# "Simulate" a 32-bit integer overflow in JavaScript

JavaScript can handle the following Math just fine:

``````var result = (20000000 * 48271) % 0x7FFFFFFF;
``````

But in some programming languages, that first `int*int` multiplication results in a value too large to hold in a standard 32 bit integer. Is there any way to "simulate" this in JavaScript, and see what the resulting calculation would be if the multiplication resulted in an integer overflow?

• @FélixSaparelli It's not a duplicate, `20000000 * 48271` is still well within the JavaScript Number's 52 bit accuracy; it will not overflow. I'm trying to simulate a 32 bit overflow. May 10 '14 at 6:33
• I cheated by subtracting 2^32 enough times from the result, but I don't think that's very efficient or very smart :P May 10 '14 at 6:34
• `if Math.abs(int * int) is greater than (2^32)/2 then log value and continue`? May 10 '14 at 6:45

In newer browsers, `Math.imul(a,b)` will give you an actual 32-bit integer multiplied result, with overflow resulting the way you would expect (it gives the lower half of the 64-bit result as what it returns).

However, as far as I know there's no way to actually get the overflow, (the upper 32 bits) but the modulus you showed in your answer gets rid of that information, so I figure that's not what you want. If they were going to do overflow, they'd have to separate it based on signed and unsigned anyway.

I know this works in Chrome, Firefox, and Opera, not sure about the rest, though pretty sure IE doesn't have it (typical). You'd need to fall back to a shim such as this one.

• I think you're confusing 32-bit/64-bit with unsigned/signed. May 10 '14 at 16:53
• No, when you multiply two 32 bit numbers in two's complement, it produces a 64 bit result, though the lower half will be correct regardless of whether the multiplication is signed or not- it's the upper half, the overflow, that varies based on signedness. See stackoverflow.com/questions/14063599/…
– TND
May 10 '14 at 21:07
• @TND, I'm writing a hashCode like function where the algorithm I've been told to implement has a 32-bit int and expects the behavior provided by the Math.imul(). I would suggest that you remove the part about it having no way to get the upper 32 bits to make the answer clearer.
– PatS
Feb 7 '18 at 23:43
• Is there also iadd? Addition with correct overflow? I need this for my Javascript based JVM Sep 15 '19 at 17:22

It is possible to simulate 32-bit integer by "abusing" the bitwise operators available in JavaScript (since they can only return integers within that range).

To convert to a signed 32-bit integer:

``````x = (a * b) | 0;
``````

To convert to an unsigned 32-bit integer:

``````x = (a * b) >>> 0;
``````

Another way to achieve this is to convert to a format where you can remove extra bytes before converting back to integer. That may not be optimal for JS but can be helpful in environments with really restricted operators.

``````var hugeInteger = 999999999999999;
It's also possible to get the overflow from `hugeInteger.toString(16).slice(0,-8)`