7. 1/4 points | Previous Answers PooleLinAlg4 4.1024. Find all of the eigenvalues λ of the...
13. -14 points PoolelinAlg4 4.1.027. Find all of the eigenvalues of the matrix A over the complex numbers C. Give bases for each of the corresponding eigenspaces. 1-C has eigenspace span has elgenspace (-value with smaller imaginary part) 12 - has eigenspace span (-value with larger imaginary part) Need Help? Read It Talk to a Tutor 14. + -14 points PooleLinAlg4 4.1.030. Find all of the eigenvalues of the matrix A over the complex numbers C. Give bases for each...
Consider the following of the matrix A. Find all eigenvalues - 7,2 Give bases for each of the corresponding eigenspaces smaller A-value spa larger A-value span and a diagonal matrix, such that 'AQ -0. (Enter each matrix in the form [row frow 2, ..., where each rows Orthogonally diagonalue the matrix by finding an orthogonal matrix comma-separated list) (0,0) -
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...
matrix algebra 14. 0/3 points | Previous Answers HoltLinAlg2 6.1.067. Consider the matrix A 00-2-11 1 1 7 6 A=12041 Find the eigenvalues of A. (Enter your answers as a comma-separated list.) Find a basis for each eigenspace. 0 (smaller eigenvalue) (larger eigenvalue) 14. 0/3 points | Previous Answers HoltLinAlg2 6.1.067. Consider the matrix A 00-2-11 1 1 7 6 A=12041 Find the eigenvalues of A. (Enter your answers as a comma-separated list.) Find a basis for each eigenspace. 0...
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....
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)
plz solve all 3 9. (1/5 Points] DETAILS PREVIOUS ANSWERS LARLINALG8 7.1.025. Find the characteristic equation and the eigenvalues and corresponding eigenvectors) of the matrix. 0 -3 -4 4 -6 0 0 (a) the characteristic equation (-23 +812 - 42 - 48) X (b) the eigenvalues (Enter your answers from smallest to largest.) (dzo dz, dz) = (-2,4,6 the corresponding eigenvectors Need Help? Read It Talk to a Tutor Submit Answer 10. [-/1 Points] DETAILS LARLINALG8 7.1.041. Find the eigenvalues...
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.
Consider the 2×22×2 matrix AA given by A=1−2[−5−1−1−5].A=1−2[−5−1−1−5].. Find the eigenvalues λ+λ+ and λ−λ−, larger and smaller or equal or conjugate, respectively, of the matrix AA, I am really stuck on parts b and c so any help would be greatly appreciated! (10 points) 5 Consider the 2 x 2 matrix A given by A al -}] 1 a. (2/10) Find the eigenvalues l_ and _, larger and smaller or equal or conjugate, respectively, of the matrix A, + =...
Consider the 2×22×2 matrix AA given by A=[−3−2029].A=[−32−209].. (2/10) Find the eigenvalues λ+λ+ and λ−λ−, larger and smaller or equal or conjugate, respectively, of the matrix AA, The last part of the problem I can't seem to get. (10 points) -3 2 Consider the 2 x 2 matrix A given by A = - 20 9 a. (2/10) Find the eigenvalues l_ and __, larger and smaller or equal or conjugate, respectively, of the matrix A, d. = 3+2i Σ...