# Check if only one single bit is set within an integer (whatever its position)

I store flags using bits within a 64-bits integer.
I want to know if there is a single bit set whatever the position within the 64-bits integer (e.i. I do not care about the position of any specific bit).

boolean isOneSingleBitSet (long integer64)
{
return ....;
}


I could count number of bits using the Bit Twiddling Hacks (by Sean Eron Anderson), but I am wondering what is the most efficient way to just detect whether one single bit is set...

I found some other related questions:

NB: my application is in java, but I am curious about optimizations using other languages...

EDIT: Lưu Vĩnh Phúc pointed out that my first link within my question already got the answer: see section Determining if an integer is a power of 2 in the Bit Twiddling Hacks (by Sean Eron Anderson). I did not realized that one single bit was the same as power of two.

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For Java I would consider using BitSet class for this purpose which supports convenient isEmpty() method as well as many others making bit flags much easier to use. – maximdim Nov 16 '12 at 16:17
it's already in the Bit Twiddling Hacks linked above: Determining if an integer is a power of 2 – Lưu Vĩnh Phúc Oct 4 at 9:31
Oh! Thank you :-) I update my question :-) Cheers – olibre Oct 5 at 7:42

If you just literally want to check if one single bit is set, then you are essentially checking if the number is a power of 2. To do this you can do:

if ((number & (number-1)) == 0) ...


This will also count 0 as a power of 2, so you should check for the number not being 0 if that is important. So then:

if (number != 0 && (number & (number-1)) == 0) ...

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Perfect answer! – Ali Nov 16 '12 at 16:24
I am sorry, but I have tested your answer, I have these results: 0->false (ok) ; 1->true (ok) ; 2->false (KO) ; 3->false (ok) ; 4->false (KO) 5->false (ok) ... Please could you check it also on your side? – olibre Nov 16 '12 at 17:08
Have a look at the second version where I've spelt out how it would look with the check for != 0. Really is fine as far as I can see. – Neil Coffey Nov 16 '12 at 17:17
Thank you for your edit, but your first line if ((number & (number-1)) == 0) ... does not check whether the number is a power of 2 as you can see within my test results (see my previous comment). To check whether the numberis a power of two, you can do: if (number && !(number & (number - 1)) ... (please accept my edit in your answer) – olibre Nov 16 '12 at 17:25
OK, though I did say verbally that you need to do the zero check: were you seriously unable to turn that into code?? – Neil Coffey Nov 19 '12 at 16:30

(using x as the argument)

Detecting if at least one bit is set is easy:

return x!=0;


Likewise detecting if bit one (second lowest bit) is set is easy:

return (x&2)!=0;


Exactly one bit is set iff it is a power of two. This works:

return x!=0 && (x & (x-1))==0;

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Is there any way to check which bit is on? (beside log) Great trick by the way – hl3mukkel Mar 21 '14 at 17:54
@hl3mukkel you could use iterated division (which is just a way to compute an integer logarithm). If you're looking for something faster, check stackoverflow.com/q/14429661/499214. Using a logarithm is definitely more readable, is subject to rounding issues. – Jan Dvorak Mar 22 '14 at 7:07
Thanks! I found link to be an efficient & clean approach. – hl3mukkel Mar 22 '14 at 7:35

Assuming you have already an efficient - or hardware - implementation of ffs() - find first set - you may act as follows:

bool isOneSingleBitSet (long integer64)
{
return (integer64 >> ffs(integer64)) == 0;
}


The ffs() function may be already available, or you may like to see your own link above

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is ffs() available in java? – olibre Nov 16 '12 at 16:34
+1 your answer is valid :-) but tested using GCC __builtin_ffs(). Please tell me if ffs() is available in java... – olibre Nov 16 '12 at 17:17
I am not a java developer! Just interested in your question – Ali Nov 16 '12 at 18:14

lets assume X is a 64bit inter full of 0s exept the one you are looking for;

  return ((64bitinteger&X)==X)

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returns true when 64bitinteger = 0 :-( – olibre Nov 16 '12 at 16:44
what is X in your answer? The same as 64bitinteger? – olibre Nov 16 '12 at 17:12
1010101 if you want to check if the 3rd bit is 1 1010101 & 0010000 equals to 0010000 in this example X=0010000 – Ercan Nov 16 '12 at 17:42
thanks for your answer but I am looking for the most efficient way to know if there is a single bit set at any position... – olibre Nov 17 '12 at 0:36

The wrapper class java.lang.Long has a static function bitCount() that returns the number of bits in a long (64-bit int):

boolean isSingleBitSet(long l)
{
return Long.bitCount(l) == 1;
}


Note that ints are 32-bit in java.

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Changing the condition to ==1, this will work, but it almost certainly isn't the most efficient way of detecting a single bit, strictly speaking. – Neil Coffey Nov 16 '12 at 16:25
Do you know the overhead of this method? This is certainly the most readable solution even if not the fastest. – Jan Dvorak Nov 16 '12 at 16:29
As it is now (>0), this will check for the number being non-zero (thanks @NeilCoffey for noticing). – Jan Dvorak Nov 16 '12 at 16:30
Got it. changing. – ApproachingDarknessFish Nov 16 '12 at 16:54
+1 for this readable solution. Is there a function to check whether the integer is a power of two? – olibre Nov 16 '12 at 16:59

Seems like you can do a bitwise AND with a long representation of the single bit you want to check. For example, to check the LSB

return(   (integer64 & 1L)!=0  );


Or to check the 4th bit from the right

return(   (integer64 & 8L)!=0  );

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ok... but how do you check if there is one single bit set? Do you check each 64 bits? – olibre Nov 16 '12 at 16:43
Using the method in this answer, yes, but I wouldn't recommend it. I understood the initial question as checking a specific bit, rather than checking for any single bit as intended. The question as you intended it is more interesting, and well answered by Neil Coffey and Jan Dvorak. – Pursuit Nov 16 '12 at 18:19
Thanks @Pursuit. I will improve a bit my question to be more understandable ;-) – olibre Nov 17 '12 at 0:39