# Can floating point error cause 'a/(double)b >= a/b' to fail?

Can `result` ever be false because `4 / 2.0` may return something like `1.99999999`? More generally than the title:

``````int a = // any valid int
int b = // any valid int
boolean result = (a/(double)b) >= a/b;
``````

If this is possible, can anyone provide an example of `a` and `b`? If this isn't possible, is there any java or floating point specification which proves this?

I wrote this logic a few minutes ago, and suddenly worried about it breaking. I have been unable to break it, but I'm wondering if it's guaranteed across all JVMs.

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If `a` and `b` are positive `int` values, then `a/(double)b >= a/b`.

I use the following premises, along with understood semantics, such as that the `int` value of `a/b` will be converted to `double` for the comparison with the other operand of `>=`.

Premises:

• The range of `int` is [-2,147,483,648, 2,147,483,648).
• `double` is IEEE 754 64-bit binary.
• The rounding mode is round-to-nearest.
• All floating-point operations, particularly division, conform to IEEE 754.
• The integer `a/b` truncates toward zero.

Notation:

• a is the mathematical value of `a`.
• b is the mathematical value of `b`.
• Mathematical expressions, such as a/b, are exact, as distinct from computed expressions such as `a/b`.
• Let L be the value produced for `a/(double)b`.
• Let R be the value produced for `a/b`.

Proof:

• All `int` values are representable in `double`, so IEEE 754 requires that converting `int` to `double` be exact.
• Therefore, `(double) a` and `(double) b` produce a and b exactly, and `a/(double)b` produces a/b correctly rounded to the nearest `double`.
• Since R is a/b truncated toward zero, and a/b is positive, R is floor(a/b).
• The greatest a/b can be is 2,147,483,647/1 = 2,147,483,647. Each integer at this magnitude and below is exactly representable as a `double`.
• L is the `double` nearest a/b. If L is reduced by rounding, it is reduced to the next lower `double`. Since all integers at this magnitude are representable, floor(a/b) is representable, so L is at least floor(a/b).
• Therefore LR.
• The conversion of R to `double` is exact, so the comparison of L to R with `>=` produces the same result as the mathematical LR.
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Thanks for the great and thorough response! –  Cory Kendall Mar 12 '13 at 6:29

For negative numbers, it fails for a = -10, b = 3.

For positive inputs only, I think you are safe.

Let x be the real number result of dividing a by b.

First consider the case where x is representable as an int. It is also representable as a double, and both calculations return x.

Now suppose x is not an int. The question is whether the absolute value of the rounding error difference between x and a/(double b) can ever exceed the truncation error for a/b. It cannot.

The truncation error t = x - a/b must be at least 1/b. x cannot be bigger than Integer.MAX_VALUE/b, so t/x is at least 1/Integer.MAX_VALUE. That is much greater than the maximum rounding error on a correctly rounded double calculation.

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`4 / 2.0` must return `2.0` because floating-point division is exact.

Negative numbers may cause your comparison to fail, though. Note that `-1/2 = 0` while `-1.0/2.0 = -0.5`.

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+1 for the example. However, "floating-point division division is exact" needs some qualification; what exactly do you mean by that? –  Oliver Charlesworth Mar 12 '13 at 0:47
Also because those are binary digits, no? `4 / 2.0` is `4 * 2^(-1)` which, IIRC, is how floats are stored. –  WChargin Mar 12 '13 at 0:48
@OliCharlesworth: The division of two floating-point numbers always returns the closest floating-point number to the quotient. –  tmyklebu Mar 12 '13 at 0:48
Can you expand on the definition of "exact"? I assume that calculating `1/3` will lead to something like "0.33333..." to some amount of precision, but will never equal the true "exact" mathematical value of `1/3`. –  Cory Kendall Mar 12 '13 at 0:48
The term used in the IEEE 754 standard is “correctly rounded”. The produced result is generally not mathematically exact, but it is the mathematically exact result correctly rounded according to the rounding mode. In round-to-nearest mode, that is the nearest representable result, with ties toward the even low bit. There are other modes which produces results farther away. –  Eric Postpischil Mar 12 '13 at 0:57