724

Today I needed a simple algorithm for checking if a number is a power of 2.

The algorithm needs to be:

  1. Simple
  2. Correct for any ulong value.

I came up with this simple algorithm:

private bool IsPowerOfTwo(ulong number)
{
    if (number == 0)
        return false;

    for (ulong power = 1; power > 0; power = power << 1)
    {
        // This for loop used shifting for powers of 2, meaning
        // that the value will become 0 after the last shift
        // (from binary 1000...0000 to 0000...0000) then, the 'for'
        // loop will break out.

        if (power == number)
            return true;
        if (power > number)
            return false;
    }
    return false;
}

But then I thought: How about checking if log2 x is an exactly a round number? When I checked for 2^63+1, Math.Log() returned exactly 63 because of rounding. So I checked if 2 to the power 63 is equal to the original number and it is, because the calculation is done in doubles and not in exact numbers.

private bool IsPowerOfTwo_2(ulong number)
{
    double log = Math.Log(number, 2);
    double pow = Math.Pow(2, Math.Round(log));
    return pow == number;
}

This returned true for the given wrong value: 9223372036854775809.

Is there a better algorithm?

6
  • 1
    I think the solution (x & (x - 1)) may return false positives when X is a sum of powers of two, e.g. 8 + 16.
    – Joe Brown
    Nov 24, 2011 at 2:52
  • 48
    All numbers can be written as a sum of powers of two, it's why we can represent any number in binary. Furthermore, your example does not return a false positive, because 11000 & 10111 = 10000 != 0.
    – vlsd
    Nov 24, 2011 at 3:09
  • 2
    @JoeBrown It doesn't have any false positives. In fact the expression returns the larger of any sum of two powers of two. Dec 7, 2018 at 23:48
  • 1
    It’s very easy in .net 6 now stackoverflow.com/a/69711480/6527049
    – Vivek Nuna
    Dec 21, 2021 at 14:33
  • Won't every power of two only have one set bit? 2^0 = 1 , 2^1 = 10, 2^2 = 100, 2^3 = 1000 and so on So can't we just check if there is just one set bit? 2 ^x = Sum(0 x 2^xi) + (1 x 2 ^ x) + Sum(0 x 2 ^xj)
    – gautam1168
    Dec 1, 2022 at 7:52

31 Answers 31

1517

There's a simple trick for this problem:

bool IsPowerOfTwo(ulong x)
{
    return (x & (x - 1)) == 0;
}

Note, this function will report true for 0, which is not a power of 2. If you want to exclude that, here's how:

bool IsPowerOfTwo(ulong x)
{
    return (x != 0) && ((x & (x - 1)) == 0);
}

Explanation

First and foremost the bitwise binary & operator from MSDN definition:

Binary & operators are predefined for the integral types and bool. For integral types, & computes the logical bitwise AND of its operands. For bool operands, & computes the logical AND of its operands; that is, the result is true if and only if both its operands are true.

Now let's take a look at how this all plays out:

The function returns boolean (true / false) and accepts one incoming parameter of type unsigned long (x, in this case). Let us for the sake of simplicity assume that someone has passed the value 4 and called the function like so:

bool b = IsPowerOfTwo(4)

Now we replace each occurrence of x with 4:

return (4 != 0) && ((4 & (4-1)) == 0);

Well we already know that 4 != 0 evals to true, so far so good. But what about:

((4 & (4-1)) == 0)

This translates to this of course:

((4 & 3) == 0)

But what exactly is 4&3?

The binary representation of 4 is 100 and the binary representation of 3 is 011 (remember the & takes the binary representation of these numbers). So we have:

100 = 4
011 = 3

Imagine these values being stacked up much like elementary addition. The & operator says that if both values are equal to 1 then the result is 1, otherwise it is 0. So 1 & 1 = 1, 1 & 0 = 0, 0 & 0 = 0, and 0 & 1 = 0. So we do the math:

100
011
----
000

The result is simply 0. So we go back and look at what our return statement now translates to:

return (4 != 0) && ((4 & 3) == 0);

Which translates now to:

return true && (0 == 0);
return true && true;

We all know that true && true is simply true, and this shows that for our example, 4 is a power of 2.

31
  • 67
    @Kripp: The number will be of the binary form 1000...000. When you -1 it, it will be of the form 0111...111. Thus, the two number's binary and would result is 000000. This wouldn't happen for non-power-of-twos, since 1010100 for example would become 1010011, resulting in an (continued...) Mar 1, 2009 at 19:15
  • 50
    ... Resulting in a 1010000 after the binary and. The only false positive would be 0, which is why I would use: return (x != 0) && ((x & (x - 1)) == 0); Mar 1, 2009 at 19:16
  • 7
    Kripp, consider (2:1, 10:1) (4:3, 100:11) (8:7, 1000:111) (16:15, 10000:1111) See the pattern? Mar 1, 2009 at 19:18
  • 15
    @ShuggyCoUk: two's complement is how negative numbers are represented. Since this is an unsigned integer, representation of negative numbers is not relevant. This technique only relies on binary representation of nonnegative integers. Mar 1, 2009 at 22:57
  • 4
    @SoapBox - what is more common? Zeroes or non-zero numbers which aren't powers of two? This is a question you can't answer without some more context. And it really, really doesn't matter anyway. Oct 22, 2010 at 23:33
108

Some sites that document and explain this and other bit twiddling hacks are:

And the grandaddy of them, the book "Hacker's Delight" by Henry Warren, Jr.:

As Sean Anderson's page explains, the expression ((x & (x - 1)) == 0) incorrectly indicates that 0 is a power of 2. He suggests to use:

(!(x & (x - 1)) && x)

to correct that problem.

3
  • 9
    0 is a power of 2... 2 ^ -inf = 0. ;) ;) ;) Sep 28, 2016 at 4:47
  • 4
    Since this is a C# tagged thread, it is worth pointing out that the last expression (of Sean Anderson) is illegal in C# since ! can only be applied to boolean types, and && also requires both operands to be boolean- (Except that user defined operators make other things possible, but that is not relevant for ulong.) Mar 4, 2018 at 11:13
  • 1
    catonmat.net/low-level-bit-hacks explains some related bithacks with 8-bit examples. e.g. Isolate the rightmost 1-bit with y = x & (-x). This test is just a special case of clearing the lowest set bit. Sep 18, 2020 at 18:34
51

return (i & -i) == i

4
  • 2
    any hint why this will or will not work? i checked its correctness in java only, where there are only signed ints/longs. if it is correct, this would be the superior answer. faster+smaller Jul 21, 2009 at 21:11
  • 8
    It takes advantage of one of the properties of two's-complement notation: to calculate the negative value of a number you perform a bitwise negation and add 1 to the result. The least significant bit of i which is set will also be set in -i. The bits below that will be 0 (in both values) while the bits above it will be inverted with respect to each other. The value of i & -i will therefore be the least significant set bit in i (which is a power of two). If i has the same value then that was the only bit set. It fails when i is 0 for the same reason that i & (i - 1) == 0 does. Aug 15, 2009 at 14:04
  • 7
    If i is an unsigned type, twos complement has nothing to do with it. You're merely taking advantage of the properties of modular arithmetic and bitwise and. Sep 4, 2010 at 0:57
  • 4
    This doesn't work if i==0 (returns (0&0==0) which is true). It should be return i && ( (i&-i)==i )
    – bobobobo
    Nov 14, 2011 at 16:59
30

The following addendum to the accepted answer may be useful for some people:

A power of two, when expressed in binary, will always look like 1 followed by n zeroes where n is greater than or equal to 0. Ex:

Decimal  Binary
1        1     (1 followed by 0 zero)
2        10    (1 followed by 1 zero)
4        100   (1 followed by 2 zeroes)
8        1000  (1 followed by 3 zeroes)
.        .
.        .
.        .

and so on.

When we subtract 1 from these kind of numbers, they become 0 followed by n ones and again n is same as above. Ex:

Decimal    Binary
1 - 1 = 0  0    (0 followed by 0 one)
2 - 1 = 1  01   (0 followed by 1 one)
4 - 1 = 3  011  (0 followed by 2 ones)
8 - 1 = 7  0111 (0 followed by 3 ones)
.          .
.          .
.          .

and so on.

Coming to the crux

What happens when we do a bitwise AND of a number x, which is a power of 2, and x - 1?

The one of x gets aligned with the zero of x - 1 and all the zeroes of x get aligned with ones of x - 1, causing the bitwise AND to result in 0. And that is how we have the single line answer mentioned above being right.


Further adding to the beauty of accepted answer above -

So, we have a property at our disposal now:

When we subtract 1 from any number, then in the binary representation the rightmost 1 will become 0 and all the zeroes to the right of that rightmost 1 will now become 1.

One awesome use of this property is in finding out - How many 1s are present in the binary representation of a given number? The short and sweet code to do that for a given integer x is:

byte count = 0;
for ( ; x != 0; x &= (x - 1)) count++;
Console.Write("Total ones in the binary representation of x = {0}", count);

Another aspect of numbers that can be proved from the concept explained above is "Can every positive number be represented as the sum of powers of 2?".

Yes, every positive number can be represented as the sum of powers of 2. For any number, take its binary representation. Ex: Take number 117.

The binary representation of 117 is 1110101

Because  1110101 = 1000000 + 100000 + 10000 + 0000 + 100 + 00 + 1
we have  117     = 64      + 32     + 16    + 0    + 4   + 0  + 1
3
  • Yes, by putting 0 as an example and making that math on it inside that binary representation. It creates a Confusion.
    – Michi
    May 23, 2017 at 16:45
  • For the "property", did you mean to say "... and all the zeros to the right of that rightmost 1 will now become 1"? Sep 17, 2023 at 20:59
  • 1
    @lesterfernandez: You are correct! Sep 18, 2023 at 0:39
25
bool IsPowerOfTwo(ulong x)
{
    return x > 0 && (x & (x - 1)) == 0;
}
2
  • 4
    This solution is better because it can also deal with negative number if negative were able to pass in. (if long instead of ulong)
    – Steven
    Jan 27, 2015 at 0:54
  • Why does a decimal pass as a power of two in this case? Apr 1, 2020 at 12:09
22

Here's a simple C++ solution:

bool IsPowerOfTwo( unsigned int i )
{
    return std::bitset<32>(i).count() == 1;
}
4
  • 10
    on gcc this compiles down to a single gcc builtin called __builtin_popcount. Unfortunately, one family of processors doesn't yet have a single assembly instruction to do this (x86), so instead it's the fastest method for bit counting. On any other architecture this is a single assembly instruction.
    – deft_code
    Sep 4, 2010 at 18:11
  • 3
    @deft_code newer x86 microarchitectures support popcnt
    – phuclv
    Mar 16, 2017 at 11:23
  • lea eax, [rdi-1] + test/jnz to implement i & (i-1) == 0 is somewhat cheaper than popcnt / cmp/je, especially if you don't need to handle the i==0 case as not counting. Sep 18, 2020 at 18:38
  • Thank you for mentioning C++ and linking it to C++'s wikipedia page. Without that it would have been really really confusing. /s Oct 17, 2020 at 2:16
10

After posting the question I thought of the following solution:

We need to check if exactly one of the binary digits is one. So we simply shift the number right one digit at a time, and return true if it equals 1. If at any point we come by an odd number ((number & 1) == 1), we know the result is false. This proved (using a benchmark) slightly faster than the original method for (large) true values and much faster for false or small values.

private static bool IsPowerOfTwo(ulong number)
{
    while (number != 0)
    {
        if (number == 1)
            return true;

        if ((number & 1) == 1)
            // number is an odd number and not 1 - so it's not a power of two.
            return false;

        number = number >> 1;
    }
    return false;
}

Of course, Greg's solution is much better.

0
10
    bool IsPowerOfTwo(int n)
    {
        if (n > 1)
        {
            while (n%2 == 0)
            {
                n >>= 1;
            }
        }
        return n == 1;
    }

And here's a general algorithm for finding out if a number is a power of another number.

    bool IsPowerOf(int n,int b)
    {
        if (n > 1)
        {
            while (n % b == 0)
            {
                n /= b;
            }
        }
        return n == 1;
    }
7
bool isPow2 = ((x & ~(x-1))==x)? !!x : 0;
2
  • 1
    Is this c#? I guess this is c++ as x is returned as a bool. Sep 3, 2010 at 18:58
  • 1
    I did write it as C++. To make it C# is trivial: bool isPow2 = ((x & ~(x-1))==x)? x!=0 : false;
    – abelenky
    Sep 3, 2010 at 19:05
7

It's very easy in .Net 6 now.

using System.Numerics;

bool isPow2 = BitOperations.IsPow2(64); // sets true

Here is the documentation.

5
int isPowerOfTwo(unsigned int x)
{
    return ((x != 0) && ((x & (~x + 1)) == x));
}

This is really fast. It takes about 6 minutes and 43 seconds to check all 2^32 integers.

0
5
return ((x != 0) && !(x & (x - 1)));

If x is a power of two, its lone 1 bit is in position n. This means x – 1 has a 0 in position n. To see why, recall how a binary subtraction works. When subtracting 1 from x, the borrow propagates all the way to position n; bit n becomes 0 and all lower bits become 1. Now, since x has no 1 bits in common with x – 1, x & (x – 1) is 0, and !(x & (x – 1)) is true.

4
bool isPowerOfTwo(int x_)
{
  register int bitpos, bitpos2;
  asm ("bsrl %1,%0": "+r" (bitpos):"rm" (x_));
  asm ("bsfl %1,%0": "+r" (bitpos2):"rm" (x_));
  return bitpos > 0 && bitpos == bitpos2;
}
3
  • bitpos > 0 is not a meaningful test if you're trying to exclude x_ == 0. An input of x_ = 1 has one set bit, and results in BSF and BSR producing a bit-position result of 0. You didn't initialize your "+r" read-write outputs so you don't have any guaranteed behaviour for x_ == 0. (BSF and BSR leave the destination unmodified on input=0; AMD documents this, Intel implements it but only documents the result as a undefined value.) Perhaps bitpos = 0, bitpos2 = 32 before the asm statements would be useful, so they mismatch on input=0. Sep 18, 2020 at 18:56
  • I'd also suggest dropping the "m" from the input constraint. You want the compiler to pick a register because you're reading it twice. The 2nd asm statement could maybe be arranged so output=input initially so the compiler can pick the same register for input and output if it wants to. Sep 18, 2020 at 18:58
  • asm is not cross-platform compatible. You didn't even mention what processor family this is valid for. Nov 29, 2023 at 4:52
4

for any power of 2, the following also holds.

n&(-n)==n

NOTE: fails for n=0 , so need to check for it
Reason why this works is:
-n is the 2s complement of n. -n will have every bit to the left of rightmost set bit of n flipped compared to n. For powers of 2 there is only one set bit.

1
  • This answer was posted 7 years earlier.
    – GSerg
    Sep 6, 2021 at 19:48
3

Find if the given number is a power of 2.

#include <math.h>

int main(void)
{
    int n,logval,powval;
    printf("Enter a number to find whether it is s power of 2\n");
    scanf("%d",&n);
    logval=log(n)/log(2);
    powval=pow(2,logval);

    if(powval==n)
        printf("The number is a power of 2");
    else
        printf("The number is not a power of 2");

    getch();
    return 0;
}
2
  • Or, in C#: return x == Math.Pow(2, Math.Log(x, 2)); Apr 1, 2010 at 3:43
  • 5
    Broken. Suffers from major floating point rounding issues. Use frexp rather than nasty log stuff if you want to use floating point. Sep 4, 2010 at 1:00
3

A number is a power of 2 if it contains only 1 set bit. We can use this property and the generic function countSetBits to find if a number is power of 2 or not.

This is a C++ program:

int countSetBits(int n)
{
        int c = 0;
        while(n)
        {
                c += 1;
                n  = n & (n-1);
        }
        return c;
}

bool isPowerOfTwo(int n)
{        
        return (countSetBits(n)==1);
}
int main()
{
    int i, val[] = {0,1,2,3,4,5,15,16,22,32,38,64,70};
    for(i=0; i<sizeof(val)/sizeof(val[0]); i++)
        printf("Num:%d\tSet Bits:%d\t is power of two: %d\n",val[i], countSetBits(val[i]), isPowerOfTwo(val[i]));
    return 0;
}

We dont need to check explicitly for 0 being a Power of 2, as it returns False for 0 as well.

OUTPUT

Num:0   Set Bits:0   is power of two: 0
Num:1   Set Bits:1   is power of two: 1
Num:2   Set Bits:1   is power of two: 1
Num:3   Set Bits:2   is power of two: 0
Num:4   Set Bits:1   is power of two: 1
Num:5   Set Bits:2   is power of two: 0
Num:15  Set Bits:4   is power of two: 0
Num:16  Set Bits:1   is power of two: 1
Num:22  Set Bits:3   is power of two: 0
Num:32  Set Bits:1   is power of two: 1
Num:38  Set Bits:3   is power of two: 0
Num:64  Set Bits:1   is power of two: 1
Num:70  Set Bits:3   is power of two: 0
2
  • returning c as an 'int' when the function has a return type of 'ulong'? Using a while instead of an if? I personally can't see a reason but it would seem to work. EDIT:- no ... it will return 1 for anything greater than 0!? Jan 13, 2012 at 2:08
  • @JamesKhoury I was writing a c++ program so I mistakingly returned an int. However that was a small typos and didn't deserved a downvote. But I fail to understand the reasoning for the rest of your comment "using while instead of if" and "it will return 1 for anything greater than 0". I added the main stub to check the output. AFAIK its the expected output. Correct me if I am wrong.
    – jerrymouse
    Jan 13, 2012 at 6:56
3

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

bool is_power_of_2(ulong x) {
    if(x ==  (1 << (sizeof(ulong)*8 -1) ) return true;
    return (x > 0) && (x<<1 == (x|(x-1)) +1));
}
2
  • Do you need the (x > 0) bit here? Apr 25, 2013 at 17:31
  • @configurator, yes, otherwise is_power_of_2(0) would return true
    – Chethan
    Apr 26, 2013 at 9:17
3

I've been reading the documentation for Random.nextInt(int bound) and saw this nice piece of code which checks whether the parameter is a power of 2, which says (part of the code) :

if ((bound & -bound) == bound) // ie, bound is a power of 2   

let's test it

for (int i=0; i<=8; i++) {
  System.out.println(i+" = " + Integer.toBinaryString(i));
}

>>
0 = 0
1 = 1
2 = 10
3 = 11
4 = 100
5 = 101
6 = 110
7 = 111
8 = 1000
// the left most 0 bits where cut out of the output

for (int i=-1; i>=-8; i--) {
  System.out.println(i+" = " + Integer.toBinaryString(i));
}

>>
-1 = 11111111111111111111111111111111
-2 = 11111111111111111111111111111110
-3 = 11111111111111111111111111111101
-4 = 11111111111111111111111111111100
-5 = 11111111111111111111111111111011
-6 = 11111111111111111111111111111010
-7 = 11111111111111111111111111111001
-8 = 11111111111111111111111111111000

did you notice something ? positive and negative Power 2 numbers have opposite bits in binary representation (negative power 2 numbers are 1's complement of positive power 2 numbers.

if we apply a logical AND over X and -X, where X is a Power 2 number, we get the same positive value X as a result :)

for (int i=0; i<=8; i++) {
  System.out.println(i + " & " + (-i)+" = " + (i & (-i)));
}

>>
0 & 0 = 0    <-
1 & -1 = 1   <-
2 & -2 = 2   <-
3 & -3 = 1
4 & -4 = 4   <-
5 & -5 = 1
6 & -6 = 2
7 & -7 = 1
8 & -8 = 8   <-
2

Example

0000 0001    Yes
0001 0001    No

Algorithm

  1. Using a bit mask, divide NUM the variable in binary

  2. IF R > 0 AND L > 0: Return FALSE

  3. Otherwise, NUM becomes the one that is non-zero

  4. IF NUM = 1: Return TRUE

  5. Otherwise, go to Step 1

Complexity

Time ~ O(log(d)) where d is number of binary digits

2

Mark gravell suggested this if you have .NET Core 3, System.Runtime.Intrinsics.X86.Popcnt.PopCount

public bool IsPowerOfTwo(uint i)
{
    return Popcnt.PopCount(i) == 1
}

Single instruction, faster than (x != 0) && ((x & (x - 1)) == 0) but less portable.

3
  • are you sure it's faster than (x != 0) && ((x & (x - 1)) == 0)? I doubt that, esp. on older systems where popcnt isn't available
    – phuclv
    Feb 22, 2020 at 13:04
  • It's not faster. I just tested this on a modern Intel CPU and verified POPCNT in use in the disassembly (granted, in C code, not .NET). POPCNT is faster for counting bits in general, but for the single-bit-on case the bit twiddling trick is still faster by 10%.
    – eraoul
    Feb 22, 2020 at 22:39
  • 1
    Oops, I take it back. I was testing in a loop were I think branch prediction was "cheating". POPCNT is indeed a single instruction that runs in a single clock cycle and is faster if you have it available.
    – eraoul
    Feb 23, 2020 at 0:00
2

There is a one liner in .NET 6

// IsPow2 evaluates whether the specified Int32 value is a power of two.
Console.WriteLine(BitOperations.IsPow2(128));            // True
1

Improving the answer of @user134548, without bits arithmetic:

public static bool IsPowerOfTwo(ulong n)
{
    if (n % 2 != 0) return false;  // is odd (can't be power of 2)

    double exp = Math.Log(n, 2);
    if (exp != Math.Floor(exp)) return false;  // if exp is not integer, n can't be power
    return Math.Pow(2, exp) == n;
}

This works fine for:

IsPowerOfTwo(9223372036854775809)
1
  • floating point operations are far slower than a simple bitwise expression
    – phuclv
    Feb 22, 2020 at 13:05
1

in this approach , you can check if there is only 1 set bit in the integer and the integer is > 0 (c++).

bool is_pow_of_2(int n){
    int count = 0;
    for(int i = 0; i < 32; i++){
        count += (n>>i & 1);
    }
    return count == 1 && n > 0;
}

1

Kotlin:

fun isPowerOfTwo(n: Int): Boolean {
    return (n > 0) && (n.and(n-1) == 0)
}

or

fun isPowerOfTwo(n: Int): Boolean {
    if (n == 0) return false
    return (n and (n - 1).inv()) == n
}

inv inverts the bits in this value.


Note:
log2 solution doesn't work for large numbers, like 536870912 ->

import kotlin.math.truncate
import kotlin.math.log2

fun isPowerOfTwo(n: Int): Boolean {
    return (n > 0) && (log2(n.toDouble())) == truncate(log2(n.toDouble()))
}
1
  • For unsigned integers, n.countOneBits() == 1 could be used as well.
    – FrankM
    May 1, 2023 at 16:14
0

I see many answers are suggesting to return n && !(n & (n - 1)) but to my experience if the input values are negative it returns false values. I will share another simple approach here since we know a power of two number have only one set bit so simply we will count number of set bit this will take O(log N) time.

while (n > 0) {
    int count = 0;
    n = n & (n - 1);
    count++;
}
return count == 1;

Check this article to count no. of set bits

1
  • the input is ulong, so it isn't negative
    – Cato
    Oct 7, 2022 at 13:58
0

This is another method to do it as well

package javacore;

import java.util.Scanner;

public class Main_exercise5 {
    public static void main(String[] args) {
        // Local Declaration
        boolean ispoweroftwo = false;
        int n;
        Scanner input = new Scanner (System.in);
        System.out.println("Enter a number");
        n = input.nextInt();
        ispoweroftwo = checkNumber(n);
        System.out.println(ispoweroftwo);
    }
    
    public static boolean checkNumber(int n) {
        // Function declaration
        boolean ispoweroftwo= false;
        // if not divisible by 2, means isnotpoweroftwo
        if(n%2!=0){
            ispoweroftwo=false;
            return ispoweroftwo;
        }
        else {
            for(int power=1; power>0; power=power<<1) {
                if (power==n) {
                    return true;
                }
                else if (power>n) {
                    return false;
                }
            }
        }
        return ispoweroftwo;
    }
}
0

This one returns if the number is the power of two up to 64 value ( you can change it inside for loop condition ("6" is for 2^6 is 64);

const isPowerOfTwo = (number) => {
  let result = false;
  for (let i = 1; i <= 6; i++) {
    if (number === Math.pow(2, i)) {
      result = true;
    }
  }
  return result;
};

console.log(isPowerOfTwo(16));
console.log(isPowerOfTwo(10));

0

There were a number of answers and posted links explaining why the n & (n-1) == 0 works for powers of 2, but I couldn't find any explanation of why it doesn't work for non-powers of 2, so I'm adding this just for completeness.

For n = 1 (2^0 = 1), 1 & 0 = 0, so we are fine.

For odd n > 1, there are at least 2 bits of 1 (left-most and right-most bits). Now n and n-1 will only differ by the right-most bit, so their &-sum will at least have a 1 on the left-most bit, so n & (n-1) != 0:

n:          1xxxx1  for odd n > 1
n-1:        1xxxx0
            ------
n & (n-1):  1xxxx0 != 0

Now for even n that is not a power of 2, we also have at least 2 bits of 1 (left-most and non-right-most). Here, n and n-1 will differ up to the right-most 1 bit, so their &-sum will also have at least a 1 on the left-most bit:

        right-most 1 bit of n
                 v
n:          1xxxx100..00 for even n
n-1:        1xxxx011..11
            ------------
n & (n-1):  1xxxx000..00 != 0
0

I'm assuming 1 is a power of two, which it is, it's 2 to the power of zero

 bool IsPowerOfTwo(ulong testValue)
 {
  ulong bitTest = 1;
  while (bitTest != 0)
  {
    if (bitTest == testValue) return true;
    bitTest = bitTest << 1;
  }

  return false;
}
0

In C, I tested the i && !(i & (i - 1) trick and compared it with __builtin_popcount(i), using gcc on Linux, with the -mpopcnt flag to be sure to use the CPU's POPCNT instruction. My test program counted the # of integers in the interval [0, 2^31) that were a power of two.

At first I thought that i && !(i & (i - 1) was 10% faster, even though I verified that POPCNT was used in the disassembly where I used__builtin_popcount.

However, I realized that I had included an if statement, and branch prediction was probably doing better on the bit twiddling version. I removed the if and POPCNT ended up faster, as expected.

Results:

Intel(R) Core(TM) i7-4771 CPU max 3.90GHz

Timing (i & !(i & (i - 1))) trick
30

real    0m13.804s
user    0m13.799s
sys     0m0.000s

Timing POPCNT
30

real    0m11.916s
user    0m11.916s
sys     0m0.000s

AMD Ryzen Threadripper 2950X 16-Core Processor max 3.50GHz

Timing (i && !(i & (i - 1))) trick
30

real    0m13.675s
user    0m13.673s
sys 0m0.000s

Timing POPCNT
30

real    0m13.156s
user    0m13.153s
sys 0m0.000s

Note that here the Intel CPU seems slightly slower than AMD with the bit twiddling, but has a much faster POPCNT; the AMD POPCNT doesn't provide as much of a boost.

popcnt_test.c:

#include "stdio.h"

// Count # of integers that are powers of 2 up to (not including) 2^31;
int main() {
  int n;
  for (int z = 0; z < 20; z++){
      n = 0;
      for (unsigned long i = 0; i < 1<<30; i++) {
       #ifdef USE_POPCNT
        n += (__builtin_popcount(i)==1); // Was: if (__builtin_popcount(i) == 1) n++;
       #else
        n += (i && !(i & (i - 1)));  // Was: if (i && !(i & (i - 1))) n++;
       #endif
      }
  }

  printf("%d\n", n);
  return 0;
}

Run tests:

gcc popcnt_test.c -O3 -o test.exe
gcc popcnt_test.c -O3 -DUSE_POPCNT -mpopcnt -o test-popcnt.exe

echo "Timing (i && !(i & (i - 1))) trick"
time ./test.exe

echo
echo "Timing POPCNT"
time ./test-opt.exe
3
  • Comment is 2 up to 2^31 and for loop i = 0; i < 1<<30;, suggest reconciling. Even better: Iterate over all 32-bit values. Feb 25, 2023 at 3:22
  • Thanks -- nice catch. I don't want to rerun this and recompute values at the moment since I don't have as convenient access to the original CPUs, but you're right that the comment (or code) is wrong; fixed. I'm not sure why I stopped early instead of doing all 32 bit values, just being lazy I guess. I like your suggested change: I'd replace for (unsigned long i = 0; i < 1<<30; i++) with for (unsigned long i = 0; i <= 0xFFFFFFFF; i++) {
    – eraoul
    Feb 26, 2023 at 5:08
  • Note, with 32-bit unsigned long, i <= 0xFFFFFFFF is always true. Feb 26, 2023 at 7:12

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