# Help me finish this Python 3.x self-challenge

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!

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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
Why are you using bitwise XOR in your divisible function? Did you mean ** instead of ^? –  dan04 Apr 16 '10 at 1:57

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.

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+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") –  SingleNegationElimination 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))
``````
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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)
``````
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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
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)
``````
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