# Why does System.MidpointRounding.AwayFromZero not round up in this instance?

In .NET, why does `System.Math.Round(1.035, 2, MidpointRounding.AwayFromZero)` yield 1.03 instead of 1.04? I feel like the answer to my question lies in the section labeled "Note to Callers" at http://msdn.microsoft.com/en-us/library/ef48waz8.aspx, but I'm unable to wrap my head around the explanation.

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Interestingly, calling this method with a value of 1.135 returns 1.14. –  Kyle Trauberman Feb 10 '12 at 0:51
The "note" is essentially that it's a base-2 number. It can't represent certain values precisely. You type 1.035, the internal representation might be 1.034999999982 or whatever. If you're interested in the exact representation of digits to a given number of decimal places, perhaps System.Decimal is the type for you. Particularly so if you are dealing with financial values. –  user414076 Feb 10 '12 at 0:53
@KyleTrauberman that's because with 1.135 you get lucky- the approximation lands a little higher than 1.135, as opposed to lower like in the OP. –  Chris Shain Feb 10 '12 at 1:13

Your suspicion is exactly right. Numbers with fractional portion, when expressed as literals in .NET, are by default doubles. A double (like a float) is an approximation of a value, not a precise value. In this case, the approximation is ever so vanishingly on the small side of 1.035. If you write it using an explicit Decimal it works as you expect:

``````Console.WriteLine(Math.Round(1.035m, 2, MidpointRounding.AwayFromZero));
``````

To understand why doubles and floats work the way they do, imagine representing the number 1/3 in decimal (or binary, which suffers from the same problem). You can't- it translates to .3333333...., meaning that to represent it accurately would require an infinite amount of memory.

Computers get around this using approximations. I'd explain precisely how, but I'd probably get it wrong. You can read all about it here though: http://en.wikipedia.org/wiki/IEEE_754-1985

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Note, the default is double. 1.0 is implicitly a double, although it can be explicitly so with 1d or 1.0d. The `f` suffix is required for float literals. –  user414076 Feb 10 '12 at 0:57
Fixed, thanks Anthony –  Chris Shain Feb 10 '12 at 1:01
@ChrisShain double is indeed a precise value; it's just it's a precise binary value, which may or may not be an approximation to the precise decimal value indicated by the literal. For example, the binary value `0.25d` is precisely equal to the decimal value 0.25. Plus I think you meant "imagine representing the number 1/3 in decimal" because 0.33333... is the decimal representation, not binary. The binary representation is more like 0.0101010101... –  phoog Feb 10 '12 at 1:04
@phoog that's misleading though. Floating point values cannot be relied upon to store precisely the value that an equivalent decimal would, as illustrated in the OP. I can aim a rifle approximately at a target- the fact that I hit the bullseye occasionally doesn't say anything about my accuracy as a marksman. –  Chris Shain Feb 10 '12 at 1:08
@ChrisShain I think the better analogy is that the double is a tool often used for the wrong purpose. The fact that metric wrenches don't fit the nuts on my bicycle does not imply that metric wrenches are inaccurate. –  phoog Feb 10 '12 at 5:39

The binary representation of 1.035d is 0x3FF08F5C28F5C28F, which in fact is 1.03499999999999992006394222699E0, so System.Math.Round(1.035, 2, MidpointRounding.AwayFromZero) yield 1.03 instead of 1.04, so it's correct.

However, the binary representation of 4.005d is 0x4010051EB851EB85, which is 4.00499999999999989341858963598, so System.Math.Round(4.005, 2, MidpointRounding.AwayFromZero) should yield 4.00, but it yield 4.01 which is wrong (or a smart 'fix'). If you check it in MS SQL select ROUND(CAST(4.005 AS float), 2), it's 4.00 I don't understand why .NET apply this 'smart fix' which makes things worse.

You can check binary representation of a double at: http://www.binaryconvert.com/convert_double.html

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I believe the example you're referring to is a different issue; as far as I understand they're saying that 0.1 isn't stored, in float, as exactly 0.1, it's actually slightly off because of how floats are stored in binary. As such let's suppose it actually looks more like 0.0999999999999 (or similar), something very, very slightly less than 0.1 - so slightly that it doesn't tend to make much difference. Well, no, they're saying: one noticeable difference would be that adding this to your number and rounding would actually appear to go the wrong way because even though the numbers are extremely close it's still considered "less than" the .5 for rounding.

If I misunderstood that page, I hope somebody corrects me :)

I don't see how it relates to your call, though, because you're being more explicit. Perhaps it's just storing your number in a similar fashion.

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That's exactly right. –  Chris Shain Feb 10 '12 at 0:57
+1 for "because of how floats are stored in binary". –  phoog Feb 10 '12 at 1:07

At a guess I'd say that internally 1.035 can't be represented in binary as exactly 1.035 and it's probably (under the hood) 1.0349999999999999, which would be why it rounds down.

Just a guess though.

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``````decimal result = decimal.Round(1.035m, 2, MidpointRounding.AwayFromZero);