Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

i know that if number is power of two,then it must satisfy (x&(x-1))=0; for example let's take x=16 or 10000 x-16=10000-1=01111 and (x&(x-1))=0; for another non power number 7 for example, 7=0111,7-1=0110 7&(7-1)=0110 which is not equal 0,my question how can i determine if number is some power of another number k? for example 625 is 5^4,and also how can i find in which power is equal k to n?i am interested using bitwise operators,sure i can find it by brute force methods(by standard algorithm,thanks a lot

share|improve this question
Your question should probably be about "logarithm", not "power", of a number. –  Kerrek SB Oct 15 '11 at 10:40
add comment

3 Answers

up vote 1 down vote accepted

For arbitrary k there is only the generic solution:

bool is_pow(unsigned long x, unsigned int base) {
  assert(base >= 2);
  if (x == 0) {
    return false;
  unsigned long t = x;
  while (t % base == 0) {
    t /= base;
  return t == 1;

When k is a power of two, you can speed things up by checking whether x is a power of two and whether the number of trailing zero bits of x is divisible by log2(k).

And if computational speed is important and your k is fixed, you can always use the trivial implementation:

bool is_pow5(unsigned long x) {
  if (x == 5 || x == 25 || x == 125 || x == 625)
    return true;
  if (x < 3125)
    return false;
  // you got the idea
share|improve this answer
add comment

I doubt you're going to find a bitwise algorithm for determining that a number is a power of 5.

In general, given y = n^x, to find x, you need to use logarithms, i.e. x = log_n(y). Most languages don't offer a log_n function, but you can achieve it with the following identity:

log_n(y) = log(y) / log(n)

If y is an integer power of n, then x will be an integer. Of course, due to the limitations of finite-precision computer arithmetic, you won't necessarily get the exact answer with the method above.

share|improve this answer
You can simply check n^((int)x) after determining of x, to be sure. –  nslqqq Oct 15 '11 at 10:48
@Faust: Indeed. Although you probably want to round rather than truncate. –  Oli Charlesworth Oct 15 '11 at 10:49
add comment

I'm afraid, you can't do that with just simple bit magic. Bits are typically good for powers of 2. For powers of, say, 5 you'd probably need to operate in base-5 system, where 15=110, 105=510, 1005=2510, 10005=12510, 100005=62510, etc. In base-5 system you can recognize powers of 5 just as easily as powers of 2 in binary. But you'd first need to convert your numbers to that base.

share|improve this answer
add comment

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.