# What's the simplest way to test whether a number is a power of 2 in C++?

I need a function like this:

``````// return true iff 'n' is a power of 2, e.g.
// is_power_of_2(16) => true  is_power_of_2(3) => false
bool is_power_of_2(int n);
``````

Can anyone suggest how I could write this? Can you tell me a good web site where this sort of algorithm can be found?

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`(n & (n - 1)) == 0` is best. However, note that it will incorrectly return true for n=0, so if that is possible, you will want to check for it explicitly.

http://www.graphics.stanford.edu/~seander/bithacks.html has a large collection of clever bit-twiddling algorithms, including this one.

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great web site (and answer), thanks – Ant Sep 20 '08 at 14:54

A power of two will have just one bit set (for unsigned numbers). Something like

``````bool powerOfTwo = !(x == 0) && !(x & (x - 1));
``````

Will work fine; one less than a power of two is all 1s in the less significant bits, so must AND to 0 bitwise.

As I was assuming unsigned numbers, the == 0 test (that I originally forgot, sorry) is adequate. You may want a > 0 test if you're using signed integers.

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You're missing a '!' or an '==0' – Mike F Sep 20 '08 at 14:43
You're also missing a test for negative value of x. – Rob Wells Sep 20 '08 at 14:44
Neat, how did you edit it without the 'edited x minutes ago' appearing? – Mike F Sep 20 '08 at 14:45
What about when x is 0? – Ant Sep 20 '08 at 14:47
Seriously, how did you just get 120 rep for a demonstrably wrong answer? – Mike F Sep 20 '08 at 14:50

Powers of two in binary look like this:

``````1: 0001
2: 0010
4: 0100
8: 1000
``````

Note that there is always exactly 1 bit set. The only exception is with a signed integer. e.g. An 8-bit signed integer with a value of -128 looks like:

``````10000000
``````

So after checking that the number is greater than zero, we can use a clever little bit hack to test that one and only one bit is set.

``````bool is_power_of_2(int x) {
return x > 0 && !(x & (x−1));
}
``````

For more bit twiddling see here.

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small typo - function argument must be x – Chethan Apr 24 '13 at 17:06
``````bool is_power_of_2(int i) {
if ( i <= 0 ) {
return 0;
}
return ! (i & (i-1));
}
``````
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The condition should be <= 0 – Steve Jessop Sep 20 '08 at 14:48
Oh. Yes. Good catch! Thanks (-: – Rob Wells Sep 20 '08 at 15:01

This isn't the fastest or shortest way, but I think it is very readable. So I would do something like this:

``````bool is_power_of_2(int n)
int bitCounter=0;
while(n) {
if ((n & 1) == 1) {
++bitCounter;
}
n >>= 1;
}
return (bitCounter == 1);
}
``````

This works since binary is based on powers of two. Any number with only one bit set must be a power of two.

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It may not be fast or short, but it's correct unlike the top answers. – Mike F Sep 20 '08 at 15:00
The top answers are correct. – Larry Gritz Sep 21 '08 at 6:47
At time of commenting they were all bugged. They have since been edited into an acceptable state. – Mike F Sep 25 '08 at 4:33

Here is another method, in this case using `|` instead of `&` :

``````bool is_power_of_2(int x) {
return x > 0 && (x<<1 == (x|(x-1)) +1));
}
``````
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It is possible through c++

``````int IsPowOf2(int z) {
double x=log2(z);
int y=x;
if (x==(double)y)
return 1;
else
return 0;
}
``````
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That's neither simple, nor fast, to me. – luk32 Sep 14 '15 at 12:55
I.e. it's certainly not fast due to `log2`, and proof that it works is not so easy to explain (precisely, can you get caught by rounding errors?). It's also needlessly convoluted with `if..return..else..return`. What's wrong with collapsing it to `return x==(double)y;` ? It should return `bool` anyayws. IMO even ternary operator would be clearer if one really wants to stick to `int`. – luk32 Sep 14 '15 at 13:01

Following would be faster then most up-voted answer due to boolean short-circuiting and fact that comparison is slow.

``````int isPowerOfTwo(unsigned int x)
{
return x && !(x & (x – 1));
}
``````

If you know that x can not be 0 then

``````int isPowerOfTwo(unsigned int x)
{
return !(x & (x – 1));
}
``````
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Approach #1:

Divide number by 2 reclusively to check it.

Time complexity : O(log2n).

Approach #2:

Bitwise AND the number with its just previous number should be equal to ZERO.

Example: Number = 8 Binary of 8: 1 0 0 0 Binary of 7: 0 1 1 1 and the bitwise AND of both the numbers is 0 0 0 0 = 0.

Time complexity : O(1).

Approach #3:

Bitwise XOR the number with its just previous number should be sum of both numbers.

Example: Number = 8 Binary of 8: 1 0 0 0 Binary of 7: 0 1 1 1 and the bitwise AND of both the numbers is 1 1 1 1 = 15.

Time complexity : O(1).

http://javaexplorer03.blogspot.in/2016/01/how-to-check-number-is-power-of-two.html

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Another way to go (maybe not fastest) is to determine if ln(x) / ln(2) is a whole number.

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There's no maybe about it :-). – paxdiablo Sep 20 '08 at 15:17
This would have problems with floating point inaccuracy. ln(1<<29) / ln(2) comes out to 29.000000000000004. – Anonymous Sep 20 '08 at 15:19

This is the bit-shift method in T-SQL (SQL Server):

``````SELECT CASE WHEN @X>0 AND (@X) & (@X-1)=0 THEN 1 ELSE 0 END AS IsPowerOfTwo
``````

It is a lot faster than doing a logarithm four times (first set to get decimal result, 2nd set to get integer set & compare)

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It is good to see how the top answer to this question can also be implemented in T-SQL, but that isn't really relevant to the question asked here. An alternative (if you were looking for a solution in T-SQL, found this answered question , implemented it in T-SQL and thought it interesting enough to post this answer) would be to post the question with reference to T-SQL, then answer it yourself, with reference to this answered question. Hope this suggestion is helpful. – Simon Feb 2 '13 at 2:03
this doesn't really answer this question – Lưu Vĩnh Phúc Mar 11 '15 at 5:46

The simplest way I found was:

``````function isPowerOfTwo(number) {
while ((number % 2 == 0) && (number > 1)) {
number /= 2;
}
return number == 1;
};
console.log(isPowerOfTwo(8));     // → true
console.log(isPowerOfTwo(25));    // → false
console.log(isPowerOfTwo(64));    // → true
console.log(isPowerOfTwo(18));    // → false
console.log(isPowerOfTwo(1024));  // → true
console.log(isPowerOfTwo(96));    // → false
console.log(isPowerOfTwo(1));     // → true
``````

You can see a list of the number that are power of two here:

http://www.tsm-resources.com/alists/pow2.html

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