# Modulus for factorial and divide

How to solve `(a!/(b!*c!))%mod`. Here `a!` is factorial of `a`.

Just as `(a+b)%mod=(a%mod+b%mod)%mod`

I know to calculate `(a*b)%mod`.

But how to take modulus of this type of function?

UPDATED Whats the best way to find (a/(b*c))%mod. Here mod is prime number

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Please clarify. Your question is a bit confusing. –  KRUKUSA Feb 23 at 7:08
@KRUKUSA What you did not understand? –  user3306991 Feb 23 at 7:12
mod what? Is the modulus prime? –  Ted Hopp Feb 23 at 7:16

## 1 Answer

Note that `(a! / (b! * c!)) % M` equals `((a! % M) / ((b! % M) * (c! % M))) % M` so implement `x! % M`:

``````def modfac(x, M):
if x == 0:
return 1
else:
return (modfac(x-1, M)*x)%M
``````

That could be made iterative but its only an example.

And then use it:

``````(modfac(a,M) / (modfac(b,M) * modfac(c,M))) % M
``````
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For computing n! mod M quickly, see this thread –  Ted Hopp Feb 23 at 7:17
@DanD WHat if denomnator term overflow the range of integer?should we compute denominator modulo using inverse modulo or so?I mean question reduces now to (a/(b*c))%mod –  user3306991 Feb 23 at 7:31