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In java following expression results into

new Double(1.0E22) + new Double(3.0E22)  = 4.0E22


new Double(1.0E22) + new Double(4.0E22)  = 4.9999999999999996E22

I was expecting it to be 5.0E22. The Double limit is 1.7976931348623157E308. Appreciate your help. My machine's architecture is x64 and JVM is also 64 bit.

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Take a look at the answer of this post: stackoverflow.com/questions/10786587/… –  Mik378 May 8 '13 at 13:25
1) new Double(1.0E22) + new Double(3.0E22) makes no sense since it's equivalent to 1.0E22 + 3.0E22 –  Evgeniy Dorofeev May 8 '13 at 13:30
The problem is that 5^23 has 54 significant bits, 0x2a5a058fc295ed, but double has only 53. So 5.0e22 gets rounded down to (5^23 - 1)*2^22. –  Daniel Fischer May 8 '13 at 16:55
@DanielFischer but double's max value is 1.7976931348623157E308. So i am safely within that range. Still why am i seeing the rounding off? –  Naman May 8 '13 at 17:24
@Mik378 Thanks, BigDecimal worked for me. –  Naman May 9 '13 at 5:47

2 Answers 2

up vote 4 down vote accepted

Welcome to the planet of floating point units. Unfortunately, in a real world, you have to give up some precision to get speed and breadth of representation. You cannot avoid that: double is only an approximate representation. Actually, you cannot represent a number but with finite precision. Still, it's a good approximation: less than 0.00000000001% error. This has nothing to do with double upper limits, rather with CPU limits, try doing some more math with Python:

>>> 4.9999999999999996 / 5.
>>> 5. - 4.9999999999999996

See? As a side note, never check for equality on double, use approximate equality:

if ((a - b) < EPSILON)

Where EPSILON is a very small value. Probably Java library has something more appropriate, but you get the idea.

If you are insterested in some theory, the standard for floating point operations is IEEE754

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There are a few ways that you can reduce floating point errors, e.g. pairwise summation and Kahan summation, but neither of these will help you precisely represent a number like 5.0E22 - as Stefano Sanfilippo stated in his answer, that's due to the limits of what you can represent in using floating point, as opposed to a problem with the algorithm used to achieve the answer. To represent 5.0E22 you should either use BigDecimal or else use a library that has a Rational data type, e.g. JScience.

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Thanks, used BigDecimal and worked perfectly. –  Naman May 9 '13 at 5:48

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