HP 48gII hp 48gII_user's manual_English_E_HDPMSG48E67_V2.pdf - Page 370

Eigenvalues and eigenvectors Given a square matrix A, we can write the eigenvalue equation A⋅x = λ⋅x, where the values of λ that satisfy the equation are known as the eigenvalues of matrix A. For each value of λ, we can find, from the same equation, values of x that satisfy the eigenvalue equation. These values of x are known as the eigenvectors of matrix A. The eigenvalues equation can be written also as (A - λ⋅I)x = 0. This equation will have a non-trivial solution only if the matrix (A - λ⋅I) is singular, i.e., if det(A - λ⋅I) = 0. The last equation generates an algebraic equation involving a polynomial of order n for a square matrix An×n. The resulting equation is known as the characteristic polynomial of matrix A. Solving the characteristic polynomial produces the eigenvalues of the matrix. The calculator provides a number of functions that provide information regarding the eigenvalues and eigenvectors of a square matrix. Some of these functions are located under the menu MATRICES/EIGEN activated through „Ø. Function PCAR Function PCAR generates the characteristic polynomial of a square matrix using the contents of variable VX (a CAS reserved variable, typically equal to 'X') as the unknown in the polynomial. For example, enter the following matrix in ALG mode and find the characteristic equation using PCAR: [[1,5,-3],[2,-1,4],[3,5,2]] Page 11-44