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In the lunch break we started debatting about the precision of the double value type.

My collegue thinks, it has always 15 places after the decimal point.

In my opinion one can't tell, because IEEE 754 does not make assumptions about this and it depends on where the first 1 is in the binary representation. (i.e. the size of the number before the decimal point counts, too)

How to make a more qualified statement?

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Are you reasoning in absolute terms or according to scientific notation? How would you consider a number such as 0.001e5 ? –  Nicola Musatti Aug 23 '12 at 11:21
    
We were talking exactly about that. My collegue insists on having 15 places after the decimal point. My opinion is that you have a 53 bit mantissa for all places. But there seem to be difficulties to explain that in a qualified way. –  Mare Infinitus Aug 23 '12 at 11:26
    
Just to make it more clear: This is especially a C# issue. If the internal C# representation is not IEEE 754 but 15 places after the decimal point, this is extremly interesting. –  Mare Infinitus Aug 23 '12 at 11:41
    
The internal representation of C# doubles is indeed IEEE 754, or rather IEC 60559 which is the corresponding international standard. –  Nicola Musatti Aug 23 '12 at 12:04

3 Answers 3

up vote 2 down vote accepted

As stated by the C# reference, the precision is from 15 to 16 digits (depending on the decimal values represented). Precision meaning the number of decimal digits a value can hold (regardless of the position).

In short, you are right, it depends on the values before the decimal point.

For example:

  • 12345678.1234567D //Next digit to the right will get rounded up
  • 1234567.12345678D //Next digit to the right will get rounded up

Full sample at: http://ideone.com/eXvz3

Also, it is important to note that thinking double values as they are decimal values is not a good idea.

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Just to point it out, this means 15 digits in total, not just after the decimal point. –  Joachim Isaksson Aug 23 '12 at 10:53

You're both wrong. A normal double has 53 bits of precision. That's roughly equivalent to 16 decimal digits, but thinking of double values as though they were decimals leads to no end of confusion, and is best avoided.

That said, you are much closer to correct than your colleague--the precision is relative to the value being represented; sufficiently large doubles have no fractional digits of precision.

For example, the next double larger than 4503599627370496.0 is 4503599627370497.0.

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C# doubles are represented according to IEEE 754 with a 53 bit significand p (or mantissa) and a 11 bit exponent e, which has a range between -1022 and 1023. Their value is therefore

p * 2^e

The significand always has one digit before the decimal point, so the precision of its fractional part is fixed. On the other hand the number of digits after the decimal point in a double depends also on its exponent; numbers whose exponent exceeds the number of digits in the fractional part of the significand do not have a fractional part themselves.

What Every Computer Scientist Should Know About Floating-Point Arithmetic is probably the most widely recognized publication on this subject.

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