How can we get the length of a hexadecimal number in python language? I tried using this code but even this is showing some error.

``````i=0
def hex_len(a):
if a>0x0:
#i=0
i=i+1
a=a/16
return i
b=0x346
print hex_len(b)
``````

Here I just used 346 as the hexadecimal number but my actual numbers are very big to be counted manually. I am new to coding, your help will be greatly appreciated.

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Can you use the number of letters of the string representation? –  Alex L Jun 28 '13 at 15:14
What exactly do you mean by "Length of a hex number"? What are you expecting the length of `0x346` to be? –  Justin Ethier Jun 28 '13 at 15:15
@JustinEthier 3? –  David Jashi Jun 28 '13 at 15:23
@DavidJashi - I suppose that is obvious now, having read the question again. I must have been over-thinking it. –  Justin Ethier Jun 28 '13 at 15:27
@JustinEthier I expect the length to be 3. –  Ashray Malhotra Jun 28 '13 at 15:31

Use the function `hex`:

``````>>> b = 0x346
>>> hex(b)
'0x346'
>>> len(hex(b))-2
3
``````

or using string formatting:

``````>>> len("{:x}".format(b))
3
``````
-

As Ashwini wrote, the `hex` function does the hard work for you:

hex(x)

Convert an integer number (of any size) to a hexadecimal string. The result is a valid Python expression.

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While using the string representation as intermediate result has some merits in simplicity it's somewhat wasted time and memory. I'd prefer a mathematical solution (returning the pure number of digits without any 0x-prefix):

``````from math import ceil, log

def numberLength(n, base=16):
return ceil(log(n+1)/log(base))
``````

The +1 adjustment takes care of the fact, that for an exact power of your number base you need a leading "1".

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"somewhat wasted time and memory"—I'm sceptical –  Colonel Panic Jun 28 '13 at 15:58
Considering this is python I doubt the difference in resources matters. If it was code for an embedded controller, then maybe. But +1 for thinking beyond the "obvious" string-based solution. –  Justin Ethier Jun 28 '13 at 16:05
My measurements using the timeit module gave these results: the string solution has a runtime nearly linear to the number of digits, the log solution a nearly constant one. Break even is at about 240 bit numbers. For a 32 bit number the string routine needs half the time, for a 1024 bit number the string solution needs factor 3 of the log solution. The original question mentioned very big numbers... –  guidot Jun 29 '13 at 12:18