# Count number of 0s from [1,2,…num]

We are given a large number 'num', which can have upto 10^4 digits ,( num<= 10^(10000) ) , we need to find the count of number of zeroes in the decimal representation starting from 1 upto 'num'.

``````eg:
countZeros('9') = 0
countZeros('100') = 11
countZeros('219') = 41
``````

The only way i could think of is to do brute force,which obviously is too slow for large inputs.

I found the following python code in this link ,which does the required in O(L),L being length of 'num'.

``````def CountZeros(num):
Z = 0
N = 0
F = 0
for j in xrange(len(num)):
F = 10*F + N - Z*(9-int(num[j]))
if num[j] == '0':
Z += 1
N = 10*N + int(num[j])
return F
``````

I can't understand the logic behind it..Any kind of help will be appreciated.

-
I guess you should really ask on math.stackexchange.com :) I can understand the logic of the code; however understanding the math behind it might take a few more minutes than I have spare :) –  James Mills Dec 16 '13 at 15:23
Sounds like a project euler problem. writing down the numbers with zeros in them will help to figure out the pattern. And then you'll probably see the logic in the code also. –  M4rtini Dec 16 '13 at 15:30
Have you tried littering the function with `print`(s) and see what the invariant(s) are through the loop? –  James Mills Dec 16 '13 at 15:31

``````from 0 - 9 : 0 zeros
from 10 - 99: 9 zeros ( 10, 20, ... 90)

--100-199 explained-----------------------
100, 101, ..., 109 : 11 zeros (two in 100)
110, 120, ..., 199:  9 zeros (this is just the same as 10-99) This is important
Total: 20
------------------------------------------

100 - 999: 20 * 9 = 180

total up to 999 is: 180 + 9: 189
CountZeros('999') -> 189
``````

Continu this pattern and you might start to see the overall pattern and eventually the algorithm.

-

``````>>> for i in range(10, 100, 10):
...     print(CountZeros(str(i)))
...
1
2
3
4
5
6
7
8
9
>>>
``````

``````>>> CountZeros("30")
j Z N F
0 0 0 0

j Z N F
0 0 3 0

j Z N F
1 0 3 0

j Z N F
1 1 30 3

3
``````
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(your understanding) :) –  Groo Dec 16 '13 at 15:52
Yeah well I really don't want to give away the answer now do i? :) –  James Mills Dec 16 '13 at 15:55