# Why do Python's math.ceil() and math.floor() operations return floats instead of integers?

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Can someone explain this (straight from the docs- emphasis mine):

math.ceil(x) Return the ceiling of x as a float, the smallest integer value greater than or equal to x.

math.floor(x) Return the floor of x as a float, the largest integer value less than or equal to x.

Why would `.ceil` and `.floor` return floats when they are by definition supposed to calculate integers?

EDIT:

Well this got some very good arguments as to why they should return floats, and I was just getting used to the idea, when @jcollado pointed out that they in fact do return ints in Python 3...

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 My guess would be that it's because x is a float, not an integer, but since I don't know or use Python, I'll let someone else answer more definitively. :) – Adam V Dec 20 '11 at 22:26 @Adam- but the whole point of ceil/floor operations is to round floats to integers! – Yarin Dec 20 '11 at 22:40 This also irked me the first time I came across it, because it just seems wrong. At least, it's not too hard to use `int(floor(n))`. – wim Dec 21 '11 at 5:14

The range of floating point numbers usually exceeds the range of integers. By returning a floating point value, the functions can return a sensible value for input values that lie outside the representable range of integers.

Consider: If `floor()` returned an integer, what should `floor(1.0e30)` return?

Now, while Python's integers are now arbitrary precision, it wasn't always this way. The standard library functions are thin wrappers around the equivalent C library functions.

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Ahh makes sense – Yarin Dec 20 '11 at 22:29
And even though Python integers are now arbitrary precision, there are still floats whose floor and ceiling can't be represented by integers. Try `floor(float("inf"))` or `ceil(float("nan"))`. – Michael Hoffman Dec 20 '11 at 22:33
@Michael- Apparently in P3 you will now get OverflowExceptions if you try that. See jcollado's answer – Yarin Dec 20 '11 at 22:57
Er, it should return a 'long' type (a.k.a. 'bigint'), shouldn't it? Seems like an obvious answer to me, but now I feel like I'm being naive somehow. – koschei Dec 21 '11 at 0:13
@koschei: It does in Python 3.x, see jcollado's answer. – Greg Hewgill Dec 21 '11 at 0:14

As pointed out by other answers, in python they return floats probably because of historical reasons to prevent overflow problems. However, they return integers in python 3.

``````>>> import math
>>> type(math.floor(3.1))
<class 'int'>
>>> type(math.ceil(3.1))
<class 'int'>
``````

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@jcollado- Where do you see that they return integers in P3? – Yarin Dec 20 '11 at 22:39
@Yarin I just typed the commands above. Also if you try with `float("inf")` or `float("nan")`, you'll get an `OverflowError` exception. – jcollado Dec 20 '11 at 22:40
@jcollado- Wow interesting- I was just getting used to the returning as float concept... – Yarin Dec 20 '11 at 22:48
For completeness, Python's `numpy.floor` and `ceil` return floats (<class 'numpy.float64'>) – Neil G Dec 21 '11 at 4:36

Because python's math library is a thin wrapper around the C math library which returns floats.

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 Good point as well – Yarin Dec 20 '11 at 22:29

Because the range for floats is greater than that of integers -- returning an integer could overflow

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Integers don't overflow in Python; its integers convert to bigints when they become too large. Open up a Python interpreter and type "2 ** 500", and you'll see that you get an object you can treat in every way like an int. – koschei Dec 21 '11 at 0:14
@koschei- interesting point – Yarin Dec 21 '11 at 1:13
@koschei: Even bigints overflow when trying to represent infinity. – Stephen Canon Dec 21 '11 at 19:10

Before Python 2.4, an integer couldn't hold the full range of truncated real numbers.

http://docs.python.org/whatsnew/2.4.html#pep-237-unifying-long-integers-and-integers

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It can't hold the "full range of truncated real numbers" now, either, because that is obviously an infinite set and would therefore require an infinite amount of memory. It can hold the range of truncated floats, which is but a small subset of ℝ. – leftaroundabout Dec 21 '11 at 5:08
@leftaroundabout - picky picky! You knew what I meant. – Mark Ransom Dec 21 '11 at 5:15

the whole point of ceil/floor operations is to convert floats to integers!

The point of the ceil and floor operations is to round floating-point data to integral values. Not to do a type conversion. Users who need to get integer values can do an explicit conversion following the operation.

Note that it would not be possible to implement a round to integral value as trivially if all you had available were a ceil or float operation that returned an integer. You would need to first check that the input is within the representable integer range, then call the function; you would need to handle NaN and infinities in a separate code path.

Additionally, you must have versions of ceil and floor which return floating-point numbers if you want to conform to IEEE-754.

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 Stephen- I rewrote my comment- I had meant round, not convert. But that wasn't the source of my confusion- rather it was that I wasn't recognizing the range disparity. – Yarin Dec 20 '11 at 22:41 Sadly, I am out of votes today. This is the correct answer, much more so than any limitation of representation. – Marcin Feb 7 '12 at 16:39

Maybe because other languages do this as well, so it is generally-accepted behavior. (For good reasons, as shown in the other answers)

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 Or what Charles said. :) – Almo Dec 20 '11 at 22:27

This is a very interesting question! As a float requires some bits to store the exponent (=`bits_for_exponent`) any floating point number greater than `2**(float_size - bits_for_exponent)` will always be an integral value! At the other extreme a float with a negative exponent will give one of `1`, `0` or `-1`. This makes the discussion of integer range versus float range moot because these functions will simply return the original number whenever the number is outside the range of the integer type. The python functions are wrappers of the `C` function and so this is really a deficiency of the `C` functions where they should have returned an integer and forced the programer to do the range/`NaN`/`Inf` check before calling ceil/floor.

Thus the logical answer is the only time these functions are useful they would return a value within integer range and so the fact they return a float is a mistake and you are very smart for realizing this!

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There is really no sane way to make such a function that returns a standard integer type. Clearly the input has to be a float. And the range of floats vastly exceeds the range of integers. So returning a float is the standard.

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Thanks for the link- looks like it's a canonical rule – Yarin Dec 20 '11 at 22:31
Integers are unbounded, in Python (and even more so in Python 3, which only has one type of integers). – EOL Dec 21 '11 at 10:12