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My code is below:

int main(int argc, char *argv[])
{

    double f = 18.40;
    printf("%d\n", (int)(10 * f));

    return 0;
}

The result is 184 in VC6.0, while the result in Codeblock is 183. Why?

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I just ran this on CodeBlocks and got 184 as the result. –  verbose Sep 3 '13 at 8:30
    
What compiler are you using with CodeBlock? –  mathk Sep 3 '13 at 8:43
    
@mathk my compiler is g++ –  Charles0429 Sep 3 '13 at 8:48
    
@mathk is there any difference between gcc and g++ when converting float to int? –  Charles0429 Sep 3 '13 at 8:49
    
Add 0.5 every times you need to round a double to an integer : (int)((10. * f)+0.5) will work with all compilers. –  Michael Sep 3 '13 at 9:03

4 Answers 4

up vote 2 down vote accepted

The reason for this is that GCC tries to make the code backward compatible with older architectures of the CPU as much as possible, while MSVC tries to take advantage of the newer futures of the architecture.

The code generated by MSVC multiplies the two numbers, 10.0 × 18.40:

.text:00401006 fld     ds:dbl_40D168
.text:0040100C fstp    [ebp+var_8]
.text:0040100F fld     ds:dbl_40D160
.text:00401015 fmul    [ebp+var_8]
.text:00401018 call    __ftol2_sse

and then call a function named __ftol2_sse, inside this function it converts the result to integer using some instruction named cvttsd2si:

.text:00401189 push    ebp
.text:0040118A mov     ebp, esp
.text:0040118C sub     esp, 8
.text:0040118F and     esp, 0FFFFFFF8h
.text:00401192 fstp    [esp+0Ch+var_C]
.text:00401195 cvttsd2si eax, [esp+0Ch+var_C]
.text:0040119A leave
.text:0040119B retn

This instruction, cvttsd2si, is according to this page:

Convert scalar double-precision floating-point value (with truncation) to signed doubleword of quadword integer (SSE2)

it basically converts the double into integer. This instruction is part of instruction set called SSE2 which is introduced with Intel Pentium 4.

GCC doesn't uses this instructions set by default and tries to do it with the available instructions from i386:

fldl   0x28(%esp)
fldl   0x403070
fmulp  %st,%st(1)
fnstcw 0x1e(%esp)
mov    0x1e(%esp),%ax
mov    $0xc,%ah
mov    %ax,0x1c(%esp)
fldcw  0x1c(%esp)
fistpl 0x18(%esp)
fldcw  0x1e(%esp)
mov    0x18(%esp),%eax
mov    %eax,0x4(%esp)
movl   $0x403068,(%esp)
call   0x401b44 <printf>
mov    $0x0,%eax

if you want GCC to use cvttsd2si you need to tell it to use the futures available from SSE2 by compiling with the flag -msse2, but also this means that some people who still using older computers won't be able to run this program. See here Intel 386 and AMD x86-64 Options for more options.

So after compiling with -msse2 it will use cvttsd2si to convert the result to 32 bit integer:

0x004013ac <+32>:    movsd  0x18(%esp),%xmm1
0x004013b2 <+38>:    movsd  0x403070,%xmm0
0x004013ba <+46>:    mulsd  %xmm1,%xmm0
0x004013be <+50>:    cvttsd2si %xmm0,%eax
0x004013c2 <+54>:    mov    %eax,0x4(%esp)
0x004013c6 <+58>:    movl   $0x403068,(%esp)
0x004013cd <+65>:    call   0x401b30 <printf>
0x004013d2 <+70>:    mov    $0x0,%eax

now both MSVC and GCC should give the same number:

> type test.c
#include <stdio.h>

int main(int argc, char *argv[])
{

    double f = 18.40;
    printf("%d\n", (int) (10.0  * f));

    return 0;
}
> gcc -Wall test.c -o gcctest.exe -msse2
> cl test.c /W3 /link /out:msvctest.exe
> gcctest.exe
184
> msvctest.exe
184
>
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Codeblocks compiler has probably something like 18.39999999999 as the floating point value. I think you should round if you want a consistent result.

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Could you tell what's the difference between codeblock and vc6.0?Does the float type not same in each compiler? –  Charles0429 Sep 3 '13 at 8:30
1  
It's based on the selected compiler. Code:Blocks supports probably every c compiler on this planet. I assume you have the default one which is g++. I'm not sure what it does with floating points but in general never (!) assume that two floating points are exactly the same even if the are calculated the same way. –  tea2code Sep 3 '13 at 8:33
    
is there any difference between gcc and g++ when converting float to int? –  Charles0429 Sep 3 '13 at 8:50
    
It is very bad practice to depend on the compiler for something like this. Please round your value. The best way to do this is descriped in this post: stackoverflow.com/questions/9695329/… –  tea2code Sep 3 '13 at 8:53

The point is, that 0.4 is 2/5 . Fractions with anything but a power of two in the denominator are not exactly representable in floating point numbers, much like 1/3 is not exactly representable as a decimal number. Thus, your compiler has to choose a nearby, representable number, with the result that 10*18.4 is not precisely 184, but 183.999...

Now, everything depends on the rounding mode employed when your float is converted to an integer. With round to nearest or round to infinity, you get 184, with round to zero or round to minus infinity you get 183.

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is there any difference between gcc and g++ when converting float to int? –  Charles0429 Sep 3 '13 at 8:50
    
@Charles0429 Sorry, I don't know about any compiler specifics, I only know about the details of the floating point format and the way floating point calculations are performed by the CPU. But, maybe someone else knows? –  cmaster Sep 3 '13 at 8:55
    
correct answer +1 :) round towards 0 and round towards - infinity should be true regardless of the cases . –  ROHIT Sep 3 '13 at 9:51
    
Assuming the compiler succeeded to constant-fold the computation here, it would be interesting to complicate the test program to the point where it would be forced to compute it at runtime. In particular, you could read the number 10 from stdin or a command line argument. –  Ambroz Bizjak Sep 3 '13 at 9:53
2  
This answer falsely states that “everything” depends on the rounding mode used when converting float to int. The rounding is fixed by the C standard; it is round-toward-zero. The result depends on the value obtained when the source text 18.4 is converted to floating-point and multiplied by 10. –  Eric Postpischil Sep 3 '13 at 10:22

Floating point calculations are implemented differently by different compilers and different architectures. Even the same compiler can have different modes of operation that will yield different results.

For example, if I take your program and my installation of gcc (MinGW, 4.6.2) and compile like this:

gcc main.c

then the output is, as your report, 183.

However, if I compile like this:

gcc main.c -ffloat-store

then the output is 184.

If you really want to understand the differences you need to specify precise compiler versions, and specify which options you are passing to the compiler.

More fundamentally, you should be aware that the value 18.4 cannot be represented exactly as a binary floating point value. The closest representable double precision value to 18.4 is:

18.39999 99999 99998 57891 45284 79799 62825 77514 64843 75

So I suspect that you are reasoning that the correct output from your program is 184. But I suspect that reasoning is flawed and fails to account for representability, rounding, etc. issues.

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