# float/double Math.Round in C# [duplicate]

``````float ff = (float)31.15;

double dd = 31.15;

var frst = Math.Round(ff, 1, MidpointRounding.AwayFromZero);

var drst = Math.Round(dd, 1, MidpointRounding.AwayFromZero);
``````

frst: 31.1

drst: 31.2

Can someone explain why?

• Because `(float)31.15` is not equal to `(double)31.15`. Floating-point-arithmetic allmost allways yields to rounding-erros. In paticular rounding a double works different from rounding a float. – HimBromBeere Jan 17 '19 at 12:26
• Rounding errors are unavoidable with floating point values. They are as unavoidable as death and taxes : youtube.com/watch?v=PZRI1IfStY0 – Christopher Jan 17 '19 at 12:31
• @i486 Well, not always, there is a reason why `float` exists. – SᴇM Jan 17 '19 at 12:33
• @i486 Again, that doesn't mean, that you should never use `float`. – SᴇM Jan 17 '19 at 13:29
• Where are the C# gold badges? IMHO this should have been closed as dup in the first 17s, not 5 hours after! – YSC Jan 17 '19 at 17:47

Well, `Math.Round` wants `double`, not `float`, that's why

``````Math.Round(ff, 1, MidpointRounding.AwayFromZero);
``````

equals to

``````Math.Round((double)ff, 1, MidpointRounding.AwayFromZero);
``````

and if we inspect `(double)ff` value

``````Console.Write(((double)ff).ToString("R"));
``````

we'll see round up errors in action

``````31.149999618530273
``````

Finally, `Math.Round(31.149999618530273, 1, MidpointRounding.AwayFromZero) == 31.1` as expected

In floating point, all numbers are represented internally as fractions where the denominator is a power of 2.

(This is a similar way to how decimals are actually fractions with power-of-10 denominators. So `31.15` is just a way of writing the fraction `3115/100`)

In floating point, `31.15` must be represented internally as a binary number. The closest binary fraction is: `1111.1001001100110011001100110011001100110011001100110011001100...repeating`

The `1100` recurs (repeats forever), and so the number will be truncated depending on whether it is stored in a double or a float. In a float it is truncated to 24 digits, and in a double to 53.

``````Exact:  1111.100100110011001100110011001100110011001100110011001100110011001100...forever
Float:  1111.10010011001100110011
Double: 1111.1001001100110011001100110011001100110011001100110
``````

Therefore you can see that the double that this number converts to, is actually slightly larger than the float it converts to. So it is clear that it won't necessarily round to the same number, since it is not the same number to begin with.