Given a decimal integer (eg. 65), how does one reverse the underlying bits in Python? ie. the following operation:

65 → 01000001 → 10000010 → 130

It seems that this task can be broken down into three steps:

  1. Convert the decimal integer to binary representation
  2. Reverse the bits
  3. Convert back to decimal

Steps #2 and 3 seem pretty straightforward (see this and this SO question related to step #2), but I'm stuck on step #1. The issue with step #1 is retrieving the full decimal representation with filling zeros (ie. 65 = 01000001, not 1000001).

I've searched around, but I can't seem to find anything.

  • 1
    For step one, you can use str(bin(65))[2:].zfill(8). To lazy/tired to look further into this now. But you should probably just do as larsmans says. – BrtH Oct 1 '12 at 22:26
up vote 31 down vote accepted
int('{:08b}'.format(n)[::-1], 2)

You can specify any filling length in place of the 8. If you want to get really fancy,

b = '{:0{width}b}'.format(n, width=width)
int(b[::-1], 2)

lets you specify the width programmatically.

  • 1
    Elegant and concise. I needed to change the format string to '{:08b}' to work as specified. – Shane Holloway Oct 1 '12 at 22:30
  • Ah, yes, he wanted the filling zeroes. I'll amend. – nneonneo Oct 1 '12 at 22:31
  • If I do int('{:b}'.format(65)[::-1], 2), I just get 65 as output. Using {:08b} instead of {:b} gives the correct result though, so +1 for elegant solution. – BrtH Oct 1 '12 at 22:32
  • Yes, sorry. Slight reading comprehension fail, answer amended. – nneonneo Oct 1 '12 at 22:33
  • @nneonneo & Shane, thanks to both of you. I read up on format() and this makes a lot sense. Definitely the most elegant solution. – David Chouinard Oct 1 '12 at 22:34

If you are after more speed, you can use the technique described in http://leetcode.com/2011/08/reverse-bits.html

def reverse_mask(x):
    x = ((x & 0x55555555) << 1) | ((x & 0xAAAAAAAA) >> 1)
    x = ((x & 0x33333333) << 2) | ((x & 0xCCCCCCCC) >> 2)
    x = ((x & 0x0F0F0F0F) << 4) | ((x & 0xF0F0F0F0) >> 4)
    x = ((x & 0x00FF00FF) << 8) | ((x & 0xFF00FF00) >> 8)
    x = ((x & 0x0000FFFF) << 16) | ((x & 0xFFFF0000) >> 16)
    return x
def reverse_bit(num):
    result = 0
    while num:
        result = (result << 1) + (num & 1)
        num >>= 1
    return result

We don't really need to convert the integer into binary, since integers are actually binary in Python.

The reversing idea is like doing the in-space reversing of integers.

def reverse_int(x):
    result = 0
    pos_x = abs(x)
    while pos_x:
        result = result * 10 + pos_x % 10
        pos_x /= 10
    return result if x >= 0 else (-1) * result

For each loop, the original number is dropping the right-most bit(in binary). We get that right-most bit and multiply 2 (<<1) in the next loop when the new bit is added.

  • You have to take into account the number of bits to be reversed. For example, you want to reverse bits in a byte. You expect that 0x1 will be translated to 0x80 (0b00000001 -> 0b10000000). And with current implementation, you'll still get 0x1 on the output – rusxg Sep 7 at 7:02

There's no need, and no way, to "convert a decimal integer to binary representation". All Python integers are represented as binary; they're just converted to decimal when you print them for convenience.

If you want to follow this solution to the reversal problem, you only need to find appropriate numbits. You can either specify this by hand, or compute the number of bits needed to represent an integer n with n.bit_length() (new in Python 2.7 and 3.1).

However, for 65, that would give you 7, as there's no reason why 65 should require any more bits. (You might want to round up to the nearest multiple of 8...)

  • Not really right, as you can get a string representing the bits (bin(n), or '{:b}'.format(n)). Plus, you can use .bit_length() to find the exact number of bits needed to represent a number. – nneonneo Oct 1 '12 at 22:28
  • @nneonneo: I was assuming the OP wants to work on the integer itself rather than a string representation, given the links. But thanks for the bit_length method, didn't know about that. – Fred Foo Oct 1 '12 at 22:30

You can test the i'th bit of a number by using a shift and mask. For example, bit 6 of 65 is (65 >> 6) & 1. You can set a bit in a similar way by shifting 1 left the right number of times. These insights gives you code like this (which reverses x in a field of 'n' bits).

def reverse(x, n):
    result = 0
    for i in xrange(n):
        if (x >> i) & 1: result |= 1 << (n - 1 - i)
    return result

print bin(reverse(65, 8))

One more way to do it is to loop through the bits from both end and swap each other. This i learned from EPI python book.

i = 0; j = 7
num = 230
print(bin(num))
while i<j:
    # Get the bits from both end iteratively
    if (x>>i)&1 != (x>>j)&1:
        # if the bits don't match swap them by creating a bit mask
        # and XOR it with the number 
        mask = (1<<i) | (1<<j)
        num ^= mask
    i += 1; j -= 1
print(bin(num))

best way to do is perform bit by bit shifting

def reverse_Bits(n, no_of_bits):
    result = 0
    for i in range(no_of_bits):
        result <<= 1
        result |= n & 1
        n >>= 1
    return result
# for example we reverse 12 i.e 1100 which is 4 bits long
print(reverse_Bits(12,4))

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