# Need help in mod 1000000007 questions

I am weak in mathematics and always get stuck with the problems which require answer modulo some prime no.

eg: (500!/20!) mod 1000000007

I am familiar with BigIntegers but calculating modulo after calculating factorial of 500(even after using DP) seems to take a load of time.

I'd like to know if there's a particular way of approaching/dealing with these kind of problems.

Here is one such problem which I am trying to solve at the moment: http://www.codechef.com/FEB12/problems/WCOUNT

It would really be helpful if someone could direct me to a tutorial or an approach to handle these coding problems. I am familiar with Java and C++.

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The key to these large-number modulus tasks is not to compute the full result before performing the modulus. You should reduce the modulus in the intermediate steps to keep the number small:

``````500! / 20! = 21 * 22 * 23 * ... * 500

21 * 22 * 23 * 24 * 25 * 26 * 27 = 4475671200

4475671200 mod 1000000007 = 475671172
475671172 * 28 mod 1000000007 = 318792725
318792725 * 29 mod 1000000007 = 244988962
244988962 * 30 mod 1000000007 = 349668811

...

31768431 * 500 mod 1000000007 = 884215395

500! / 20! mod 1000000007 = 884215395
``````

You don't need to reduce modulus at every single step. Just do it often enough to keep the number from getting too large.

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thank you for your answer. could you help me with one more doubt. how am I to make sure that eg:31768431*x ( for any x) would not go outside the range of long. –  daerty0153 Feb 7 '12 at 0:12
If the max value of `long` is 2^63 - 1, then `1768431 * x` will not overflow as long as `x < 290331368171`. –  Mysticial Feb 7 '12 at 0:15
But wouldn't the comparison operation be equally expensive? –  nikhil Jul 2 '12 at 14:38
@nikhil What comparison operations are you referring to? –  Mysticial Jul 2 '12 at 14:40
The comparison operation itself is cheap. Determining how many multiplies you can do before you need a reduction is a bit tricker. (Roughly speaking you would need to keep track of the bit-length of the product as it grows.) But you can always default to reducing modulus after every multiply. –  Mysticial Jul 2 '12 at 14:58

Start by observing that `500!/20!` is the product of all numbers from 21 to 500, inclusive and Next, observe that you can perform modulo multiplication item by item, taking `%1000000007` at the end of each operation. You should be able to write your program now. Be careful not to overflow the number: 32 bits may not be enough.

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I think this could be of some use for you

``````for(mod=prime,res=1,i=20;i<501;i++)
{
res*=i; // an obvious step to be done
if(res>mod) // check if the number exceeds mod
res%=mod; // so as to avoid the modulo as it is costly operation
}
``````
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