Question

4 4 8 6 4 6 6 5 5 find the eigenvalue of the above matrix...

4 4 8
6 4 6
6 5 5

find the eigenvalue of the above matrix .

Homework Answers

Answer #1

Please give it a thumbs up if you like the answer. Comment if any problem in solution. :)

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Let ? be an eigenvalue of the ? × ? matrix A. Prove that ? +...
Let ? be an eigenvalue of the ? × ? matrix A. Prove that ? + 1 is an eigenvalue of the matrix ? + ?? .
Let A =[6,8;-4,-6] A. Find the characteristic polynomial of A p(x)= B. Find the eigenvalue of...
Let A =[6,8;-4,-6] A. Find the characteristic polynomial of A p(x)= B. Find the eigenvalue of A and the basis for the associated eigenspaces. smallest eigenvalue= Basis for the eigenspaces= largest eigenvalue= basis for the eigenspaces=
v is an eigenvector with eigenvalue 5 for the invertible matrix A. Is v an eigenvector...
v is an eigenvector with eigenvalue 5 for the invertible matrix A. Is v an eigenvector for A^-2? Show why/why not.
Q‒5. [8+4+8 marks] Let Find the eigenvalues of A and the corresponding eigenvectors. Find a matrix...
Q‒5. [8+4+8 marks] Let Find the eigenvalues of A and the corresponding eigenvectors. Find a matrix P and a diagonal matrix D such thatD=P-1AP . Using the equationD=P-1AP , computeA27 .
The matrix A has an eigenvalue λ with an algebraic multiplicity of 5 and a geometric...
The matrix A has an eigenvalue λ with an algebraic multiplicity of 5 and a geometric multiplicity of 2. Does A have a generalised eigenvector of rank 3 corresponding to λ? What about a generalised eigenvector of rank 5?
Prove or disprove: If a real 5x5 matrix has a non-real eigenvalue, then it has 5...
Prove or disprove: If a real 5x5 matrix has a non-real eigenvalue, then it has 5 distinct eigenvalues.
Verify that u=[1,13]T is an eigenvector of the matrix [[ -8,1],[-13,6]]. Find the corresponding eigenvalue lambda.
Verify that u=[1,13]T is an eigenvector of the matrix [[ -8,1],[-13,6]]. Find the corresponding eigenvalue lambda.
2.  For each 3*3 matrix and each eigenvalue below construct a basis for the eigenspace Eλ. A=...
2.  For each 3*3 matrix and each eigenvalue below construct a basis for the eigenspace Eλ. A= (9 42 -30 -4 -25 20 -4 -28 23),λ = 1,3 A= (2 -27 18 0 -7 6 0 -9 8) , λ = −1,2 3. Construct a 2×2 matrix with eigenvectors(4 3) and (−3 −2) with eigen-values 2 and −3, respectively. 4. Let A be the 6*6 diagonal matrix below. For each eigenvalue, compute the multiplicity of λ as a root of the...
Assume A is an invertible matrix 1. prove that 0 is not an eigenvalue of A...
Assume A is an invertible matrix 1. prove that 0 is not an eigenvalue of A 2. assume λ is an eigenvalue of A. Show that λ^(-1) is an eigenvalue of A^(-1)
2. ?̇=??, ?= [3 −18 ; 2 −9]. (1) Find the eigenvalue of multiplicity two and...
2. ?̇=??, ?= [3 −18 ; 2 −9]. (1) Find the eigenvalue of multiplicity two and their corresponding (generalized) eigenvectors ?1= [3;?] and ?2= [?;0] respectively. (2) Let ?= ?^−1??.Find the matrix B. (3) Find ???. (4) Find the general solution of ?̇ = ??. (5) Let ?=??.Find the general solution of ?̇ = ??. (6) Find the solution with initial values x(0) =[4; 1].