How to do Part 3? -- Find e^(At), the exponential of matrix A, where t ∈ ℝ is any real number.
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How to do Part 3? -- Find e^(At), the exponential of matrix A, where t ∈ ℝ is any real number.
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).
Problem 2. Find the eigenvalues Xi and the corresponding eigenvectors v; of the matrix -4 6...
Problem 2. Find the eigenvalues Xi and the corresponding eigenvectors v; of the matrix -4 6 -12 A-3 -16, (3 3 8 and also find an invertible matrix P and a diagonal matrix D such that D=P-AP or A = PDP-
Consider the differential equation for the vector-valued function x, x = x, A- Find the eigenvalues...
Consider the differential equation for the vector-valued function x, x = x, A- Find the eigenvalues A, , and their corresponding eigenvectors V, V, of the coefficient matrix A (a) Eigenvalues Au, dy (b) Eigenvector for A, you entered above (c) Eigenvector for A, you entered above: V2 = (d) Use the eigenpairs you found in parts (a)-(C) to find real-valued fundamental solutions to the differential equation above X = X Note: To enter the vector (u, v) type <u,v>...
Publish using a MatLab function for the following: If a matrix A has dimension n×n and has n line...
Publish using a MatLab function for the following:
If a matrix A has dimension n×n and has n linearly independent
eigenvectors, it is diagonalizable.This means there exists a matrix
P such that P^(−1)AP=D, where D is a diagonal matrix whose diagonal
entries are made up of the eigenvalues of A. P is constructed by
taking the eigenvectors of A and using them as the columns of P.
Your task is to write a program (function) that does the
following
If...
مل 3 (1 point) Suppose that a 2 x 2 matrix A has an eigenvalue 3...
مل 3 (1 point) Suppose that a 2 x 2 matrix A has an eigenvalue 3 with corresponding eigenvector and an eigenvalue -1 with corresponding eigenvector Find an invertible matrix P and a diagonal matrix D so that A = PDP-1. Enter your answer as an equation of the form A = PDP-1. You must enter a number in every answer blank for the answer evaluator to work properly. 1-1
For the 3×2 matrix A: a) Determine the eigenvalues of ATA, and confirm that your eigenvalues...
For the 3×2 matrix A:
a) Determine the eigenvalues of ATA, and confirm that
your eigenvalues are consistent with the trace and determinant of
ATA.
b) Find an eigenvector for each eigenvalue of
ATA.
c) Find an invertible matrix P and a diagonal matrix D such that
P-1(ATA)P = D.
d) Find the singular value decomposition of the matrix A; that
is, find matrices U, Σ, and V such that A = UΣVT.
e) What is the best rank 1...
(1 point) Find the characteristic polynomial of the matrix 5 -5 A = 0 [ 5...
(1 point) Find the characteristic polynomial of the matrix 5 -5 A = 0 [ 5 -5 -2 5 0] 4. 0] p(x) = (1 point) Find the eigenvalues of the matrix [ 23 C = -9 1-9 -18 14 9 72 7 -36 : -31] The eigenvalues are (Enter your answers as a comma separated list. The list you enter should have repeated items if there are eigenvalues with multiplicity greater than one.) (1 point) Given that vi =...
(1 point) Let 3 -4 A = -4 -1 -4 -2 -2 If possible, find an...
(1 point) Let 3 -4 A = -4 -1 -4 -2 -2 If possible, find an invertible matrix P so that D = P-1 AP is a diagonal matrix. If it is not possible, enter the identity matrix for P and the matrix A for D. You must enter a number in every answer blank for the answer evaluator to work properly. P= II II D= Be sure you can explain why or why Is A diagonalizable over R? diagonalizable...
I need help with Q12) please and eigenvectors of the row-echelon matrix VWV) 37dldl IV 31076...
I need help with Q12) please
and eigenvectors of the row-echelon matrix VWV) 37dldl IV 31076 IW NO LOHS 1 U = 2 -4 0 2 1 0 0 3 0 0 0 3 --3 3 5 d the eigenvalues and eigenvectors of the following matrices. a) A= 1 3 0 2 2 0 0 0 6 3 0 b) B= 0 -4 0 6 0 -1 3 Problems 8.2 : Eigenvectors, bases, and diagonalisation 11. [R] For each of...
Given the matrix 5 28 -16 A = 1 8 -4 E R3x3, 3 21 -11...
Given the matrix 5 28 -16 A = 1 8 -4 E R3x3, 3 21 -11 1. find all eigenvalues of A, 2. find the corresponding eigenvectors of A 3. show that A is diagonalizable, that is, find an invertible matrix KER3x3, and a diagonal matrix DE R3x3 such that 3. show that A is diagonalizable, that is, find an invertible matrix KER3x3, and a diagonal matrix DE R3x3 such that K-IAK = D.
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).
Problem 2. Find the eigenvalues Xi and the corresponding eigenvectors v; of the matrix -4 6 -12 A-3 -16, (3 3 8 and also find an invertible matrix P and a diagonal matrix D such that D=P-AP or A = PDP-
Consider the differential equation for the vector-valued function x, x = x, A- Find the eigenvalues A, , and their corresponding eigenvectors V, V, of the coefficient matrix A (a) Eigenvalues Au, dy (b) Eigenvector for A, you entered above (c) Eigenvector for A, you entered above: V2 = (d) Use the eigenpairs you found in parts (a)-(C) to find real-valued fundamental solutions to the differential equation above X = X Note: To enter the vector (u, v) type <u,v>...
Publish using a MatLab function for the following:
If a matrix A has dimension n×n and has n linearly independent
eigenvectors, it is diagonalizable.This means there exists a matrix
P such that P^(−1)AP=D, where D is a diagonal matrix whose diagonal
entries are made up of the eigenvalues of A. P is constructed by
taking the eigenvectors of A and using them as the columns of P.
Your task is to write a program (function) that does the
following
If...
مل 3 (1 point) Suppose that a 2 x 2 matrix A has an eigenvalue 3 with corresponding eigenvector and an eigenvalue -1 with corresponding eigenvector Find an invertible matrix P and a diagonal matrix D so that A = PDP-1. Enter your answer as an equation of the form A = PDP-1. You must enter a number in every answer blank for the answer evaluator to work properly. 1-1
For the 3×2 matrix A:
a) Determine the eigenvalues of ATA, and confirm that
your eigenvalues are consistent with the trace and determinant of
ATA.
b) Find an eigenvector for each eigenvalue of
ATA.
c) Find an invertible matrix P and a diagonal matrix D such that
P-1(ATA)P = D.
d) Find the singular value decomposition of the matrix A; that
is, find matrices U, Σ, and V such that A = UΣVT.
e) What is the best rank 1...
(1 point) Find the characteristic polynomial of the matrix 5 -5 A = 0 [ 5 -5 -2 5 0] 4. 0] p(x) = (1 point) Find the eigenvalues of the matrix [ 23 C = -9 1-9 -18 14 9 72 7 -36 : -31] The eigenvalues are (Enter your answers as a comma separated list. The list you enter should have repeated items if there are eigenvalues with multiplicity greater than one.) (1 point) Given that vi =...
(1 point) Let 3 -4 A = -4 -1 -4 -2 -2 If possible, find an invertible matrix P so that D = P-1 AP is a diagonal matrix. If it is not possible, enter the identity matrix for P and the matrix A for D. You must enter a number in every answer blank for the answer evaluator to work properly. P= II II D= Be sure you can explain why or why Is A diagonalizable over R? diagonalizable...
I need help with Q12) please
and eigenvectors of the row-echelon matrix VWV) 37dldl IV 31076 IW NO LOHS 1 U = 2 -4 0 2 1 0 0 3 0 0 0 3 --3 3 5 d the eigenvalues and eigenvectors of the following matrices. a) A= 1 3 0 2 2 0 0 0 6 3 0 b) B= 0 -4 0 6 0 -1 3 Problems 8.2 : Eigenvectors, bases, and diagonalisation 11. [R] For each of...
Given the matrix 5 28 -16 A = 1 8 -4 E R3x3, 3 21 -11 1. find all eigenvalues of A, 2. find the corresponding eigenvectors of A 3. show that A is diagonalizable, that is, find an invertible matrix KER3x3, and a diagonal matrix DE R3x3 such that 3. show that A is diagonalizable, that is, find an invertible matrix KER3x3, and a diagonal matrix DE R3x3 such that K-IAK = D.
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