# python: composition of `int` and `float`

As part of some other calculations, I noticed that I sometimes apply `float()` and then `int()` function to an integer input. Is it safe to assume that:

``````int(float(x)) == x
``````

if x is integer?

Why? (Or why not?) And is it documented anywhere?

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All numbers of the form `significant_digits * (2 ** exponent)` have an exact representation as a floating point number, as long as you have enough bits to represent `significant_digits` and `exponent`. Most platforms use IEEE 754 double representation, and Python uses the platform's double. IEEE 754 doubles have 11 bits for `exponent` and 52 bits for `significant digits`. As long as your numbers fit these bounds they will come out as expected.

See Python's docs on floating point representation and Wikipedia's article on floating points.

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I guess the direct answer to my question is a simple 'no' (with an example); but I do find this additional information useful for debugging purposes. –  max Jul 12 '11 at 0:40

If `x` needs more precision than provided by double-precision floating point numbers then the comparison will fail.

``````>>> int(float(10**23))
99999999999999991611392L
``````
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``````>>> x = 10**300
>>> int(float(x)) == x
False
``````
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Why? (Or why not?) And is it documented anywhere?

One of the definitive guides that every programmer should know well:

What Every Programmer Should Know About Floating-Point Arithmetic

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What does that have to do with integers? –  Jeff Mercado Jul 11 '11 at 23:54
The question is about `int` and `float` types. `Float()` involves floating point, right? From Python Docs: `float() Convert a string or a number to floating point.` –  dawg Jul 12 '11 at 0:00
But he isn't really doing any math with it. And he specifically mentions that the input is already an integer. –  Jeff Mercado Jul 12 '11 at 0:02
As demonstrated in the other answers, such as `int(float(10**300))` it does matter. What do you think happens to the interim result once you apply `float()` to something? –  dawg Jul 12 '11 at 0:04
Whenever I see that link by anyone, it's usually in the context of doing floating point arithmetic, not usually to point out the precision of the values. Sorry for the confusion. :) –  Jeff Mercado Jul 12 '11 at 0:27
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