How come the number N! can terminate in exactly 1,2,3,4, or 6 zeroes by never 5 zeroes?
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The factors of 10 are 5 and 2. Note that the 5th multiple of 5 will bring a pair of 5s into the product, which means you couldn't group just 5 5s as the factorials of 25+ have 6 fives within it. Every even number contributes a 2 so that is where there are plenty of 2s to perform a sort of rearranging of the prime factorization to get 10^6 within all factorials of 25 or higher. Under 25, there are at most 4 factors that contain a 5: 5, 10, 15, and 20. 

