# Subtracting a very small number from a float

The smallest number that differentiates two `float` values is `FLT_EPSILON`, which is defined as:

``````#define FLT_EPSILON 1.19209290E-07F // decimal constant
``````

(Yes I am aware of this: https://frama-c.com/2013/05/09/Definition-of-FLT_EPSILON.html)

However, upon subtracting a very small number (1e-12) from a zero, I would expect the resulting number to be zero, also considering it is less than half way mark of `FLT_EPSILON`.

However, the following program outputs:

Value of EPSILONF: -0.000000000001000

``````#include <stdio.h>

#define EPSILONF static_cast<float>(1e-12)

int main() {
printf("Value of EPSILONF: %.15f\n", float(0.0f-EPSILONF));
return 0;
}
``````

What am I missing here?

• `FLOAT_EPSILON` is actually defines as the difference between 1.0 and the smallest number greater than 1.0 that is representable by a `float`. When dealing with numbers smaller than one, they can have a difference that is considerably less than FLOAT_EPSILON Commented Jul 23 at 23:17
• `%f` is format specifier for `double` type, not for `float`. I'm not sure if there exists any specifier for `float`... Commented Jul 23 at 23:19
• @Yksisarvinen there isn't one. A `float` gets converted to a `double` in a variadic parameter list (same with `std::ostream::operator<<(float)`, for that matter). Commented Jul 23 at 23:19
• @SKPS As you get closer to 0 the epsilon gets smaller, that’s how floating point works. Check Wikipedia for an overview. Picture floating point like the binary version of writing a number in scientific notation and then truncating the multiplier so you’re only taking N sig figs. Commented Jul 23 at 23:25
• Might be useful: std::nextafter returns the next representable floating-point value after the floating-point value given as its first argument. The second argument specifies the direction to go (up or down). Commented Jul 24 at 3:17

The smallest number that differentiates two float values is `FLT_EPSILON`
What you are missing is that this isn't what `FLT_EPSILON` is. `FLT_EPSILON` is the difference between 1.0 and the next representable number greater than 1.0.
Once the absolute value gets close to 0 you get into the range of subnormal numbers (see page 19), where the differences between two consecutive representable numbers are significantly smaller than `FLT_EPSILON`.
The difference (effectively) between 0.0 and the next greatest representable number is `FLT_MIN`. For a 32-bit IEEE floating-point it's 2-149.
Btw, for `double`s, the constants are `DBL_EPSILON` and `DBL_MIN`.