# .NET Math.Round(<double>,<int>,MidpointRounding.AwayFromZero) not working correctly

I am using Visual Studio Professional 2012. I created a new C# ConsoleApplication, targeting .NET Framework 4.5, with following code:

``````    static void Main(string[] args)
{
double x = 2.44445;
double y = Math.Round(x, 4, MidpointRounding.AwayFromZero);
Console.WriteLine(y);
}
``````

The expected result should be 2.4445, but it actually returns 2.4444. //Same result with previous framework version, and I tried VCE2010.

I know such problem usually results from the way double data type is stored (i.e. finite decimals converted to infinite binary fraction). But I didn't expect this to happen with only 5 decimal digits like 2.44445

I'm worrying if such thing could happen with even shorter decimals. I would also like to learn a safer way to round (using away from zero convention) in C#. Thanks.

-
`Math.Round(new Decimal(2.44445), 4, MidpointRounding.AwayFromZero)` does give 2.4445. So using `Decimal` would an option to consider. –  Chrono Dec 27 '12 at 13:50

This is indeed due to the fragile precision of floating-point numbers. 0.5 can be stored perfectly in IEEE floating point, but 0.45, 0.445 etc. cannot. For example, the actual value that is stored when you specify 2.44445 is 11009049289107177/4503599627370496 which is 2.44449999999999989519494647... It should now be obvious why the number is rounded the way it is.

If you need to store fractional numbers precisely, consider using the `decimal` type instead.

-
Thanks. I just checked how decimal type is stored and am convinced it won't incur the problem as with floating binary. –  limilaw Dec 27 '12 at 14:51

Because of the loss of precision that can result from representing decimal values as floating-point numbers or performing arithmetic operations on floating-point values, in some cases the Round(Double, Int32, MidpointRounding) method may not appear to round midpoint values as specified by the mode parameter. This is illustrated in the following example, where 2.135 is rounded to 2.13 instead of 2.14. This occurs because internally the method multiplies value by 10digits, and the multiplication operation in this case suffers from a loss of precision.

This is how Round implemented:

``````double num = roundPower10Double[digits];
value *= num;
if (mode == MidpointRounding.AwayFromZero)
{
double num2 = SplitFractionDouble(&value);
if (Abs(num2) >= 0.5)
{
value += Sign(num2);
}
}
``````

As you can see, value is multiplied by num, which is a value from

``````roundPower10Double = new double[] { 1.0, 10.0, 100.0, 1000.0, 10000.0,
100000.0, 1000000.0, 10000000.0, 100000000.0, 1000000000.0, 10000000000,
100000000000, 1000000000000, 10000000000000, 100000000000000, 1E+15 };
``````

So, actually you have `2.44445 * 10000.0 - 24444,0` which gives `0,499999999996362`. Which is less than `0.5`. Thus you have `2.4444`.

-
Now I see. Thanks. –  limilaw Dec 27 '12 at 14:24
It also amazed me that .NET does 3.44445 right, when 2.44445D and 3.44445D has only 1 bit difference. Seems dangerous to play with multiplication on double :) –  limilaw Dec 28 '12 at 4:26
@limilaw It's not .NET that's getting it right/wrong. It's IEEE. This Web page lets you see the internal representation of IEEE floating point values. And it's not actually right/wrong; you are erroneously expecting exact decimal precision from a binary floating point format. (Imagine an alien with three fingers who says, "Stupid decimal humans. I ask them for 1/3 and they come back with this inexact value. 0.3333333") –  Raymond Chen Dec 31 '12 at 16:49