# Count bits of a integer in Python

``````1 = 0b1 -> 1
5 = 0b101 -> 3
10 = 0b1010 -> 4
100 = 0b1100100 -> 7
1000 = 0b1111101000 -> 10
…
``````

How can I get the bit size of an integer, i.e. count the number of bits that are necessary to represent an integer in Python?

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int.bit_length(): Return the number of bits necessary to represent an integer in binary, excluding the sign and leading zeros. docs.python.org/2/library/… – wap26 Sep 24 '13 at 8:15
possible duplicate of fast way of counting bits in python – endolith Apr 20 '14 at 17:50

``````import math
def number_of_bits(n):
return int(math.log(n, 2)) + 1
``````
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Bear in mind that a floating-point based solution will become inaccurate for large n. Depending on how good the system's log function is, the above solution may also fail for powers of 2. 2**48-1 is the smallest integer for which this fails on my system (it gives 49). – Mark Dickinson Apr 16 '10 at 17:03
To put it simply: this answer is wrong. It just happens to return the right result for some arguments, mostly small ones. – Gilles Feb 3 '12 at 19:16
falsifying example: `number_of_bits(2**1024-1) == 1025` – Hubert Kario Nov 4 at 17:52

In python 2.7+ there is a `int.bit_length()` method:

``````>>> a = 100
>>> a.bit_length()
7
``````
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``````>>> len(bin(1000))-2
10
>>> len(bin(100))-2
7
>>> len(bin(10))-2
4
``````

Note: will not work for negative numbers, may be need to substract 3 instead of 2

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+1: Very clever – S.Lott Apr 16 '10 at 15:37
This will not work with negative numbers though (while it also won't fail on it, opposed to the log-versions) – KillianDS Apr 16 '10 at 15:40
You are right @KillianDS, I added a note – YOU Apr 16 '10 at 15:43
If you care about negative numbers, do `len(bin(abs(n)))-2` – endolith Dec 11 '13 at 20:59
More importantly, this fails for `0`. – phihag Jul 13 at 2:39

If your Python version has it (≥2.7 for Python 2, ≥3.1 for Python 3), use the `bit_length` method from the standard library.

Otherwise, `len(bin(n))-2` as suggested by YOU is fast (because it's implemented in Python). Note that this returns 1 for 0.

Otherwise, a simple method is to repeatedly divide by 2 (which is a straightforward bit shifting), and count how long it takes to reach 0.

``````defs bit_length(n): # return the bit size of a nonnegative integer
bits = 0
while n >> bits: bits += 1
return bits
``````

It is significantly faster (at least for large numbers — a quick benchmarks says more than 10 times faster for 1000 digits) to shift by whole words at a time, then go back and work on the bits of the last word.

``````defs bit_length(n): # return the bit size of a nonnegative integer
if n == 0: return 0
bits = -32
m = 0
while n:
m = n
n >>= 32; bits += 32
while m: m >>= 1; bits += 1
return bits
``````

In my quick benchmark, `len(bin(n))` came significantly faster than even the word-sized chunk version. Although `bin(n)` builds a string that's discarded immediately, it comes out on top due to having an inner loop that's compiled to machine code. (`math.log` is even faster, but that's not important since it's wrong.)

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``````def bitcounter(n):
return math.floor(math.log(n,2)) + 1
``````

EDIT fixed so that it works with 1

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This is off by one for powers of two. – Ants Aasma Apr 16 '10 at 15:29
@Ants Aasma: Are you sure about that? It looks fine to me, assuming that math.log(n, 2) gives a perfectly correct result. – Mark Dickinson Apr 16 '10 at 18:11
@MarkDickinson: `math.log(n, 2)` does not give a perfectly correct result. `math.log(2**29, 2)` = 29.000000000000004, for instance. – endolith Dec 9 '13 at 18:15
@endolith: Yep; I'm scratching my head trying to figure out what on earth I was thinking when I wrote that comment. FWIW, there's `math.log2` for Python 3, which does give exact results for floats that are exact powers of 2. – Mark Dickinson Dec 9 '13 at 18:47
@endolith: Though interestingly, on my machine, I get `log(2**n, 2) >= n` for all non-negative `n`, so that `math.floor(math.log(n, 2)) + 1` still gives the correct result for powers of 2. Though not, of course, for all `n`; `n = 2**48 - 1` seems to be the smallest value for which it fails. – Mark Dickinson Dec 9 '13 at 18:53

This solution takes advantage of `.bit_length()` if available, and falls back to `len(hex(a))` for older versions of Python. It has the advantage over `bin` that it creates a smaller temporary string, so it uses less memory.

Please note that it returns 1 for 0, but that's easy to change.

``````_HEX_BIT_COUNT_MAP = {
'0': 0, '1': 1, '2': 2, '3': 2, '4': 3, '5': 3, '6': 3, '7': 3}

def bit_count(a):
"""Returns the number of bits needed to represent abs(a). Returns 1 for 0."""
if not isinstance(a, (int, long)):
raise TypeError
if not a:
return 1
# Example: hex(-0xabc) == '-0xabc'. 'L' is appended for longs.
s = hex(a)
d = len(s)
if s[-1] == 'L':
d -= 1
if s[0] == '-':
d -= 4
c = s[3]
else:
d -= 3
c = s[2]
return _HEX_BIT_COUNT_MAP.get(c, 4) + (d << 2)

# Use int.bit_length and long.bit_length introduced in Python 2.7 and 3.x.
if getattr(0, 'bit_length', None):
__doc = bit_count.__doc__
def bit_count(a):
return a.bit_length() or 1
bit_count.__doc__ = __doc

assert bit_count(0) == 1
assert bit_count(1) == 1
assert bit_count(2) == 2
assert bit_count(3) == 2
assert bit_count(63) == 6
assert bit_count(64) == 7
assert bit_count(75) == 7
assert bit_count(2047) == 11
assert bit_count(2048) == 12
assert bit_count(-4007) == 12
assert bit_count(4095) == 12
assert bit_count(4096) == 13
assert bit_count(1 << 1203) == 1204
assert bit_count(-(1 << 1203)) == 1204
assert bit_count(1 << 1204) == 1205
assert bit_count(1 << 1205) == 1206
assert bit_count(1 << 1206) == 1207
``````
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instead of checking if it has bit_length, you should just try to use it and then `except AttributeError`? – endolith Dec 11 '13 at 21:20
@endolith: Would it be a significant improvement of this code? In what way? – pts Dec 11 '13 at 21:22
well it's more efficient if you're expecting bit_length to be available – endolith Dec 11 '13 at 21:32
@endolith: Are you sure it's more efficient? (Have you benchmarked it?) Is the difference significant in this case? – pts Dec 11 '13 at 21:46
@pts Handling `AttributeError` is considered more Pythonic. e.g., stackoverflow.com/a/12265860/687467 – yati sagade Apr 18 at 17:30