# Rounding error in Python with non-odd number?

I'm beginner in Python, and I have one question.
Why does rounding a number like 5.5, 7.5, (anything).5 with odd integer part applying `round(num)` work correctly (rule 5/4), but rounding number like (anything).5 with non-odd integer part by the same function returns just an integer part? (But if we add a little number like 0.000000001 to that decimal number it works correctly)

I mean the next:

``````round(9.5)
``````

returns 10, and it's correct. But

``````round(8.5)
``````

returns 8, and it isn't correct. And

``````round(8.5 + 0.0000000000001)
``````

returns 9.

Why it works incorrect?
I use Python 3.2.2 at Windows.

-
Interesting. Python 2.7 returns `10.0` for `round(9.5)` and `9.0` for `round(8.5)`. –  Tim Pietzcker Apr 10 '12 at 17:49
round(8.5) returns 9.0 as expected. I am on version 2.7.2. –  Mike McMahon Apr 10 '12 at 17:50
@Tim: Actually, it is. –  Ignacio Vazquez-Abrams Apr 10 '12 at 17:52

Python 3.x, in contrast to Python 2.x, uses Banker's rounding for the `round()` function.

This is the documented behaviour:

[I]f two multiples are equally close, rounding is done toward the even choice (so, for example, both round(0.5) and round(-0.5) are 0, and round(1.5) is 2).

Since floating point numbers by their very nature are only approximations, it shouldn't matter too much how "exact" half-integers are treated – there could always be rounding errors in the preceding calculations anyway.

Edit: To get the old rounding behaviour, you could use

``````def my_round(x):
return int(x + math.copysign(0.5, x))
``````
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was just going to post this gem :) –  Mike McMahon Apr 10 '12 at 17:53
@gxoptg: try `def roundHalfUp(f): return round(f + 0.00000000000001)` or `def roundHalfUp(f): return math.floor(f + 0.5)` –  jedwards Apr 10 '12 at 18:14
`max(round(x), round(x + 1) - 1)` gives incorrect results for negative numbers. –  agf Apr 10 '12 at 19:03
To summarise the reason for rounding like this: if `x.5` numbers are a significant portion of some data, rounding them all up shifts the average upwards as well. But if you round half of them up and half down, the average should stay about the same. –  Thomas K Apr 10 '12 at 19:30