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If I were solving a problem in C using recursion where I'd have to find all TRUE or FALSE values for X1, X2 AND X3 satisfying the expression, how would I compare the alignment (whether or not a variable is NOT like X2 in the first clause)against actual true and false values? I could use 0 and 1 and recursively try all permutations, but I'm unsure how to actually go about computing this.

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2 Answers 2

up vote 5 down vote accepted

I'm not entirely sure about your question, but you have 4 boolean values which can be represented by 4 bits. By exploiting the internal respresentation for integrals, you can make that in a for loop to check for all possible combinations:

for( int i = 0; i < 16; ++i ) // That's 2^4
{
    int x1 = i & 1;
    int x2 = i & 2;
    int x3 = i & 4;
    int x4 = i & 8;

    if( ( x1 || !x2 || !x3 ) && ( x1 || x2 || x4 ) )
        ... the expression holds for this combination, store it somewhere ...
}
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Could you try explaining the bit about how you are exploiting the internal representation for "integrals" and what your reasoning was? –  Louis93 Nov 11 '11 at 14:09
    
Actaully, nenvermind, I understand it now. Thanks! –  Louis93 Nov 11 '11 at 18:43

bool x1[2]={false,true};
bool x2[2]={false,true};
bool x3[2]={false,true};
bool x4[2]={false,true};
for(int i1=0;i1!=2;i1++)
{
for(int i2=0;i2!=2;i2++)
{
for(int i3=0;i3!=2;i3++)
{
for(int i4=0;i4!=2;i4++)
{ if((x1[i1]||!x2[i2]||!x3[i3])&&(x1[i1]||x2[i2]||x4[i4]))
.......the expression holds, do something you need
}
}
}
}

The thought of this answer is the same with K-ballo, but obviously, he had smarter codes.

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