# Is there a way to do 'correct' arithmetical rounding in .NET? / C#

I'm trying to round a number to it's first decimal place and, considering the different MidpointRounding options, that seems to work well. A problem arises though when that number has sunsequent decimal places that would arithmetically affect the rounding.

An example:

With `0.1`, `0.11..0.19` and `0.141..0.44` it works:

``````Math.Round(0.1, 1) == 0.1
Math.Round(0.11, 1) == 0.1
Math.Round(0.14, 1) == 0.1
Math.Round(0.15, 1) == 0.2
Math.Round(0.141, 1) == 0.1
``````

But with `0.141..0.149` it always returns `0.1`, although `0.146..0.149` should round to `0.2`:

``````Math.Round(0.145, 1, MidpointRounding.AwayFromZero) == 0.1
Math.Round(0.146, 1, MidpointRounding.AwayFromZero) == 0.1
Math.Round(0.146, 1, MidpointRounding.ToEven) == 0.1
Math.Round(0.146M, 1, MidpointRounding.ToEven) == 0.1M
Math.Round(0.146M, 1, MidpointRounding.AwayFromZero) == 0.1M
``````

I tried to come up with a function that addresses this problem, and it works well for this case, but of course it glamorously fails if you try to round i.e. `0.144449` to it's first decimal digit (which should be `0.2`, but results `0.1`.) (That doesn't work with Math.Round() either.)

``````private double "round"(double value, int digit)
{
// basically the old "add 0.5, then truncate to integer" trick
double fix = 0.5D/( Math.Pow(10D, digit+1) )*( value >= 0 ? 1D : -1D );
double fixedValue = value + fix;

// 'truncate to integer' - shift left, round, shift right
return Math.Round(fixedValue * Math.Pow(10D, digit)) / Math.Pow(10D, digit);
}
``````

I assume a solution would be to enumerate all digits, find the first value larger than 4 and then round up, or else round down. Problem 1: That seems idiotic, Problem 2: I have no idea how to enumerate the digits without a gazillion of multiplications and subtractios.

Long story short: What is the best way to do that?

• why should 0.149 round to 0.2 it is less than the midpoint so it should round down not up. do you actually want to truncate and add 1 maybe?
– jk.
Commented Mar 25, 2010 at 11:13

`Math.Round()` is behaving correctly.

The idea with midpoint rounding is that half of the in-between numbers should round up and half should round down. So for numbers between 0.1 and 0.2, half of them should round to 0.1 and half should round to 0.2. The midpoint between these two numbers is 0.15, so that's the threshold for rounding up. 0.146 is less than 0.15, therefore it must round down to 0.1.

``````                    Midpoint
0.10                  0.15                  0.20
|----------------|----|---------------------|
0.146
<---- Rounds Down
``````
• Actually, you do sometimes need to look beyond. For example, suppose we're using round-to-even to tenths; 0.250 rounds to 0.2 (it's exactly on the midpoint, so it goes to even 0.2 rather than odd 0.3), but 0.251 rounds to 0.3 (as it is closer to 0.3 than 0.2). I think the digit sequence "50̅" (5 after your rounding place followed by all zeros) is the only case you need to consider, though. Commented Mar 25, 2010 at 11:39
• Math.Round doesn't behave correctly, it rounds to the next even integer, e.g. `Math.Round(1.5) == 2` as well as `Math.Round(2.5) == 2` Commented May 24, 2020 at 15:07
• To do mitdpoint rounding, use `Math.Round(2.5, [System.MidpointRounding]::AwayFromZero)` the default if not specified is "ToEven" Commented May 24, 2020 at 15:15
• @K.Frank The default of ToEven is "correct", it just isn't what you were probably expecting. ToEven (which I've known as "bankers rounding" but apparently has many names) tends to avoid the bias that AwayFromZero can introduce. The question on this page was making the mistake of rounding iteratively (rounding to the hundredths place, then again to the tenths), so that's what this answer is pointing out. Commented May 24, 2020 at 22:12
• @KevinReid You're right. I'm surprised that incorrect statement made it 10 years without someone editing the answer for me. I've removed it from my answer since it didn't matter for addressing the question. Commented May 24, 2020 at 22:16

I don't get what you are trying to accomplish here. 0.149 rounded to one decimal place is 0.1, not 0.2

• Yep, think some basic maths revision is required first ;) Commented Mar 25, 2010 at 11:13
• I understood (and understand) rounding as truncating to a number of digits with adjustment of that specific digit according to the value of, well, the rest. Or, 0.149 being 0.15, being 0.2. Don't destroy my world! Commented Mar 25, 2010 at 11:14
• Yea, you don't start rounding from the last decimal place, then work in. You simply look at the decimal place after the place you want to round to. Commented Mar 25, 2010 at 11:15
• if 1.49 -> 0.15 -> 0.2 you are rounding twice! once to 2dp and once to 1dp. you generally don't want to round twice as each round adds error to the 'real' value
– jk.
Commented Mar 25, 2010 at 11:15
• I think a strong coffee is needed right now. :D Thanks anyone! Commented Mar 25, 2010 at 11:21

Rounding is not an iterative process, you round only once.

So 0.146 rounded to 1 decimal digit is 0.1.

You don't do this:

``````0.146 --> 0.15
0.15 -->  0.2
``````

You only do this:

``````0.146 --> 0.1
``````

Otherwise, the following:

``````0.14444444444444446
``````

would also round to 0.2, but it doesn't, and shouldn't.

Don't try and compound the rounding 'errors'. Which is what you're trying to do.

.146 should round down to .1 if you're going to one decimal place.

By rounding it to .15 first, then again to .2 you're just introducing more rounding error, not less.

• A severe misunderstanding on my side. Thanks! Commented Mar 25, 2010 at 11:25