Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Lemme clarify:

What would be the fastest way to get every number with all unique digits between two numbers. For example, 10,000 and 100,000.

Some obvious ones would be 12,345 or 23,456. I'm trying to find a way to gather all of them.

for i in xrange(LOW, HIGH):
  str_i = str(i)
share|improve this question
I understand you want both 12345 and 54321 in your results? –  Tadeck Sep 11 '13 at 3:51
@Tadeck yes I do –  SetSlapShot Sep 11 '13 at 3:51
The fastest way? Probably to list them out in the source code... Something tells me you are not looking for the fastest way. –  Oddthinking Sep 11 '13 at 4:03
I'm doing a different brute force to the crypt-arithmetic than the normal ways, I think I am. –  SetSlapShot Sep 11 '13 at 4:06
add comment

4 Answers

up vote 15 down vote accepted

Use itertools.permutations:

from itertools import permutations

result = [
    a * 10000 + b * 1000 + c * 100 + d * 10 + e
    for a, b, c, d, e in permutations(range(10), 5)
    if a != 0

I used the fact, that:

  • numbers between 10000 and 100000 have either 5 or 6 digits, but only 6-digit number here does not have unique digits,
  • itertools.permutations creates all combinations, with all orderings (so both 12345 and 54321 will appear in the result), with given length,
  • you can do permutations directly on sequence of integers (so no overhead for converting the types),


Thanks for accepting my answer, but here is the data for the others, comparing mentioned results:

>>> from timeit import timeit
>>> stmt1 = '''
a = []
for i in xrange(10000, 100000):
    s = str(i)
    if len(set(s)) == len(s):
>>> stmt2 = '''
result = [
    for digits in permutations('0123456789', 5)
    if digits[0] != '0'
>>> setup2 = 'from itertools import permutations'
>>> stmt3 = '''
result = [
    x for x in xrange(10000, 100000)
    if len(set(str(x))) == len(str(x))
>>> stmt4 = '''
result = [
    a * 10000 + b * 1000 + c * 100 + d * 10 + e
    for a, b, c, d, e in permutations(range(10), 5)
    if a != 0
>>> setup4 = setup2
>>> timeit(stmt1, number=100)
>>> timeit(stmt2, setup2, number=100)
>>> timeit(stmt3, number=100)
>>> timeit(stmt4, setup4, number=100)

So, to sum up:

  • solution no. 1 took 7.96 s,
  • solution no. 2 (my original solution) took 1.88 s,
  • solution no. 3 took 8.6 s,
  • solution no. 4 (my updated solution) took 0.75 s,

Last solution looks around 10x faster than solutions proposed by others.

Note: My solution has some imports that I did not measure. I assumed your imports will happen once, and code will be executed multiple times. If it is not the case, please adapt the tests to your needs.

EDIT #2: I have added another solution, as operating on strings is not even necessary - it can be achieved by having permutations of real integers. I bet this can be speed up even more.

share|improve this answer
Will this be faster? The len(set(str)) == len(s) method is humming along rather slowly. –  SetSlapShot Sep 11 '13 at 3:54
Nice, except that you do have to exclude numbers starting with zeroes. –  nneonneo Sep 11 '13 at 3:54
@SetSlapShot: What range are you operating over? –  nneonneo Sep 11 '13 at 3:55
@nneonneo: Good advice, I have added a check. –  Tadeck Sep 11 '13 at 3:56
For my case, 10,000,000 to 100,000, 000 –  SetSlapShot Sep 11 '13 at 3:56
show 7 more comments

Cheap way to do this:

for i in xrange(LOW, HIGH):
    s = str(i)
    if len(set(s)) == len(s):
        # number has unique digits

This uses a set to collect the unique digits, then checks to see that there are as many unique digits as digits in total.

share|improve this answer
Briliant. Thank you. –  SetSlapShot Sep 11 '13 at 3:45
This solution will be faster than Tadeck's one if LOW and HIGH are similar numbers. (e.g. 0.9 * HIGH < LOW < HIGH) –  hynekcer Sep 11 '13 at 21:45
add comment

List comprehension will work a treat here (logic stolen from nneonneo):

[x for x in xrange(LOW,HIGH) if len(set(str(x)))==len(str(x))]

And a timeit for those who are curious:

> python -m timeit '[x for x in xrange(10000,100000) if len(set(str(x)))==len(str(x))]'
10 loops, best of 3: 101 msec per loop
share|improve this answer
add comment

Here is an answer from scratch:

def permute(L, max_len):
    allowed = L[:]
    results, seq = [], range(max_len)
    def helper(d):
        if d==0:
            for i in xrange(len(L)):
                if allowed[i]:
    return results

A = permute(list("1234567890"), 5)
print A
print len(A)
print all(map(lambda a: len(set(a))==len(a), A))

It perhaps could be further optimized by using an interval representation of the allowed elements, although for n=10, I'm not sure it will make a difference. I could also transform the recursion into a loop, but in this form it is more elegant and clear.

Edit: Here are the timings of the various solutions

  • 2.75808000565 (My solution)
  • 8.22729802132 (Sol 1)
  • 1.97218298912 (Sol 2)
  • 9.659760952 (Sol 3)
  • 0.841020822525 (Sol 4)
share|improve this answer
Ok, to make your solution comparable with other solutions, could you: 1) fix the exceptions and make it work without necessity for modifications, 2) use timeit.timeit() for measuring the time, 3) make sure it produces proper results (after fixing exception), 4) maybe also run timeit.timeit() on all the solutions for comparison? –  Tadeck Sep 11 '13 at 16:20
I made a mistake when copying from the interpreter, calling "helper" instead of "permute". It is fixed now. –  erjoalgo Sep 11 '13 at 16:39
As I mentioned in my answer, it certainly can be improved, I just did not find it amusing enough to do it myself. But I am looking forward to see what will be your approach. In the meantime I also removed the downvote that I made due to issues with your solution. Plus, I would not call itertools an external library, as it is part of standard library. –  Tadeck Sep 11 '13 at 17:18
add comment

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.