We changed the first nonzero entry beneath the pivot to a zero and found the following augmented matrix. -1 1 1 45 0 33 90 1 010 Next we will change the other entry beneath the pivot to a zero. Formulate the Type 2 row operation that wll change the first entry in R, to a zero. Applying the row operation results in the following matrix. -1 1 1 45 0 3 90 2
We changed the first nonzero entry beneath the pivot to a zero and found the following augmented matrix. -1 1 1 45 0 33 90 1 010 Next we will change the other entry beneath the pivot to a zero. Formulate the Type 2 row operation that wll change the first entry in R, to a zero. Applying the row operation results in the following matrix. -1 1 1 45 0 3 90 2
Chapter7: Systems Of Equations And Inequalities
Section7.6: Solving Systems With Gaussian Elimination
Problem 3SE: Is there only one correct method of using row operations on a matrix? Try to explain two different...
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Transcribed Image Text:We changed the first nonzero entry beneath the pivot to a zero and found the following augmented matrix.
-1 1 1 45
0 33 90
1 010
Next we will change the other entry beneath the pivot to a zero. Formulate the Type 2 row operation that will
change the first entry in R, to a zero.
R. ?vR,
Applying the row operation results in the following matrix.
-1 1
1
45
0 3
90
2
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