# Making a matrix square and padding it with desired value in numpy

In general we could have matrices of arbitrary sizes. For my application it is necessary to have square matrix. Also the dummy entries should have a specified value. I am wondering if there is anything built in numpy?

Or the easiest way of doing it

EDIT :

The matrix X is already there and it is not squared. We want to pad the value to make it square. Pad it with the dummy given value. All the original values will stay the same.

Thanks a lot

-

Edit

To expand an existing array, use `resize`:

``````x = np.random.rand(3,5)

x1 = np.resize(x, (5,5))  # Repeat the column

x.resize((5,5))  # Fill with zeros
``````

Unfortunately I do not know how to pad it with a specific value, aside from explicit arithmetic.

(Not directly relevant, but I'll keep it here for the time being)

If a multidimensional array is sufficient:

``````import numpy as np

M = N = 5
x = np.zeros((M, N))  # Note the tuple argument
``````

For a nonzero value, you have a few options.

``````K = 7.
x[:,:] = K
``````

This is one popular method (mostly us ex-Matlab users I'd guess):

``````x = np.ones((M,N)) * K
``````

But this is quite a bit faster:

``````x = np.empty((M,N))    # Contains random memory values
x.fill(K)
``````

If you want to put some random content:

``````x = np.random.rand(M, N)   # No tuple this time
``````

If you do need a proper matrix (transposes, eigenvalues, etc.), wrap it with the matrix function:

``````m = np.matrix(x)
``````
-
thanks for the answer... I should have mentioned that we already have a matrix which is not square we want to make it square. –  Shan Jun 3 '12 at 15:37
Ahh, OK, sorry! That's a completely different question! –  marshall.ward Jun 3 '12 at 15:39

For a 2D numpy array `m` it’s straightforward to do this by creating a `max(m.shape)` x `max(m.shape)` array of ones `p` and multiplying this by the desired padding value, before setting the slice of `p` corresponding to `m` (i.e. `p[0:m.shape[0], 0:m.shape[1]]`) to be equal to `m`.

This leads to the following function, where the first line deals with the possibility that the input has only one dimension (i.e. is an array rather than a matrix):

``````import numpy as np

m = a.reshape((a.shape[0], -1))
``````

So, for example:

``````>>> r1 = np.random.rand(3, 5)
>>> r1
array([[ 0.85950957,  0.92468279,  0.93643261,  0.82723889,  0.54501699],
[ 0.05921614,  0.94946809,  0.26500925,  0.02287463,  0.04511802],
[ 0.99647148,  0.6926722 ,  0.70148198,  0.39861487,  0.86772468]])
array([[ 0.85950957,  0.92468279,  0.93643261,  0.82723889,  0.54501699],
[ 0.05921614,  0.94946809,  0.26500925,  0.02287463,  0.04511802],
[ 0.99647148,  0.6926722 ,  0.70148198,  0.39861487,  0.86772468],
[ 3.        ,  3.        ,  3.        ,  3.        ,  3.        ],
[ 3.        ,  3.        ,  3.        ,  3.        ,  3.        ]])
``````

or

``````>>> r2=np.random.rand(4)
>>> r2
array([ 0.10307689,  0.83912888,  0.13105124,  0.09897586])