# Slick way to reverse the (binary) digits of a number in Python?

I am looking for a slick function that reverses the digits of the binary representation of a number.

If `f` were such a function I would have

`int(reversed(s),2) == f(int(s,2))` whenever s is a string of zeros and ones starting with 1.

Right now I am using `lambda x: int(''.join(reversed(bin(x)[2:])),2)`

which is ok as far as conciseness is concerned, but it seems like a pretty roundabout way of doing this.

I was wondering if there was a nicer (perhaps faster) way with bitwise operators and what not.

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Why do you have the call to `list()` in there? `str.join()` will take any iterable. I also don't see this as roundabout at all - it's written almost exactly as you explain it. –  Lattyware Mar 2 '13 at 22:30
@Lattyware Right, that wasn't needed. I just felt it was roundabout in the sense that I manipulate strings, when it seems really like a numeric problem. Although, suggestions on how to improve the string method is cool too. –  math4tots Mar 2 '13 at 22:35
@math4tots: It seems unlikely that any method involving bit manipulation would be faster since it would inevitably involve interpreted loops. This is, of course, in stark contrast to languages like C, where bit twiddling would be the natural way to go. –  NPE Mar 2 '13 at 22:37
Is there a way to do this using mathematical operations that takes advantage of the two's complement representation of a number, without reversing at all? –  Andrew Mao Mar 2 '13 at 22:37
Most or all of the bit-twiddling solutions that you might find are going to assume fixed-width integers. For example if you reverse the bits of the integer `1` you want `1` as the result, but C programmers are generally going to want either 2^15 or 2^31 according to how many bits there are in `unsigned int`. –  Steve Jessop Mar 2 '13 at 22:49

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

or

``````int(bin(n)[:1:-1], 2)
``````

The second method seems to be the faster of the two, however both are much faster than your current method:

``````import timeit

print timeit.timeit("int('{0:b}'.format(n)[::-1], 2)", 'n = 123456')

print timeit.timeit("int(bin(n)[:1:-1], 2)", 'n = 123456')

print timeit.timeit("int(''.join(reversed(bin(n)[2:])),2)", 'n = 123456')
``````
```1.13251614571
0.710681915283
2.23476600647
```
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Does not work for negative numbers...`>>> int(bin(-128)[:1:-1], 2)` `ValueError: invalid literal for int() with base 2: '00000001b'` –  Andrew Mao Mar 2 '13 at 22:58
Also, very strange that every power of 2 has the same reverse value of `1`. `>>> int(bin(4)[:1:-1], 2) = 1`, `>>> int(bin(8)[:1:-1], 2) = 1`, `>>> int(bin(16)[:1:-1], 2) = 1`, etc. This reverse is definitely not transitive in Python. –  Andrew Mao Mar 2 '13 at 23:05
@AndrewMao Yes because a power of two has a binary representation of the form `10000...00`, so the reverse of this is always `1`. –  arshajii Mar 2 '13 at 23:17
Of course, but it's just strange in a variable-width integer setting :) –  Andrew Mao Mar 2 '13 at 23:56

You could do it with shift operators like this:

``````def revbits(x):
rev = 0
while x:
rev <<= 1
rev += x & 1
x >>= 1
return rev
``````

It doesn't seem any faster than your method, though (in fact, slightly slower for me).

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Here is my suggestion:

``````In [83]: int(''.join(bin(x)[:1:-1]), 2)
Out[83]: 9987
``````

Same method, slightly simplified.

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I don't really see this is better. It just uses a more obscure method of reversing it. Personally, I'd much rather see the marginally more verbose, but largely more readable version. –  Lattyware Mar 2 '13 at 22:33
Even simpler without join: `int(bin(n)[:1:-1], 2)` –  eugene y May 30 '13 at 3:53

I would argue your current method is perfectly fine, but you can lose the `list()` call, as `str.join()` will accept any iterable:

``````def binary_reverse(num):
return int(''.join(reversed(bin(num)[2:])), 2)
``````

It would also advise against using `lambda` for anything but the simplest of functions, where it will only be used once, and makes surrounding code clearer by being inlined.

The reason I feel this is fine as it describes what you want to do - take the binary representation of a number, reverse it, then get a number again. That makes this code very readable, and that should be a priority.

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There is an entire half chapter of Hacker's Delight devoted to this issue (Section 7-1: Reversing Bits and Bytes) using binary operations, bit shifts, and other goodies. Seems like these are all possible in Python and it should be much quicker than the binary-to-string-and-reverse methods.

The book isn't available publicly but I found this blog post that discusses some of it. The method shown in the blog post follows the following quote from the book:

Bit reversal can be done quite efficiently by interchanging adjacent single bits, then interchanging adjacent 2-bit fields, and so on, as shown below. These five assignment statements can be executed in any order.

http://blog.sacaluta.com/2011/02/hackers-delight-reversing-bits.html

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That makes presumptions about potential size of numbers that don't hold in Python. –  Lattyware Mar 2 '13 at 22:44
Well, if you have 32-bit integers, you do 5 operations, and if you have 64-bit integers, you do 6. Not too hard... –  Andrew Mao Mar 2 '13 at 22:45
Except Python will automatically promote numbers to infinitely large representations - the docs state 'Integers have unlimited precision.'. You would need infinite operations. –  Lattyware Mar 2 '13 at 22:46
That's silly. How do you do two's complement arithmetic if you don't have a fixed bit-length number? There is no unique reverse of a negative two's complement number if the number of bits isn't defined. –  Andrew Mao Mar 2 '13 at 22:49
You don't. You do it a way that makes sense in a high-level language like Python. –  Lattyware Mar 2 '13 at 22:50
``````>>> def bit_rev(n):
...     return int(bin(n)[:1:-1], 2)
...
>>> bit_rev(2)
1
>>>bit_rev(10)
5
``````
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