# Why am I receiving a “no ordering relation defined for complex numbers” error?

See this question for some background. My main problem on that question was solved, and it was suggested that I ask another one for a second problem I'm having:

``````print cubic(1, 2, 3, 4)  # Correct solution: about -1.65
...
if x > 0:
TypeError: no ordering relation is defined for complex numbers
print cubic(1, -3, -3, -1)  # Correct solution: about 3.8473
if x > 0:
TypeError: no ordering relation is defined for complex numbers
``````

Cubic equations with one real root and two complex roots are receiving an error, even though I am using the cmath module and have defined the cube root function to handle complex numbers. Why is this?

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What is the value of `x`? –  Adam Rosenfield Apr 30 '13 at 4:06
See the other question. x is an argument passed to the function that calculates the cube root. –  user2330618 Apr 30 '13 at 19:14

Python's error messages are pretty good, as these things go: unlike some languages I could mention, they don't feel like random collections of letters. So when Python complains of the comparison

``````if x > 0:
``````

that

``````TypeError: no ordering relation is defined for complex numbers
``````

you should take it at its word: you're trying to compare a complex number `x` to see whether or not it's greater than zero, and Python doesn't know how to order complex numbers. Is `2j > 0`? Is `-2j > 0`? Etc. In the face of ambiguity, refuse the temptation to guess.

Now, in your particular case, you've already branched on whether or not `x.imag != 0`, so you know that `x.imag == 0` when you're testing `x` and you can simply take the real part, IIUC:

``````>>> x = 3+0j
>>> type(x)
<type 'complex'>
>>> x > 0
Traceback (most recent call last):
File "<ipython-input-9-36cf1355a74b>", line 1, in <module>
x > 0
TypeError: no ordering relation is defined for complex numbers

>>> x.real > 0
True
``````
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I already have the cube root function (shown in the other question) set to handle complex numbers. This shouldn't be a problem. –  user2330618 Apr 30 '13 at 14:28
user2330618: no, you don't. Have it set to handle complex numbers, I mean. Right before the `if x < 0:`, add `print(type(x), repr(x))`, to convince yourself `x` is a complex number. Then pick a random complex number, say `2+3j`, and type `2+3j > 0` at the console. Note the error message. –  DSM Apr 30 '13 at 14:33
I think, then, that it would be failing only for complex numbers whose imaginary part is zero. But I can definitely fix that with: elif x.imag == 0: x = x.real –  user2330618 Apr 30 '13 at 14:44
Erm, that's exactly what I said: "you can simply take the real part", because "you know that `x.imag == 0`". –  DSM Apr 30 '13 at 14:45
It is not clear from your example code what `x` is, but it seems it must be a complex number. Sometimes, when using complex numerical methods, an approximate solution will come up as a complex number even though the exact solution is supposed to be real.
Complex numbers have no natural ordering, so an inequality `x > 0` makes no sense if `x` is complex. That's what the type error is about.