# Zero under diagonal elements by given column index

Having square matrix `A` and I want to zero all its under diagonal elements in column `i` using operations performed on the associated matrix as describe in Gaussian elimination ,

mean `R(t) = R(t)-m*R(i) | t > i` .

I tried `A( (i+1):n,: ) = A( (i+1):n,: ) - (A( (i+1):n)/A(i,i))*(A(i,:))` with no luck .

you can assume that `i` isn't the last column .

Edit:

For example - for `i=1` the follow matrix `A`

become to be -

since `m=1/4` and `m=2/4` for 2nd 3nd row respectively .

-
Show examples. As is your question is vague –  Rasman May 29 '13 at 11:48
@Rasman : added –  URL87 May 29 '13 at 11:53
What do you mean by a quadratic matrix? Never seen one of them. –  user85109 May 29 '13 at 12:36
@woodchips : sorry .. English isn't my native and I relied on google translate . fixed . –  URL87 May 29 '13 at 12:41

The way I would solve your problem is through basic linear algebra...

First divide the residual row by the diagonal element, multiply the row vector to the main column vector to be removed (resulting in a n*m matrix) then subtract from the submatrix to be operated on:

``````A(i+1:end,i:end) = A(i+1:end,i:end)- A(i+1:end,i)* A(i,i:end)/A(i,i)
``````
-
``````A( (i+1):n,: ) = A( (i+1):n,: ) -  ((A( (i+1):n,:  )/A(i,i)).*( ones(n-i,1) *(A(i,:))))
The additional multiplication by the vector of `1` create a matrix whose size is the same as `A( (i+1):n)` but with `A(i,:)` in each line. The component-wise product can then be used. This gives the correct answer without explicit loop.