From Numpy's tutorial, axis can be indexed with integers, like 0 is for column, 1 is for row, but I don't grasp why they are indexed this way? And How do I figure out each axis' index when coping with multidimensional array?

  • 6
    0 should refer to the rows and 1 should refer to the columns. I suspect you are thinking of e.g. .sum(axis=0) which sums along the rows (producing column totals). – nneonneo Jun 13 '13 at 4:34
  • @nneonneo, yes that's what I mean, so how do I know the index of each axis? – Alcott Jun 13 '13 at 4:41
up vote 69 down vote accepted

By definition, the axis number of the dimension is the index of that dimension within the array's shape. It is also the position used to access that dimension during indexing.

For example, if a 2D array a has shape (5,6), then you can access a[0,0] up to a[4,5]. Axis 0 is thus the first dimension (the "rows"), and axis 1 is the second dimension (the "columns"). In higher dimensions, where "row" and "column" stop really making sense, try to think of the axes in terms of the shapes and indices involved.

If you do .sum(axis=n), for example, then dimension n is collapsed and deleted, with each value in the new matrix equal to the sum of the corresponding collapsed values. For example, if b has shape (5,6,7,8), and you do c = b.sum(axis=2), then axis 2 (dimension with size 7) is collapsed, and the result has shape (5,6,8). Furthermore, c[x,y,z] is equal to the sum of all elements b[x,y,:,z].

  • Thanks for this answer. It cleared things up a lot for me. – Vikash Madhow Jun 10 '16 at 5:32
  • 2
    this might help visualize youtu.be/gtejJ3RCddE?t=2h38m15s – bicepjai Jul 3 '17 at 7:05
  • 1
    Thanks a lot, @nneonneo. Finally, I understand. Now I am curious about your explanation. I did not find in the official documentation. Where did you study these from? If it is your creation then please do tell if you have any blog or sth where I can learn more of these. – zeal Feb 27 at 10:47
  • StackOverflow is my blog for things like this...just browse my other NumPy answers :) – nneonneo Feb 27 at 12:14
  • 1
    @PirateApp as I said, it's a bit hard to apply those terms to a 3D array. The position of a "depth" channel depends on the application and convention - sometimes it's 0, sometimes 2, sometimes it doesn't make sense to have a "depth" channel at all. – nneonneo Apr 25 at 16:22

In general, axis = 0, means all cells with first dimension varying with each value of 2nd dimension and 3rd dimension and so on

For example , 2-dimensional array has two corresponding axes: the first running vertically downwards across rows (axis 0), and the second running horizontally across columns (axis 1)

For 3D, it becomes complex, so, use multiple for loops

>>> x = np.array([[[ 0,  1,  2],
    [ 3,  4,  5],
    [ 6,  7,  8]],
   [[ 9, 10, 11],
    [12, 13, 14],
    [15, 16, 17]],
   [[18, 19, 20],
    [21, 22, 23],
    [24, 25, 26]]])

>>> x.shape #(3, 3, 3)

#axis = 0 
>>> for j in range(0, x.shape[1]):
      for k in range(0, x.shape[2]):
        print( "element = ", (j,k), " ", [ x[i,j,k] for i in range(0, x.shape[0]) ])
...
element =  (0, 0)   [0, 9, 18]             #sum is 27
element =  (0, 1)   [1, 10, 19]            #sum is 30
element =  (0, 2)   [2, 11, 20]
element =  (1, 0)   [3, 12, 21]
element =  (1, 1)   [4, 13, 22]
element =  (1, 2)   [5, 14, 23]
element =  (2, 0)   [6, 15, 24]
element =  (2, 1)   [7, 16, 25]
element =  (2, 2)   [8, 17, 26]

>>> x.sum(axis=0)            
array([[27, 30, 33],
       [36, 39, 42],
       [45, 48, 51]])

#axis = 1    
for i in range(0, x.shape[0]):
    for k in range(0, x.shape[2]):
        print( "element = ", (i,k), " ", [ x[i,j,k] for j in range(0, x.shape[1]) ])

element =  (0, 0)   [0, 3, 6]      #sum is 9 
element =  (0, 1)   [1, 4, 7]
element =  (0, 2)   [2, 5, 8]
element =  (1, 0)   [9, 12, 15]
element =  (1, 1)   [10, 13, 16]
element =  (1, 2)   [11, 14, 17]
element =  (2, 0)   [18, 21, 24]
element =  (2, 1)   [19, 22, 25]
element =  (2, 2)   [20, 23, 26]

# for sum, axis is the first keyword, so we may omit it,

>>> x.sum(0), x.sum(1), x.sum(2)
(array([[27, 30, 33],
        [36, 39, 42],
        [45, 48, 51]]),
 array([[ 9, 12, 15],
        [36, 39, 42],
        [63, 66, 69]]),
 array([[ 3, 12, 21],
        [30, 39, 48],
        [57, 66, 75]]))

You can grasp axis in this way:

>>> a = np.array([[[1,2,3],[2,2,3]],[[2,4,5],[1,3,6]],[[1,2,4],[2,3,4]],[[1,2,4],[1,2,6]]])
array([[[1, 2, 3],
    [2, 2, 3]],

   [[2, 4, 5],
    [1, 3, 6]],

   [[1, 2, 4],
    [2, 3, 4]],

   [[1, 2, 4],
    [1, 2, 6]]])
>>> a.shape
(4,2,3)

I created an array of a shape with different values(4,2,3) so that you can tell the structure clearly. Different axis means different 'layer'.

That is, axis = 0 index the first dimension of shape (4,2,3). It refers to the arrays in the first []. There are 4 elements in it, so its shape is 4:

  array[[1, 2, 3],
        [2, 2, 3]],

  array[[2, 4, 5],
        [1, 3, 6]],

  array[[1, 2, 4],
        [2, 3, 4]],

  array[[1, 2, 4],
        [1, 2, 6]]

axis = 1 index the second dimension in shape(4,3,2). There are 2 elements in each array of the layer: axis = 0,e.c. In the array of

 array[[1, 2, 3],
       [2, 2, 3]]

. The two elements are:

array[1, 2, 3]

array[2, 2, 3]

And the third shape value means there are 3 elements in each array element of layer: axis = 2. e.c. There are 3 elements in array[1, 2, 3]. That is explicit.

And also, you can tell the axis/dimensions from the number of [] at the beginning or in the end. In this case, the number is 3([[[), so you can choose axis from axis = 0, axis = 1 and axis = 2.

  • might wanna correct that 4,3,2 to 4,2,3 :) – PirateApp Apr 25 at 7:24

If at all anyone need this visual description:

Numpy array axis 0 and 1

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