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I saw this question,and pop up this idea.

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3  
Questions often give rise to new questions, but I recommend considering generalizations. e.g. "power of N?" where N is an arbitrary integer. –  Michael Easter Nov 26 '09 at 18:30
1  
@Michael: I just added an answer that is even faster than the one by starblue: My algorithm's worst case is just five divides. In my answer I also discuss the general case of "power of N". –  Ray Burns Feb 4 '10 at 10:23
    
use logarithmic –  sapam Mar 26 at 6:43
    
This is silly. What is next? Power of 5? –  Alexandre Santos Jun 17 at 23:28

16 Answers 16

while (n % 3 == 0) {
    n /= 3;
}
return n == 1;

Note that 1 is the zeroth power of three.

Edit: You also need to check for zero before the loop, as the loop will not terminate for n = 0 (thanks to Bruno Rothgiesser).

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13  
I will comment here, since it is currently (and I hope remains) the top-voted answer. For all the folks who want to avoid division by multiplying: The reason this answer will typically beat yours is that for most input, it won't have to divide very many times. Two thirds of random input will be eliminated after a single mod and compare. Multiplication-based answers have to keep multiplying until the accumulator meets or exceeds n, for ANY input. –  John Y Nov 26 '09 at 16:25
8  
+1, but remember to check if n==0 before the loop. –  b.roth Nov 26 '09 at 16:33
1  
You cannot get much simpler or clearer than this algorithm. In pure mathematics, we would use logarithms. On computers, we would use starblue's example code instead. –  Noctis Skytower Nov 26 '09 at 18:01
    
@Noctis: There are real-world applications that require both big integers and speed. –  J.F. Sebastian Nov 26 '09 at 23:13
2  
I read this and the other answers with interest, but the fastest solution of all was not here. I have posted another answer that is faster than this one and also faster than the if-tree idea because it avoids pipeline stalls (check it out...). I must say, however, that I really like the simplicity of this answer and would probably choose it over my own answer if I were writing anything but a library for which speed was the most important criterion. –  Ray Burns Feb 4 '10 at 10:19

I find myself slightly thinking that if by 'integer' you mean 'signed 32-bit integer', then (pseudocode)

return (n == 1) 
    or (n == 3)
    or (n == 9)
    ... 
    or (n == 1162261467)

has a certain beautiful simplicity to it (the last number is 3^19, so there aren't an absurd number of cases). Even for an unsigned 64-bit integer there still be only 41 cases (thanks @Alexandru for pointing out my brain-slip). And of course would be impossible for arbitrary-precision arithmetic...

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14  
for 64-bit integers you shouldn't get more than 64 cases. –  Alexandru Nov 26 '09 at 15:58
4  
You could expand out the constants: e.g. n = 3 * 3 or n = 3 ** 2. That way you could visually check for correctness. Typically your compiler will fold the constants for you, so there would be no loss of efficiency (that may not be the case in all languages/implementations). –  dan-gph Nov 26 '09 at 16:13
4  
You could use binary search to speed it up. –  starblue Nov 26 '09 at 19:06
3  
+1. With binary search, I'm sure this is the most efficient solution –  nikie Nov 26 '09 at 22:22
    
an elegant solution! –  Axarydax Dec 16 '09 at 23:01

I'm surprised at this. Everyone seems to have missed the fastest algorithm of all.

The following algorithm is faster on average - and dramatically faster in some cases - than a simple while(n%3==0) n/=3; loop:

bool IsPowerOfThree(uint n)
{
  // Optimizing lines to handle the most common cases extremely quickly
  if(n%3 != 0) return n==1;
  if(n%9 != 0) return n==3;

  // General algorithm - works for any uint
  uint r;
  n = Math.DivRem(n, 59049, out r); if(n!=0 && r!=0) return false;
  n = Math.DivRem(n+r, 243, out r); if(n!=0 && r!=0) return false;
  n = Math.DivRem(n+r,  27, out r); if(n!=0 && r!=0) return false;
  n += r;
  return n==1 || n==3 || n==9;
}

The numeric constants in the code are 3^10, 3^5, and 3^3.

Performance calculations

In modern CPUs, DivRem is a often single instruction that takes a one cycle. On others it expands to a div followed by a mul and an add, which would takes more like three cycles altogether. Each step of the general algorithm looks long but it actually consists only of: DivRem, cmp, cmove, cmp, cand, cjmp, add. There is a lot of parallelism available, so on a typical two-way superscalar processor each step will likely execute in about 4 clock cycles, giving a guaranteed worst-case execution time of about 25 clock cycles.

If input values are evenly distributed over the range of UInt32, here are the probabilities associated with this algorithm:

  • Return in or before the first optimizing line: 66% of the time
  • Return in or before the second optimizing line: 89% of the time
  • Return in or before the first general algorithm step: 99.998% of the time
  • Return in or before the second general algorithm step: 99.99998% of the time
  • Return in or before the third general algorithm step: 99.999997% of the time

This algorithm outperforms the simple while(n%3==0) n/=3 loop, which has the following probabilities:

  • Return in the first iteration: 66% of the time
  • Return in the first two iterations: 89% of the time
  • Return in the first three iterations: 97% of the time
  • Return in the first four iterations: 98.8% of the time
  • Return in the first five iterations: 99.6% of the time ... and so on to ...
  • Return in the first twelve iterations: 99.9998% of the time ... and beyond ...

What is perhaps even more important, this algorithm handles midsize and large powers of three (and multiples thereof) much more efficiently: In the worst case the simple algorithm will consume over 100 CPU cycles because it will loop 20 times (41 times for 64 bits). The algorithm I present here will never take more than about 25 cycles.

Extending to 64 bits

Extending the above algorithm to 64 bits is trivial - just add one more step. Here is a 64 bit version of the above algorithm optimized for processors without efficient 64 bit division:

bool IsPowerOfThree(ulong nL)
{
  // General algorithm only
  ulong rL;
  nL = Math.DivRem(nL, 3486784401, out rL); if(nL!=0 && rL!=0) return false;
  nL = Math.DivRem(nL+rL,   59049, out rL); if(nL!=0 && rL!=0) return false;
  uint n = (uint)nL + (uint)rL;
  n = Math.DivRem(n,   243, out r); if(n!=0 && r!=0) return false;
  n = Math.DivRem(n+r,  27, out r); if(n!=0 && r!=0) return false;
  n += r;
  return n==1 || n==3 || n==9;

}

The new constant is 3^20. The optimization lines are omitted from the top of the method because under our assumption that 64 bit division is slow, they would actually be slow things down.

Why this technique works

Say I want to know if "100000000000000000" is a power of 10. I might follow these steps:

  1. I divide by 10^10 and get a quotient of 10000000 and a remainder of 0. These add to 10000000.
  2. I divide by 10^5 and get a quotient of 100 and a remainder of 0. These add to 100.
  3. I divide by 10^3 and get a quotient of 0 and a remainderof 100. These add to 100.
  4. I divide by 10^2 and get a quotient of 1 and a remainder of 0. These add to 1.

Because I started with a power of 10, every time I divided by a power of 10 I ended up with either a zero quotient or a zero remainder. Had I started out with anything except a power of 10 I would have sooner or later ended up with a nonzero quotient or remainder.

In this example I selected exponents of 10, 5, and 3 to match the code provided previously, and added 2 just for the heck of it. Other exponents would also work: There is a simple algorithm for selecting the ideal exponents given your maximum input value and the maximum power of 10 allowed in the output, but this margin does not have enough room to contain it.

NOTE: You may have been thinking in base ten throughout this explanation, but the entire explanation above can be read and understood identically if you're thinking in in base three, except the exponents would have been expressed differently (instead of "10", "5", "3" and "2" I would have to say "101", "12", "10" and "2").

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1  
Pardon my ignorance, but on the cycle counts, don't div and mul usually take more than one cycle? –  Michael Myers May 20 '10 at 19:25
3  
It depends on the CPU. On CPUs where div takes multiple cycles the numbers will be different but this algorithm is still the most efficient available. –  Ray Burns May 20 '10 at 20:47
    
maybe using log() would be faster, see my solution –  TMS Aug 8 '11 at 11:22

if (log n) / (log 3) is integral then n is a power of 3.

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8  
+1 for using math. :) –  ojrac Nov 26 '09 at 16:03
17  
True in mathematical sense, not practical because of rounding errors. I checked that (log 3^40)/log(3^40-1)=1.0 on my machine. –  Rafał Dowgird Nov 26 '09 at 16:52
3  
Imho, this is too inefficent and imprecise, though mathematically correct. –  Dario Nov 26 '09 at 17:03

Recursively divide by 3, check that the remainder is zero and re-apply to the quotient.

Note that 1 is a valid answer as 3 to the zero power is 1 is an edge case to beware.

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3  
+1 for the correct approach, but recursion (in its true sense) is completely unnecessary. This can be done iteratively. –  Carl Smotricz Nov 26 '09 at 15:39
5  
+1 @Carl Smotzicz: The algorithm is inherently recursive, iteration just a workaround with no objective advantage (see tail-recursion elimination) –  Dario Nov 26 '09 at 15:51
7  
Or, iterate the other way: -- is the number 1 (ie 3^0) ? if so, success if not continue: -- is the number 1*3, ... -- is the number 1*3*3 ... This avoids division and keeps your firmly in the realm of integers. OR, if you are using a system with, say, 64-bit integers, build a table of the powers of 3 and check against each entry in the array, it's only 40 elements. –  High Performance Mark Nov 26 '09 at 15:53

Very interesting question, I like the answer from starblue, and this is a variation of his algorithm which will converge little bit faster to the solution:

private bool IsPow3(int n)
{
    if (n == 0) return false;
    while (n % 9 == 0)
    {
        n /= 9;
    }
    return (n == 1 || n == 3);
}
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Nice "hybrid" approach (essentially combining division with precomputed values). –  John Y Nov 26 '09 at 18:31

How large is your input? With O(log(N)) memory you can do faster, O(log(log(N)). Precompute the powers of 3 and then do a binary search on the precomputed values.

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I'd agree if there was going to be a large number of powers of 3, but with only 40 less than 2^64, I think a linear search might outperform the binary search. And, no, I'm not inclined to test this ! –  High Performance Mark Nov 26 '09 at 16:07
    
+1 for the pre-computation idea. Very useful if the operation has to happen multiple times. –  Tragedian Nov 26 '09 at 16:08
    
Might even be possible to create an efficient hash. –  MSalters Dec 2 '09 at 10:19

Between powers of two there is at most one power of three. So the following is a fast test:

  1. Find the binary logarithm of n by finding the position of the leading 1 bit in the number. This is very fast, as modern processors have a special instruction for that. (Otherwise you can do it by bit twiddling, see Bit Twiddling Hacks).

  2. Look up the potential power of three in a table indexed by this position and compare to n (if there is no power of three you can store a zero there).

  3. If they are equal return yes, otherwise no.

The runtime depends mostly on the time needed for accessing the table entry. If we are using machine integers the table is small, and probably in cache (we are using it many millions of times, otherwise this level of optimization wouldn't make sense).

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You can do better than repeated division, which takes O(lg(X) * |division|) time. Essentially you do a binary search on powers of 3. Really we will be doing a binary search on N, where 3^N = input value). Setting the Pth binary digit of N corresponds to multiplying by 3^(2^P), and values of the form 3^(2^P) can be computed by repeated squaring.

Algorithm

  • Let the input value be X.
  • Generate a list L of repeated squared values which ends once you pass X.
  • Let your candidate value be T, initialized to 1.
  • For each E in reversed L, if T*E <= X then let T *= E.
  • Return T == X.

Complexity:

O(lg(lg(X)) * |multiplication|) - Generating and iterating over L takes lg(lg(X)) iterations, and multiplication is the most expensive operation in an iteration.

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I am not sure this is better than repeated division in practice because a division-based solution short-circuits very quickly in the typical case. You can stop dividing once you get a remainder, which is after the very first pass on two-thirds of random input. 8/9 of random input requires no more than 2 passes; etc. Unless division is VASTLY slower than multiplication (which it typically isn't these days), the division method usually produces an answer before you have even finished generating L. –  John Y Nov 26 '09 at 19:30
    
True, but still not as good in the worst case. –  Strilanc Nov 27 '09 at 0:08

For really large numbers n, you can use the following math trick to speed up the operation of

  n % 3 == 0

which is really slow and most likely the choke point of any algorithm that relies on repeated checking of remainders. You have to understand modular arithmetic to follow what I am doing, which is part of elementary number theory.

Let x = Σ k a k 2 k be the number of interest. We can let the upper bound of the sum be ∞ with the understanding that a k = 0 for some k > M. Then

0 ≡ x ≡ Σ k a k 2 k ≡ Σ k a 2k 2 2k + a 2k+1 2 2k+1 ≡ Σ k 2 2k ( a 2k + a 2k+1 2) ≡ Σ k a 2k + a 2k+1 2 (mod 3)

since 22k ≡ 4 k ≡ 1k ≡ 1 (mod 3).

Given a binary representation of a number x with 2n+1 bits as

x0 x1 x2 ... x2n+1

where xk ∈{0,1} you can group odd even pairs

(x0 x1) (x2 x3) ... (x2n x2n+1).

Let q denote the number of pairings of the form (1 0) and let r denote the number of pairings of the form (0 1). Then it follows from the equation above that 3 | x if and only if 3 | (q + 2r). Furthermore, you can show that 3|(q + 2r) if and only if q and r have the same remainder when divided by 3.

So an algorithm for determining whether a number is divisible by 3 could be done as follows

 q = 0, r = 0
 for i in {0,1, .., n}
     pair <- (x_{2i} x_{2i+1})
     if pair == (1 0)
         switch(q)
             case 0:
                 q = 1;
                 break;
             case 1:
                 q = 2;
                 break;
             case 2:
                 q = 0;
                 break;
     else if pair == (0 1)
         switch(r)
             case 0:
                 r = 1;
                 break;
             case 1:
                 r = 2;
                 break;
             case 2:
                 r = 0;
 return q == r

This algorithm is more efficient than the use of %.

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What language is this? What's the time for one million (or one billion) executions of x % 3 and the time for the same number of executions of this algorithm? –  Chip Uni Nov 26 '09 at 22:29
    
% uses the euclidian algorithm which is a general algorithm to determine the remainder when dviding by an arbitriary number. % worst case (non-bitwise) time complexity is 5 times the number of digits in the base 10 representation of the smaller number, meaning no more than 15 multiplications and subtractions. This is O(n) in the complexity of the number of bits, however. –  ldog Nov 26 '09 at 22:41
    
This is pseudo code, it can easily be implemented in C or C++ efficiently. Keep in mind that multiplication can not be done in O(n) time, so the euclidian algorithm will be slower than this. –  ldog Nov 26 '09 at 22:49
1  
I should rephrase that, we don't know of a multiplication algorithm that computes the product in O(n) time where n is the number of bits. –  ldog Nov 26 '09 at 22:51
1  
You're forgetting an important fact: hardware is much faster than software. As long as you have multiplication in hardware, % is going to be faster. Your algorithm could still be useful for a bignum library, though. –  LaC Nov 26 '09 at 23:02

Simple and constant-time solution:

return n == power(3, round(log(n) / log(3)))
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1  
Constant long time. There probably are a couple of taylor series hidden under the covers. –  EvilTeach Sep 12 '11 at 15:33

If you are running Python, you can try using this (broken because of rounding error) code.

from math import log

def power_of(number, base):
    return log(number) / log(base) % 1 == 0

The test shown below that it is only reliable on the lower values of 3 ** X. Rounding can help, but starblue's answer is certainly superior to any other way of solving your question.

>>> from math import log
>>> def power_of(number, base):
    return log(number) / log(base) % 1 == 0

>>> for power in range(21):
    number = 3 ** power
    answer = '{} is{}a power of {}.'
    values = number, ' ' if power_of(number, 3) else ' not ', 3
    print(answer.format(*values))
    number += 1
    values = number, ' ' if power_of(number, 3) else ' not ', 3
    print(answer.format(*values))


1 is a power of 3.
2 is not a power of 3.
3 is a power of 3.
4 is not a power of 3.
9 is a power of 3.
10 is not a power of 3.
27 is a power of 3.
28 is not a power of 3.
81 is a power of 3.
82 is not a power of 3.
243 is not a power of 3.
244 is not a power of 3.
729 is a power of 3.
730 is not a power of 3.
2187 is a power of 3.
2188 is not a power of 3.
6561 is a power of 3.
6562 is not a power of 3.
19683 is a power of 3.
19684 is not a power of 3.
59049 is not a power of 3.
59050 is not a power of 3.
177147 is a power of 3.
177148 is not a power of 3.
531441 is a power of 3.
531442 is not a power of 3.
1594323 is not a power of 3.
1594324 is not a power of 3.
4782969 is a power of 3.
4782970 is not a power of 3.
14348907 is not a power of 3.
14348908 is not a power of 3.
43046721 is a power of 3.
43046722 is not a power of 3.
129140163 is not a power of 3.
129140164 is not a power of 3.
387420489 is a power of 3.
387420490 is not a power of 3.
1162261467 is a power of 3.
1162261468 is not a power of 3.
3486784401 is not a power of 3.
3486784402 is not a power of 3.
>>>
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Shouldn't there be a check that the number is a positive value, though? –  JB King Nov 26 '09 at 15:34
    
You can also use: Math.Log(x, 3) == Math.Round(Math.Log(x, 3)) –  Elisha Nov 26 '09 at 15:34
    
Surely he was asking for a bit hack? –  int3 Nov 26 '09 at 15:37
2  
Unless I'm very mistaken, this is a horribly stupid implementation. It's unlikely that Math.Log will evaluate to a number that's all 0's in the trailing decimals; in other words, it's very ignorant of floating-point rounding errors. –  Carl Smotricz Nov 26 '09 at 15:38
2  
just FYI >>> [((math.log(3**i) / math.log(3)) % 1 == 0) for i in range(20)] [True, True, True, True, True, False, True, True, True, True, False, True, True, False, True, False, True, False, True, True] –  YOU Nov 26 '09 at 15:40

Set based solution...

DECLARE @LastExponent smallint, @SearchCase decimal(38,0)

SELECT
    @LastExponent = 79, -- 38 for bigint
    @SearchCase = 729

;WITH CTE AS
(
    SELECT
        POWER(CAST(3 AS decimal(38,0)), ROW_NUMBER() OVER (ORDER BY c1.object_id)) AS Result,
        ROW_NUMBER() OVER (ORDER BY c1.object_id) AS Exponent
    FROM
        sys.columns c1, sys.columns c2
)
SELECT
    Result, Exponent
FROM
    CTE
WHERE
    Exponent <= @LastExponent
    AND
    Result = @SearchCase

With SET STATISTICS TIME ON it record the lowest possible, 1 millisecond.

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Is needed the second table 'sys.columns c2'? Did you chosen to use sys.columns for speed reasons? –  Nitai Bezerra Nov 26 '09 at 17:14
    
I used the cross join to make sure I get enough rows, and sys.columns because I know it has at least 40-50 rows. And it was the first one I thought of :-) –  gbn Nov 26 '09 at 17:20

Here is a nice and fast implementation of Ray Burns's method in C:

bool is_power_of_3(unsigned x) {
    if (x > 0x0000ffff)
    x *= 0xb0cd1d99;    // multiplicative inverse of 59049
    if (x > 0x000000ff)
    x *= 0xd2b3183b;    // multiplicative inverse of 243
    return x <= 243 && ((x * 0x71c5) & 0x5145) == 0x5145;
}

It uses the multiplicative inverse trick for to first divide by 3^10 and then by 3^5. Finally, it needs to check whether the result is 1, 3, 9, 27, 81, or 243, which is done by some simple hashing that I found by trial-and-error.

On my CPU (Intel Sandy Bridge), it is quite fast, but not as fast as the method of starblue that uses the binary logarithm (which is implemented in hardware on that CPU). But on a CPU without such an instruction, or when lookup tables are undesirable, it might be an alternative.

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There exists a pretty fast method for integers of limited size (e.g. 32-bit integers).

Note that for an integer N that is a power of 3 the following is true:

  1. For any M <= N that is a power of 3, M divides N.
  2. For any M <= N that is not a power 3, M does not divide N.

The biggest power of 3 that fits into 32 bits is 3486784401. This gives the following code:

bool isPower3(std::uint32_t value) {
    return value != 0 && 3486784401u % value == 0;
}
share|improve this answer
#include<stdio.h>
int main()
{
int n;
scanf("%d",&n);
while((n>1)&&(n%3==0))
{
n=n/3;
}
if(n==1)
printf("Yes,Given Number is  Power of 3");
else
printf("No,Given Number is not a Power of 3"); 
return 0;

}
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