If one of the eigenvalues of [A]nxn is zero, it implies(a)The solution to system of equations [A][X] = [C] is unique(b) The determinant of [A] is zero(c) The solution to system of equations [A][X] = [0] is trivial(d) The determinant of [A] is nonzero

Given that one of the eigenvalue of [A]n×n is zero. Since the value of det(A) is equal to product of…

Answered: If one of the eigenvalues of [A]nxn is…

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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Let A be a (13x13) matrix such that the dimension of its column space is 13. Then Select all possible answers. |dim (rowspace (A)) = 13 The determinant of Ais a non-zero number. Ais invertible. A-1 does not exist.
1. (a) What (b) What are the seven 2. Consider you have a A matrix as below: 213 A = 1 3 412 12 (b) (40 points) What is the determinant of A matrix, that is to say AA? (a) (30 points) What is the transpose (A') of the matrix?
4. Let two 3 × 3 matrices A and B be given by 1 -2 2 0 1 -1 A = -2 1 0 and B = -5 1 -3 3 3 -2 -1 (a) Calculate the matrix products AB and A'B, where A' is the transpose of A. (b) Calculate the determinants of A and B. Use the result to obtain the determinant of AB and of A'B. (c) Calculate the inverse matrix of A, if it exists.

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If one of the eigenvalues of [A]nxn is zero, it implies (a)The solution to system of equations [A][X] = [C] is unique (b) The determinant of [A] is zero (c) The solution to system of equations [A][X] = [0] is trivial (d) The determinant of [A] is nonzero