# Laplacian and Gaussian Filter

I am trying to do some image processing and I would like to apply the LoG kernel. I know the formula, which is :

But I didn't understand how to obtain the kernel matrix with this formula. From what I have read, I have a matrix of n x n and I apply this formula to every cell in that matrix, but what should be the starting values within that matrix in the first place.

Also, I have the same question with the Laplacian filer. I know the formula, which is:

and also, from what I have read, the 3 x 3 filter should be the matrix:

`x = [1 1 1; 1 -4 1; 1 1 1]`

but can you please tell me how to apply the formula in order to obtain the matrix, or at least indicate me a tutorial of how to apply this.

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I think this has already been covered in this question: Laplacian of gaussian filter use but if not then feel free to expand on your question. –  Paul R Oct 21 '10 at 11:07

Basically, we are just going from continuous space to discrete space. The first derivative in continuous time (space) is analogous to the first difference in discrete time (space). To compute the first difference of a discrete-time signal, you convolve `[1 -1]` over the signal. To compute the second difference, you convolve a signal with `[1 -2 1]` (which is `[1 -1]` convolved with itself, or equivalently, convolving the signal with `[1 -1]` twice).