One important property of IEEE floating-point math that rounding causes "errors" in calculations due to the limited number of bits and the base-2 format.

E.g. in C#:

```
(Math.PI * 1e20 / 1e20) == Math.PI; // false
```

Is there a way to determine the magnitude of the error of those operations? .NET exposes the `Double.Epsilon`

field that give the smallest significant value greater than zero, but that's not relevant for comparing non-zero numbers.

EDIT: I'm not asking for a way to *exactly* compute the error, I'm just trying to find a way to estimate its magnitude.

For example (again, in C#):

```
(1e20 + 1e3) == 1e20; // true
(1e20 + 1e4) == 1e20; // false
```

So the error of the operation `1e20 + X`

appears to be approximately 1e3, which makes sense because `doubles`

have up to 17 digits of decimal precision.

xand you know that error ofxis0.1and you want to calculate10 * x, error of the result is10 * 0.1 = 1). Now in your updated question I see you just want get an approximate value of it, but I suppose just trying to calculate it can be considered. – Lukasz M Apr 17 '12 at 20:53