Integer division compared to floored quotient: why this surprising result?
The //
"integer division" operator of Python surprised me, today:
>>&开发者_如何学Gogt; math.floor(11/1.1)
10.0
>>> 11//1.1
9.0
The documentation reads "(floored) quotient of x and y". So, why is math.floor(11/1.1) equal to 10, but 11//1.1 equal to 9?
Because 1.1 can't be represented in binary form exactly; the approximation is a littler higher than 1.1 - therefore the division result is a bit too small.
Try the following:
Under Python 2, type at the console:
>>> 1.1
1.1000000000000001
In Python 3.1, the console will display 1.1
, but internally, it's still the same number.
But:
>>> 11/1.1
10.0
As gnibbler points out, this is the result of "internal rounding" within the available precision limits of floats. And as The MYYN points out in his comment, //
uses a different algorithm to calculate the floor division result than math.floor()
in order to preserve a == (a//b)*b + a%b
as well as possible.
Use the Decimal
type if you need this precision.
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