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How can we shift all the zeros in an integer to the right.

For example, int x = 560106 , after shifting, x = 561600.

We cannot use another variable and String manipulation is not a good answer.

Also, I do know the dirty method of using mod recursively depending upon the integer length.

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Clearly (?) it can't be done as "bit-manipulation", since the question in posed in terms of powers of 10. And I'm pretty sure that you need either recursion or else another variable to hold the power of ten you're currently working on. I may be wrong, and I suppose that for a known size of int you could unroll that loop anyway. –  Steve Jessop May 5 '11 at 16:19
@Steve: As mentioned, we cannot have another variable. I have a solution for integer with unknown length and using mod recursively. But this is a dirty method. There have to be a simpler way. –  user484691 May 5 '11 at 16:23
Could you expand upon "cannot use another variable"? Are you saying that the only declarations allowed in our program are 'int main()' and 'int x' ? –  Robᵩ May 5 '11 at 16:29
@Rob: we cannot store any new information like if you want to store positions of zeros or length of the integer. Also, its a brain teaser so we are more worried about the logic and not the program. But answering your question, YES. only main() and int x. –  user484691 May 5 '11 at 16:33
Don't keep us in suspense, post the answer you have. –  Robᵩ May 5 '11 at 19:46

1 Answer 1

I am not sure if this is your solution, but a recursive implementation is (sorry about using Scheme - I dabble in it, so I try to use it for practice):

(define (bubble-digit-up number digit)
  (if (= number 0)
    (let ((last-digit (modulo number 10)))
      (if (= last-digit 0)
          (* (bubble-digit-up (/ number 10) digit) 10)
        (+ (* number 10) digit)))))

(define (shift-zeros-right x)
  (if (<= x 0)
    (let* ((last-digit (modulo x 10))
           (rest (shift-zeros-right (/ (- x last-digit) 10))))
      (bubble-digit-up rest last-digit))))

The function bubble-digit-up gets two parameters: a number, and a digit. It moves the digit near the first nonzero digit. For example, (bubble-digit-up 100 4) will return 1400. shift-zeros-right is the main function, which solves the problem recursively: extract first digit, shift the zeros of the remainder to right, and bubble the extracted digit into place.

Not a very elegant implementation, and definitely not bit operations (as per the tag), but this is the best I've got so far.

EDIT: If you consider the use of let as cheating, here is the variable-less version:

(define (bubble-digit-up number digit)
  (if (= number 0)
    (if (= (modulo number 10) 0)
        (* (bubble-digit-up (/ number 10) digit) 10)
      (+ (* number 10) digit))))

(define (shift-zeros x)
  (if (<= x 0)
     (shift-zeros (/ (- x (modulo x 10)) 10))
     (modulo x 10))))

EDIT2: A Python implementation may be easier to follow:

def bubble_digit_up(num, digit):
    if num == 0:
        return digit
        if num%10 == 0:
            return 10*bubble_digit_up(num/10, digit)
            return 10*num + digit

def shift_zeros_right(x):
    if x <= 0:
        return 0
        return bubble_digit_up(shift_zeros_right(x/10), x%10)
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Finally somebody started giving answers instead of incrementing/decrementing persons reputation...let me go through this...Thanks... –  user484691 May 5 '11 at 21:06
No worries. It was interesting to work with. :) Another possible solution is remove_zero_digits(num)*(10**count_zero_digits(num)), where the two functions can be coded up recursively too. I guess the aim of the question was to see if you can do recursive functions - as it is an obvious method to hide variable usage. :) –  vhallac May 5 '11 at 21:21
Yes the aim is to find an efficient way to get the answer i.e. all zeroes to right and rest on left. –  user484691 May 5 '11 at 21:49

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