Diagonalize this 3x3 matrix: 1 3 3 -3 -5 -3 3 3 1

Consider 3x3 matrix A with eigenvalues -1, 2, 3. Find the trace and determinant of A....

Consider 3x3 matrix A with eigenvalues -1, 2, 3. Find the trace and determinant of A. Then, find the eigenvalues of A3 and A-1.

Find all eigenvalues and eigenvectors for the 3x3 matrix A= 1 3 2 -1 2   1...

Find all eigenvalues and eigenvectors for the 3x3 matrix A= 1 3 2 -1 2   1 4 -1 -1

Find all eigenvectors of this 3x3 matrix, when the eigenvalues are lambda = 1, 2, 3...

Find all eigenvectors of this 3x3 matrix, when the eigenvalues are lambda = 1, 2, 3 4 0 1 -2 1 0 -2 0 1

What are the eigenvalues and eigenvectors of the 3x3 matrix [1 1 1], [1 1 1],...

What are the eigenvalues and eigenvectors of the 3x3 matrix [1 1 1], [1 1 1], [1 1 1]

True/False? If 0 is an eigenvalue of a 3x3 matrix A with geometric multiplicity ug(A,0)=3, then...

True/False? If 0 is an eigenvalue of a 3x3 matrix A with geometric multiplicity ug(A,0)=3, then A is the zero-matrix, that is A=0 The answer is True, but I don't understand why.

The matrix A= 1 0 0 -1 0 0 1 1 1 3x3 matrix has two...

The matrix A= 1 0 0 -1 0 0 1 1 1 3x3 matrix has two real eigenvalues, one of multiplicity 11 and one of multiplicity 22. Find the eigenvalues and a basis of each eigenspace. λ1 =..........? has multiplicity 1, with a basis of .............? λ2 =..........? has multiplicity 2, with a basis of .............? Find two eigenvalues and basis.

Solve the following system (d/dt)X=(3x3 matrix) (-1 -1 0; 1 -1 1; 0 1 1)X+(column matrix)...

Solve the following system (d/dt)X=(3x3 matrix) (-1 -1 0; 1 -1 1; 0 1 1)X+(column matrix) (e^-t; 0; -e^-t)

I'm attempting to diagonalize my 3x3 matrix, but with only 2 eigenvectors I am having trouble...

I'm attempting to diagonalize my 3x3 matrix, but with only 2 eigenvectors I am having trouble organizing my A=PDP^-1. Original matrix [0 0 1] . Calculated eigenvalues: (2,-2) . Calculated eigenvectors: [1/2] [0] [-1/2] [0 2 0] [0] [1] . [0] [4 0 0] [1] [0] [1] If I only have 2 eigenvalues, what do i put for my 3x3 D matrix? What order should I place my Eigenvectors in for my 3x3 P matrix?

Suppose a 3x3 real matrix A=[a b c; d e f; g h i] has determinant...

Suppose a 3x3 real matrix A=[a b c; d e f; g h i] has determinant 5. What is the determinant of the 3x3 matrix B=[2a 2c 2b; 2d 2f 2e; 2g 2i 2h]?

How may ways can you partition a 3x3 matrix?

How may ways can you partition a 3x3 matrix?