# Is there a way to do (A*B) mod M without overflow for unsigned long long A and B?

I don't want the nightmare of installing GMP on Windows.

I have two numbers A and B, `unsigned long long`s, on the order of magnitude 10^10 or so at most, but even when doing `((A%M)*(B%M))%M`, I get integer overflow.

Are there homebrew functions for calculating `(A*B)%M` for larger numbers?

-
What is the order of magnitude of M? – jxh Nov 20 '12 at 0:22
the same, around 10^10 – John Smith Nov 20 '12 at 0:24
basically M*M overflows? – cpp initiator Nov 20 '12 at 0:31
Yes, pretty much. Sample numbers: 9030460994 x 9030460994 mod 12*10^9 => overflow – John Smith Nov 20 '12 at 0:33
I can think of a way (but not quite efficient) by using congruence recursively. en.wikipedia.org/wiki/Congruence_relation – cpp initiator Nov 20 '12 at 0:38

If the modulus `M` is sufficiently smaller than `ULLONG_MAX` (which is the case if it's in the region of 10^10), you can do it in three steps by splitting one of the factors in two parts. I assume that `A < M` and `B < M`, and `M < 2^42`.

``````// split A into to parts
unsigned long long a1 = (A >> 21), a2 = A & ((1ull << 21) - 1);
unsigned long long temp = (a1 * B) % M;   // doesn't overflow under the assumptions
temp = (temp << 21) % M;                  // this neither
temp += (a2*B) % M;                       // nor this
return temp % M;
``````

For larger values, you can split the factor in three parts, but if the modulus becomes really close to `ULLONG_MAX` it becomes ugly.

-
Sweet googly mooglies, I believe this works. Thank you – John Smith Nov 20 '12 at 0:45