Homework SourseLet A 2 4 8 4 5 13 5 5 5 4 8 0 5 11 1 Find a basis for the
Let A = [-2 4 -8 -4 5 -13 5 5 5 -4 -8 0 5 11 -1]. Find a basis for the row space of A.
![Let A = [-2 4 -8 -4 5 -13 5 5 5 -4 -8 0 5 11 -1]. Find a basis for the row space of A. SolutionFirst, we must convert the matrix to reduced row echelon form: D](/WebImages/45/let-a-2-4-8-4-5-13-5-5-5-4-8-0-5-11-1-find-a-basis-for-the-1142438-1761613067-0.webp "Let A = [-2 4 -8 -4 5 -13 5 5 5 -4 -8 0 5 11 -1]. Find a basis for the row space of A. SolutionFirst, we must convert the matrix to reduced row echelon form: D")
Solution
First, we must convert the matrix to reduced row echelon form:
Divide row1 by -2
Add (-4 * row1) to row2
Add (8 * row1) to row3
Divide row2 by -3
Add (-3 * row2) to row3
Add (-2 * row2) to row1
Because we have only performed linear operations on rows, the non-zero rows in the reduced row echelon form of the matrix comprise a Basis for the Row Space of the matrix.
(Note that this is not true of the Column Space; the Column Space certainly changes as you perform row operations.)
The rows highlighted below in BOLD comprise a Basis for the Row Space of our matrix:
| 1 | 2 | -5/2 | 2 | -5/2 |
| 4 | 5 | 5 | -8 | 11 |
| -8 | -13 | 5 | 0 | -1 |
