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I want to make '==' operator use approximate comparison in my program: float values x and y are equal (==) if

abs(x-y)/(0.5(x+y)) < 0.001

What's a good way to do that? Given that float is a built-in type, I don't think I can redefine the == operator, can I?

Note that I would like to use other features of float, the only thing that I'd like to change is the equality operator.


Thank you for the answers, and I understand your arguments about readability and other issues.

That said, I really would prefer, if possible, to actually keep using the regular float type, instead of having a new class or a new comparison function. Is it even possible to redefine == operator for regular floats?

My reasons are::

(a) everyone using the program I'm writing wants the floats to be compared this way

(b) there's no way in the world anyone would ever want to use the default == for floats.. Why is it even in the language???

(c) I dislike extra words in the code; obviously using the existing float results in no changes in the code whatsoever


Now that I know I can't overload the == operator for float, I have to change my question. It will become so different that I'll make a new one at

share|improve this question
Whatch out for the impact on readability, especially for others. –  Emilio M Bumachar Oct 4 '10 at 11:06
Overloading operator '==' seems cute, but using a separate function for this is almost always a better idea. –  Constantin Oct 4 '10 at 14:00
I have numerous comparisons of lists of numbers (for example) that would become much more convoluted if I couldn't redefine the default == operator.. –  max Oct 4 '10 at 18:45
Well, you can't redefine the default == operator for float (fortunately). "much more convoluted": how does changing a == b to func_name(a, b) make your code more convoluted? Dare one suggest that "numerous comparisons of lists of numbers" may be "convoluted" already? Perhaps a function to compare two lists "inexactly" might help? –  John Machin Oct 4 '10 at 23:15

3 Answers 3

up vote 5 down vote accepted

Your definition has two problems:

  1. Missing an *

  2. Will attempt to divide by zero if x + y == 0.0 (which covers a possibly frequent case x == y == 0.0)

Try this instead:

define approx_Equal(x, y, tolerance=0.001):
    return abs(x-y) <= 0.5 * tolerance * (x + y)

Edit: Note the use of <= instead of < ... needed to make the x == y == 0.0 case work properly.

I wouldn't try to override ==

Edit 2: You wrote:

there's no way in the world anyone would ever want to use the default == for floats.. Why is it even in the language???

No way? Suppose you have a function that returns a float, and you have a brainwave about an algorithm that would produce the same answers faster and/or more elegantly; how do you test it?

share|improve this answer
One of the reasons for my question is that I often compare dictionaries, which have values of different types including float. The standard Python == operator is perfectly fine, except for the float (which need to be compared approximately). Obviously, there's easy ways to do that with some extra code, but I was hoping overriding == in float would be the cleanest, most elegant solution. –  max Oct 4 '10 at 23:20
I accept this answer because dealing with custom float subclass is terribly inconvenient in Python for reasons shown in comments to that solution. Other than the subclass, this is the first correct solution. –  max Oct 4 '10 at 23:57
If you could override float ==, to avoid utter disaster you would need to override the other 5 relational operators in a consistent fashion. The override would be effective for all the library code, which would not be expecting it. E.g. sorting a list of floats might not give the same answer. All hell may break loose. The effort of working through a proof that it won't cause a catastrophe would be a large undertaking. –  John Machin Oct 5 '10 at 0:40
+1 - best way to deal with division by zero. –  max Oct 5 '10 at 2:57
You need to do return abs(x-y) <= 0.5 * tolerance * (abs(x) + abs(y)), or else this won't work for negative x or y. –  max Apr 28 '12 at 9:46

You can create a new class deriving from the builtin float type, and then overwrite the necessary operators:

class InexactFloat(float):
    def __eq__(self, other):
            return abs(self.real - other) / (0.5 * (abs(self.real) + abs(other))) < 0.001
        except ZeroDivisionError:
            # Could do another inexact comparison here, this is just an example:
            return self.real == other

    def __ne__(self, other):
        return not self.__eq__(other)

print 5.2 == 5.20000000000001 # False
print 5.2 != 5.20000000000001 # True
print InexactFloat(5.2) == InexactFloat(5.20000000000001) # True
print InexactFloat(5.2) != InexactFloat(5.20000000000001) # False
print InexactFloat(-5) == -5 # True

# Works for InexactFloat <-> float comparison
print 5.0 == InexactFloat(5.0) # True
print InexactFloat(5.0) == 5.0 # True

# Zero division case (note how I implemented it above!)
print InexactFloat(-0.00001) == InexactFloat(0.00001) # False
print InexactFloat(-0.000000001) == InexactFloat(0.000000001) # False
print InexactFloat(-5) == InexactFloat(5) # False

# Unit test for fixed negative numbers problem
print InexactFloat(-5) == InexactFloat(-10) # False

You may also want to overwrite operators like <= etc.

share|improve this answer
+1: I think this is the best idea - creating a new class instead of overriding builtin operators for builtin classes. But you should still handle the ZeroDivisionError if both numbers are or add up to zero. –  Tim Pietzcker Oct 4 '10 at 10:11
@Tim Pietzcker: Right, I forgot about that case. Changed to code accordingly. –  AndiDog Oct 4 '10 at 10:22
@AndiDog: At what stage does he switch from using float to using this class? Does he need to wrap InexactFloat() around every float? Suppose he doesn't do that but does all his calculations in floats and gets two values a and b ... does he need to do InexactFloat(a) == InexactFloat(b) or can he get away with InexactFloat(a) == b? If the latter, why does he need a class at all? –  John Machin Oct 4 '10 at 11:07
@John Machin: If you put print other into the __eq__ method, you'll see that if at least one side of the comparison is a InexactFloat instance, then the custom comparison method is used. So InexactFloat(a) == b is enough. He needs the class because overwriting the builtin float.__eq__ is 1) not possible and 2) could lead to unexpected behavior in other libraries or parts of the program. That's why a custom class is better. If only few inexact comparisons are necessary, one could as well use a function compareInexact(a, b) as suggested in another answer. –  AndiDog Oct 4 '10 at 11:43
@Andidog: If the OP is going to use your class in a just-in-time manner, he needs to type Classname(a) == b for each comparison occurrence in the code, which is two keystrokes more than func_name(a, b) if one adheres to PEP8, else one more. Otherwise for every code occurrence of saving a float value that may be compared later, the OP needs to locate that occurrence, and insert classname(whatever) -- do you recommend that? Would you be happy maintaining such code?? –  John Machin Oct 4 '10 at 23:04

If you wrap the numbers in a class you can overload "==" with:

def __eq__(self, x):
   return abs(x - self.x) / (0.5 * (x + self.x)) < 0.001

however you should rewrite the expression to

abs(x - self.x) < 0.0005 * (x + self.x)

to avoid zero division.

share|improve this answer
Arguments don't seem right. –  livibetter Oct 4 '10 at 9:58
Make sure to also define ne as well so you don't have both a==b and a!=b true. And be aware that with eq redefined as above you can have both a==b and a<b true, but if that doesn't make sense you can define gt and ge as well. –  Bill Gribble Oct 4 '10 at 9:59
livibetter. Sorry I fetched the info from –  MdaG Oct 4 '10 at 10:10
Which class is "in your class" referring to? The OP has float objects. –  Roger Pate Oct 4 '10 at 10:24
+1 for preventing the ZeroDivisionError. –  poke Oct 4 '10 at 12:51

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