# Why does this simple division between 2 floats not work with java?

``````System.out.println((26.55f/3f));
``````

or

``````System.out.println((float)( (float)26.55 / (float)3.0 ));
``````

etc.

returns the result 8.849999. not 8.85 as it should.

Can anyone explain this or should we all avoid using floats?

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Duplicate of LOTS of questions. –  dan04 Apr 26 '10 at 14:10
So going by the answers below... Does this mean if Im doing math that represents, say money, or something where I need exactly the correct answer, that I would get by doing math by hand, I should use ints and insert the floating point at the end, or are doubles satisfactory for these situations? –  user323186 Apr 26 '10 at 14:35
@user323186: Never use binary floats for money, use a decimal type instead. As for "exactly the correct answer", that's actually not possible in many cases, and floats can be far more exact than ints for many. Do read the site I liked to. –  Michael Borgwardt Apr 26 '10 at 15:02
No, doubles will have the same problem as floats due to how binary floating point number encoding works. Either use ints and when you need to show it render it as a String with the point in the right place; or use Java's BigDecimal class. –  Nate Apr 26 '10 at 15:05
Yup Michaels link looks like the shortest most concise answer explaing the stiuation well. WD Michael –  user323186 Apr 27 '10 at 10:55

Q: Why don’t my numbers, like 0.1 + 0.2 add up to a nice round 0.3, and instead I get a weird result like 0.30000000000000004?

A: Because internally, computers use a format (binary floating-point) that cannot accurately represent a number like 0.1, 0.2 or 0.3 at all.

In-depth explanations at the linked-to site

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Take a look at Wikipedia's article on Floating Point, specifically the Accuracy Problems section.

The fact that floating-point numbers cannot precisely represent all real numbers, and that floating-point operations cannot precisely represent true arithmetic operations, leads to many surprising situations. This is related to the finite precision with which computers generally represent numbers.

The article features a couple examples that should provide more clarity.

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Explaining is easy: floating point is a binary format and so can only represent exactly values that are an integer multiple of `1.0 / (2 to the Nth power)` for some natural integer `N`. `26.55` does not have this property, therefore it cannot be represented exactly.

If you need exact representation (e.g. your code is about accounting and money, where every fraction of a cent matters), then you must indeed avoid floats in favor of other types that do guarantee exact representation of the values you need (depending on your application, for example, just doing all accounting in terms of integer numbers of cents might suffice). Floats (when used appropriately and advisedly!-) are perfectly fine for engineering and scientific computations, where the input values are never "infinitely precise" in any case and therefore the computationally cumbersome burden of exact representation is absolutely not worth carrying.

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@Michael: Floats will lead you down many winding paths; but the core of the issue is: They are slower than integral numbers, and they don't allow direct comparison (`==`). There are a lot of applications where they make sense, but often times; integral maths make as much sense (consider, if you will, engineering tasks where sizes are given as integral microns or mm). –  Williham Totland Apr 26 '10 at 14:14