**Multiplication with shift and add** is easy

I saw some solutions here, but they were not explained, so here it is in full.

The basic formula is: **a * b = c**. Rewrite **b** to a binary-number form. For 32-bit numbers you get:

**a * ( b0*(2^0) + b1*(2^1) + ... + b31*(2^31) ) = c**. **2^i** is the same as **1 << i** and **b0,...,b31** are the bits from **b**.

Now the obvious code (tested for unsigned 32-bit integers):

```
DWORD mul(DWORD a, DWORD b)
{
DWORD c = 0, i, m;
for (m = 1, i = 0; i < 32; i++, m<<=1, a<<=1)
if (DWORD(b&m))
c += a;
return c;
}
```

And also it can be further optimized:

- Reset all used bits in b
- Then the loop can end if b == 0, so no need for i

For more speed, also a >= b, so swap them if not (fewer bits of b means fewer iterations).

Optimized code

```
DWORD mul(DWORD a, DWORD b)
{
DWORD c;
if (a < b) {
c = a;
a = b;
b = c;
}
for (c = 0; b; b>>=1, a<<=1)
if (DWORD(b&1))
c+=a;
return c;
}
```

If you need a bigint multiplication, have a look at Stack Overflow question *Fast bignum square computation*:

There are some ideas and the use of NTT is also possible. It is speeded up 40x times so it's usable, but still for veeeery big numbers.
For more information, look at Stack Overflow question *Modular arithmetics and NTT (finite field DFT) optimizations*.

If you need signed numbers then handle signum separately:

```
int mul(int a, int b)
{
int c, s;
s = +1;
if (a < 0) {
s = -s;
a = -a;
}
if (b < 0) {
s= -s;
b= -b;
}
if (a < b) {
c = a;
a = b;
b = c;
}
for (c = 0; b; b>>=1, a<<=1)
if (DWORD(b&1))
c += a;
if (s<0)
c=-c;
return c;
}
```

And last, but not least: **Do not forget about OVERFLOW!!!**

(n0)bits * (n1)bits = (n0+n1)bits. To avoid overflow you need to use 2N-bit shift and add arithmetics, so the result is also 2N-bit long.

I hope it helps.

`*`

operator; that's what it's for. This is nearly a duplicate of this question. Note that`(x<<3) - x`

can overflow for some values of`x`

where the simpler and clearer`x * 7`

won't. – Keith Thompson Dec 29 '11 at 2:49