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I write this short program to test the conversion from double to int:

int main() {
    int a;
    int d; 
    double b = 0.41;

    /* Cast from variable. */
    double c = b * 100.0;
    a = (int)(c);

    /* Cast expression directly. */
    d = (int)(b * 100.0);

    printf("c = %f \n", c);
    printf("a = %d \n", a);
    printf("d = %d \n", d);

    return 0;


c = 41.000000 
a = 41 
d = 40 

Why do a and d have different values even though they are both the product of b and 100?

share|improve this question
9 – Carl Norum Jun 20 '13 at 18:13
Side note: a = (int)(c); There is no need to the parenthesis around c. – Maroun Maroun Jun 20 '13 at 18:14
@MarounMaroun Nor is there any need for the explicit cast. – user529758 Jun 20 '13 at 18:15
@ZiyaoWei That's what we call an "implementation detail". – user529758 Jun 20 '13 at 18:16
d = (int)(b * 100.000); is apparently computed at greater precision than that of double (that's allowed), resulting in a value slightly smaller than 41. When that's stored as a double, it becomes exactly 41.0. – Daniel Fischer Jun 20 '13 at 18:17
up vote 17 down vote accepted

The C standard allows a C implementation to compute floating-point operations with more precision than the nominal type. For example, the Intel 80-bit floating-point format may be used when the type in the source code is double, for the IEEE-754 64-bit format. In this case, the behavior can be completely explained by assuming the C implementation uses long double (80 bit) whenever it can and converts to double when the C standard requires it.

I conjecture what happens in this case is:

  • In double b = 0.41;, 0.41 is converted to double and stored in b. The conversion results in a value slightly less than .41.
  • In double c = b * 100.0000;, b * 100.0000 is evaluated in long double. This produces a value slightly less than 41.
  • That expression is used to initialize c. The C standard requires that it be converted to double at this point. Because the value is so close to 41, the conversion produces exactly 41. So c is 41.
  • a = (int)(c); produces 41, as normal.
  • In d = (int)(b * 100.000);, we have the same multiplication as before. The value is the same as before, something slightly less than 41. However, this value is not assigned to or used to intialize a double, so no conversion to double occurs. Instead, it is converted to int. Since the value is slightly less than 41, the conversion produces 40.
share|improve this answer
I'd say this is exactly as ugly as usual. The value 0.41 cannot be represented exactly in binary floating-point; the stored value will be either slightly less than or slightly greater than the mathematical value. Details about double vs. long double and storing extra precision might affect the results in this particular case, but in general you can't necessarily expect 0.41 multiplied by 100 and converted to int to yield 41, whatever else you do. – Keith Thompson Jun 20 '13 at 18:36
C says this: (C99, 6.3.1.p8) "The values of floating operands and of the results of floating expressions may be represented in greater precision and range than that required by the type;" – ouah Jun 20 '13 at 18:37
@KeithThompson, the rules employed by IEEE arithmetic should give reproducible results even when rounding is occurring. It doesn't matter if 0.41 gets rounded down if the multiplication rounds it back up again. – Mark Ransom Jun 20 '13 at 18:39
Eric, since we have d = (int)(b * 100.000);, it is to be expected that it uses the double value of 0.41. Multiply that with 100.0L and you're likely to get something like 40.9999999999999975575093458246556110680103302001953125. – Daniel Fischer Jun 20 '13 at 18:51
@DanielFischer: Yes, I believe I figured it out. The behavior is completely explained by the compiler using long double whenever it can and converting to double when compelled by the C standard. I have updated the answer accordingly. – Eric Postpischil Jun 20 '13 at 18:54

The crux of the problem is that 0.41 is not exactly representable in IEEE 754 64-bit binary floating point. The actual value (with only enough precision to show the relevant part) is 0.409999999999999975575..., while 100 can be represented exactly. Multiplying these together should yield 40.9999999999999975575..., which is again not quite representable. In the likely case that the rounding mode is towards nearest, zero, or negative infinity, this should be rounded to 40.9999999999999964.... When cast to an int, this is rounded to 40.

The compiler is allowed to do calculations with higher precision, however, and in particular may replace the multiplication in the assignment of c with a direct store of the computed value.

Edit: I miscalculated the largest representable number less than 41, the correct value is approximately 40.99999999999999289.... As both Eric Postpischil and Daniel Fischer correctly point out, even the value calculated as a double should be rounded to 41 unless the rounding mode is towards zero or negative infinity. Do you know what the rounding mode is? It makes a difference, as this code sample shows:

#include <stdio.h>
#include <fenv.h>

int main(void)
    int roundMode = fegetround( );

    volatile double d1;
    volatile double d2;
    volatile double result;
    volatile int rounded;


    d1 = 0.41;
    d2 = 100;
    result = d1 * d2;
    rounded = result;

    printf("nearest rounded=%i\n", rounded);


    d1 = 0.41;
    d2 = 100;
    result = d1 * d2;
    rounded = result;

    printf("zero rounded=%i\n", rounded);


    return 0;


nearest rounded=41
zero rounded=40
share|improve this answer

The compiler can infer that c has to be initialized with 0.41 * 100.0 and does that better than the calculation of d.

share|improve this answer
When computed as IEEE754 doubles, 0.41 * 100 is exactly 41. – Daniel Fischer Jun 20 '13 at 18:20
Yes, floating point has odd behaviour. The compiler however also evaluates constants and generates double c = 41.0; by smart data flow analysis. – Joop Eggen Jun 20 '13 at 18:20
Confused - but then why d is 40? – Ziyao Wei Jun 20 '13 at 18:21
@JoopEggen Of course 0.41 cannot be exactly represented as a binary floating point number. But 0.409999999999999975575093458246556110680103302001953125 times 100, rounded to 53 significant bits yields exactly 41.0. – Daniel Fischer Jun 20 '13 at 18:29
@DanielFischer one thing learned/confirmed outweights -100 points on SO. I would guess too, that compiler options might be set or some other thing. – Joop Eggen Jun 20 '13 at 18:44

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