Homework Answers
2. [-12 Points) DETAILS LARLINALG8 7.2.005. Consider the following. -4 20 0 1 -3 A =...
2. [-12 Points) DETAILS LARLINALG8 7.2.005. Consider the following. -4 20 0 1 -3 A = 040 P= 04 0 4 0 2 1 2 2 (a) Verify that A is diagonalizable by computing p-AP. p-1AP = 11 (b) Use the result of part (a) and the theorem below to find the eigenvalues of A. Similar Matrices Have the Same Eigenvalues If A and B are similar n x n matrices, then they have the same eigenvalues. (91, 12, 13)...
Question 5 Suppose that A is the matrix (51 -1 A= 0 4 0 1 1...
Question 5 Suppose that A is the matrix (51 -1 A= 0 4 0 1 1 3 (a) Find an invertible matrix P such that P-1AP = J where J is a Jordan normal form. Now consider the system of differential equations f'(t) = 5f(t) +g(t) - h(t), 9'(t) = 49(t) and h'(t) = f(t)+g(t) + 3h(t). (b) Find the general solution to this system of differential equations. (c) What is the dominant long-term behaviour of this system? For what...
(4) (15 marks) Repeat the Question 2 for the following matrices -3 4 0] 0 0...
(4) (15 marks) Repeat the Question 2 for the following matrices -3 4 0] 0 0 A -2 30 B 0 -1 0 -8 8 1 0 0 1 ū= 10 = > 3 (I) (2 mark) Find the characteristic polynomial of matrix A. (II) (1 mark) Find eigenvalues of the matrix A. III) (2 mark) Find a basis for the eigenspaces of matrix A. IV) (1 mark) What is the algebraic and geometric multiplicities of its eigenvalues. (V) (2...
Problem. Let A=1-1-2-2-2 0-2 1 1 -1 21 0 (a) Find a Jordan form J for A (b) Find the change of ba...
Problem. Let A=1-1-2-2-2 0-2 1 1 -1 21 0 (a) Find a Jordan form J for A (b) Find the change of basis matrix X such that X-1 AX = J.
Problem. Let A=1-1-2-2-2 0-2 1 1 -1 21 0 (a) Find a Jordan form J for A (b) Find the change of basis matrix X such that X-1 AX = J.
4. Consider the following matrix [1 0 -27 A=000 L-2 0 4] (a) (3 points) Find...
4. Consider the following matrix [1 0 -27 A=000 L-2 0 4] (a) (3 points) Find the characteristic polynomial of A. (b) (4 points) Find the eigenvalues of A. Give the algebraic multiplicity of each eigenvalue (c) (8 points) Find the eigenvectors corresponding to the eigenvalues found in part (b). (d) (4 points) Give a diagonal matrix D and an invertible matrix P such that A = PDP-1 (e) (6 points) Compute P-and verify that A= PDP- (show your steps).
solve it clear please ????? 6 0 0 1 Q2. Consider the matrix A = 2...
solve it clear please ?????
6 0 0 1 Q2. Consider the matrix A = 2 -5 -6 -50 (a) Find all eigenvalues of the matrix A. (7 pts) (b) Find all eigenvectors of the matrix A. (8 pts) (c) Do you think that the set of the eigenvectors of A is a basis for the vector space R$? (Justify your answer) (5 pts) Q5. Consider the square matrix A = (a) Show that the characteristic polynomial of A is:...
1. Determine the polynomial function whose graph passes through the points (0, 10), (1, 7), (3,...
1. Determine the polynomial function whose graph passes through the points (0, 10), (1, 7), (3, -11), and (4, -14). Be sure to include a sketch of the polynomial functions, showing the points. Solve using the Gauss-Jordan method or Gaussian elimination with back substitution. Show the matrix and rovw operation used for each step. 2. The figure below shows the flow of traffic (in vehicles per hour) through a network of streets. 300 200 100 500 YA Y 600 400...
Consider the matrix A= 2 -2 0 1 -1 0 2 -4 1 which has eigenvalues...
Consider the matrix A= 2 -2 0 1 -1 0 2 -4 1 which has eigenvalues 1 = 1,1,0. a) Show that the characteristic polynomial of A is p(a) = -2(1 - 1) 2. b) Compute the eigenvectors of A. c) show that what you found are indeed eigenvalue- eigenvector pairs for A.
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.
Consider the matrix A= (1 -2 12 2 1 4 -1 1 – 2 1. Find...
Consider the matrix A= (1 -2 12 2 1 4 -1 1 – 2 1. Find an echelon form for A. Denote this by U. 2. Describe each step towards the echelon form by an elementary matrix Ek 3. Write the matrix equation describing the transformation between A to the echelon form U, EmEm-1 ... E2E A = U. 4. Solve for A from the previous equation and label L= E,'E;'... EmEm. 5. Compute LU and show that it is...
2. [-12 Points) DETAILS LARLINALG8 7.2.005. Consider the following. -4 20 0 1 -3 A = 040 P= 04 0 4 0 2 1 2 2 (a) Verify that A is diagonalizable by computing p-AP. p-1AP = 11 (b) Use the result of part (a) and the theorem below to find the eigenvalues of A. Similar Matrices Have the Same Eigenvalues If A and B are similar n x n matrices, then they have the same eigenvalues. (91, 12, 13)...
Question 5 Suppose that A is the matrix (51 -1 A= 0 4 0 1 1 3 (a) Find an invertible matrix P such that P-1AP = J where J is a Jordan normal form. Now consider the system of differential equations f'(t) = 5f(t) +g(t) - h(t), 9'(t) = 49(t) and h'(t) = f(t)+g(t) + 3h(t). (b) Find the general solution to this system of differential equations. (c) What is the dominant long-term behaviour of this system? For what...
(4) (15 marks) Repeat the Question 2 for the following matrices -3 4 0] 0 0 A -2 30 B 0 -1 0 -8 8 1 0 0 1 ū= 10 = > 3 (I) (2 mark) Find the characteristic polynomial of matrix A. (II) (1 mark) Find eigenvalues of the matrix A. III) (2 mark) Find a basis for the eigenspaces of matrix A. IV) (1 mark) What is the algebraic and geometric multiplicities of its eigenvalues. (V) (2...
Problem. Let A=1-1-2-2-2 0-2 1 1 -1 21 0 (a) Find a Jordan form J for A (b) Find the change of basis matrix X such that X-1 AX = J.
Problem. Let A=1-1-2-2-2 0-2 1 1 -1 21 0 (a) Find a Jordan form J for A (b) Find the change of basis matrix X such that X-1 AX = J.
4. Consider the following matrix [1 0 -27 A=000 L-2 0 4] (a) (3 points) Find the characteristic polynomial of A. (b) (4 points) Find the eigenvalues of A. Give the algebraic multiplicity of each eigenvalue (c) (8 points) Find the eigenvectors corresponding to the eigenvalues found in part (b). (d) (4 points) Give a diagonal matrix D and an invertible matrix P such that A = PDP-1 (e) (6 points) Compute P-and verify that A= PDP- (show your steps).
solve it clear please ?????
6 0 0 1 Q2. Consider the matrix A = 2 -5 -6 -50 (a) Find all eigenvalues of the matrix A. (7 pts) (b) Find all eigenvectors of the matrix A. (8 pts) (c) Do you think that the set of the eigenvectors of A is a basis for the vector space R$? (Justify your answer) (5 pts) Q5. Consider the square matrix A = (a) Show that the characteristic polynomial of A is:...
1. Determine the polynomial function whose graph passes through the points (0, 10), (1, 7), (3, -11), and (4, -14). Be sure to include a sketch of the polynomial functions, showing the points. Solve using the Gauss-Jordan method or Gaussian elimination with back substitution. Show the matrix and rovw operation used for each step. 2. The figure below shows the flow of traffic (in vehicles per hour) through a network of streets. 300 200 100 500 YA Y 600 400...
Consider the matrix A= 2 -2 0 1 -1 0 2 -4 1 which has eigenvalues 1 = 1,1,0. a) Show that the characteristic polynomial of A is p(a) = -2(1 - 1) 2. b) Compute the eigenvectors of A. c) show that what you found are indeed eigenvalue- eigenvector pairs for A.
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 matrix A= (1 -2 12 2 1 4 -1 1 – 2 1. Find an echelon form for A. Denote this by U. 2. Describe each step towards the echelon form by an elementary matrix Ek 3. Write the matrix equation describing the transformation between A to the echelon form U, EmEm-1 ... E2E A = U. 4. Solve for A from the previous equation and label L= E,'E;'... EmEm. 5. Compute LU and show that it is...
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