# Is there a way to correctly multiply two 32 bit integers in Javascript?

Is there a way to correctly multiply two 32 bit integers in Javascript?

When I try this from C using `long long` I get this:

``````printf("0x%llx * %d = %llx\n", 0x4d98ee96ULL, 1812433253,
0x4d98ee96ULL * 1812433253);
==> 0x4d98ee96 * 1812433253 = 20becd7b431e672e
``````

But from Javascript the result is different:

``````x = 0x4d98ee97 * 1812433253;
print("0x4d98ee97 * 1812433253 = " + x.toString(16));
==> 0x4d98ee97 * 1812433253 = 20becd7baf25f000
``````

The trailing zeros lead me to suspect that Javascript has an oddly limited integer resolution somewhere between 32 and 64 bits.

Is there a way to get a correct answer? (I'm using Mozilla js-1.8.5 on x86_64 Fedora 15 in case that matters.)

-
FYI: It's actually around 53 bits. –  Thai Jun 4 '11 at 3:31

You'll likely need to make use of a third-party Javascript library to handle large-number precision.

For example, BigInt.js: http://www.leemon.com/crypto/BigInt.js

-

This seems to do what I wanted without an external dependency:

``````function multiply_uint32(a, b) {
var ah = (a >> 16) & 0xffff, al = a & 0xffff;
var bh = (b >> 16) & 0xffff, bl = b & 0xffff;
var high = ((ah * bl) + (al * bh)) & 0xffff;
return ((high << 16)>>>0) + (al * bl);
}
``````

This performs a 32-bit multiply modulo 2^32, which is the correct bottom half of the computation. A similar function could be used to calculate a correct top half and store it in a separate integer (ah * bh seems right), but I don't happen to need that.

Note the zero-shift. Without that the function generates negative values whenever the high bit is set.

-

You are correct. Javascript integers are treated as floats, which have poor precision when dealing with ints.

In javascript, it is the case that `10000000000000001%2 == 0`

A friend also mentions that `10000000000000001 == 10000000000000000`, and that this is indeed due to the spec (though ints are used for optimization, the spec still requires float-like behavior).

Though once you're in this territory, you're already nearly at the limit of 64bit int precision.

-
Because integers are in fact stored as IEEE 754 double-precision (64 bit) floats, you can't get better than 54 (or 53? something like that) bits of precision, but in cases where JavaScript needs to do int-like things (array indexing), it drops down to 31 bits anyway. –  Pointy Jun 3 '11 at 22:22