# Checking if float is equivalent to an integer value in python

In Python 3, I am checking whether a given value is triangular, that is, it can be represented as `n * (n + 1) / 2` for some positive integer `n`.

Can I just write:

``````import math

def is_triangular1(x):
num = (1 / 2) * (math.sqrt(8 * x + 1) - 1)
return int(num) == num
``````

Or do I need to do check within a tolerance instead?

``````epsilon = 0.000000000001
def is_triangular2(x):
num = (1 / 2) * (math.sqrt(8 * x + 1) - 1)
return abs(int(num) - num) < epsilon
``````

I checked that both of the functions return same results for `x` up to 1,000,000. But I am not sure if generally speaking `int(x) == x` will always correctly determine whether a number is integer, because of the cases when for example 5 is represented as 4.99999999999997 etc.

As far as I know, the second way is the correct one if I do it in C, but I am not sure about Python 3.

• I know you are asking about floats and ints but you may find the following Q useful stackoverflow.com/questions/5595425/… Commented Jun 1, 2011 at 23:54
• Both functions may return the same, but for some reason they return True for all numbers I've tried. Commented Jun 2, 2011 at 1:37
• @Jochen, are you using Python3? In Python2 `1/2==0` so `num` will always just be `0` Commented Jun 2, 2011 at 4:37
• @gnibbler: oh right, I should read more carefully Commented Jun 2, 2011 at 11:58

There is `is_integer` function in python float type:

``````>>> float(1.0).is_integer()
True
>>> float(1.001).is_integer()
False
>>>
``````

You'll want to do the latter. In Programming in Python 3 the following example is given as the most accurate way to compare

``````def equal_float(a, b):
#return abs(a - b) <= sys.float_info.epsilon
return abs(a - b) <= chosen_value #see edit below for more info
``````

Also, since epsilon is the "smallest difference the machine can distinguish between two floating-point numbers", you'll want to use <= in your function.

Edit: After reading the comments below I have looked back at the book and it specifically says "Here is a simple function for comparing floats for equality to the limit of the machines accuracy". I believe this was just an example for comparing floats to extreme precision but the fact that error is introduced with many float calculations this should rarely if ever be used. I characterized it as the "most accurate" way to compare in my answer, which in some sense is true, but rarely what is intended when comparing floats or integers to floats. Choosing a value (ex: 0.00000000001) based on the "problem domain" of the function instead of using sys.float_info.epsilon is the correct approach.

Thanks to S.Lott and Sven Marnach for their corrections, and I apologize if I led anyone down the wrong path.

• Don't work for the question: `5 - 4.999999999999997 <= sys.float_info.epsilon` is False (at least on my python3.2 @64-bit) Commented Jun 2, 2011 at 0:03
• Half right. Don't use `sys.float_info.epsilon`. Use a value that's specific to the problem domain. Commented Jun 2, 2011 at 0:51
• @S-Lott Why not sys.float_info.epsilon ? Commented Jun 2, 2011 at 0:58
• @Sunny88: Do the algebra. It's possible that your float value's representation error is larger that `sys.float_info.epsilon`. `epsilon = 0.000000000001` is more likely to be correct, since it depends on something in your problem domain, not a fairly arbitrary property of the floating-point representation. Commented Jun 2, 2011 at 2:21
• @Dan: You edit fixes the issue only partially. You need to check relative errors against some epsilon, and this epsilon is not necessarily `sys.float_info.epsilon`. Maybe you want to read the standard reference on this topic. Commented Jun 4, 2011 at 14:05

Both your implementations have problems. It actually can happen that you end up with something like `4.999999999999997`, so using `int()` is not an option.

I'd go for a completely different approach: First assume that your number is triangular, and compute what `n` would be in that case. In that first step, you can round generously, since it's only necessary to get the result right if the number actually is triangular. Next, compute `n * (n + 1) / 2` for this `n`, and compare the result to `x`. Now, you are comparing two integers, so there are no inaccuracies left.

The computation of `n` can be simplified by expanding

``````(1/2) * (math.sqrt(8*x+1)-1) = math.sqrt(2 * x + 0.25) - 0.5
``````

and utilizing that

``````round(y - 0.5) = int(y)
``````

for positive `y`.

``````def is_triangular(x):
n = int(math.sqrt(2 * x))
return x == n * (n + 1) / 2
``````
• round(y - 0.5) == int(y) does not seem to be always correct: In Python 3, round(1-0.5)==0, but int(1)==1 Commented Jun 2, 2011 at 0:54
• @Sunny: Interesting -- the behaviour of `round()` changed in Python 3.x. But since we only want to round numbers that are pretty close to integers, we don't have to worry about the case that the fractional part is exactly `0.5` here. As I said before, we can be pretty tolerant with rounding since we only need to get it right if the number is actually triangular. That's why it's also ok to omit the `0.25`. Commented Jun 2, 2011 at 1:35
• You can just list all triangular numbers `((x*x+x)/2 for x in count())` and test that the function gives True for these and False for everything else ... it does, for all numbers Python can turn into ints. Commented Jun 2, 2011 at 1:52

Python does have a `Decimal` class (in the `decimal` module), which you could use to avoid the imprecision of floats.

• Good answer, for me. I hope there aren't any side-effects of using Decimal instead of float. Commented Sep 6, 2015 at 10:09

floats can exactly represent all integers in their range - floating-point equality is only tricky if you care about the bit after the point. So, as long as all of the calculations in your formula return whole numbers for the cases you're interested in, int(num) == num is perfectly safe.

So, we need to prove that for any triangular number, every piece of maths you do can be done with integer arithmetic (and anything coming out as a non-integer must imply that x is not triangular):

To start with, we can assume that x must be an integer - this is required in the definition of 'triangular number'.

This being the case, 8*x + 1 will also be an integer, since the integers are closed under + and * .

math.sqrt() returns float; but if x is triangular, then the square root will be a whole number - ie, again exactly represented.

So, for all x that should return true in your functions, int(num) == num will be true, and so your istriangular1 will always work. The only sticking point, as mentioned in the comments to the question, is that Python 2 by default does integer division in the same way as C - int/int => int, truncating if the result can't be represented exactly as an int. So, 1/2 == 0. This is fixed in Python 3, or by having the line

``````from __future__ import division
``````

near the top of your code.

I think the module decimal is what you need

• Care to explain how this module will aid the OP (or any of the Google audience) or at least post a link? Commented Mar 11, 2013 at 21:36
• @BlackVegetable In the absolute, you're not wrong. But relatively to the ocean of posts in which mine was going to be lost, I probably didn't consider worth while to write a detailed answer that would have re-explain what is already explained in the documenbtation. Sometimes, just showing the direction is usefull. Commented Mar 11, 2013 at 21:59
• Fair enough, your answer just seemed to be taking a different direction than the others. I was wishing I could click on the word decimal and get a link to that module. (It might even earn you an up-vote!) Commented Mar 11, 2013 at 22:23
• I have a kind of principle: I bet on the intelligence of others. That day, I was probably tired and hadn't energy to explain that `decimal` manages problems of precision, and I thought that everybody was enough trained in Python to know where to find the documentation on this module, either by clicking on Help button in IDLE, either on python.org site (moreover everybody has his/her preference) - Concerning upvote, oh I have some other answers having no points in several threads, and I still sleep well. Commented Mar 11, 2013 at 22:53

You can round your number to e.g. 14 decimal places or less:

`````` >>> round(4.999999999999997, 14)
5.0
``````

PS: double precision is about 15 decimal places

It is hard to argue with standards.

In C99 and POSIX, the standard for rounding a float to an int is defined by nearbyint() The important concept is the direction of rounding and the locale specific rounding convention.

Assuming the convention is common rounding, this is the same as the C99 convention in Python:

``````#!/usr/bin/python

import math

infinity = math.ldexp(1.0, 1023) * 2

def nearbyint(x):
"""returns the nearest int as the C99 standard would"""

# handle NaN
if x!=x:
return x

if x >= infinity:
return infinity

if x <= -infinity:
return -infinity

if x==0.0:
return x

return math.floor(x + 0.5)
``````

If you want more control over rounding, consider using the Decimal module and choose the rounding convention you wish to employ. You may want to use Banker's Rounding for example.

Once you have decided on the convention, round to an int and compare to the other int.

Consider using NumPy, they take care of everything under the hood.

`import numpy as np`

`result_bool = np.isclose(float1, float2)`

Python has unlimited integer precision, but only 53 bits of float precision. When you square a number, you double the number of bits it requires. This means that the ULP of the original number is (approximately) twice the ULP of the square root.

You start running into issues with numbers around 50 bits or so, because the difference between the fractional representation of an irrational root and the nearest integer can be smaller than the ULP. Even in this case, checking if you are within tolerance will do more harm than good (by increasing the number of false positives).

For example:

``````>>> x = (1 << 26) - 1
>>> (math.sqrt(x**2)).is_integer()
True
>>> (math.sqrt(x**2 + 1)).is_integer()
False
>>> (math.sqrt(x**2 - 1)).is_integer()
False

>>> y = (1 << 27) - 1
>>> (math.sqrt(y**2)).is_integer()
True
>>> (math.sqrt(y**2 + 1)).is_integer()
True
>>> (math.sqrt(y**2 - 1)).is_integer()
True
>>> (math.sqrt(y**2 + 2)).is_integer()
False
>>> (math.sqrt(y**2 - 2)).is_integer()
True
>>> (math.sqrt(y**2 - 3)).is_integer()
False
``````

You can therefore rework the formulation of your problem slightly. If an integer `x` is a triangular number, there exists an integer `n` such that `x = n * (n + 1) // 2`. The resulting quadratic is `n**2 + n - 2 * x = 0`. All you need to know is if the discriminant `1 + 8 * x` is a perfect square. You can compute the integer square root of an integer using `math.isqrt` starting with python 3.8. Prior to that, you could use one of the algorithms from Wikipedia, implemented on SO here.

You can therefore stay entirely in python's infinite-precision integer domain with the following one-liner:

``````def is_triangular(x):
return math.isqrt(k := 8 * x + 1)**2 == k
``````

Now you can do something like this:

``````>>> x = 58686775177009424410876674976531835606028390913650409380075
>>> math.isqrt(k := 8 * x + 1)**2 == k
True
>>> math.isqrt(k := 8 * (x + 1) + 1)**2 == k
False

>>> math.sqrt(k := 8 * x + 1)**2 == k
False
``````

The first result is correct: `x` in this example is a triangular number computed with `n = 342598234604352345342958762349`.

Python still uses the same floating point representation and operations C does, so the second one is the correct way.

Under the hood, Python's float type is a C double.

The most robust way would be to get the nearest integer to num, then test if that integers satisfies the property you're after:

``````import math
def is_triangular1(x):
num = (1/2) * (math.sqrt(8*x+1)-1 )
inum = int(round(num))
return inum*(inum+1) == 2*x  # This line uses only integer arithmetic
``````
• Why inum = int(round(num)) and not just inum = int(num) or inum = round(num)? Commented Jun 2, 2011 at 1:31
• @Sunny88: `int(num)` truncates rather than rounds (so 0.9999 would become 0). `round(num)` rounds but returns a float. Commented Jun 3, 2011 at 14:33
• Apparently return value of round() changed in python 3. Now it is integer if there is only one argument. Commented Jun 8, 2011 at 4:57