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)
digit
(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)
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)
digit
(if (= (modulo number 10) 0)
(* (bubble-digit-up (/ number 10) digit) 10)
(+ (* number 10) digit))))
(define (shift-zeros x)
(if (<= x 0)
0
(bubble-digit-up
(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
else:
if num%10 == 0:
return 10*bubble_digit_up(num/10, digit)
else:
return 10*num + digit
def shift_zeros_right(x):
if x <= 0:
return 0
else:
return bubble_digit_up(shift_zeros_right(x/10), x%10)
```

`int`

you could unroll that loop anyway. – Steve Jessop May 5 '11 at 16:19