# Please explain the logic behind Kernighan's bit counting algorithm

This question directly follows after reading through this post . The Java code in question is

``````int count_set_bits(int n) {
int count = 0;
while(n != 0) {
n &= (n-1);
count++;
}
}
``````

I want to understand what `n &= (n-1)` is achieving here ? I have seen a similar kind of construct in another nifty algorithm for detecting whether a number is a power of 2 like:

``````if(n & (n-1) == 0) {
System.out.println("The number is a power of 2");
}
``````
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Stepping through the code in a debugger helped me.

``````n = 1010101 & n-1=1010100 => 1010100
n = 1010100 & n-1=1010011 => 1010000
n = 1010000 & n-1=1001111 => 1000000
n = 1000000 & n-1=0111111 => 0000000
``````

So this iterates 4 times. Each iteration decrements the value in such a way that the least significant bit that is set to 1 disappears.

Decrementing by one flips the lowest bit and every bit up to the first one. e.g. if you have 1000....0000 -1 = 0111....1111 not matter how many bits it has to flip and it stops there leaving any other bits set untouched. When you and this with `n` the lowest bit set and only the lowest bit becomes `0`

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You're fast, was only half-way through pretty much the same description :) –  pap Sep 12 '12 at 7:24
@pap I jump onto questions rather quick, should stop that. ;) –  Peter Lawrey Sep 12 '12 at 7:26
The reason being `1000... - 1 = 0111...` so bitwise and gives you `0000...` –  verdesmarald Sep 12 '12 at 7:34