# Python: Code to find a number where first N digits are divisible by N (from 0-9)

I've been trying to write a recursive solution to a program to find a number where first N digits are divisible by N.

As an example: 3816547290, 3 is divisible by 1, 38 is divisible by 2, 381 is divisible by 3 and so on...

My recursive solution works fine while going "into" the recursion, but has issues when the stack unwinds (i.e. I don't specifically know how to backtrack or take steps on the way out

``````ARR = *10
ARR = 1 #dummy entry
def numSeq(pos, num):

if all(ARR):
print num
return True

if (pos>0) and (num%pos) != 0:
return False

for i in xrange(1,10):
if ARR[i] == 1:
continue
new_num = num*10 + i
if new_num%(pos+1) == 0:
ARR[i] = 1
numSeq(pos+1,new_num)
``````

The problem with this code seems to be that it follows the number generation correctly while going into the recursion...so it correctly generates the number 123654 which is divisible by 6 and follows first N digits being divisible by N, but after it fails to find any further digits from 7-8 or 9 that divide 7, i don't get the next set of steps to "reset" the global ARR and begin from index 2, i.e. try 24xxxx,and eventually get to 3816547290

EDIT: One condition I'd forgotten to mention is that each digit must be used exactly once (i.e. repetition of digits is disallowed)

2nd EDIT:

I was able to finally apply proper backtracking to solve the problem...this code works as is.

``````ARR = *10
def numDivisibile(num,pos):

if all(ARR):
print num
return True

for i in xrange(0,10):
if ARR[i] == 1:
continue
new_num = num*10+i
#check for valid case
if new_num%(pos+1) == 0:
ARR[i] = 1
if numDivisibile(new_num, pos+1):
return True
#backtrack
ARR[i] = 0

return False

print numDivisibile(0, 0)
``````
• Why are you trying to do this recursively? This seems like a poor choice for a recursive solution – Adam Smith Jul 20 '15 at 3:47
• it seems you have NOT `recovery ARR`(means ARR[i] = 0) – LittleQ Jul 20 '15 at 3:51
• the goal here is to build a 10 digit number where first N digits are divisible by N and each digit is used just once...Apologies if I was not clear...here is more flavor on the problem if you'd like: puzzling.stackexchange.com/questions/3017/… – labheshr Jul 20 '15 at 3:53
• @JTurk OH you're trying to BUILD it. I thought you were trying to test for it. P != NP. – Adam Smith Jul 20 '15 at 3:55
• @LittleQ - not sure what you mean by "recovery ARR" (where does the ARR[i] = 0) and where does that fit into my code? – labheshr Jul 20 '15 at 3:58

To generate all 10 digits integers where the first `n` digits are divisible by `n` for each `n` from `1` to `10` inclusive:

``````#!/usr/bin/env python3

def generate_ints_nth_digit_divisible_by_n(n=1, number=0):
number *= 10
if n == 10:
yield number  # divisible by 10
else:
for digit in range(not number, 10):
candidate = number + digit
if candidate % n == 0:  # divisible by n
yield from generate_ints_nth_digit_divisible_by_n(n + 1, candidate)

print("\n".join(map(str, generate_ints_nth_digit_divisible_by_n())))
``````

### Output

``````1020005640
1020061620
1020068010
...
9876062430
9876069630
9876545640
``````

To get numbers where each digit occurs only once i.e., to find the permutations of the digits that satisfy the divisibility condition:

``````def divisibility_predicate(number):
digits = str(number)
for n in range(1, len(digits) + 1):
if int(digits[:n]) % n != 0:
return n - 1
return n

def generate_digits_permutation(n=1, number=0, digits=frozenset(range(1, 10))):
# precondition: number has n-1 digits
assert len(set(str(number))) == (n - 1) or (number == 0 and n == 1)
# and the divisibility condition holds for n-1
assert divisibility_predicate(number) == (n - 1) or (number == 0 and n == 1)

number *= 10
if n == 10:
assert not digits and divisibility_predicate(number) == 10
yield number  # divisible by 10
else:
for digit in digits:
candidate = number + digit
if candidate % n == 0:  # divisible by n
yield from generate_digits_permutation(n + 1, candidate, digits - {digit})

from string import digits
print([n for n in generate_ints_nth_digit_divisible_by_n()
if set(str(n)) == set(digits)])
print(list(generate_digits_permutation()))
``````

### Output

``````

``````
• Thanks a lot, this is pretty good, the only requirement is each digit (from 0-9) is used exactly once (i should have made it clearer in my original post. That's the reason i use the global ARR in my code). I'll try to tweak the above code to adapt for that requirement – labheshr Jul 20 '15 at 12:03
• @JTurk: It is a considerable change in the requirements. Don't put such info in the comments, edit or update your question instead. It is easy to filter final result: `set(str(n)) == set('1234567890')` or exclude digits that are already in `number`. I've updated the answer with the corresponding code examples. – jfs Jul 20 '15 at 12:37

In your function, you never do `return numSeq(...)`, this seems like causing the issue.

If you want to have a iterative solution, you can check the following:

``````def getN(number):
strNum = str(number)
for i in range(1, len(strNum)+1):
if int(strNum[:i]) % i != 0:
return i-1
return i

print getN(3816)
print getN(3817)
print getN(38165)
``````

Output:

``````4
3
5
``````

We can modify your recursive function a little to try different possibilities. Rather than have a global record (`ARR`) of used positions, each thread of the recursion will have its own `hash` of used digits:

``````def numSeq(pos, num, hash):
if pos != 1 and num % (pos - 1) != 0:   # number does not pass the test
return

elif pos == 11:                         # number passed all the tests
print num

elif pos == 5:
numSeq(pos + 1,10 * num + 5,hash)     # digit is 5 at position 5

elif pos == 10:
numSeq(pos + 1,10 * num,hash)         # digit is 0 at position 10

else:
k = 2 if pos % 2 == 0 else 1          # digit is even at even positions
for i in xrange(k,10,2):
if hash & (1 << i):                 # digit has already been used, skip it
continue
numSeq(pos + 1,10 * num + i,hash | (1 << i))

numSeq(1,0,0) # 3816547290
``````