Consider the following of the matrix A. Find all eigenvalues - 7,2 Give bases for each...
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....
7. 1/4 points | Previous Answers PooleLinAlg4 4.1024. Find all of the eigenvalues λ of the matrix A. (Hint: Use the method of Example 4.5 of finding the solutions to the equation 0 = det(A-ÀI. Enter your answers as a comma-separated list.) -13B 5 0 Give bases for each of the corresponding eigenspaces span (smaller λ-value) (larger λ-value)
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...
16.-1 points poolelinalg4 5.4.006.nva My Notes Ask Your Teache Orthogonally diagonalize the matrix below by finding an orthogonal matrix Q and a diagonal matrix D such that QT AQ = D separated list.) Enter each matrix in the form row 1 row 2 where each row is a comma- 3 3 0 0 4 3 Need Help? 17. 1 points poolelinalg4 5.4.009 nva My Notes Ask Your Teacher Orthogonally diagonalize the matrix below by finding an orthogonal matrix Q and...
Find the matrix A of the quadratic form associated with the equation. 48x2 + 72xy + 27y2 - 74x - 52y + 70 = 0 A = Find the eigenvalues of A. (Enter your answers as a comma-separated list.) a = Find an orthogonal matrix P such that PTAP is diagonal. (Enter the matrix in the form [[row 1], [row 2], ...], where each row is a comma-separated list.) P=
Find the matrix A of the quadratic form associated with the equation. 6x2 - 9xy - 6y2 + 5 = 0 A= Find the eigenvalues of A. (Enter your answers as a comma-separated list.) 2 = Find an orthogonal matrix P such that PTAP is diagonal. (Enter the matrix in the form [[row 1], [row 2], ...), where each row is a comma-separated list.) P = Need Help? Read It Talk to a Tutor
Will rate and comment. Thank you ! Find a matrix P such that PTAP orthogonally diagonalizes A. Verify that PTAP gives the proper diagonal form. (Enter each matrix in the form [row 1, [row 2], ...], where each row is a comma-separated list.) 42 €34) A-O 0 2 4 o o 42 (P, PTAP) Find a matrix P such that PTAP orthogonally diagonalizes A. Verify that PTAP gives the proper diagonal form. (Enter each matrix in the form [row 1,...
Please explain steps thanks Find a matrix P such that PTAP orthogonally diagonalizes A. Verify that PTAP gives the proper diagonal form. (Enter each matrix in the form [[row 1], [row 2], ...], where each row is a comma separated list.) -121 Need Help?Read It Talk to a Tutor Show My Work (Optional
step by step please Find the eigenvalues of the matrix and determine whether there is a sufficient number to guarantee that the matrix is diagonalizable. (Recall that the matrix may be diagonalizable even though it is not guaranteed to be diagonalizable by the theorem shown below.) Sufficient Condition for Diagonalization If an n x matrix A has n distinct eigenvalues, then the corresponding cigenvectors are linearly independent and A is diagonalizable 02 Find the eigenvalues. (Enter your answers as a...
Consider the 3 x 3 matrix A defined as follows 7 4-4 a) Find the eigenvalues of A. Is A singular matrix? b) Find a basis for each eigenspace. Then, determine their dimensions c) Find the eigenvalues of A10 and their corresponding eigenspaces. d) Do the eigenvectors of A form a basis for IR3? e) Find an orthogonal matrix P that diagonalizes A f) Use diagonalization to compute A 6