While a `signed long long int`

will not hold `A*B`

, two of them will. So `A*B`

could be decomposed to tree terms of different exponent, any of them fitting one `signed long long int`

.

```
A1=A>>32;
A0=A & 0xffffffff;
B1=B>>32;
B0=B & 0xffffffff;
AB_0=A0*B0;
AB_1=A0*B1+A1*B0;
AB_2=A1*B1;
```

Same for `C*D`

.

Folowing the straight way, the subraction could be done to every pair of `AB_i`

and `CD_i`

likewise, using an additional carry bit (accurately a 1-bit integer) for each. So if we say E=A*B-C*D you get something like:

```
E_00=AB_0-CD_0
E_01=(AB_0 > CD_0) == (AB_0 - CD_0 < 0) ? 0 : 1 // carry bit if overflow
E_10=AB_1-CD_1
...
```

We continue by transferring the upper-half of `E_10`

to `E_20`

(shift by 32 and add, then erase upper half of `E_10`

).

Now you can get rid of the carry bit `E_11`

by adding it with the right sign (obtained from the non-carry part) to `E_20`

. If this triggers an overflow, the result wouldn't fit either.

`E_10`

now has enough 'space' to take the upper half from `E_00`

(shift, add, erase) and the carry bit `E_01`

.

`E_10`

may be larger now again, so we repeat the transfer to `E_20`

.

At this point, `E_20`

must become zero, otherwise the result won't fit. The upper half of `E_10`

is empty as result of the transfer too.

The final step is to transfer the lower half of `E_20`

into `E_10`

again.

If the expectation that `E=A*B+C*D`

would fit the `signed long long int`

holds, we now have

```
E_20=0
E_10=0
E_00=E
```

`A - C`

could overflow. It that an issue to consider or do you know that this is not going to happen with your data? – William Morris Nov 5 '12 at 17:47willhappen). Using inline assembly is one of many non-portable ways to check. – Mooing Duck Nov 5 '12 at 18:31