# Why does assertAlmostEqual(-inf,-inf) fail?

Numpy's log method gives -inf for log(0). This value is comparable:

``````>>> np.log(0) == np.log(0)
True
``````

Now in unittesting the following works fine:

``````self.assertEqual(np.log(0),np.log(0))
``````

but this fails:

``````self.assertAlmostEqual(np.log(0),np.log(0))
``````

Why is this behaviour like this? Is this a bug or intended? If intended, how can I check two float values to be almost equal, working also correctly for -inf?

-

The difference between an Inf and any finite value is either Inf or -Inf. That's part of the IEEE754 specification. Since `assertAlmostEqual` uses subtraction this explains the behaviour.

Here's the relevant table from the Intel x86 documentation for FSUB:

To solve your problem you are going to need special case handling for Inf.

-
Note that this special case belongs in `assertAlmostEqual`, not in his test code. This is clearly a bug in `TestCase.failUnlessAlmostEqual`. –  Glenn Maynard Mar 21 '11 at 13:52
@Glenn I agree. I don't know how to file Python bug reports! Do you? –  David Heffernan Mar 21 '11 at 13:58
bugs.python.org –  Glenn Maynard Mar 21 '11 at 23:12

From the doc of unittest assertAlmostEqual(a, b) is by default equivalent to `round(a-b, 7) == 0`. so in your case you have :

``````In [8]: np.log(0) - np.log(0)
Out[8]: nan

In [9]: round(np.log(0) - np.log(0), 7)
Out[9]: nan

In [11]: np.nan == 0
Out[11]: False
``````

That explain why your test fail.

For making it work use unittest2 here is an example:

``````import unittest2
import numpy as np

class Test_Assertions(unittest2.TestCase):
def test_float_inf(self):
self.assertAlmostEqual(float('inf'), float('inf'))

def test_numpy_inf(self):
self.assertAlmostEqual(np.log(0),np.log(0))

unittest2.main()
``````

Output:

``````..
----------------------------------------------------------------------
Ran 2 tests in 0.000s

OK
``````

N.B: In unittest2 `assertAlmostEqual()` first test if the two objects are equal if yes so the result is yes else do the magic (almost equal) , this is why it work . It also should work in new python version (2.7 >) because most of them have the unittest2 functionality implemented (i'm not sure about this because i don't have python 2.7 > in my work station).

Hope this can help :)

-

I'd say that the difference between -∞ and -∞ can be as much as ∞. Therefore, they aren't really "almost equal".

If you want to ignore this special case, then something like this might be useful:

``````if valueA != valueB:
self.assertAlmostEqual(valueA, valueB)
``````
-
They're equal, but not almost [i.e. close to] equal? That doesn't make sense. –  Devin Jeanpierre Mar 21 '11 at 13:06
@Devin: indeed. Unfortunately the corner cases of IEEE floating point numbers (infinity, NaN, +/-0) are rarely intuitive. +/-0 is one of the rare cases that behaves pretty sane. –  Joachim Sauer Mar 21 '11 at 13:12
@Devin It does make sense. For example. Think of a large positive number, x say. Now square x. x^2 is less than infinity but a long way from x. Now consider x^x. It is less than infinity but but even further from x. And so on. That's just the nature of infinity. –  David Heffernan Mar 21 '11 at 13:56
@Devin: the idea is possibly that two calculation that both arrive at positive infinity could get there via wildly different calculations. So there's no way to say if the "same infinity" is meant. There are an infinite number of infinite values, after all. –  Joachim Sauer Mar 21 '11 at 14:05
@David @Joachim and yet if there is any difference between two numbers, they are not equal. So if the difference is large, obviously it is nonzero, and therefore infinity != infinity. And yet infinity == infinity. The logic above would imply otherwise. –  Devin Jeanpierre Mar 21 '11 at 16:49