3. (12 pts) Find a subset of vectors that forms a basis for the space spanned...
a) Find a subset of the given vectors that forms a basis for the space spanned by these vectors. b) Express each vector not in the basis as a linear combination of the basis vectors.c) Use the vectors V1, V2, V3, V4, Vs to construct a basis for R4.
3. (12 pts) Find a subset of vectors that forms a basis for the space spanned by Vi = (1, -2,0,3), 02 = (2,-5, -3,6), V3 = (0,1,3,0), 04 = (-2, 1, -4,7), v5 = = (-5, 8,-1, -2). Then express the other vector(s) as a linear combination of the basis vectors.
3. (12 pts) Find a subset of vectors that forms a basis for the space spated by 11 = (1.22. - 1), 1 = (-3, -6, -6,3). Es =(4,9,9,-4), 4 = (-2,-1,-1,2), 3 =(5,8,9,-5). Then express the other vector(s) as a linear combination of the basis vectors 4. 12 pts) Show the matrix operator T: - R given by the following equations is one-to-one Find the standard matrix for the inverse operator T-!, and find T-2, 43, ).
Linear Algebra 6. (8pt) (a) Find a subset of the vectors v1 = (1, -1,5,2), V2 = (-2,3,1,0), V3 =(4,-5, 9,4), V4 = (0,4,2, -3) V5 = (-7, 18, 2, -8) that forms a basis for the space spanned by these vectors. (b) Use (a) to express each vector not in the basis as a linear combination of the basis vectors. (c) Let Vi V2 A= V3 V4 Use (a) to find the dimension of row(A), col(A), null(A), and of...
4. (11 pts) Find a subsct of vectors that forms a basis for the space spanned by -(1,2,0,3), ty=(8, 1,6,9), = (0, -1,3,0), t = (2-1,2,1), us = (5.-1,7,5). Then express the other vector(s) is a linear combination of the basis vectors
Please show work Problem 2. Consider the vectors [1] 1 1 v1 = 1, V2 = -1, V3 = -3 , 04 = , 05 = 6 Let S CR5 be defined by S = span(V1, V2, V3, V4, 05). A. Find a basis for S. What is the dimension of S? B. For each of the vectors V1, V2, V3, V4.05 which is not in the basis, express that vector as linear combination of the basis vectors. C. Consider...
15 points) Consider the following vectors in R3 0 0 2 V1 = 1 ; V2 = 3 ; V3 = 1] ; V4 = -1;V5 = 4 1 2 3 = a) Are V1, V2, V3, V4, V5 linearly independent? Explain. b) Let H (V1, V2, V3, V4, V5) be a 3 x 5 matrix, find (i) a basis of N(H) (ii) a basis of R(H) (iii) a basis of C(H) (iv) the rank of H (v) the nullity...
Problem #8: Find a basis for the orthogonal complement of the subspace of R4 spanned by the following vectors. v1 = (1,-1,4,7), v2 = (2,-1,3,6), v3 = (-1,2,-9, -15) The required basis can be written in the form {(x, y, 1,0), (2,w,0,1)}. Enter the values of x, y, z, and w (in that order) into the answer box below, separated with commas.
8. (a) Use the Gram-Schmidt procedure to produce an orthonormal basis for the sub space spanned by W = Do not change the order of the vectors. (b) Express the vector x = as a linear combination of the orthonormal basis obtained in part (a).