# Can 12.1 be represented exactly as a floating point number?

This is in reference to the comments in this question:

This code in Java produces 12.100000000000001 and this is using 64-bit doubles which can present 12.1 exactly. – Pyrolistical

Is this true? I felt that since a floating point number is represented as a sum of powers of two, you cannot represent 12.1 exactly, no matter how many bits you have. However, when I implemented both the algorithms and printed the results of calling them with (12.1, 3) with many significant digits, I get, for his and mine respectively:

12.10000000000000000000000000000000000000000000000000000000000000000000000000 12.10000000000000100000000000000000000000000000000000000000000000000000000000

I printed this using `String.format("%76f")`. I know that's more zeros than necessary, but I don't see any rounding in the 12.1 .

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Could you please post the code that prints those two numbers, because I have to say that I believe the other comments that say you can't represent 12.1 exactly, and the number of digits you are printing to should show just over or just under at some point. If doubles have 53 bits of mantissa, then you would expect to see variation from exact arouns the 14th significant figure. –  Tony van der Peet Dec 15 '09 at 0:04
It's the top two answers in that question - I didn't want to repeat myself here. –  Claudiu Dec 15 '09 at 0:15
what if you both use `strictfp` and compare the result again? in that case the result should be VM independent. (I'm not claiming without `strictfp` the language spec allow different results. don't know don't care. floats are meant to be for imprecise values anyway) –  irreputable Dec 15 '09 at 0:23
I think the correct answer for the way your question is currently set is here stackoverflow.com/questions/1904321/… . Do you mean can you represent 12.1 exactly in a java `double`? –  Pool Dec 15 '09 at 1:07
I looked at that question, and didn't see any code that prints numbers, just code that calculates numbers. –  Tony van der Peet Dec 15 '09 at 9:16

No. As others noted in followups to his comment, no sum of (a finite number of) powers of two can ever add up to exactly 12.1. Just like you can't represent 1/3 exactly in base ten, no matter how many digits you use after the decimal point.

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How come the numbers printed are so exact then? The 1st answer is definitely more precise than the 2nd. –  Claudiu Dec 15 '09 at 0:10
heh also the 'others' following up were me =P. –  Claudiu Dec 15 '09 at 0:11
@Claudio - from what I can make out, you are rounding a `double` approximation of 12.1 to a number that ... when converted back to decimal ... is very close to 12.1. That's not surprising. –  Stephen C Dec 15 '09 at 0:22
@Claudio - in the case where the resulting decimal number appears to be exactly 12.1, this is definitely an artefact of the library routine you are using to convert a `double` to a decimal string. It is rounding to a "human friendly" version of the number rather than displaying the mathematically closest decimal number to the `double` you have provided. –  Stephen C Dec 15 '09 at 0:25

In binary, 12.1 is:

``````1100.000110011001100110011...
``````

Since this doesn't terminate, it can't be represented exactly in the 53 significand bits of a double, or any other finite-width binary floating-point type.

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Try to express 0.1 in binary:
0.5 is too big
0.25 is too big
0.125 is too big
0.0625 fits, and leaves a remainder of 0.0375
0.03125 fits, and leaves a remainder of 0.00625
0.015625 is too big
0.0078125 is too big
0.00390625 fits, and leaves a remainder of 0.00234375
0.001953125 fits, and leaves a remainder of 0.000390625

It's going to keep repeating indefinitely, creating a base 2 value of 0.00011001100...

No, it can't be expressed exactly in a double. If Java supports BCD, or fixed point decimal, that would work exactly.

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Java does support decimals, see java.math.BigDecimal. –  Keith Randall Dec 15 '09 at 0:08

Not in binary, no. If you'll allow me to be fanciful, you could in "floating point binary coded decimal" (which, to the best of my knowledge, has never been implemented):

``````12.1 = 0000 . 0001 0010 0001 * (10^2)
``````

In binary all non-zero values are of the form `1.xyz * m`, and IEEE form takes advantage of this to omit the leading 1. I'm not sure what the equivalent is for FP-BCD, so I've gone for values of the form `0.xyz * m` instead.

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Correct, and well done for thinking outside the box. –  Pool Dec 15 '09 at 0:13
'"floating point binary coded decimal" (which, to the best of my knowledge, has never been implemented)' -- oops, you need to read your history. It was implemented around 50 years ago. –  Windows programmer Dec 15 '09 at 0:24
P.S. That is, it was implemented in hardware around 50 years ago, though it was also implemented in software before and after that. –  Windows programmer Dec 15 '09 at 0:25
That is interesting and in hindsight not surprising. What I said was still correct, though: "to the best of my knowledge" etc. ;-) –  Edmund Dec 15 '09 at 2:30
Actually the IEEE 754 floating point standard defines decimal floating point formats in densely packed decimal (10 bits = 3 digits). I've not seen those in the wild, though. en.wikipedia.org/wiki/IEEE_754-2008#Basic_formats –  starblue Dec 16 '09 at 8:13

I suggest reading What Every Computer Scientist Should Know About Floating Point Arithmetic. Then you'll know for sure. :)

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everything java programmers should know about floats: they are not precise:) that's good enough for me. –  irreputable Dec 15 '09 at 0:38

A way to see what the double is fairly exactly is to convert it to BigDecimal.

``````// prints 12.0999999999999996447286321199499070644378662109375
System.out.println(new BigDecimal(12.1));
``````
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