# How to convert an integer to a string in any base?

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

``````int(str, base).
``````

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, b), b) == x
``````

The function name/argument order is unimportant.

For any number `x` and base `b` that `int()` will accept.

This is an easy function to write: in fact it's 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 with (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

### Related

• 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) stackoverflow.com/a/28666223/1090562 Feb 23, 2015 at 2:55
• I have incorporated the solution with arbitrary big bases into my code as standard for bases larger 62 and provided also reverse conversion in the same function. So if there is anyone interested, just check it out: stackoverflow.com/a/71027453/7711283 . Feb 8 at 1:26

Surprisingly, people were giving only solutions that convert to small bases (smaller than 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 
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

1. at some point of time you will notice that sometimes there is no built-in library function to do things that you want, so you need to write your own. If you disagree, post you own solution with a built-in function which can convert a base 10 number to base 577.
2. this is due to lack of understanding what a number in some base means.
3. I encourage you to think for a little bit why base in your method works only for n <= 36. Once you are done, it will be obvious why my function returns a list and has the signature it has.
• Excellent answer! Good thinking leaving the number in a list; it makes it easier to come up with one's own character representation of numbers in different bases. May 13 at 17:12
• How would you then convert that list into a single character representation, if you had for example a string of characters like 0-9 plus A-Z plus 541 extra unicode characters? `s = "0123456789ABCDEF"` `n = [15,1,13]` `"".join([s[x] for x in n])` Jun 17 at 10:24

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., for Python 2, most simply:

``````import string
digs = string.digits + string.ascii_letters

def int2base(x, base):
if x < 0:
sign = -1
elif x == 0:
return digs
else:
sign = 1

x *= sign
digits = []

while x:
digits.append(digs[int(x % base)])
x = int(x / base)

if sign < 0:
digits.append('-')

digits.reverse()

return ''.join(digits)
``````

For Python 3, `int(x / base)` leads to incorrect results, and must be changed to `x // base`:

``````import string
digs = string.digits + string.ascii_letters

def int2base(x, base):
if x < 0:
sign = -1
elif x == 0:
return digs
else:
sign = 1

x *= sign
digits = []

while x:
digits.append(digs[x % base])
x = x // base

if sign < 0:
digits.append('-')

digits.reverse()

return ''.join(digits)
``````
• Just in (gmpy2) case the func Alex speaks of seems to be `gmpy2.digits(x, base)`. Jan 2, 2012 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, 2012 at 11:54
• (or `string.digits + string.letters`) Sep 25, 2013 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. Feb 5, 2014 at 21:02
• @lordscales91 You can also use `x //= base` which behaves like `/=` in Python 2 in dropping the decimal. This answer should include a disclaimer that it's for Python 2. Mar 27, 2017 at 16:33
``````"{0:b}".format(100) # bin: 1100100
"{0:x}".format(100) # hex: 64
"{0:o}".format(100) # oct: 144
``````
• But it only does those three bases? Oct 4, 2011 at 14:48
• Yes, unfortunately you can't specify custom int base. More info is here: docs.python.org/library/string.html#formatstrings
– Rost
Oct 6, 2011 at 9:25
• The `0` is unnecessary. Here's the Python 2 documentation: docs.python.org/2/library/string.html#format-string-syntax Aug 14, 2016 at 4:48
• You can achieve the same results with `hex(100)[2:]`, `oct(100)[2:]` and `bin(100)[2:]`. Sep 10, 2016 at 8:26
• @EvgeniSergeev: It's only unnecessary on 2.7/3.1+. On 2.6, the explicit position (or name) is required. Apr 4, 2017 at 20:09
``````def baseN(num,b,numerals="0123456789abcdefghijklmnopqrstuvwxyz"):
return ((num == 0) and numerals) or (baseN(num // b, b, numerals).lstrip(numerals) + numerals[num % b])
``````

``````RuntimeError: maximum recursion depth exceeded in cmp
``````

for very big integers.

• Elegant in its brevity. It seems to work under python 2.2.3 for non-negative integers. A negative number infinitely recurses. Feb 15, 2010 at 17:04
• +1 useful; fixed a problem when numerals didn't start with '0'
– sehe
Sep 14, 2011 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)`. Oct 9, 2013 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. Jan 7, 2015 at 23:36
• The use of short-circuiting here seems needlessly confusing...why not just use an if statement...the line `return numerals if num == 0 else baseN(num // b, b, numerals).lstrip(numerals) + numerals[num % b]` is just as brief. Jun 13, 2018 at 21:17
``````>>> numpy.base_repr(10, base=3)
'101'
``````

Note that `numpy.base_repr()` has a limit of 36 as its base. Otherwise it throws a `ValueError`

• Nice solution. In my case, I was avoiding numpy in `clac` for loading-time concerns. Preloading numpy more than triples the runtime of simple expression evaluation in clac: e.g. `clac 1+1` went from about 40ms to 140ms. Jun 3, 2019 at 20:20
• Which matches the limitation of the built in "int" function. Larger bases require deciding on what to do when the letters run out, Jan 18, 2020 at 14:46

## Recursive

I would simplify the most voted answer to:

``````BS="0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZ"
def to_base(n, b):
return "0" if not n else to_base(n//b, b).lstrip("0") + BS[n%b]
``````

With the same advice for `RuntimeError: maximum recursion depth exceeded in cmp` on very large integers and negative numbers. (You could use`sys.setrecursionlimit(new_limit)`)

## Iterative

To avoid recursion problems:

``````BS="0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZ"
def to_base(s, b):
res = ""
while s:
res+=BS[s%b]
s//= b
return res[::-1] or "0"
``````
• Beautifully refactored, and without library. Mar 5, 2019 at 17:00
• Shouldn't the stop condition be `return BS if not n` then ? Just in case you want to use fancy digits, like I do :) Apr 15, 2019 at 16:26
• @ArnaudP agreed. This one works for me: `return BS[n] if n < b else to_base(n // b) + BN[n % b]`
– Jens
Jan 14, 2020 at 21:55

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+/"
else:
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
else:
return  '-' + int2base(-x,b,alphabet)
# else x is non-negative real
rets=''
while x>0:
x,idx = divmod(x,b)
rets = alphabet[idx] + rets
return rets

``````

• How do you convert the base64 output of our function back to an integer? Oct 26, 2010 at 6:46

You could use `baseconv.py` from my project: https://github.com/semente/python-baseconv

Sample usage:

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

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

``````def base(decimal ,base) :
list = "0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZ"
other_base = ""
while decimal != 0 :
other_base = list[decimal % base] + other_base
decimal    = decimal / base
if other_base == "":
other_base = "0"
return other_base

print base(31 ,16)
``````

output:

"1F"

• `other-base` is the same as `other - base`, so you should use `other_base` Jul 15, 2015 at 20:43
• Also, this doesn't work correctly if `decimal` is zero. Jul 15, 2015 at 20:49

http://code.activestate.com/recipes/65212/

``````def base10toN(num,n):
"""Change a  to a base-n number.
Up to base-36 is supported without special notation."""
num_rep={10:'a',
11:'b',
12:'c',
13:'d',
14:'e',
15:'f',
16:'g',
17:'h',
18:'i',
19:'j',
20:'k',
21:'l',
22:'m',
23:'n',
24:'o',
25:'p',
26:'q',
27:'r',
28:'s',
29:'t',
30:'u',
31:'v',
32:'w',
33:'x',
34:'y',
35:'z'}
new_num_string=''
current=num
while current!=0:
remainder=current%n
if 36>remainder>9:
remainder_string=num_rep[remainder]
elif remainder>=36:
remainder_string='('+str(remainder)+')'
else:
remainder_string=str(remainder)
new_num_string=remainder_string+new_num_string
current=current/n
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"

try:
n = int(n)
base = int(base)
except:
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:
break

return s
``````
• base10toN does not account for the case of num == 0. Jun 18, 2020 at 20:42

I made a pip package for this.

I recommend you use my bases.py https://github.com/kamijoutouma/bases.py 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 https://github.com/kamijoutouma/bases.py#known-basesalphabets for what bases are usable

• This works like a charm for the known bases specified. Nov 2, 2016 at 9:49
• This is by far the best answer! And thanks for the pip packaging! Mar 27, 2019 at 21:18
``````def base_conversion(num, base):
digits = []
while num > 0:
num, remainder = divmod(num, base)
digits.append(remainder)
return digits[::-1]
``````
• By replacing the last line with `return ''.join(map(str, digits[::-1]))`, it's even more useful in bases between 2 and 10. It's not working for base 1.
– Wolf
Apr 29 at 8:18
• It also doesn't work with `num=0`.
– Wolf
Apr 29 at 8:46
``````>>> 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)
'-16d5'
>>> int2base(213, 21)
'a3'
``````

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
``````
``````def int2base(a, base, numerals="0123456789abcdefghijklmnopqrstuvwxyz"):
baseit = lambda a=a, b=base: (not a) and numerals  or baseit(a-a%b,b*base)+numerals[a%b%(base-1) or (a%b) and (base-1)]
return baseit()
``````

## explanation

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

For every`N=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.

``````def base_changer(number,base):
buff=97+abs(base-10)
dic={};buff2='';buff3=10
for i in range(97,buff+1):
dic[buff3]=chr(i)
buff3+=1
while(number>=base):
mod=int(number%base)
number=int(number//base)
if (mod) in dic.keys():
buff2+=dic[mod]
continue
buff2+=str(mod)
if (number) in dic.keys():
buff2+=dic[number]
else:
buff2+=str(number)

return buff2[::-1]
``````
• In this function you can easily convert any decimal number to your favorite base. Sep 8, 2019 at 17:45
• You don't need comment your own answer, you can just edit it to add explanation. Sep 8, 2019 at 18:03

Here is an example of how to convert a number of any base to another base.

``````from collections import namedtuple

Test = namedtuple("Test", ["n", "from_base", "to_base", "expected"])

def convert(n: int, from_base: int, to_base: int) -> int:
digits = []
while n:
(n, r) = divmod(n, to_base)
digits.append(r)
return sum(from_base ** i * v for i, v in enumerate(digits))

if __name__ == "__main__":
tests = [
Test(32, 16, 10, 50),
Test(32, 20, 10, 62),
Test(1010, 2, 10, 10),
Test(8, 10, 8, 10),
Test(150, 100, 1000, 150),
Test(1500, 100, 10, 1050000),
]

for test in tests:
result = convert(*test[:-1])
assert result == test.expected, f"{test=}, {result=}"
print("PASSED!!!")
``````

Say we want to convert 14 to base 2. We repeatedly apply the division algorithm until the quotient is 0:

14 = 2 x 7

7 = 2 x 3 + 1

3 = 2 x 1 + 1

1 = 2 x 0 + 1

The binary representation is just the remainder read from bottom to top. This can be proved by expanding

14 = 2 x 7 = 2 x (2 x 3 + 1) = 2 x (2 x (2 x 1 + 1) + 1) = 2 x (2 x (2 x (2 x 0 + 1) + 1) + 1) = 2^3 + 2^2 + 2

The code is the implementation of the above algorithm.

``````def toBaseX(n, X):
strbin = ""
while n != 0:
strbin += str(n % X)
n = n // X
return strbin[::-1]
``````
• "They can't go to eleven" -- Nigel from "This is Spinal Tap" Jun 25, 2021 at 11:57
• @MarkBorgerding Yeah. But it should be easy to implement larger bases. Jun 25, 2021 at 12:01

This is my approach. At first converting the number then casting it to string.

``````    def to_base(n, base):
if base == 10:
return n

result = 0
counter = 0

while n:
r = n % base
n //= base
result += r * 10**counter
counter+=1
return str(result)
``````

I have written this function which I use to encode in different bases. I also provided the way to shift the result by a value 'offset'. This is useful if you'd like to encode to bases above 64, but keeping displayable chars (like a base 95).

I also tried to avoid reversing the output 'list' and tried to minimize computing operations. The array of pow(base) is computed on demand and kept for additional calls to the function.

The output is a binary string

``````pows = {}

######################################################
def encode_base(value,
base = 10,
offset = 0) :

"""
Encode value into a binary string, according to the desired base.

Input :
value : Any positive integer value
offset : Shift the encoding (eg : Starting at chr(32))
base : The base in which we'd like to encode the value

Return : Binary string

Example : with : offset = 32, base = 64

100 -> !D
200 -> #(
"""

# Determine the number of loops
try :
pb = pows[base]

except KeyError :
pb = pows[base] = {n : base ** n for n in range(0, 8) if n < 2 ** 48 -1}

for n in pb :
if value < pb[n] :
n -= 1
break

out = []
while n + 1 :
b = pb[n]
out.append(chr(offset + value // b))
n -= 1
value %= b

return ''.join(out).encode()
``````

This function converts any integer from any base to any base

``````def baseconvert(number, srcbase, destbase):
if srcbase != 10:
sum = 0
for _ in range(len(str(number))):
sum += int(str(number)[_]) * pow(srcbase, len(str(number)) - _ - 1)
b10 = sum
return baseconvert(b10, 10, destbase)
end = ''
q = number
while(True):
r = q % destbase
q = q // destbase
end = str(r) + end
if(q<destbase):
end = str(q) + end
return int(end)
``````

The below provided Python code converts a Python integer to a string in arbitrary base ( from 2 up to infinity ) and works in both directions. So all the created strings can be converted back to Python integers by providing a string for N instead of an integer. The code works only on positive numbers by intention (there is in my eyes some hassle about negative values and their bit representations I don't want to dig into). Just pick from this code what you need, want or like, or just have fun learning about available options. Much is there only for the purpose of documenting all the various available approaches ( e.g. the Oneliner seems not to be fast, even if promised to be ).

I like the by Salvador Dali proposed format for infinite large bases. A nice proposal which works optically well even for simple binary bit representations. Notice that the width=x padding parameter in case of infiniteBase=True formatted string applies to the digits and not to the whole number. It seems, that code handling infiniteBase digits format runs even a bit faster than the other options - another reason for using it?

I don't like the idea of using Unicode for extending the number of symbols available for digits, so don't look in the code below for it, because it's not there. Use the proposed infiniteBase format instead or store integers as bytes for compression purposes.

``````    def inumToStr( N, base=2, width=1, infiniteBase=False,\
useNumpy=False, useRecursion=False, useOneliner=False, \
useGmpy=False, verbose=True):
''' Positive numbers only, but works in BOTH directions.
For strings in infiniteBase notation set for bases <= 62
infiniteBase=True . Examples of use:
inumToStr( 17,  2, 1, 1)             # [1,0,0,0,1]
inumToStr( 17,  3, 5)                #       00122
inumToStr(245, 16, 4)                #        00F5
inumToStr(245, 36, 4,0,1)            #        006T
inumToStr(245245245245,36,10,0,1)    #  0034NWOQBH
inumToStr(245245245245,62)           #     4JhA3Th
245245245245 == int(gmpy2.mpz('4JhA3Th',62))
inumToStr(245245245245,99,2) # [25,78, 5,23,70,44]
----------------------------------------------------
inumToStr( '[1,0,0,0,1]',2, infiniteBase=True ) # 17
inumToStr( '[25,78, 5,23,70,44]', 99) # 245245245245
inumToStr( '0034NWOQBH', 36 )         # 245245245245
inumToStr( '4JhA3Th'   , 62 )         # 245245245245
----------------------------------------------------
--- Timings for N = 2**4096, base=36:
standard: 0.0023
infinite: 0.0017
numpy   : 0.1277
recursio; 0.0022
oneliner: 0.0146
For N = 2**8192:
standard: 0.0075
infinite: 0.0053
numpy   : 0.1369
max. recursion depth exceeded:    recursio/oneliner
'''
show = print
if type(N) is str and ( infiniteBase is True or base > 62 ):
lstN = eval(N)
if verbose: show(' converting a non-standard infiniteBase bits string to Python integer')
return sum( [ item*base**pow for pow, item in enumerate(lstN[::-1]) ] )
if type(N) is str and base <= 36:
if verbose: show('base <= 36. Returning Python int(N, base)')
return int(N, base)
if type(N) is str and base <= 62:
if useGmpy:
if verbose: show(' base <= 62, useGmpy=True, returning int(gmpy2.mpz(N,base))')
return int(gmpy2.mpz(N,base))
else:
if verbose: show(' base <= 62, useGmpy=False, self-calculating return value)')
lstStrOfDigits="0123456789"+ \
"abcdefghijklmnopqrstuvwxyz".upper() + \
"abcdefghijklmnopqrstuvwxyz"
dictCharToPow = {}
for index, char in enumerate(lstStrOfDigits):
dictCharToPow.update({char : index})
return sum( dictCharToPow[item]*base**pow for pow, item in enumerate(N[::-1]) )
#:if
#:if

if useOneliner and base <= 36:
if verbose: show(' base <= 36, useOneliner=True, running the Oneliner code')
d="0123456789abcdefghijklmnopqrstuvwxyz"
baseit = lambda a=N, b=base: (not a) and d  or \
baseit(a-a%b,b*base)+d[a%b%(base-1) or (a%b) and (base-1)]
return baseit().rjust(width, d)[1:]

if useRecursion and base <= 36:
if verbose: show(' base <= 36, useRecursion=True, running recursion algorythm')
BS="0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZ"
def to_base(n, b):
return "0" if not n else to_base(n//b, b).lstrip("0") + BS[n%b]

if base > 62 or infiniteBase:
if verbose: show(' base > 62 or infiniteBase=True, returning a non-standard digits string')
# Allows arbitrary large base with 'width=...'
# applied to each digit (useful also for bits )
N, digit = divmod(N, base)
strN = str(digit).rjust(width, ' ')+']'
while N:
N, digit = divmod(N, base)
strN = str(digit).rjust(width, ' ') + ',' + strN
return '[' + strN
#:if

if base == 2:
if verbose: show(" base = 2, returning Python str(f'{N:0{width}b}')")
return str(f'{N:0{width}b}')
if base == 8:
if verbose: show(" base = 8, returning Python str(f'{N:0{width}o}')")
return str(f'{N:0{width}o}')
if base == 16:
if verbose: show(" base = 16, returning Python str(f'{N:0{width}X}')")
return str(f'{N:0{width}X}')

if base <= 36:
if useNumpy:
if verbose: show(" base <= 36, useNumpy=True, returning np.base_repr(N, base)")
import numpy as np
strN = np.base_repr(N, base)
return strN.rjust(width, '0')
else:
if verbose: show(' base <= 36, useNumpy=False, self-calculating return value)')
lstStrOfDigits="0123456789"+"abcdefghijklmnopqrstuvwxyz".upper()
strN = lstStrOfDigits[N % base] # rightmost digit
while N >= base:
N //= base # consume already converted digit
strN = lstStrOfDigits[N % base] + strN # add digits to the left
#:while
return strN.rjust(width, lstStrOfDigits)
#:if
#:if

if base <= 62:
if useGmpy:
if verbose: show(" base <= 62, useGmpy=True, returning gmpy2.digits(N, base)")
import gmpy2
strN = gmpy2.digits(N, base)
return strN.rjust(width, '0')
# back to Python int from gmpy2.mpz with
#     int(gmpy2.mpz('4JhA3Th',62))
else:
if verbose: show(' base <= 62, useGmpy=False, self-calculating return value)')
lstStrOfDigits= "0123456789" + \
"abcdefghijklmnopqrstuvwxyz".upper() + \
"abcdefghijklmnopqrstuvwxyz"
strN = lstStrOfDigits[N % base] # rightmost digit
while N >= base:
N //= base # consume already converted digit
strN = lstStrOfDigits[N % base] + strN # add digits to the left
#:while
return strN.rjust(width, lstStrOfDigits)
#:if
#:if
#:def
``````

I'm presenting a "unoptimized" solution for bases between 2 and 9:

``````  def to_base(N, base=2):
N_in_base = ''
while True:
N_in_base = str(N % base) + N_in_base
N //= base
if N == 0:
break
return N_in_base
``````

This solution does not require reversing the final result, but it's actually not optimized. Refer to this answer to see why: https://stackoverflow.com/a/37133870/7896998

Simple base transformation

``````def int_to_str(x, b):
s = ""
while x:
s = str(x % b) + s
x //= b
return s
``````

Example of output with no 0 to base 9

``````s = ""
x = int(input())
while x:
if x % 9 == 0:
s = "9" + s
x -= x % 10
x = x // 9
else:
s = str(x % 9) + s
x = x // 9

print(s)
``````
``````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
else:

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]))

``````

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'):
try:
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")
``````

Here is a recursive version that handles signed integers and custom digits.

``````import string

def base_convert(x, base, digits=None):
"""Convert integer `x` from base 10 to base `base` using `digits` characters as digits.
If `digits` is omitted, it will use decimal digits + lowercase letters + uppercase letters.
"""
digits = digits or (string.digits + string.ascii_letters)
assert 2 <= base <= len(digits), "Unsupported base: {}".format(base)
if x == 0:
return digits
sign = '-' if x < 0 else ''
x = abs(x)
first_digits = base_convert(x // base, base, digits).lstrip(digits)
return sign + first_digits + digits[x % base]
``````

Strings aren't the only choice for representing numbers: you can use a list of integers to represent the order of each digit. Those can easily be converted to a string.

None of the answers reject base < 2; and most will run very slowly or crash with stack overflows for very large numbers (such as 56789 ** 43210). To avoid such failures, reduce quickly like this:

``````def n_to_base(n, b):
if b < 2: raise # invalid base
if abs(n) < b: return [n]
ret = [y for d in n_to_base(n, b*b) for y in divmod(d, b)]
return ret[1:] if ret == 0 else ret # remove leading zeros

def base_to_n(v, b):
h = len(v) // 2
if h == 0: return v
return base_to_n(v[:-h], b) * (b**h) + base_to_n(v[-h:], b)

assert ''.join(['0123456789'[x] for x in n_to_base(56789**43210,10)])==str(56789**43210)
``````

Speedwise, `n_to_base` is comparable with `str` for large numbers (about 0.3s on my machine), but if you compare against `hex` you may be surprised (about 0.3ms on my machine, or 1000x faster). The reason is because the large integer is stored in memory in base 256 (bytes). Each byte can simply be converted to a two-character hex string. This alignment only happens for bases that are powers of two, which is why there are special cases for 2,8, and 16 (and base64, ascii, utf16, utf32).

Consider the last digit of a decimal string. How does it relate to the sequence of bytes that forms its integer? Let's label the bytes `s[i]` with `s` being the least significant (little endian). Then the last digit is `sum([s[i]*(256**i) % 10 for i in range(n)])`. Well, it happens that 256**i ends with a 6 for i > 0 (6*6=36) so that last digit is `(s*5 + sum(s)*6)%10`. From this, you can see that the last digit depends on the sum of all the bytes. This nonlocal property is what makes converting to decimal harder.

``````def baseConverter(x, b):
s = ""
d = string.printable.upper()
while x > 0:
s += d[x%b]
x = x / b
return s[::-1]
``````
• For python3 your code does this: baseConverter(0, 26) -> '' baseConverter(1, 26) -> '0000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001' For python2 it does this: baseConverter(0, 26) -> '' baseConverter(1, 26) -> 1 baseConverter(3, 26) -> 3 baseConverter(5, 26) -> 5 baseConverter(26, 26) -> 10 baseConverter(32, 26) -> 16 Apr 20, 2017 at 12:25
``````num = input("number")
power = 0
num = int(num)
while num > 10:
num = num / 10
power += 1

print(str(round(num, 2)) + "^" + str(power))
``````
• please add some brief information that what you did special init Nov 15, 2018 at 4:29
• While this might answer the authors question, it lacks some explaining words and/or links to documentation. Raw code snippets are not very helpful without some phrases around them. You may also find how to write a good answer very helpful. Please edit your answer. Nov 15, 2018 at 7:48