3 x 3 matrix whose eigens vector is Y-AXIS is.......
(linear algebra question and hope you explain full detail. Thanks
if the eigenvector is at y-axis then it means that all the coordinates should be zero.
hence eigenvector is (0 1 0)^T
i think this will help. if there is any problem please comment.
3 x 3 matrix whose eigens vector is Y-AXIS is....... (linear algebra question and hope you explain full detail. Thanks
Help on this question of Linear Algebra, thanks.
Prove that an n x n matrix A is diagonalizable if and only if A has n L.I. eigenvectors.
Help on this question of Linear Algebra, thanks.
Let A be a square matrix. Prove that A is invertible if and only if det(A) +0.
linear algebra
Find the standard matrix for the linear transformation T. T(x, y, z) = (6x – 8z, 8y - z) BE
Need assistance with this linear algebra problem. Thank you
Find a 3 x 3 matrix A having the following three eigenpairs: 1 (-[i]) (-18) (4)
Linear Algebra question. Please explain in detail.
1.16 Verify that this map is an isomorphism: h: R4 M2x2 given by al c a+ d b d
Find the matrix for the linear transformation which reflects every 2-dimensional vector across the y axis and hen rotate by an angle of T/4
linear algebra
Use the age transition matrix L and the age distribution vector x1 to find the age distribution vectors X2 and X3. Then find a stable age distribution vector. 0 3 18 0 0 1 450 450 L = X1 = 0 1 9 0 450 X2 X3 Find a stable age distribution vector. X=t
3. (a) (3 marks) If multiplication by matrix A rotates a vector v in the x-y plane through an angle 0, what is the effect of multiplying v by A?. (b) (3 marks) Describe the geometric effect of multiplying a vector x by the following matrix (cos0 – sin? 0 -2 sin 0 cos 0 ) | 2 sin 6 cos sin0 – cosa e ) (c) (4 marks) In three dimensional space, find a matrix that rotates a vector...
linear algebra
1 2. Let A be the 3 x 3 matrix: A= 3 3 0 -4 1-3 5 1 (a) Find det(A) by hand. (b) What can you say about the solution(s) to the linear system Az = ? A. No Solutions B. Unique Solution C. Infinitely Many Solutions (c) Is A invertible?
linear algebra// only the top question
1. Find the Fourier series of f(x) = x + 2 over the interval (0,25). To receive full credit, you must show all work when integrating. 3. (12 points) Prove each of the following parts. a) Prove that the characteristic equation of a 2 x 2 matrix A can be expressed as