1. Let az, az, az, a4 are vectors in R3. Suppose that az 3a1 – 2a3...
Determine whether the set of vectors is a basis for R3. Given the set of vectors decide which of the following statements is true: A: Set is linearly independent and spans R3. Set is a basis for R3. B: Set is linearly independent but does not span R3. Set is not a basis for R3. C: Set spans R3 but is not linearly independent. Set is not a basis for R3. D: Set is not linearly independent and does not...
Consider the three 4-dimensional vectors aj = _21, 22 = 1 , a3 = 11 and the matrix A = [a], 22, az). (a) Find rank A and null A. (b) The linear transformation TA : R3 → R4 is defined by T.(x) = Ax. Determine whether TA is injective or not. (c) Determine whether the vectors aj, a2, az are linearly independent or dependent.
Suppose that 4 3 -225 3 3 -3 2 6 -2 -2 2-1 5 In the following questions you may use the fact that the matrix B is row-equivalent to A, where 1 0 1 0 1 0 1 -2 0 5 0 0 01 3 (a) Find: the rank of A the dimension of the nullspace of A (b) Find a basis for the nullspace of A. Enter each vector in the form [x1, x2, ...]; and enter your...
2 5 Do the vectors u = and v= 3 7 span R3? -1 1 Explain! Hint: Use Let a, a2,ap be vectors in R", let A = [a1a2..ap The following statements are equivalent. 1. ai,a2,..,a, span R" = # of rows of A. 2. A has a pivot position in every row, that is, rank(A) Select one: Oa. No since rank([uv]) < 2 3=# of rows of the matrix [uv b.Yes since rank([uv]) =2 = # of columns of...
3, (10%) Let V be the subset of R3 consisting of vectors of the form (a, b, a). Determine whether V is a subspace of R3. If it is a subspace, give a basis and its dimension
3, (10%) Let V be the subset of R3 consisting of vectors of the form (a, b, a). Determine whether V is a subspace of R3. If it is a subspace, give a basis and its dimension
Linear Algebra Question: 18. Consider the system of equations Ax = b where | A= 1 -1 0 3 1 -2 -1 4 2 0 4 -1 –4 4 2 0 0 3 -2 2 2 and b = BENA 1 For each j, let a; denote the jth column of A. e) Let T : Ra → Rb be the linear transformation defined by T(x) = Ax. What are a and b? Find bases for the kernel and image...
1 3. Consider the vector v= (-1) in R3. Let U = {w € R3 :w.v=0}, where w.v is the dot product. 2 (a) Prove that U is a subspace of R3. (b) Find a basis for U and compute its dimension. 4. Decide whether or not the following subsets of vector spaces are linearly independent. If they are, prove it. If they aren't, write one as a linear combination of the others. (a) The subset {0 0 0 of...
linear alegbra Let u, v, w be linearly independent vectors in R3. Which statement is false? (A) The vector u+v+2w is in span(u + u, w). (B) The zero vector is in span(u, v, w) (C) The vectors u, v, w span R3. (D) The vector w is in span(u, v).
Please give answer with the details. Thanks a lot! Let T: V-W be a linear transformation between vector spaces V and W (1) Prove that if T is injective (one-to-one) and {vi,.. ., vm) is a linearly independent subset of V the n {T(6),…,T(ền)} is a linearly independent subset of W (2) Prove that if the image of any linearly independent subset of V is linearly independent then Tis injective. (3) Suppose that {b1,... bkbk+1,. . . ,b,) is a...