Bitmask: how to determine if only one bit is set

If I have a basic bitmask...

``````cat = 0x1;
dog = 0x2;
chicken = 0x4;
cow = 0x8;

// OMD has a chicken and a cow
onTheFarm = 0x12;
``````

...how can I check if only one animal (i.e. one bit) is set?

The value of `onTheFarm` must be 2n, but how can I check that programmatically (preferable in Javascript)?

Thanks!

-
Check out this question. Not javascript-specific, but interesting. –  Rob I Apr 11 '13 at 14:46
Thanks Rob, just found this (it looks a bit more straight forward) stackoverflow.com/questions/1053582/… –  Tim Apr 11 '13 at 14:53

You can count the number of bits that are set in a non-negative integer value with this code (adapted to JavaScript from this answer):

``````function countSetBits(i)
{
i = i - ((i >> 1) & 0x55555555);
i = (i & 0x33333333) + ((i >> 2) & 0x33333333);
return (((i + (i >> 4)) & 0x0F0F0F0F) * 0x01010101) >> 24;
}
``````

It should be much more efficient than examining each bit individually. However, it doesn't work if the sign bit is set in `i`.

EDIT (all credit to Pointy's comment):

``````function isPowerOfTwo(i) {
return i > 0 && (i & (i-1)) === 0;
}
``````
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Wow that's pretty good. Looking into that, I found this reference for this particular question, and it looks even better! –  Pointy Apr 11 '13 at 15:05
@Pointy - Nice! It only needs a special test to rule out 0 (since (0 & (0-1)) == 0). –  Ted Hopp Apr 11 '13 at 15:09

You have to check bit by bit, with a function more or less like this:

``````function p2(n) {
if (n === 0) return false;
while (n) {
if (n & 1 && n !== 1) return false;
n >>= 1;
}

return true;
}
``````

Some CPU instruction sets have included a "count set bits" operation (the ancient CDC Cyber series was one). It's useful for some data structures implemented as bit collections. If you'ce got a set implemented as a string of integers, with bit positions corresponding to elements of the set data type, then getting the cardinality involves counting bits.

edit wow looking into Ted Hopp's answer I stumbled across this:

``````function p2(n) {
return n !== 0 && (n & (n - 1)) === 0;
}
``````

That's from this awesome collection of "tricks". Things like this problem are good reasons to study number theory :-)

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``````var singleAnimal = (Math.log(onTheFarm) / Math.log(2)) % 1 == 0;
`Math.log(y) / Math.log(2)` finds the `x` in `2^x = y` and the `x % 1` tells us if `x` is a whole number. `x` will only be a whole number if a single bit is set, and thus, only one animal is selected.
Merrily ignoring floating point roundoff, you would conclude that (1<<29) would have more than one bit set: `console.log((Math.log(1<<29) / Math.log(2)) % 1)` prints 3.552713678800501e-15 on my machine. –  Ted Hopp Apr 11 '13 at 15:05
Interesting. I suppose using `log` in general would be far less efficient than the other techniques outlined as answers anyways. Know of any way to handle the floating point roundoff error? –  cmptrgeekken Apr 11 '13 at 18:52