# Can I use xor on numpy matrices?

I have 2 numpy matrix like this.

matrix1

``````arr1 =
array([[ 0.,  0.,  0.],
[ 0.,  0.,  0.],
[ 0.,  1.,  0.]])
``````

matrix2

``````arr2 =
array([[ 0.,  0.,  0.],
[ 0.,  0.,  1.],
[ 0.,  0.,  0.]])
``````

I want to find similarity of these matrices. I think `xor` can be used on matrices. Xor operation should show where values are different and then I can count value 1 to calculate a percentage of similarity. I don't know how to use `xor` in python.

This code doesn't work: `a = arr1 xor arr2` .

• Are all elements `0` or `1`? Mar 1, 2017 at 18:02
• XOR in Python is `^`, not `xor`. Mar 1, 2017 at 18:08

You can simply use `arr1 != arr2` which results in:

``````>>> arr1 != arr2
array([[False, False, False],
[False, False,  True],
[False,  True, False]], dtype=bool)``````

and then use `.sum()` since `int(False)` is `0` and `int(True)` is `1`:

``````>>> (arr1 != arr2).sum()
2``````

So there are two indices for which `arr1[i,j]` is not equal to `arr2[i,j]`.

If you want to calculate the similarity (here defined as the number of elements that are the same) you can use:

``````>>> (arr1 == arr2).sum()/arr1.size
0.77777777777777779``````

so 77.77% of the elements are the same.

There is also the inbuilt function bitwise_xor

A XOR B means:

(A and not B) or (B and not A):

``````AxorB = (A>B)+(B>A)
``````

... at least for Boolean arrays.

If you have binary ndarrays then you could use `logical_xor()` too:

``````np.logical_xor(arr1, arr2).sum()
# 2
``````