The linked post is about a symmetric matrix, is this also your case? In that case (if issymmetric returns true for your matrix), the eigenvectors returned by EIG will be orthogonal up to numerical round-off (an exact 0 is not possible in numerical computation, practically speaking).
The proposed solution doesn't improve the eigenvectors, but instead applies a projection to the computed residual vectors, to project out any components along the eigenvectors of the larger eigenvalues. Whether this is useful will depend on your application - that is, do you need to do computations with that residual?
