# Log to the base 2 in python

How should I compute log to the base two in python. Eg. I have this equation where I am using log base 2

import math
e = -(t/T)* math.log((t/T)[, 2])
• What you have should work if you take the square brackets out around the ", 2" in the math.log() call. Have you tried it? – martineau Sep 15 '10 at 18:44
• nice entropy calculation – Muhammad Alkarouri Sep 16 '10 at 1:36
• math.log(value, base) – Valentin Heinitz Jan 7 '15 at 22:10

It's good to know that

but also know that math.log takes an optional second argument which allows you to specify the base:

In [22]: import math

In [23]: math.log?
Type:       builtin_function_or_method
Base Class: <type 'builtin_function_or_method'>
String Form:    <built-in function log>
Namespace:  Interactive
Docstring:
log(x[, base]) -> the logarithm of x to the given base.
If the base not specified, returns the natural logarithm (base e) of x.

In [25]: math.log(8,2)
Out[25]: 3.0
• +1. Change-of-base formula FTW – Matt Ball Sep 15 '10 at 17:01
• base argument added in version 2.3, btw. – Joe Koberg Sep 15 '10 at 18:09
• What is this '?' syntax ? I can't find reference for it. – wap26 Apr 30 '13 at 13:59
• @wap26: Above, I'm using the IPython interactive interpreter. One of its features (accessed with the ?) is dynamic object introspection. – unutbu Apr 30 '13 at 17:51

# float → float math.log2()

import math

log2 = math.log(x, 2.0)
log2 = math.log2(x)   # python 3.4 or later

# float → int math.frexp()

If all you need is the integer part of log base 2 of a floating point number, extracting the exponent is pretty efficient:

log2int_slow = int(math.floor(math.log(x, 2.0)))
log2int_fast = math.frexp(x)[1] - 1
• Python frexp() calls the C function frexp() which just grabs and tweaks the exponent.

• Python frexp() returns a tuple (mantissa, exponent). So [1] gets the exponent part. For integral powers of 2 the exponent is one more than you might expect. For example 32 is stored as 0.5x2⁶. This explains the - 1 above. Also works for 1/32 which is stored as 0.5x2⁻⁴.

# int → int .bit_length()

If both input and output are integers, this native integer method could be very efficient:

log2int_faster = x.bit_length() - 1
• - 1 because 2ⁿ requires n+1 bits. This is the only option that works for very large integers, e.g. 2**10000.

• All the int-output versions will floor the log toward negative infinity, so log₂31 is 4 not 5.

• Interesting. So you're subtracting 1 there because the mantissa is in the range [0.5, 1.0)? I would give this one a few more upvotes if I could. – LarsH Feb 23 '15 at 11:49
• Exactly right @LarsH. 32 is stored as 0.5x2⁶ so if you want log₂32=5 you need to subtract 1. Also true for 1/32 which is stored as 0.5x2⁻⁴. – Bob Stein Feb 23 '15 at 14:10

If you are on python 3.4 or above then it already has a built-in function for computing log2(x)

import math
'finds log base2 of x'

If you are on older version of python then you can do like this

import math
'finds log base2 of x'

Using numpy:

In [1]: import numpy as np

In [2]: np.log2?
Type:           function
Base Class:     <type 'function'>
String Form:    <function log2 at 0x03049030>
Namespace:      Interactive
File:           c:\python26\lib\site-packages\numpy\lib\ufunclike.py
Definition:     np.log2(x, y=None)
Docstring:
Return the base 2 logarithm of the input array, element-wise.

Parameters
----------
x : array_like
Input array.
y : array_like
Optional output array with the same shape as `x`.

Returns
-------
y : ndarray
The logarithm to the base 2 of `x` element-wise.
NaNs are returned where `x` is negative.

--------
log, log1p, log10

Examples
--------
>>> np.log2([-1, 2, 4])
array([ NaN,   1.,   2.])

In [3]: np.log2(8)
Out[3]: 3.0

http://en.wikipedia.org/wiki/Binary_logarithm

def lg(x, tol=1e-13):
res = 0.0

# Integer part
while x<1:
res -= 1
x *= 2
while x>=2:
res += 1
x /= 2

# Fractional part
fp = 1.0
while fp>=tol:
fp /= 2
x *= x
if x >= 2:
x /= 2
res += fp

return res
• Extra points for an algorithm that can be adapted to always give the correct integer part, unlike int(math.log(x, 2)) – user12861 Jan 10 '12 at 13:43
>>> def log2( x ):
...     return math.log( x ) / math.log( 2 )
...
>>> log2( 2 )
1.0
>>> log2( 4 )
2.0
>>> log2( 8 )
3.0
>>> log2( 2.4 )
1.2630344058337937
>>>
• This is built in to the math.log function. See unutbu's answer. – tgray Sep 15 '10 at 16:26
• You're right, didn't know that - thanks ;) – puzz Sep 15 '10 at 16:34

logbase2(x) = log(x)/log(2)

Try this ,

import math
print(math.log(8,2))  # math.log(number,base)

log_base_2(x) = log(x) / log(2)

In python 3 or above, math class has the fallowing functions

import math

math.log2(x)
math.log10(x)
math.log1p(x)

or you can generally use math.log(x, base) for any base you want.

Don't forget that log[base A] x = log[base B] x / log[base B] A.

So if you only have log (for natural log) and log10 (for base-10 log), you can use

myLog2Answer = log10(myInput) / log10(2)