I am trying to find the parity of a bitstring so that it returns 1 if x has an odd # of 0’s.
I can only use basic bitwise operations and what I have so far passes most of the tests, but I’m wondering 2 things:
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Why does x ^ (x + ~1) work? I stumbled upon this, but it seems to give you 1 if there are an odd number of bits and something else if even. Like 7^6 = 1 because 7 = 0b0111
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Is this the right direction of problem solving for this? I’m assuming my problem is stemming from the first operation, specifically (x + ~1) because it would overflow certain 2’s complement numbers. Thanks
Code:
int bitParity(int x) {
int first = x ^ (x + ~1);
int second = first ^ 1; // if first XOR gave 1 you'll return 0 here
int result = !!second;
return result;
}
I would use actual counting rather than bit-level hacks that exploit the representation of the numbers, that would both feel safer and be more clean and easy to understand. Probably slower, of course, but that’s a quite nice trade-off especially when one doesn’t know anything about the performance expectations.
Do to this, just write code to count the number of 1 bits, the most straight-forward solution generally boils down to a loop.
UPDATE: Given the (weird and annoying) limitations, my response would probably be to unwind the loop given in the “naive” solution on the bithacks page. That wouldn’t be pretty, but then I could go do something useful. 🙂