4 11. (5 points) Find the row space and null space of A= 1 0 -2 1 2 1 -4 -1 -2 -8
(1 point) Find a basis for the column space, row space and null space of the matrix 8 -4 4 -2 6 2 -5 -4 1 -1 -3 2 -1 Basis of column space: {T Basis of row space: OTT {{ Basis of row space: Basis of null space:
1. Find a basis for the null space and row space of 1-13 (a) A 5-4 -4 7 -6 2 2 0 3 (b) A544 7 -6 2 1. Find a basis for the null space and row space of 1-13 (a) A 5-4 -4 7 -6 2 2 0 3 (b) A544 7 -6 2
Find a basis for the row space of A. 1 -1 3 2 -3 8 A-0 1 -2 Find a basis for the null space of A. Verify that every vector in row(A) is orthogonal to every vector in null(A). Need Help? Submit Answer Save Progress Practice Another Version 17. -12 points PooleLinAlg4 5.2.009. Find a basis for the column space of A. My Notes Ask Your Tea 1-1 3 5 2 1 A- 012 T. Find a basis for...
In Exercises 9-10, find bases for the null space and row space of A. [i -1 37 2 0 -1] 9. (a) A = 5 -4 -4| (b) A = 4 :17 -6 2 Lo O o [ 1 4 5 27 10. (a) A = 2 1 3 0 1-1 3 2 2 i 4 5 3 - 1 (b) A = 1 1 -1 0 -1 1 2 3 5 6 4 -2 97 -1 -1 7 8
Q1. Find a basis and dimension for row space, column space and null space for the matrix, -2 - 4 A= 3 6 -2 - 4 4 5 -6 -4 4 9 (Marks: 6)
5. Find a basis of row space of 131 3 3 4 -2 1 2 0-427
Find vectors that span the null space of A. [ 1 2 7 A = 4 5 10 7 8 13 span Additional Materials Tutorial -/1 points HOLTLINALG2 4.1.027. Find the null space for A. null(A) = span munca -son- Submit Answer Practice Another Version
2) Given 1 3 4 01 A2 4 -5 4 -3 1 -5 0 3 2 By result of Q1, (a) Verify that both Row(A) and Row(A) are subspaces of R5 (b) Verify that Col(A) is a subspace of , 4. Find the Row(A), Col(A) and Null(A) 1) Find the Row(A), Col(A) and Null(A) 1 3 -4 0 1 A 2 4 5 34 1 -5 0 -3 2 -3 1 8 3 -4 2) Given 1 3-4 0 1...
10 a) Find a basis and the dimension of the row space. b) Find a basis and the dimension of the column space. c) Find a basis and the dimension of the null space. d) Verify the Dimension Theorem for A e) Identify the Domain and Codomain if this is the standard matrix for a linear transformation f) What does the row space represent when this is viewed as a linear transformation? g) Does this represent a linear operator? Explain....