# Why float objects in Python doesn't have denominator attribute, while int does?

While I was messing around with Python,

``````>>> [attr for attr in dir(1) if not attr.startswith('_')]
['bit_length', 'conjugate', 'denominator', 'imag', 'numerator', 'real']
>>> [attr for attr in dir(1.1) if not attr.startswith('_')]
['as_integer_ratio', 'conjugate', 'fromhex', 'hex', 'imag', 'is_integer', 'real']
``````

Although I understand that 'conjugate', 'imag', and 'real' are there for the sake of compatibility with complex type, I can't understand why 'numerator' and 'denominator' exists for int only, and doesn't for a float.

Any explanation for that ?

• What would you expect `math.pi.denominator` to return? – dan04 Feb 22 '12 at 20:55
• I'd say 7, but after Wikipedia-ing I understood that pi is irrational number and doesn't exactly equal 22/7 the rational version. – Radian Feb 22 '12 at 21:29

This is most likely because floats are somewhat lossy - they can not perfectly represent every value. Consider this example:

``````>>> 1.0/5.0
0.20000000000000001
``````

If you wanted the access the denominator of `1.0/5.0` python would have to return `18014398509481984` (`20000000000000001/100000000000000000 == 3602879701896397/18014398509481984`). The loss of precision will cause python to have no choice but to return crazy values, so the designers chose not to implement the function.

• You mean `3602879701896397/18014398509481984`. – dan04 Feb 22 '12 at 21:05

Take a look at the number class hierarchy: Python numbers

`numbers.Integral` is a sub class of `numbers.Rational`

It's numbers.Rational that adds the numerator and denominator members.

This is because `int` is a subclass of `rational`, and `float` is not. Since `rational` has a denominator attribute, `int` inherited it.