Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

RoundingMode allows the programmer to specify in what manner floating point numbers are to be rounded. This is great and all, but there is this one thing about it I found peculiar. Maybe I just misunderstood something fundamental at school.

But this rounding mode is described as the one I was taught at school, "Always round to the nearest number, and when dead in the center, always round up.", but why does it round -2.5 to -3?

I conclude as much that it rounds up in terms of absolute values, but -2 is, to me, certainly "up" from -2.5.

share|improve this question
Have a look at this question: stackoverflow.com/questions/269721/… –  Orin MacGregor Dec 21 '12 at 19:09
docs.oracle.com/javase/1.5.0/docs/api/java/math/… Take a look at this. This might help you to find the method you are looking for. –  Peter Rasmussen Dec 21 '12 at 19:10

2 Answers 2

RoundingMode.UP is the rounding mode for "away from zero." RoundingMode.FLOOR is towards negative infinity, and CEILING is towards positive infinity. HALF_UP is consistent with UP when the fractional part is exactly 0.5.

They had to choose some term to mean "away from zero."

share|improve this answer

The rationale is outlined in the JavaDocs for RoundingMode.HALF_UP.

Rounding mode to round towards "nearest neighbor" unless both neighbors are equidistant, in which case round up. Behaves as for RoundingMode.UP if the discarded fraction is >= 0.5; otherwise, behaves as for RoundingMode.DOWN. Note that this is the rounding mode commonly taught at school.

The Wikipedia article about Rounding methods makes a different claim:

For example, by this rule the value 23.5 gets rounded to 24, but −23.5 gets rounded to −23.

This is one of two rules generally taught in US elementary mathematics classes.

Though a citation has been requested.

share|improve this answer
The OP's real issue seems to be the misconception that RoundingMode.UP is meant to be interpreted as "towards positive infinity," which is not addressed in this answer currently. –  Louis Wasserman Dec 21 '12 at 19:36

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.