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Given the following code, where both a and b are Numbers representing values within the range of signed 32-bit signed integers:

var quotient = ((a|0) / (b|0))|0;

and assuming that the runtime is in full compliance with the ECMAScript 6 specifications, will the value of quotient always be the correct signed integer division of a and b as integers? In other words, is this a proper method to achieve true signed integer division in JavaScript that is equivalent to the machine instruction?

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    Have you tried looking for any counterexamples that might prove it isn't always correct?
    – Purag
    Jul 11, 2015 at 5:33
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    I have not. Since JavaScript formally deals in all floating point, I would see the question coming down to, is the result of the double precision division of two mathematical integers in the range of a 32-bit signed integer, followed by a truncation to a 32-bit signed integer and a simulation of overflow according to the ToInt32() abstract operation specified by EMCAScript 6, equivalent to an integer division of the same mathematical values? I don't feel I understand the process of floating point division well enough to answer this myself or derive counterexamples, which is why I asked here.
    – lcmylin
    Jul 11, 2015 at 6:01
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    For division by zero, no — it returns 0 instead of throwing an exception: stackoverflow.com/questions/29179876/…
    – gengkev
    Jul 11, 2015 at 6:35
  • Math.prototype.trunc might be useful
    – royhowie
    Jul 11, 2015 at 7:19

1 Answer 1

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I'm no expert on floating-point numbers, but Wikipedia says that doubles have 52 bits of precision. Logically, it seems that 52 bits should be enough to reliably approximate integer division of 32-bit integers.

Dividing the minimum and maximum 32-bit signed ints, -2147483648 / 2147483647, produces -1.0000000004656613, which is still a reasonable amount of significant digits. The same goes for its inverse, 2147483647 / -2147483648, which produces -0.9999999995343387.

An exception is division by zero, which I mentioned in a comment. As the linked SO question states, integer division by zero normally throws some sort of error, whereas floating-point coercion results in (1 / 0) | 0 == 0.

Update: According to another SO answer, integer division in C truncates towards zero, which is what |0 does in JavaScript. In addition, division by 0 is undefined, so JavaScript is technically not incorrect in returning zero. Unless I've missed anything else, the answer to the original question should be yes.

Update 2: Relevant sections of the ECMAScript 6 spec: how to divide numbers and how to convert to a 32-bit signed integer, which is what |0 does.

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