I'm trying to understand how numpy works when you try to call the dot product of two row vectors.
I have this code:
X = np.array([[1,2,3]])
THETA = np.array([[1,2,3]])
print X.dot(THETA)
This gives me the error:
ValueError: shapes (1,3) and (1,3) not aligned: 3 (dim 1) != 1 (dim 0)
I thought that you could take the dot product of two row vectors however to get:
x1*theta1 + x2*theta2 + x3*theta3
And this would also transfer to the dot product of two column vectors.
The weird part is, I have to take the transpose of the second matrix in order to actually use the dot product:
print X.dot(THETA.T)
array([[14]])
However, I didn't think this would actually work, and why it would work instead of just doing a row dot row operation. Can anyone help me understand what's going on? Is it some rule in linear algebra that I forgot from long ago?
X.dot(THETA.T)
to compute linear response and I had trouble understanding why he had to transpose it.