how to check whether a number is divisible by 5 or not without using % and / operator. I want a quickest algorithm for this problem.
A good starting point is to look into how division can be accomplished with multiplication and bitshifts. This question is one place to look. In particular, you can follow the attached post to hit upon the following strategy. First, "divide by 5" using multiplication and bitshifts:
Then, take the result and multiply by 5:
Then,



There are two reasons I can see for wanting such an algorithm: (1) homework, or (2) writing efficient code for a microcontroller which does not have efficient division instructions. Assuming your reason is the second, but allowing for the possibility that it might be the first, I won't give you a full solution, but will suggest that if you divide your number into chunks that are a multiple of four bits each, the sum of all those chunks will be divisible by five only if the original number was; note that when performing such computation you must either avoid overflows or else add to your result the number of overflows that have occurred. I don't know any efficient way to do the latter in C, but in many machine languages it is easy. As a simple example, on the 8051 if one had a 32bit integer, one could so something like:
Note that in the machine code, adding the carries back into the number is much faster than performing 16bit math would be. Once the value has been reduced to the range 0255, one could add the upper four bits to the lower 4 bits to get a value in the range 0 to 30. One could either test for the seven such values that are multiples of five, or work to reduce the number of possible values further [e.g. if the value is at least 15, subtract 15; if at least 10, subtract 10; if 5, subtract five; if zero, it's a multiple of five]. 


Let's represent the number in base 2. We have:
or
We are given If you alternately  and +
The answer! 





It finally got unlocked, so I can explain my comment, which incidentally turns out to generate better code than GCC does for
I'll assume unsigned input, because the OP suggested an algorithm that only works with positive input. This method can be extended to signed input, but it's a little messy.
Modulo powers of two, a number has a modular multiplicative inverse iff it is odd. Since multiplying by an odd number is invertible and is actually a bijection, it can't map any nonmultiples of k to the 0  (2^{32}1)/k range. So when it's outside that range, it can't have been a multiple of k.



Keep subtracting by multiples of 5 like 50, 500,100, etc. Start with big numbers. If the result goes in negative then subtract with a smaller number number until you reach 0. Otherwise the number is not divisible. 


Add all the bytes and check (by table lookup) if the sum is divisible by 5. 


Typecast or convert to a string, then see if the final character is a 5 or 0. 


%
. So I would suggest using%
! – Oliver Charlesworth Jun 14 '13 at 17:05