet them again. thus save time.
```

Can we have a better solution?

`(true and false) xor true`

and`true and (false xor true)`

both evaluate to true. – Ben Alpert Jul 15 '11 at 4:32`if it is 'or', the number is N - Left_False * Right_False`

. I have the feeling that there are maaaaaany more parenthesization than simply N – Fezvez Jul 15 '11 at 7:28