First of all: the behaviour is documented explicitly in the docs for the hash function:
Return the hash value of the object (if it has one). Hash values are
integers. They are used to quickly compare dictionary keys during a
dictionary lookup. Numeric values that compare equal have the same
hash value (even if they are of different types, as is the case for
Secondly, a limitation of hashing is pointed out in the docs for
Called by built-in function
hash() and for operations on members of
hashed collections including
should return an integer. The only required property is that objects
which compare equal have the same hash value;
This is not unique to python. Java has the same caveat: if you implement
hashCode then, in order for things to work correctly, you must implement it in such a way that:
x.hashCode() == y.hashCode().
So, python decided that
1.0 == 1 holds, hence it's forced to provide an implementation for
hash such that
hash(1.0) == hash(1). The side effect is that
1 act exactly in the same way as
dict keys, hence the behaviour.
In other words the behaviour in itself doesn't have to be used or useful in any way. It is necessary. Without that behaviour there would be cases where you could accidentally overwrite a different key.
If we had
1.0 == 1 but
hash(1.0) != hash(1) we could still have a collision. And if
1 collide, the
dict will use equality to be sure whether they are the same key or not and kaboom the value gets overwritten even if you intended them to be different.
The only way to avoid this would be to have
1.0 != 1, so that the
dict is able to distinguish between them even in case of collision. But it was deemed more important to have
1.0 == 1 than to avoid the behaviour you are seeing, since you practically never use
ints as dictionary keys anyway.
Since python tries to hide the distinction between numbers by automatically converting them when needed (e.g.
1/2 -> 0.5) it makes sense that this behaviour is reflected even in such circumstances. It's more consistent with the rest of python.
This behaviour would appear in any implementation where the matching of the keys is at least partially (as in a hash map) based on comparisons.
For example if a
dict was implemented using a red-black tree or an other kind of balanced BST, when the key
1.0 is looked up the comparisons with other keys would return the same results as for
1 and so they would still act in the same way.
Hash maps require even more care because of the fact that it's the value of the hash that is used to find the entry of the key and comparisons are done only afterwards. So breaking the rule presented above means you'd introduce a bug that's quite hard to spot because at times the
dict may seem to work as you'd expect it, and at other times, when the size changes, it would start to behave incorrectly.
Note that there would be a way to fix this: have a separate hash map/BST for each type inserted in the dictionary. In this way there couldn't be any collisions between objects of different type and how
== compares wouldn't matter when the arguments have different types.
However this would complicate the implementation, it would probably be inefficient since hash maps have to keep quite a few free locations in order to have O(1) access times. If they become too full the performances decrease. Having multiple hash maps means wasting more space and also you'd need to first choose which hash map to look at before even starting the actual lookup of the key.
If you used BSTs you'd first have to lookup the type and the perform a second lookup. So if you are going to use many types you'd end up with twice the work (and the lookup would take O(log n) instead of O(1)).