Suppose the eigenvalues of a 3x 3 matrix A are λ1-5 λ2-4 andh"4 with corresponding eigenvectors v...
Let A be a 2x2 matrix with eigenvalues 5 and 3 and corresponding eigenvectors V1 = | Let {XK) be a solution of the difference equation asmenn :)--[;)] wywood 11 **+1 = Axx, Xo = a. Computex, = Axo. (Hint: You do not need to know A itself.] b. Find a formula for xk involving k and the eigenvectors V, and V2.
(1 point) Consider a matrix A with eigenvalues λ1-0.6, λ2--05, λ3--1 and corresponding eigenvectors 0 2 V1 6 0 Suppose x4vi 5v2 5v3 a. Find an expression for A*x. 26.6333,18.96667,19.4> b. Find Akx. lim Akx - Note: Fill up all the blanks before submitting your answers. Input vectors using angle brackets and commas. For more information, click help (vectors).
Let A be a 2x2 matrix with eigenvalues 4 and and corresponding eigenvectors V, = and v2 Let} be a solution of the difference equation X: 1 -AX. Xo' - a Computex, = Ax (Hint: You do not need to know itselt b. Find a formula for x, involving k and the eigenvectors V, and v2 a x Ax=(Type an integer or simplified fraction for each matrix element) b. xxv.v2 (Type expressions using k as the variable.)
.3 Suppose the eigenvalues of a 3x3 matrix A are A, 4, , and A 6' %3D with corresponding eigenvectors v,= V2= and v Let -2 -5 6. 11 Find the solution of the equation x Ax, for the specified x, and describe what happens ask-o. 13 Find the solution of the equation X1AX Choose the correct answer below. 4. 1. O A. X=2.(4)* +3. -4 1. 6. -5 -2 -3 O B. X=2.(4)* 0 +3. 1. -5 6. 11...
and v2-0 | are eigenvectors or a matnx A corresponding to the eigenvalues λι-5 and λ2 -4, respectively. (1 point) if v, = then A(v, + v2)- and A(-2y)- Note: Input a vector using angle brackets and commas. For example, enter 2 as "<1,2,3>". For more information, click help (vectors).
5. The following matrix B has known eigenvalues λ1-1 and λ2-6. 10a-1 B-0b-23 c30 0 Where a, b and c real numbers and vis the eigenvector associated with the eigenvalue A1. e. Determine as many of a, b, and c as you can. f.Determine the third eigenvalue, if possible. g.Determine the second and third eigenvectors, if possible.
Find the characteristic equation and the eigenvalues (and corresponding eigenvectors) of the matrix. -4 4-6 (a) the characteristic equation (b) the eigenvalues (Enter your answers from smallest to largest.) A1, ?2, ?3) the corresponding eigenvectors X1 =
Let A be an n × n real symmetric matrix with its row and column sums both equal to 0. Let λ1, . . . , λn be the eigenvalues of A, with λn = 0, and with corresponding eigenvectors v1,...,vn (these exist because A is real symmetric). Note that vn = (1, . . . , 1). Let A[i] be the result of deleting the ith row and column. Prove that detA[i] = (λ1···λn-1)/n. Thus, the number of spanning...
Problem 2. Find the eigenvalues Xi and the corresponding eigenvectors v; of the matrix -4 6 -12 A-3 -16, (3 3 8 and also find an invertible matrix P and a diagonal matrix D such that D=P-AP or A = PDP-
3. Find all the eigenvalues and corresponding eigenspaces for the matrix B = 4. Show that the matrix B = 0 1 is not diagonalizable. 0 4] Lo 5. Let 2, and 1, be two distinct eigenvalues of a matrix A (2, # 12). Assume V1, V2 are eigenvectors of A corresponding to 11 and 22 respectively. Prove that V1, V2 are linearly independent.