Thread: Solve the problem of Numerical Analysis by Jacobi's method and Power method.

Question Details:
Q.1.Find the dominant eigenvalue and the corresponding eigenvector of the matrix


by Power Method with unit vector as the initial vector i.e.; x(0) =(1,1,1)t
(Note: Answer is required after three iterations)
Q.2.Using Jacobi’s method, find the eigenvalues and eigenvectors of the following matrix,



Note: Give result at the end of second rotation.

Originally Posted by kyoscorpio

Question Details:
Q.1.Find the dominant eigenvalue and the corresponding eigenvector of the matrix


by Power Method with unit vector as the initial vector i.e.; x(0) =(1,1,1)t
(Note: Answer is required after three iterations)
Q.2.Using Jacobi’s method, find the eigenvalues and eigenvectors of the following matrix,



Note: Give result at the end of second rotation.

Please don't double post. See rule #1 here.

-Dan

Originally Posted by kyoscorpio

Question Details:
Q.1.Find the dominant eigenvalue and the corresponding eigenvector of the matrix


by Power Method with unit vector as the initial vector i.e.; x(0) =(1,1,1)t
(Note: Answer is required after three iterations)

Do you know what the power method is?

Then why are you asking this?

RonL

Please help me to solve my problem.