digits after decimal point for double variables/calculations in C++ [duplicate]

Possible Duplicate:
Writing numbers to a file with more precision - C++

While storing latitude/longitude values as `double`, I keep ending up with variables that contain trimmed numbers -e.g. 47.2792 for 47.279229 and 8.42432 for 8.424317- What is the best way to make the variables hold all the digits without loss during both variable assignments and performing arithmetic operations -e.g. adding 0.01098901098 to 47.279229 and storing it as a new variable without any precision loss etc.-? `setprecision` handles this for streams but I have yet to find a way that will serve as its variable/math counterpart.

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specifying the programming language would help... –  Mircea D. Oct 2 '12 at 19:20
@MirceaD. oh, forgot that one. fixing now. –  sm90901 Oct 2 '12 at 19:21
@sm90901 - yes, because the default precision is 6 digits. If you want to see more (using `cout`), use `setprecision`. I don't know how to persuade the debugger to show more digits, but it's doing the same thing: rounding to 6 digits. That doesn't mean the `double` value itself only holds 6 digits. Its precision doesn't change. –  Pete Becker Oct 2 '12 at 19:38
`setprecision` to what? And which debugger? The reason I am asking is that I've seen double arithmetics produce way more digits, but never fewer. If you have precision problems, I'd expect the result to look like 47.279219899999999 rather than 47.27922 –  Arkadiy Oct 2 '12 at 19:39
There! So the digits are actually correct, it's just the debugger that's wrong. The right question to ask is "How do I set the precision that VS2010 uses to display 'double' type?" –  Arkadiy Oct 2 '12 at 19:43

marked as duplicate by Bo Persson, Daniel Fischer, WATTO Studios, Vikdor, Jon LinOct 3 '12 at 3:52

The type `double` is internally [normally] stored as a binary floating point. In general, decimal values cannot represent exactly using binary floating point values although the original decimal values can often be restored exactly (with the exception of the right number of trailing zeros). When doing computations values close to the original values are manipulated, thereby introducing additional errors. The result of converting decimal fractional numbers to `double`, computing with these values, and converting them back will yield values close to the expected outcome but it won't be exact.