When division results in an infinitely repeating number, the number obviously gets truncated to fit into the size of the decimal. So something like 1/3 becomes something like 0.3333333333333333333. If we then multiply that number by 3, we get something like 0.999999999999999999 rather than 1 as we would get if the true value of the fraction had been preserved.

This is a code sample of this from the MSDN article on decimal:

```
decimal dividend = Decimal.One;
decimal divisor = 3;
// The following displays 0.9999999999999999999999999999 to the console
Console.WriteLine(dividend/divisor * divisor);
```

This causes an issue when the value 0.9999999999999999999 is compared with 1 for equality. Without the loss of precision they would be equal, but of course in this case the comparison would result in false.

How do people typically deal with this problem? Is there a more elegant solution other than defining some margin of error to every comparison?

isthe general way of doing it, either in place, or with a function that either has a margin inside it or lets you specify one (that would be more elegant in terms of readability, but same concept). (Don't forget if you're ever displaying the results to users, also round floats to something readable. Nobody wants to see that they owe $1.99999999999. Yes, I've seen this. Several times.) – neminem Apr 18 '13 at 23:14