# Getting wrong answer in double arithmetic in Java [duplicate]

Possible Duplicate:
Double calculation producing odd result

I'm writing a program in Java that deals with a lot of double arithmetic. I eventually get to the point where I need to add 0.6666666666666666 and -0.666666666666667. However, the answer that I get is -3.3306690738754696E-16.

In other words,

``````double d1 = 0.6666666666666666;
double d2 = -0.666666666666667;
System.out.println(d1 + d2);
``````

prints out "-3.3306690738754696E-16". Why is this happening?

-

## marked as duplicate by Stephen C, Andrew Thompson, A--C, Hovercraft Full Of Eels, Daniel FischerJan 7 '13 at 0:31

You are limited by the `double` type. It does not store exact decimal fields, but is an IEEE 754 8-byte floating point number. –  fge Jan 6 '13 at 23:40
You are right, they are similar. Feel free to report the question as a duplicate. Sorry about that. –  fpele Jan 7 '13 at 0:02
–  Andrew Thompson Jan 7 '13 at 0:11

`double` values cannot represent all values precisely and this is such an example. You can use `BigDecimal` instead:

``````BigDecimal bd1 = new BigDecimal("0.6666666666666666");
BigDecimal bd2 = new BigDecimal("-0.666666666666667");
``````

Output:

``````-4E-16
``````
-
Interesting, I always thought of doubles as the ultimate solution for floating-point operations. Thanks a lot! –  fpele Jan 6 '13 at 23:49
@fpele `double` still is the ultimate solution for efficient floating point on current CPUs. `BigDecimal` is a fixed point type, not floating. –  us2012 Jan 7 '13 at 0:08
@us2012: Are you sure about that? It looks a lot like floating point to me. For example, the `scale` of a product is typically the sum of the scales of the multiplicands; with fixed point, I'd expect the result to have the same scale as the inputs. –  Mark Dickinson Jan 7 '13 at 15:19
@MarkDickinson You're right, I got the terminology mixed up. The point I was trying to make is that `BigDecimal` does not behave like we expect floating point numbers to behave. The right term is of course arbitrary precision, which comes at a huge performance cost, so that `double` still remains the best solution whenever you don't explicitly need arbitrary precision. –  us2012 Jan 7 '13 at 15:34
@us2012: True enough ... –  Mark Dickinson Jan 7 '13 at 15:45

`double`s are not perfectly accurate, and not every decimal can be perfectly represented as a `double` (see this). For all practical purposes, `-3.3306690738754696E-16` is `0` *. However, if you need more precision, use `BigDecimal`. Keep in mind that this alternative will not be nearly as efficient as using primitive `double`s. It's up to you to decide if you need this level of accuracy and to make a choice accordingly.

*: Evidently, that number is not exactly zero, but for the majority of real-world calculations and computations, a value that small would be inconsiderable. In meters, this value is smaller than the diameter of protons and neutrons - i.e. very very small. That's what I mean by "for all practical purposes".

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Just for educational purposes, could you explain why you say -3.3306690738754696E-16 is 0 for all practical purposes? How can that be? Thank you for your suggestion on BigDecimals –  fpele Jan 6 '13 at 23:51
@fpele: just how big do you think that -3.3306690738754696E-16 is? Have you looked double number representation? Are you familiar with scientific notation? Have you looked up anything at all? –  Hovercraft Full Of Eels Jan 6 '13 at 23:57
My bad, I thought the answer was E+16. No need to be rude though. –  fpele Jan 7 '13 at 0:00
@fpele: I'm just amazed, that's all. –  Hovercraft Full Of Eels Jan 7 '13 at 0:23