Posted on January 2, 2013
Looking for Eigenvalue and Eigenvalue Eigenvector
Eigenvalue of a square matrix is the characteristic polynomial of the matrix; if λ is the eigenvalue of A it will be equivalent to a linear equation (A - λI) v = 0 (where I is the identity matrix) which has a non-zero solution v (an eigenvector), so it will be equivalent to the determinant.
Looking for Eigenvalue and Eigenvalue Eigenvector
Eigenvalue of a square matrix is the characteristic polynomial of the matrix; if λ is the eigenvalue of A it will be equivalent to a linear equation (A - λI) v = 0 (where I is the identity matrix) which has a non-zero solution v (an eigenvector), so it will be equivalent to the determinant.
