# Vectorization of a gradient descent code

I am implementing a batch gradient descent on Matlab. I have a problem with the update step of `theta`. `theta` is a vector of two components (two rows). `X` is a matrix containing `m` rows (number of training samples) and `n=2` columns (number of features). Y is an `m` rows vector.

During the update step, I need to set each `theta(i)` to

``````theta(i) = theta(i) - (alpha/m)*sum((X*theta-y).*X(:,i))
``````

This can be done with a `for` loop, but I can't figure out how to vectorize it (because of the `X(:,i)` term).

Any suggestion?

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I do have a suggestion: next time format your code properly –  Luis Mendo Dec 23 '13 at 0:01
If `X` has size m x 2, `theta` is 2 x 1 and `y` is m x 1, how is `X*theta` defined? How do you subtract `y` from that? And how do you multiply the result times the column vector `X(:,i)`? –  Luis Mendo Dec 23 '13 at 0:07
@LuisMendo. By using the rules of matrix multiplication –  Mad Physicist Dec 23 '13 at 0:07
@MadPhysicist Oh, I see. Sorry –  Luis Mendo Dec 23 '13 at 0:08
@LuisMendo if `X` has size mx2 `theta` is 2x1 then `X*theta` is mx1 and we can substract `y` (mx1). The multiplication by `X(:,i)` is a term by term multiplication (`.*`) –  bigTree Dec 23 '13 at 0:10

``````theta = theta - (alpha/m) * (X' * (X*theta-y));