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Python allows easy creation of an integer from a string of a given base via


I want to perform the inverse: creation of a string from an integer. i.e. I want some function int2base(num,base)
such that:

int( int2base( X , BASE ) , BASE ) == X 

the function name/argument order is unimportant

For any number X and base BASE that int() will accept.

This is an easy function to write -- in fact easier than describing it in this question -- however, I feel like I must be missing something.

I know about the functions bin,oct,hex; but I cannot use them for a few reasons:

  • Those functions are not available on older versions of python with which I need compatibility (2.2)
  • I want a general solution that can be called the same way for different bases
  • I want to allow bases other than 2,8,16


share|improve this question
I've never had a need for unicode. Should I then ridicule anyone who asks about unicode support? And no it is not a homework question. It is for the pyhon based command line calculator – Mark Borgerding Feb 15 '10 at 16:42
Surprisingly no one gave a solution which works with arbitrary big base (1023). If you need it, check my solution which works for every base (2 to inf) – Salvador Dali Feb 23 '15 at 2:55

16 Answers 16

up vote 44 down vote accepted

If you need compatibility with ancient versions of Python, you can either use gmpy (which does include a fast, completely general int-to-string conversion function, and can be built for such ancient versions -- you may need to try older releases since the recent ones have not been tested for venerable Python and GMP releases, only somewhat recent ones), or, for less speed but more convenience, use Python code -- e.g., most simply:

import string
digs = string.digits + string.letters

def int2base(x, base):
  if x < 0: sign = -1
  elif x == 0: return digs[0]
  else: sign = 1
  x *= sign
  digits = []
  while x:
    digits.append(digs[x % base])
    x /= base
  if sign < 0:
  return ''.join(digits)
share|improve this answer
Just in (gmpy2) case the func Alex speaks of seems to be gmpy2.digits(x, base). – mlvljr Jan 2 '12 at 8:03
It was brought to my attention that some cases need a base > 36 and so digs should be digs = string.digits + string.lowercase + string.uppercase – Paul Nov 29 '12 at 11:54
(or string.digits + string.letters) – kojiro Sep 25 '13 at 3:59
Any idea why the convert-base-N-to-string isn't included by default in Python? (It is in Javascript.) Yeah, we can all write our own implementation, but I've been searching around on this site and elsewhere, and many of them have bugs. Better to have one tested, reputable version included in the core distribution. – Jason S Feb 5 '14 at 21:02
Found a small bug in this excellent routine for the zero case when using a number system that does not start with '0'. Only a one line change, instead of elif x==0: return '0' =====> needs to be elif x==0: return digs[0] – Paul May 5 '14 at 16:06
def baseN(num,b,numerals="0123456789abcdefghijklmnopqrstuvwxyz"):
    return ((num == 0) and numerals[0]) or (baseN(num // b, b, numerals).lstrip(numerals[0]) + numerals[num % b])


share|improve this answer
// will not work in Python 2.2 ... – Alex Martelli Feb 15 '10 at 16:45
Elegant in its brevity. It seems to work under python 2.2.3 for non-negative integers. A negative number infinitely recurses. – Mark Borgerding Feb 15 '10 at 17:04
+1 useful; fixed a problem when numerals didn't start with '0' – sehe Sep 14 '11 at 9:57
This fails silently (a) when base is > len(numerals), and (b) num % b is, by luck, < len(numerals). e.g. although the numerals string is only 36 characters in length, baseN(60, 40) returns '1k' while baseN(79, 40) raises an IndexError. Both should raise some kind of error. The code should be revised to raise an error if not 2 <= base <= len(numerals). – Chris Johnson Oct 9 '13 at 15:32
@osa, my point is the code as-written fails in a very bad way (silently, giving misleading answer) and could be fixed easily. If you are saying there would be no error if you knew in advance, for certain, that b would not exceed len(numerals), well, good luck to you. – Chris Johnson Jan 7 '15 at 23:36
"{0:b}".format(100) # bin: 1100100
"{0:x}".format(100) # hex: 64
"{0:o}".format(100) # oct: 144
share|improve this answer
This is Python 3 only, right? – arunjitsingh Sep 26 '11 at 14:21
@arunjitsingh - no, Python 2.6.1 already implements it – Rost B. Sep 30 '11 at 8:53
But it only does those three bases? – Thomas Ahle Oct 4 '11 at 14:48
Yes, unfortunately you can't specify custom int base. More info is here: – Rost B. Oct 6 '11 at 9:25

Surprisingly, people were giving only solutions that convert to small bases (smaller then the length of the English alphabet). There was no attempt to give a solution which converts to any arbitrary base from 2 to infinity.

So here is a super simple solution:

def numberToBase(n, b):
    if n == 0:
        return [0]
    digits = []
    while n:
        digits.append(int(n % b))
        n /= b
    return digits[::-1]

so if you need to convert some super huge number to the base 577,

numberToBase(67854 ** 15 - 102, 577), will give you a correct solution: [4, 473, 131, 96, 431, 285, 524, 486, 28, 23, 16, 82, 292, 538, 149, 25, 41, 483, 100, 517, 131, 28, 0, 435, 197, 264, 455],

Which you can later convert to any base you want

share|improve this answer
For Python 3, you need n //= b instead of n /= b because of "true division". It's an easy thing to miss, so I'm mentioning it here. – Kevin 2 days ago

Great answers! I guess the answer to my question was "no" I was not missing some obvious solution. Here is the function I will use that condenses the good ideas expressed in the answers.

  • allow caller-supplied mapping of characters (allows base64 encode)
  • checks for negative and zero
  • maps complex numbers into tuples of strings

def int2base(x,b,alphabet='0123456789abcdefghijklmnopqrstuvwxyz'):
    'convert an integer to its string representation in a given base'
    if b<2 or b>len(alphabet):
        if b==64: # assume base64 rather than raise error
            alphabet = "ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz0123456789+/"
            raise AssertionError("int2base base out of range")
    if isinstance(x,complex): # return a tuple
        return ( int2base(x.real,b,alphabet) , int2base(x.imag,b,alphabet) )
    if x<=0:
        if x==0:
            return alphabet[0]
            return  '-' + int2base(-x,b,alphabet)
    # else x is non-negative real
    while x>0:
        x,idx = divmod(x,b)
        rets = alphabet[idx] + rets
    return rets

share|improve this answer
How do you convert the base64 output of our function back to an integer? – detly Oct 26 '10 at 6:46

You could use

Sample usage:

>>> from baseconv import BaseConverter
>>> base20 = BaseConverter('0123456789abcdefghij')
>>> base20.encode(1234)
>>> base20.decode('31e')
>>> base20.encode(-1234)
>>> base20.decode('-31e')
>>> base11 = BaseConverter('0123456789-', sign='$')
>>> base11.encode('$1234')
>>> base11.decode('$-22')

There is some bultin converters as for example baseconv.base2, baseconv.base16 and baseconv.base64.

share|improve this answer

def base10toN(num,n):
    """Change a  to a base-n number.
    Up to base-36 is supported without special notation."""
    while current!=0:
        if 36>remainder>9:
        elif remainder>=36:
    return new_num_string

Here's another one from the same link

def baseconvert(n, base):
    """convert positive decimal integer n to equivalent in another base (2-36)"""

    digits = "0123456789abcdefghijklmnopqrstuvwxyz"

        n = int(n)
        base = int(base)
        return ""

    if n < 0 or base < 2 or base > 36:
        return ""

    s = ""
    while 1:
        r = n % base
        s = digits[r] + s
        n = n / base
        if n == 0:

    return s
share|improve this answer
>>> import string
>>> def int2base(integer, base):
        if not integer: return '0'
        sign = 1 if integer > 0 else -1
        alphanum = string.digits + string.ascii_lowercase
        nums = alphanum[:base]
        res = ''
        integer *= sign
        while integer:
                integer, mod = divmod(integer, base)
                res += nums[mod]
        return ('' if sign == 1 else '-') + res[::-1]

>>> int2base(-15645, 23)
>>> int2base(213, 21)
share|improve this answer

I'm working on making a pip package for this.

I recommend you use my which was inspired by bases.js

from bases import Bases
bases = Bases()

bases.toBase16(200)                // => 'c8'
bases.toBase(200, 16)              // => 'c8'
bases.toBase62(99999)              // => 'q0T'
bases.toBase(200, 62)              // => 'q0T'
bases.toAlphabet(300, 'aAbBcC')    // => 'Abba'

bases.fromBase16('c8')               // => 200
bases.fromBase('c8', 16)             // => 200
bases.fromBase62('q0T')              // => 99999
bases.fromBase('q0T', 62)            // => 99999
bases.fromAlphabet('Abba', 'aAbBcC') // => 300

refer to for what bases are usable

share|improve this answer
def base(decimal ,base) :
    other_base = ""
    while decimal != 0 :
        other_base = list[decimal % base] + other_base
        decimal    = decimal / base
    return other_base

print base(31 ,16)



share|improve this answer
other-base is the same as other - base, so you should use other_base – mbomb007 Jul 15 '15 at 20:43
Also, this doesn't work correctly if decimal is zero. – mbomb007 Jul 15 '15 at 20:49

A recursive solution for those interested. Of course, this will not work with negative binary values. You would need to implement Two's Complement.

def generateBase36Alphabet():
    return ''.join([str(i) for i in range(10)]+[chr(i+65) for i in range(26)])

def generateAlphabet(base):
    return generateBase36Alphabet()[:base]

def intToStr(n, base, alphabet):
    def toStr(n, base, alphabet):
        return alphabet[n] if n < base else toStr(n//base,base,alphabet) + alphabet[n%base]
    return ('-' if n < 0 else '') + toStr(abs(n), base, alphabet)

print('{} -> {}'.format(-31, intToStr(-31, 16, generateAlphabet(16)))) # -31 -> -1F
share|improve this answer
def dec_to_radix(input, to_radix=2, power=None):
    if not isinstance(input, int):
        raise TypeError('Not an integer!')
    elif power is None:
        power = 1

    if input == 0:
        return 0
        remainder = input % to_radix**power
        digit = str(int(remainder/to_radix**(power-1)))
        return int(str(dec_to_radix(input-remainder, to_radix, power+1)) + digit)

def radix_to_dec(input, from_radix):
    if not isinstance(input, int):
        raise TypeError('Not an integer!')
    return sum(int(digit)*(from_radix**power) for power, digit in enumerate(str(input)[::-1]))

def radix_to_radix(input, from_radix=10, to_radix=2, power=None):
    dec = radix_to_dec(input, from_radix)
    return dec_to_radix(dec, to_radix, power)
share|improve this answer

def baseConverter(x, b):

s = ""
d = string.printable.upper()
while x > 0:
    s += d[x%b]
    x = x / b
return s[::-1]
share|improve this answer

Another short one (and easier to understand imo):

def int_to_str(n, b, symbols='0123456789abcdefghijklmnopqrstuvwxyz'):
    return (int_to_str(n/b, b, symbols) if n >= b else "") + symbols[n%b]

And with proper exception handling:

def int_to_str(n, b, symbols='0123456789abcdefghijklmnopqrstuvwxyz'):
        return (int_to_str(n/b, b) if n >= b else "") + symbols[n%b]
    except IndexError:
        raise ValueError(
            "The symbols provided are not enough to represent this number in "
            "this base")
share|improve this answer
def int2base(a, base, numerals="0123456789abcdefghijklmnopqrstuvwxyz"):
    baseit = lambda a=a, b=base: (not a) and numerals[0]  or baseit(a-a%b,b*base)+numerals[a%b%(base-1) or (a%b) and (base-1)]
    return baseit()


In any base every number is equal to a1+a2*base**2+a3*base**3... The "mission" is to find all a 's.

For everyN=1,2,3... the code is isolating the aN*base**N by "mouduling" by b for b=base**(N+1) which slice all a 's bigger than N, and slicing all the a 's that their serial is smaller than N by decreasing a everytime the func is called by the current aN*base**N .

Base%(base-1)==1 therefor base**p%(base-1)==1 and therefor q*base^p%(base-1)==q with only one exception when q=base-1 which returns 0. To fix that in case it returns 0 the func is checking is it 0 from the beggining.


in this sample theres only one multiplications (instead of division) and some moudulueses which relatively takes small amounts of time.

share|improve this answer

Another solution, works with base 2 to 10, needs modification for higher bases:

def n2b(n, b):
    if n == 0:
        return 0
    d = []
    while n:
        d.append(int(n % b))
        n /= b
    return ''.join(map(str,d[::-1]))


n2b(10,2) => '10100'
int(n2b(10,2),2) => 10
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