This question is about the threshold at which `Math.Floor(double)`

and `Math.Ceiling(double)`

decide to give you the previous or next integer value. I was disturbed to find that the threshold seems to have nothing to do with `Double.Epsilon`

, which is the smallest value that can be represented with a double. For example:

```
double x = 3.0;
Console.WriteLine( Math.Floor( x - Double.Epsilon ) ); // expected 2, got 3
Console.WriteLine( Math.Ceiling( x + Double.Epsilon) ); // expected 4, got 3
```

Even multiplying `Double.Epsilon`

by a fair bit didn't do the trick:

```
Console.WriteLine( Math.Floor( x - Double.Epsilon*1000 ) ); // expected 2, got 3
Console.WriteLine( Math.Ceiling( x + Double.Epsilon*1000) ); // expected 4, got 3
```

With some experimentation, I was able to determine that the threshold is somewhere around 2.2E-16, which is very small, but VASTLY bigger than `Double.Epsilon`

.

The reason this question came up is that I was trying to calculate the number of digits in a number with the formula `var digits = Math.Floor( Math.Log( n, 10 ) ) + 1`

. This formula doesn't work for `n=1000`

(which I stumbled on completely by accident) because `Math.Log( 1000, 10 )`

returns a number that's 4.44E-16 off its actual value. (I later found that the built-in `Math.Log10(double)`

provides much more accurate results.)

Shouldn't the threshold should be tied to `Double.Epsilon`

or, if not, shouldn't the threshold be documented (I couldn't find any mention of this in the official MSDN documentation)?