I use the two following C++ compilers:

  • cl.exe : Microsoft (R) C/C++ Optimizing Compiler Version 19.00.24210 for x86
  • g++ : g++ (Ubuntu 5.2.1-22ubuntu2) 5.2.1 20151010

When using the built-in sine function, I get different results. This is not critical, but sometimes results are too significants for my use. Here is an example with a 'hard-coded' value:

printf("%f\n", sin(5451939907183506432.0));

Result with cl.exe:

0.528463

Result with g++:

0.522491

I know that g++'s result is more accurate and that I could use an additional library to get this same result, but that's not my point here. I would really understand what happens here: why is cl.exe that wrong?

Funny thing, if I apply a modulo of (2 * pi) on the param, then I get the same result than g++...

[EDIT] Just because my example looks crazy for some of you: this is a part of a pseudorandom number generator. It is not important to know if the result of the sine is accurate or not: we just need it to give some result.

  • 14
    A peek at the x86 instruction set locates the FSIN and FCOS math instructions, implemented in hardware, so you'd expect the results to be compiler-independent. Maybe it is known that FSIN/FCOS is inaccurate with large values, and gcc goes the extra mile, and manully applies the modulo before executing FSIN/FCOS. – Sam Varshavchik Oct 12 '17 at 13:55
  • 14
    Keep in mine that sin(x+2pi) is equal to sin(x). In practice, this means that the argument to sin gets pre-scaled in the sin function so that it is in the range [0..2pi). The larger the argument is, the less significance there are in the low bits. Extracting the low bits by pre-scaling loses precision as the argument gets larger. Essentially, when you try to calculate the sin of an argument that big, the result is nonsense. The function is trying to calculate the sin of noise. Garbage in, garbage out. – Pete Becker Oct 12 '17 at 14:07
  • 19
    What compiler switches are you passing in each case? Do you have optimizations enabled? The precision is controllable with options. The x87 FSIN and FCOS instructions are a red herring here. They aren't used by modern compilers, having been replaced by SSE2 instructions. With GCC, even with optimizations disabled, it computes this at compile time and spits out the result as a literal. MSVC won't. – Cody Gray Oct 12 '17 at 14:12
  • 9
    Using sin this way for random generator is a very bad idea. Don't do it. – geza Oct 12 '17 at 14:57
  • 19
    On two occasions I have been asked, "Pray, Mr. Babbage, if you put into the machine wrong figures, will the right answers come out?" ... I am not able rightly to apprehend the kind of confusion of ideas that could provoke such a question. – Charles Babbage – Arne Vogel Oct 12 '17 at 15:41
up vote 16 down vote accepted

I think Sam's comment is closest to the mark. Whereas you're using a recentish version of GCC/glibc, which implements sin() in software (calculated at compile time for the literal in question), cl.exe for x86 likely uses the fsin instruction. The latter can be very imprecise, as described in the Random ASCII blog post, "Intel Underestimates Error Bounds by 1.3 quintillion".

Part of the problem with your example in particular is that Intel uses an imprecise approximation of pi when doing range reduction:

When doing range reduction from double-precision (53-bit mantissa) pi the results will have about 13 bits of precision (66 minus 53), for an error of up to 2^40 ULPs (53 minus 13).

  • 3
    I also think it's very relevant that in gcc the compiler is doing this calculation and with cl, it's being done at runtime by the code. I know gcc has gone to a lot of effort to make sure that the compiler gets exactly the same answers as the code it generates. But that has forced them to think carefully about issues like this, and I suspect cl has not done the same thing. – Omnifarious Oct 12 '17 at 19:04
  • 1
    Is the precision requirement underlying that blog post even "fair"? For comparison, assume we work with floating points having three significant digits. Then pi is represented by "3.14E0", but so is any number between 3.135 and 3.145, so that any output between "-3.40E-3" and "+6.59E-3" (including "0") would be the nearest representable value of sin(x) for some x whose nearest representable value is "3.14". Demanding that the output of sin(3.14) has to be "1.59E-3" appears unpractical to me ... – Hagen von Eitzen Oct 12 '17 at 21:11
  • 7
    "cl.exe for x86 likely uses the fsin instruction" This seems to be a very popular theory, but it's absolutely wrong. Unless you explicitly pass the /arch:IA32 switch to disable SSE2 support, the 32-bit version of MSVC assumes SSE2 support is available and generates SSE2 instructions. It has done this for many versions now. In particular, for sin, it calls its library function ___libm_sse2_sin or __libm_sse2_sin_precise, depending on whether you have set /fp:fast or /fp:precise (the latter is the default). None of these use FSIN (nor FCOS nor FSINCOS). – Cody Gray Oct 12 '17 at 23:03
  • 1
    @Cody Gray: I just tested this on a 32-bit Windows 2003 system with Windows SDK 7.0 (cl.exe version 15.00.30729.01 for 80x86). sin() and fsin both give exactly the same answer that Nicolas posted in the original question. – SloopJon Oct 13 '17 at 18:14
  • 2
    @SloopJon Version 15 of the compiler is not what I'd call a "modern" version. That was shipped with VS 2008, nearly 10 years old by now. VS 2012 (cl.exe version 17) is the version that introduced the change of which I speak, targeting SSE2 as the minimum supported instruction set even on 32-bit builds. Note that the asker is using version 19, so he's getting /arch:SSE2 set by default for x86-32 builds unless he's specifically disabling it with /arch:IA32. That's why I asked about compiler switches originally. – Cody Gray Oct 13 '17 at 18:22

You have a 19-digit literal, but double usually has 15-17 digit precision. As a result, you can get a small relative error (when converting to double), but big enough (in the context of sine calculation) absolute error.

Actually, different implementations of the standard library have differences in treating such large numbers. For example, in my environment, if we execute

std::cout << std::fixed << 5451939907183506432.0;

g++ result would be 5451939907183506432.000000
cl result would be 5451939907183506400.000000

The difference is because versions of cl earlier than 19 have a formatting algorithm that uses only a limited number of digits and fills the remaining decimal places with zero.

Furthermore, let's look at this code:

double a[1000];
for (int i = 0; i < 1000; ++i) {
    a[i] = sin(5451939907183506432.0);
}
double d = sin(5451939907183506432.0);
cout << a[500] << endl;
cout << d << endl; 

When executed with my x86 VC++ compiler the output is:

0.522491
0.528463

It appears that when filling the array sin is compiled to the call of __vdecl_sin2, and when there is a single operation, it is compiled to the call of __libm_sse2_sin_precise (with /fp:precise).

In my opinion, your number is too large for sin calculation to expect the same behavior from different compilers and to expect the correct behavior in general.

  • 4
    I would have thought that the compilers would produce the exact same bit pattern from interpreting this literal, which then wouldn't explain the difference in results. – SirGuy Oct 12 '17 at 14:01
  • 2
    @SirGuy Probably this is unspecified by the standard, and works subject to current rounding settings and compiler flags. – lisyarus Oct 12 '17 at 14:54
  • @SirGuy, Yes, that's true. They have same binary value. – DAle Oct 12 '17 at 15:06
  • 3
    This is because libstdc++ tries to display the value as it is represented (i.e. it will be n.000000 where n is rounded to some power of 2). MSVCRT, on the other hand, will just display zeroes at the end. The GNU implementation is arguably more accurate, but for practical purposes these are non-signficant digits in any case and cannot be relied on. – Arne Vogel Oct 12 '17 at 15:38
  • What effect does the std::fixed have on the value itself? – Ron Oct 12 '17 at 15:39

According to cppreference:

The result may have little or no significance if the magnitude of arg is large (until C++11)

It's possible that this is the cause of the problem, in which case you will want to manually do the modulo so that arg is not large.

  • 1
    I don't think that manually doing the modulo is going to help. – Joshua Oct 12 '17 at 20:30
  • 2
    @Joshua why not? If one compiler does the modulo and the other does not that could explain the difference in results – SirGuy Oct 12 '17 at 21:04
  • Because the x86 processor does the wrong thing for long double sine function even below the modulus. What you're really testing for is which libc is correcting this fault better. – Joshua Oct 13 '17 at 3:47
  • 1
    @joshua what's the wrong thing that it does even below the modulus? Are you referring to SloopJohn's answer and the linked-to article? – SirGuy Oct 13 '17 at 12:29
  • Yup that's the problem. Boo Intel. – Joshua Oct 13 '17 at 15:10

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