Consider a linear transformation represented by a matrix , and some vector . If , we say that is an eigenvector of with corresponding eigenvalue . Intuitively, this means that doesn't rotate or change the direction of ; it can only stretch it () or squash it () and maybe flip it (). While this notion may initially seem obscure, it turns out to have many useful applications, and many fundamental properties of a linear transformation can be characterized by its eigenvalues and eigenvectors.