http://en.wikipedia.org/wiki/Rounding#Round_half_to_even

**Round half to even**

A tie-breaking rule that is less biased is **round half to even**, namely:

If the fraction of y is 0.5, then q is the even integer nearest to y.
Thus, for example, +23.5 becomes +24, as does +24.5; while −23.5
becomes −24, as does −24.5.

This method treats positive and negative values symmetrically, and is
therefore free of sign bias. More importantly, for reasonable
distributions of y values, the expected (average) value of the rounded
numbers is the same as that of the original numbers. However, this
rule will introduce a towards-zero bias for even numbers, and a
towards-infinity bias for odd ones.

This variant of the round-to-nearest method is also called **unbiased
rounding, convergent rounding, statistician's rounding, Dutch
rounding, Gaussian rounding, odd-even rounding** or **bankers'
rounding**, and is widely used in bookkeeping.

This is the default rounding mode used in IEEE 754 computing functions
and operators.

```
>>> "%.2f"%20.325
'20.32'
>>> "%.2f"%20.335
'20.34'
>>> "%.2f"%20.345
'20.34'
>>> "%.2f"%20.355
'20.36'
```

So the real question should be *why does the third case fail?*

`203.25`

can be expressed exactly in the floating point representation, however `0.1`

cannot, it turns out to be a tiny bit more than `0.1`

```
>>> 0.1*203.25
20.325000000000003
```

So it gets rounded up