Floating point errors in C++

I need to have some float divisions that must be accurate like double version of them. I can change divided value - it represents a mapping and I can offset it - to correct eventual floating point errors.

To correct the errors, I use fallowing code:

``````do
{
float fValue = float(x) / 1024.f;
double oldFValue = fValue;
double dValue = double(x) / 1024.0;
if(oldFValue != dValue)
{
x += 1;
}
else
{
break;
}
}while(1);
``````

With this code, for

``````x = 11
``````

I have in debugger (Visual Studio 2010):

``````fValue = 0.010742188
oldFValue = 0.010742187500000000
``````

Can you please explain why douable value is different from float value? Is this a debugger problem or a floating point conversion problem? I'm asking this because:

``````if(oldFValue != dValue)
``````

is never true, even it should be. May I compare float value with double value in other way? I need the result of float division to be exact the same as double division.

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With fixed decimal digit precision, `1/3 * 3` won't be equal to `1` (it'll be .9999999). That's just how limited precision arithmetic works. –  David Schwartz Feb 5 '12 at 11:16

How much do you know about single precision float?

It's stored as `<sign><exponent><mantis>`. You can write the final number as:

``````(sign ? 1 : -1) * 0.1<mantis> * 2^(expontent - 127)
``````

As you can see number is ALWAYS stored as number `>1` and as a binary fraction. Unfortunately some numbers such as `0.1 dec` are periodic in binary so you won't get exact result with float.

You may try using this: `if(oldFValue != (float)dValue)` and if it won't work you can also try:

``````if(oldFValue*32 != (float)dValue*32)
``````

This will cause:

``````mantis >> 5
expontent += 5
``````

Which may eliminate your error (try 1 (weird, but may work in some cases), 2, 4, 8, 16..., 2^n).

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11 / 1024 is exactly representable in both `float` and `double`. So of course `oldFValue == dValue`.

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But why my debugger is showing different values? fValue = 0.010742188 oldFValue = 0.010742187500000000 –  Felics Feb 5 '12 at 11:57
@Felics Apparently it's rounding float to 8 significant places and displaying double with higher resolution. Enter `(doube)fValue` in the watch window and you wil see the exact value. –  Henrik Feb 5 '12 at 12:25

The problem with floating point is that there are infinite number of rational numbers at any non singleton range. However, you only got finite number of bits to represent your floating point number.

Thus - floating points numbers are not real/rational numbers - and behave differently. You should expect it to be not exactly as a real number would have behaved.

For this reason you should never check equality of floating points using `operator==`. you should calculate the `delta=abs(num1-num2)`, and check if it is smaller then some value you can tolerate its error.

As @Johnsyweb said, reading and understanding the attached article is important to handle floating points correctly.

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