When I tried to compute `w^T * x`

using numpy, it was super confusing for me as well. In fact, I couldn't implement it myself. So, this is one of the few gotchas in NumPy that we need to acquaint ourselves with.

As far as *1D array* is concerned, there is **no distinction between a row vector and column vector**. They are exactly the same.

Look at the following examples, where we get the same result in all cases, which is not true in (*the theoretical sense of*) linear algebra:

```
In [37]: w
Out[37]: array([0, 1, 2, 3, 4])
In [38]: x
Out[38]: array([1, 2, 3, 4, 5])
In [39]: np.dot(w, x)
Out[39]: 40
In [40]: np.dot(w.transpose(), x)
Out[40]: 40
In [41]: np.dot(w.transpose(), x.transpose())
Out[41]: 40
In [42]: np.dot(w, x.transpose())
Out[42]: 40
```

With that information, now let's try to compute the squared length of the vector `|w|^2`

.

For this, we need to transform `w`

to 2D array.

```
In [51]: wt = w[:, np.newaxis]
In [52]: wt
Out[52]:
array([[0],
[1],
[2],
[3],
[4]])
```

Now, let's compute the squared length (or squared magnitude) of the vector `w`

:

```
In [53]: np.dot(w, wt)
Out[53]: array([30])
```

Note that we used `w`

, `wt`

instead of `wt`

, `w`

(like in theoretical linear algebra) because of shape mismatch with the use of np.dot(wt, w). So, we have the squared length of the vector as `[30]`

. Maybe this is one of the ways to distinguish (numpy's interpretation of) row and column vector?

And finally, did I mention that I figured out the way to implement `w^T * x`

? Yes, I did :

```
In [58]: wt
Out[58]:
array([[0],
[1],
[2],
[3],
[4]])
In [59]: x
Out[59]: array([1, 2, 3, 4, 5])
In [60]: np.dot(x, wt)
Out[60]: array([40])
```

So, in NumPy, the order of the operands is reversed, as evidenced above, contrary to what we studied in theoretical linear algebra.

**P.S.** : potential gotchas in numpy

correct"in the real world": aonedimensional sequence of numbers is neither a row nor a column vector. A row or column vector is in fact atwodimensional array (in which one of the two dimensions is 1). Thus, your tests should be done with`array([[1, 2, 3]])`

, instead, which is not equal to its transpose. – Eric O Lebigot May 27 '15 at 5:57quiteright. What you are describing is the way things are e.g. in Matlab, and it is an extremely useful convention. The mathematically correct way would be to distinguish between vectors from a given space (per convention represented as columns) and vectors from its dual space (per convention represented as rows). – A. Donda May 20 at 22:52