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Consider the following A= 0-51 0 0 6 (a) Compute the characteristic polynomial of A det(A...
o-point Point 43003 Consider the following (a) Compute the characteristic polynomial of A det(A - -...
o-point Point 43003 Consider the following (a) Compute the characteristic polynomial of A det(A - - (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (Repeated eigenvalues should be entered repeatedly with the same eigenspaces.) has eigenspace span (smallest value) has eigenspace span has eigenspace span (largest A-value) (c) Compute the algebraic and geometric multiplicity of each eigenvalue. à has algebraic multiplicity and geometric multiplicity 2, has algebraic multiplicity and geometric multiplicity 2, has algebraic multiplicity and...
4 0 5 A 6-1 6 L5 0 4 (a) Compute the characteristic polynomial of A....
4 0 5 A 6-1 6 L5 0 4 (a) Compute the characteristic polynomial of A. det(A - A) - (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (Repeated eigenvalues should be entered repeatedly with the same eigenspaces.) λι ] has eigenspace span "L (smallest λ-value) has eigenspace span has eigenspace span (largest λ-value)
O 1/13 points | Previous Answers poolelinalg4 4.3.003.nva 5. Consider the following. 1 0 0-3 1...
O 1/13 points | Previous Answers poolelinalg4 4.3.003.nva 5. Consider the following. 1 0 0-3 1 A= 0 4 0 (a) Compute the characteristic polynomial of A. det(A- λ- (1-λ) (-3- λ ) (4- λ ) (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (F λι- has eigenspace span (small λ has eigenspace span has eigenspace span (largestA 41 (c) Compute the algebraic and geometric multiplicity of each eigenvalue. has algebraic multiplicity 2 has algebraic multiplicity...
1 Compute and completely factor the characteristic polynomial of the following matrix: 0 A= -4 5...
1 Compute and completely factor the characteristic polynomial of the following matrix: 0 A= -4 5 0 1 1 For credit, you have to factor the polynomial and show work for each step. B In the following, use complex numbers if necessary. For each of the following matrices: • compute the characteristic polynomial; • list all the eigenvalues (possibly complex) with their algebraic multiplicity; • for each eigenvalue, find a basis (possibly complex) of the corresponding eigenspace, and write the...
3. (a) For the following matrix A, compute the characteristic polynomial C(A) = det(A ?): A-1...
3. (a) For the following matrix A, compute the characteristic polynomial C(A) = det(A ?): A-1 1 (b) Find all eigenvalues of A, using the following additional information: This miatrix has exactly 2 eigenvalues. We denote these ??,A2, where ?1 < ?2. . Each Xi is an integer, and satisfies-2 < ?? 2. (c) Given an eigenvalue ?? of A, we define the corresponding eigenspace to be the nullspace of A-?,I; note that this consists of all eigenvectors corresponding to...
Consider the following. List the eigenvalues of A and bases of the corresponding eigenspaces. (Repeated eigenvalues...
Consider the following. List the eigenvalues of A and bases of the corresponding eigenspaces. (Repeated eigenvalues should be entered repeatedly with the same eigenspaces.) has eigenspace span smallest 2-value has eigenspace span has eigenspace span largest 2-value A3= Determine whether A is diagonalizable. O Yes O No Find an invertible matrix P and a diagonal matrix D such that PAP = D. (Enter each matrix in the form [[row 1], [row 2], ..], where each row is a comma-separated list....
2. (-16 Points) DETAILS CHENEYLINALG2 6.1.017. 0/2 Submissions Used 9 Let A - Find the characteristic...
2. (-16 Points) DETAILS CHENEYLINALG2 6.1.017. 0/2 Submissions Used 9 Let A - Find the characteristic polynomial. 11 Det(A - AI) - Find the eigenvalues and eigenvectors for each eigenvalue. (Order your answers from smallest to largest eigenvalue.) 21 has eigenspace span 12 has eigenspace span Find a matrix P such that p-'AP is a diagonal matrix. P
5. Consider the matrix A-1-6-7-3 Hint: The characteristic polynomial of A is p(λ ) =-(-2)0+ 1)2....
5. Consider the matrix A-1-6-7-3 Hint: The characteristic polynomial of A is p(λ ) =-(-2)0+ 1)2. (a) Find the eigenvalues of A and bases for the corresponding eigenspaces. (b) Determine the geometric and algebraic multiplicities of each eigenvalue and whether A is diagonalizable or not. If it is, give a diagonal matrix D and an invertible matrix S such that A-SDS-1. If it's not, say why not.
(1 point) The linear transformation T: R4 R4 below is diagonalizable. T(x,y,z,w) = (x – -...
(1 point) The linear transformation T: R4 R4 below is diagonalizable. T(x,y,z,w) = (x – - (2x + y), -z, 2 – 3w Compute the following. (Click to open and close sections below). (A) Characteristic Polynomial Compute the characteristic polynomial (as a function of t). A(t) = (B) Roots and Multiplicities Find the roots of A(t) and their algebraic multiplicities. Root Multiplicity t= t= t= t= (Leave any unneeded answer spaces blank.) (C) Eigenvalues and Eigenspaces Find the eigenvalues and...
Consider the matrix A. [ 300 A = 120 L-6 7 -1 Find the characteristic polynomial...
Consider the matrix A. [ 300 A = 120 L-6 7 -1 Find the characteristic polynomial for the matrix A. (Write your answer in terms of .) Find the real eigenvalues for the matrix A. (Enter your answers as a comma-separated list.) A= Find a basis for each eigenspace for the matrix A. (smallest eigenvalue) (largest eigenvalue)
o-point Point 43003 Consider the following (a) Compute the characteristic polynomial of A det(A - - (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (Repeated eigenvalues should be entered repeatedly with the same eigenspaces.) has eigenspace span (smallest value) has eigenspace span has eigenspace span (largest A-value) (c) Compute the algebraic and geometric multiplicity of each eigenvalue. à has algebraic multiplicity and geometric multiplicity 2, has algebraic multiplicity and geometric multiplicity 2, has algebraic multiplicity and...
4 0 5 A 6-1 6 L5 0 4 (a) Compute the characteristic polynomial of A. det(A - A) - (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (Repeated eigenvalues should be entered repeatedly with the same eigenspaces.) λι ] has eigenspace span "L (smallest λ-value) has eigenspace span has eigenspace span (largest λ-value)
O 1/13 points | Previous Answers poolelinalg4 4.3.003.nva 5. Consider the following. 1 0 0-3 1 A= 0 4 0 (a) Compute the characteristic polynomial of A. det(A- λ- (1-λ) (-3- λ ) (4- λ ) (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (F λι- has eigenspace span (small λ has eigenspace span has eigenspace span (largestA 41 (c) Compute the algebraic and geometric multiplicity of each eigenvalue. has algebraic multiplicity 2 has algebraic multiplicity...
1 Compute and completely factor the characteristic polynomial of the following matrix: 0 A= -4 5 0 1 1 For credit, you have to factor the polynomial and show work for each step. B In the following, use complex numbers if necessary. For each of the following matrices: • compute the characteristic polynomial; • list all the eigenvalues (possibly complex) with their algebraic multiplicity; • for each eigenvalue, find a basis (possibly complex) of the corresponding eigenspace, and write the...
3. (a) For the following matrix A, compute the characteristic polynomial C(A) = det(A ?): A-1 1 (b) Find all eigenvalues of A, using the following additional information: This miatrix has exactly 2 eigenvalues. We denote these ??,A2, where ?1 < ?2. . Each Xi is an integer, and satisfies-2 < ?? 2. (c) Given an eigenvalue ?? of A, we define the corresponding eigenspace to be the nullspace of A-?,I; note that this consists of all eigenvectors corresponding to...
Consider the following. List the eigenvalues of A and bases of the corresponding eigenspaces. (Repeated eigenvalues should be entered repeatedly with the same eigenspaces.) has eigenspace span smallest 2-value has eigenspace span has eigenspace span largest 2-value A3= Determine whether A is diagonalizable. O Yes O No Find an invertible matrix P and a diagonal matrix D such that PAP = D. (Enter each matrix in the form [[row 1], [row 2], ..], where each row is a comma-separated list....
2. (-16 Points) DETAILS CHENEYLINALG2 6.1.017. 0/2 Submissions Used 9 Let A - Find the characteristic polynomial. 11 Det(A - AI) - Find the eigenvalues and eigenvectors for each eigenvalue. (Order your answers from smallest to largest eigenvalue.) 21 has eigenspace span 12 has eigenspace span Find a matrix P such that p-'AP is a diagonal matrix. P
5. Consider the matrix A-1-6-7-3 Hint: The characteristic polynomial of A is p(λ ) =-(-2)0+ 1)2. (a) Find the eigenvalues of A and bases for the corresponding eigenspaces. (b) Determine the geometric and algebraic multiplicities of each eigenvalue and whether A is diagonalizable or not. If it is, give a diagonal matrix D and an invertible matrix S such that A-SDS-1. If it's not, say why not.
(1 point) The linear transformation T: R4 R4 below is diagonalizable. T(x,y,z,w) = (x – - (2x + y), -z, 2 – 3w Compute the following. (Click to open and close sections below). (A) Characteristic Polynomial Compute the characteristic polynomial (as a function of t). A(t) = (B) Roots and Multiplicities Find the roots of A(t) and their algebraic multiplicities. Root Multiplicity t= t= t= t= (Leave any unneeded answer spaces blank.) (C) Eigenvalues and Eigenspaces Find the eigenvalues and...
Consider the matrix A. [ 300 A = 120 L-6 7 -1 Find the characteristic polynomial for the matrix A. (Write your answer in terms of .) Find the real eigenvalues for the matrix A. (Enter your answers as a comma-separated list.) A= Find a basis for each eigenspace for the matrix A. (smallest eigenvalue) (largest eigenvalue)
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