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My Problem:

Try to figure out the result of the following C++ snippet:

#include <iostream>

int main(int argc, char* argv[])
    double a = 5.1;
    int b = a * 100;
    std::cout << b << std::endl;

    double c = 6.1;
    int d = c * 100;
    std::cout << d << std::endl;

On Windows, I compiled and run the above code with VS2008 SP1 and get:


While on Linux, I compiled and run the same code with g++ and get:


What is the problem of the code?

Sorry I have tried to figure a title for the problem thus I could have searched around. However, I can't name this problem, so I directly present it here.

Any advice is appreciated.

share|improve this question
Only the billionth duplicate of this question... – Kerrek SB Sep 10 '12 at 14:20
I'm so glad this link is on the tag wiki: docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html – chris Sep 10 '12 at 14:21
509 610 on Windows, 509 609 on Linux. Does this finally proof Windows is better than Linux? – Henrik Sep 10 '12 at 14:23
@StephenCanon: That's not true. 5.1 is always 5.1. But a is not necessarily 5.1! – Kerrek SB Sep 10 '12 at 14:27
@KerrekSB: The number 5.1 is always 5.1. The double-precision literal 5.1 is not 5.1. – Stephen Canon Sep 10 '12 at 14:28
up vote 5 down vote accepted

double is not an exact type, as you can see by applying the std::numeric_limits typetrait:

#include <limits>

static_assert(std::numeric_limits<double>::is_exact == false);

Thus computations involving doubles are only approximate, and there is nothing wrong about what you observe.

There is no problem with your code.

share|improve this answer
Weird, I never knew that existed. Thanks for the proof tool. – chris Sep 10 '12 at 14:25
Then again, 3/2 isn't exact either. It's just inexact in the first fractional bit instead of the 53rd. – MSalters Sep 10 '12 at 14:30
This answer doesn't really explain the difference in behaviour for the two compilers / system, which seems to be at the heart of the question. double is not exact, yes, but it doesn't mean it is OK for it to behave differently when rounded. – J.N. Sep 10 '12 at 14:31
@J.N.: The problem isn't with the rounding. The problem is that we can't know the value of a, since it is only approximately 5.1, in an implementation-defined way. – Kerrek SB Sep 10 '12 at 14:32
@J.N. : It doesn't matter how big the loss of precision is, if it happens exactly at the edge value for rounding. In this case, the mathematical expression 5.1 * 100.0 has to be rounded to integer 510, but (5.1-ε) * 10.00 has to be rounded to 509 for ε>0 – MSalters Sep 10 '12 at 14:45

In general, with double (and float) being binary, you can only ever make precise representations of fractions of powers of 2. Thus, if the decimal part is only made up of terms like 1/2, 1/4, 1/8, 1/16 etc. a float or double will be exact (unless you run into precision problems, of course).

Now, "0.1" is 1/10, which is actually 1/2 * 1/5. 5 is not a power of two, thus "0.1" can't be represented in binary, it can only be approximated.

share|improve this answer
There exist decimal float types (which are implemented on binary hardware) which can represent 0.1 exactly. There's nothing inherently bad about binary. It just comes down to a matter of implementation. – Kerrek SB Sep 10 '12 at 14:31

double to int conversion is done by truncation unless otherwise specified. In your case, due to loss of precisions while rounding the numbers (and a small amount of bad luck as noted by MSalters since this only happens near some "edge" values).

Here are few possible reasons for the difference in behaviour between compilers/OS:

  • Optimizations: some compilers implement compile time floating operation with infinite precision. Since your code is simple it is possible for the compiler to do the computation at compile time with infinite precision. (Have you checked the generated ASM code ?)
  • Using different internal representation. Since you are running windows you are using an x86 or an x86-64 CPU that implements floating points with more than 64 bits see this for some details.
  • Use of a different architecture entirely (are both your OS 64 bit ?)
share|improve this answer

As one of the rules of The elements of programming styles by Kernighan and Plauger stated.

10.0 times 0.1 is hardly ever 1.0

Meaning that floats don't behave like mathematical real numbers. There is a standard (IEEE 754) how you can implement floats but its not part of the C standard but only in C#.

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