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 = [0]*10
ARR[0] = 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

Thanks in Advance for your help!

**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 = [0]*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)
```

`recovery ARR`

(means ARR[i] = 0) – LittleQ Jul 20 '15 at 3:51BUILDit. I thought you were trying totestfor it. P != NP. – Adam Smith Jul 20 '15 at 3:551more comment