Which of the following subsets of R³x3 are subspaces of R³x³?A. The diagonal 3 x 3 matricesB. The 3 x 3 matrices whose entries are all integersc. The 3 x 3 matrices with all zeros in the second rowD. The invertible 3 x 3 matrices7E. The 3 x 3 matrices A such that A 6=-(8)5F. The 3 x 3 matrices whose entries are all greater than or equal to 0

Answered: Image /qna-images/answer/8ca85b4c-f711-4a4d-86e1-ee387b7c6c89.jpg

Answered: Which of the following subsets of R³X3…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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C. Let A be an m x n matrix. Then the orthogonal complement (Row (A)) of the row space of A is Nul(A), the null space of A. Select one: O True O False
3. Matrices and vectors a. Compute the following [2 marks] -5x² + 7y² + 2x² + 2xy +8xz - 6yz • -5x² + 7y² + 2z² + 2xy - 6xz+8yz · 5x² + 7y² + 2z² + 2xy +6xz-8yz • 5x² + 7y² + 2z² - 2xy - 6xz+8yz b. What's the inverse of (² (x y z) -5 1 -3 G+90- 1 7 4 -3 4 2 =? ? You should use the definition of inverse and check the conditions for each matrix in turn. [2 marks] 2 2/3 1/31 -1/3 1/3 (12) (-1/3 2/3)
Find the examples that satisfy the statement in the given items and show some work how they are correct examples. (a) A 4 × 4 matrices A that is not digonalizable.(b) Two matrices A and B that have the same characteristic polynomial but are not similar.(c) Two diagonal matrices D1 and D2 that are similar but they are not equal.(d) Two similar matrices A and B such that A is orthogonally digonalizable but B is not orthogonally diagonalizable.
Which of the following six sets are subrings of M(R)? Which ones have an identity? 0 0 (a) All matrices of the form (8 5) with reQ. (b) All matrices of the form (c) All matrices of the form (d) All matrices of the form (a b) 0 Ca a a with a, b, cЄZ. b with a, b, c = R. 0 with a Є R. 0 with a ЄR. (e) All matrices of the form a (69) (f) All matrices of the form 0 (a) with a ЄR. 0
The set of all 2x2 symmetric matrices is a vector space Select one: O True O False
Let W be the subspace of all diagonal matrices in M2.2. Find a basis for W. Then give the dimension of W. If you need to enter a matrix as part of your answer, write each row as a vector. For example, write the matrix ab c d as {(a, b), (c, d)}
If v1, ... , Vn are linearly independent, the space they span has dimension __ . These vectors are a __ for that space. If the vectors are the columns of an m by n matrix, then m is __ than n. If m = n, that matrix is __ .
1 Let A = 6 2 3 5 3 -1 1 4 Compute rank of A = nullity of A = rank of A + nullity of A = Check Answer

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