If you know the definition of a sample correlation coefficient then the answer is simple.

Since `B`

is 4 by 4, I think I can safely assume that `Classz`

is a row vector of observations on some random variable, and that you have 4 such row vectors. Thus X is a N by 4 matrix, with columns corresponding to random variables 1 to 4, and rows corresponding to observations on the random variables.

If you check the documentation in the link provided by Mark Elliot, you'll note that this implies that `X`

has the correct orientation for applying the `corrcoef`

function.

The output of `corrcoef`

is the sample correlation matrix. It is 4 by 4 since you have 4 random variables (columns of `X`

) to start with. The diagonals of this matrix correspond to each random variables correlation with itself (hence they're all equal to 1). The off-diagonals correspond to sample correlation coefficients between the random variables. That is, the number in element (2, 3) is the sample correlation coefficient between random variable 2 and 3 (ie column 2 and 3 of `X`

). Since the sample correlation coefficient between 2 and 3 is the same as between 3 and 2, `B`

is thus symmetric by construction.

Hopefully this clears it up. If the problem is that you don't know what a correlation coefficient is, then SO is probably not the right forum. Maybe do some research of your own and then if you still have a question post it to Math Exchange.