Answer:
The columns of A do not span R3.
So, Option B is the correct answer.
Explanation:
please write it claerly mat210ssze / 5.1 subspaces and spanning/4 TDanso 5.1 Subspaces and Spanning: Pro...
1 Let A= 8 We want to determine if the columns of matrix A and are linearly independent. To do that we row reduce A To do this we add times the first row to the second. We conclude that A. The columns of A are linearly dependent. O B. The columns of A are linearly independent. O C. We cannot tell if the columns of A are linearly independent or not.
Please do only e and f and show work null(AT) null(A) T col(A) row(A) Figure 5.6 The four fundamental subspaces (f) Find bases for the four fundamental subspaces of 1 1 1 6 -1 0 1 -1 2 A= -2 3 1 -2 1 4 1 6 1 3 8. Given a subspace W of R", define the orthogonal complement of W to be W vE R u v 0 for every u E W (a) Let W span(e, e2)...
Suppose that and B 4 -2 4 4 -2 2 Given the following descriptions, determine the following elementary matrices and their inverses. a) The elementary matrix E subtracts 5 times the first row of A from the second row of A. Ei- b) The elementary matrix E21 subtracts -3 times the first row of A from the second row of A. Ei- c) The permutation matrix P12 switches the first and second rows of A. 12 d) The elementary matrix...
4. For the given elementary row operation e, find its inverse operation e-1 and the elementary matrices associated with e and e-1, e = R 2 R, the e: Add - 2 times the second row to the third row of 3 x 3 matrices.
a. The elementary matrix ?1E1 multiplies the first row of A by 1/6.b. The elementary matrix ?2E2 multiplies the second row of A by -4.c. The elementary matrix ?3E3 switches the first and second rows of A.d. The elementary matrix ?4E4 adds 6 times the first row of A to the second row of A.e. The elementary matrix ?5E5 multiplies the second row of B by 1/3.f. The elementary matrix ?6E6 multiplies the third row of B by -4.g. The elementary matrix ?7E7 switches the first and third rows of B.h. The elementary matrix ?8E8 adds...
how did we get the left null space please use simple way 6% 0-0, 1:44 AM Fri May 17 , Calc 4 4 Exaimi 3 solutions Math 250B Spring 2019 1. Let A 2 6 5 (a) Find bases for and the dimensions of the four fundamental subspaces. Solution Subtract row onc from row 2, then 8 times row 2 from row 3, then 5 timcs rovw 2 fro row. Finally, divide row1 by 2 to get the row reduced...
(1 point) Suppose that: -15 A= and B = 3 -2 -4 -1 5 e) The elementary matrix E2.1 subtracts 6 times the first row of B from the second row of B. E2,1 = , Ez1 = f) The elementary matrix E3.1 subtracts -5 times the first row of B from the third row of B. E3.1 = g) The permutation matrix P13 switches the first and third rows of B. P13= ,P3! = h) The elementary matrix E32...
R assignment In the matrix() function: . The first argument is the collection of elements that R will arrange into the rows and columns of the matrix. Here, we use 1:9 which is a shortcut for c(1, 2, 3, 4, 5, 6, 7, 8, 9) e The argument byrow indicates that the matrix is filled by the rows. If we want the matrix to be filled by the columns, we just place byrow FALSE. . The third argument nrow indicates...
I need help as quick as possible, thanks beforehand. Please provide the test output The Lo Shu Magic Square is a grid with 3 rows and 3 columns shown below. 35 The Lo Shu Magic Square has the following properties: The grid contains the numbers 1 - 9 exactly The sum of each row, each column and each diagonal all add up to the same number. This is shown below: 15 4 92 15 - 81 + 15 15 15...
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...