[1 2 1 \n -1 0 2\n 2

tasfiaa024

tasfiaa024

Answered question

2022-06-25

[1 2 1 \n -1 0 2\n 2 1 -3] reduced the following matrix row echelon form.

Answer & Explanation

Vasquez

Vasquez

Expert2023-05-22Added 669 answers

To reduce the given matrix to row echelon form, we'll perform elementary row operations. Let's denote the given matrix as A.
A=[121102213]
First, we'll use row operations to introduce zeros below the first entry in the first column.
R2 = R2 + R1
R3 = R3 - 2R1
A=[121023035]
Next, we'll use row operations to introduce zeros below the second entry in the second column.
R3 = 3R2 + R3
A=[121023004]
Now, the matrix is in row echelon form. The leading entries (the first nonzero entries) of each row are strictly to the right of the leading entries of the rows above.
Therefore, the row echelon form of the given matrix is:
A=[121023004]

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