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Question same as in the title. I've done two approaches. One is straightforward. Generate all bitmasks from




And for every bitmask check if there is same amount 1's and 0's, if yes, work on it. And that's the problem, because i have to work on those bitmasks not only count them.

I came with second approach which runs on O(2^{n/2}) time, but seems like it's not generating all bitmasks and i don't know why.

Second approach is like that : generate all bitmasks from 0 to 2^{n/2} and to have valid bitmask( call it B ) i have to do something like this : B#~B

where ~ is negative.

So for example i have n=6, so i'm going to generate bitmasks with length of 3.

For example i have B=101, so ~B will be 010 and final bitmask would be 101010, as we see, we have same amount of 1's and 0's.

Is this method good or am i implementing something bad ? Maybe some another interesting approach exist? Thanks


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2 Answers 2

up vote 1 down vote accepted

Try a recursive approach:

void printMasks(int n0, int n1, int mask) {
    if (!n0 && !n1) {
        cerr << mask << endl;
    mask <<= 1;
    if (n0) {
        printMasks(n0-1, n1, mask);
    if (n1) {
        printMasks(n0, n1-1, mask | 1);

Call printMasks passing it the desired number of 0's and 1's. For example, if you need 3 ones and 3 zeros, call it like this:

printMasks(3, 3, 0);
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Hey, thanks for it, but it doesn't work so good, i mean... for arguments 3,3,0 it generate not good bitmasks before number 35, after that it gives good numbers. I've checked it with my bruteforce –  Chris Dec 16 '11 at 15:25
@Chris what do you mean? It works very well: for printMasks(2, 2, 0) I got 3, 5, 6, 9, 10, and 12 - i.e. 0011, 0101, 0110, 1001, 1010, and 1100 - all possible combinations with 2 ones and 2 zeros. Could you give an example of a not good number that you get running 3,3,0? –  dasblinkenlight Dec 16 '11 at 15:29
For printMasks(3,3,0) i have numbers like 25 which is 11001 which as we see has 2 zeros and 3 ones. And other numbers like 21, 22. But after that i have 35,37,38,41 and so on and those numbers works well. It would be great if you could help fix it :) –  Chris Dec 16 '11 at 15:32
@Chris 25 is 011001, so it is good. If you need a number with the initial 1, it is a simple change: call printMasks(3, 2, 1) (I subtracted one from n1, because the initial 1 is already there in the mask). –  dasblinkenlight Dec 16 '11 at 15:34
Hey there, thanks a lot, that's working very fine and i guess would be much faster than generating all 2^n bitmasks :) Thanks once again. –  Chris Dec 16 '11 at 15:37

It's possible, given a binary number, to produce the next higher binary number which has the same number of 'ones', using a constant number of operations on words large enough to hold all the bits (assuming that division by a power of two counts as one operation).

Identify the positions of the least significant '1' (hint: what happens if you decrement the number) and the least significant '0' above that (hint: what happens if you add the "least significant 1" to the original number?) You should change that least significant '0' to a '1', and set the proper number of least-significant bits to '1', and set the intervening bits to '0'.

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