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.

This is not homework.

I saw this article praising Linq library and how great it is for doing combinatorics stuff, and I thought to myself: Python can do it in a more readable fashion.

After half hour of dabbing with Python I failed. Please finish where I left off. Also, do it in the most Pythonic and efficient way possible please.

from itertools import permutations
from operator import mul
from functools import reduce
glob_lst = []
def divisible(n): return (sum(j*10^i for i,j in enumerate(reversed(glob_lst))) % n == 0)
oneToNine = list(range(1, 10))
twoToNine = oneToNine[1:]
for perm in permutations(oneToNine, 9):
    for n in twoToNine:
        glob_lst = perm[1:n]
        #print(glob_lst)
        if not divisible(n):
            continue
    else:
        # Is invoked if the loop succeeds
        # So, we found the number
        print(perm)

Thanks!

share|improve this question
1  
Do you want most Pythonic or most efficient? They may well be very different things. :) –  Mark Dickinson Apr 15 '10 at 23:07
    
I want it all and I want it now ;) Hm ... one of each as well as both. There is no best answer then, although I would have to select one. Please include timeit one-liner for performance testing if you would. –  Hamish Grubijan Apr 15 '10 at 23:13
3  
Why are you using bitwise XOR in your divisible function? Did you mean ** instead of ^? –  dan04 Apr 16 '10 at 1:57

4 Answers 4

up vote 23 down vote accepted

Here's a short solution, using itertools.permutations:

from itertools import permutations

def is_solution(seq):
    return all(int(seq[:i]) % i == 0 for i in range(2, 9))

for p in permutations('123456789'):
    seq = ''.join(p)
    if is_solution(seq):
        print(seq)

I've deliberately omitted the divisibility checks by 1 and by 9, since they'll always be satisfied.

share|improve this answer
    
+999 Very nice! –  Hamish Grubijan Apr 15 '10 at 23:06
    
+1; so much more elegant than the solution in the linked article (despite LINQ's "Enourmous expressive power") –  IfLoop Jun 30 '11 at 23:49

Here's my solution. I like all things bottom-up ;-). On my machine it runs about 580 times faster (3.1 msecs vs. 1.8 secs) than Marks:

def generate(digits, remaining=set('123456789').difference):
    return (n + m
        for n in generate(digits - 1)
            for m in remaining(n)
                if int(n + m) % digits == 0) if digits > 0 else ['']

for each in generate(9):
    print(int(each))

EDIT: Also, this works, and twice as fast (1.6 msecs):

from functools import reduce

def generate():
    def digits(x):
        while x:
            x, y = divmod(x, 10)
            yield y
    remaining = set(range(1, 10)).difference
    def gen(numbers, decimal_place):
        for n in numbers:
            for m in remaining(digits(n)):
                number = 10 * n + m
                if number % decimal_place == 0:
                    yield number
    return reduce(gen, range(2, 10), remaining())

for each in generate():
    print(int(each))
share|improve this answer

Here's my solution (not as elegant as Mark's, but it still works):

from itertools import permutations

for perm in permutations('123456789'):
    isgood = 1
    for i in xrange(9):
        if(int(''.join(perm[:9-i])) % (9-i)):
            isgood = 0
            break
    if isgood:
        print ''.join(perm)
share|improve this answer
    
I want to time it, but I see Python 2.x code, and I do not want to compare apples and oranges. –  Hamish Grubijan Apr 15 '10 at 23:10
    
Oh yeah, it did say Python 3.x, oops –  Justin Peel Apr 15 '10 at 23:14
    
Mine isn't anywhere near as optimized as it could be either.. but why bother on something like this? –  Justin Peel Apr 15 '10 at 23:16
2  
Ok, my goal is to keep a coworker of mine on his toes. He is so in love with everything Microsoft, that I want to show him other ways to live. Do not worry about optimization if you do not feel like it. Thanks for contributing. –  Hamish Grubijan Apr 16 '10 at 0:15

this is my solution, it is very similar to Marks, but it runs about twice as fast

from itertools import permutations

def is_solution(seq):
    if seq[-1]=='9':
        for i in range(8,1,-1):
            n = -(9-i)
            if eval(seq[:n]+'%'+str(i))==0:
                continue
            else:return False
        return True
    else:return False
for p in permutations('123456789'):
    seq = ''.join(p)
    if is_solution(seq):
        print(seq)
share|improve this answer

Your Answer

 
discard

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.