Question

Determine if the vector extbf{b} is in the span of the columns of the matrix extbf{A}. extbf{A} = egin{bmatrix} 8 & 2 \ 1 & 1 end{bmatrix}, extbf{b} = egin{bmatrix} 2 \ 1 end{bmatrix} The vector extbf{b} is in the span of the columns of the matrix extbf{A}. The vector extbf{b} is not in the span of the columns of the matrix extbf{A}.

          Determine if the vector 	extbf{b} is in the span of the columns of the matrix 	extbf{A}.
	extbf{A} = egin{bmatrix} 8 & 2 \ 1 & 1 end{bmatrix}, 	extbf{b} = egin{bmatrix} 2 \ 1 end{bmatrix}
The vector 	extbf{b} is in the span of the columns of the matrix 	extbf{A}.
The vector 	extbf{b} is not in the span of the columns of the matrix 	extbf{A}.

Determine if the vector extbfb is in the span of the columns of the matrix extbfA.
extbfA = eginbmatrix 8 2 1 1 endbmatrix, extbfb = eginbmatrix 2 1 endbmatrix
The vector extbfb is in the span of the columns of the matrix extbfA.
The vector extbfb is not in the span of the columns of the matrix extbfA.

Added by Alicia P.

Calculus: Early Transcendentals

James Stewart 8th Edition

Instant Answer

Solved by Expert Zhumagali Shomanov

05/14/2022

Step 1

Step 1:** Rearrange the augmented matrix to form a system of equations: \[8x_1 + 2x_2 = 1\] \[2x_1 + 1x_2 = 1\] ** Show more…

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Determine if the vector b is in the span of the columns of the matrix A. A = [[8, 2], [1, 1]], b = [2, 1] The vector b is in the span of the columns of the matrix A. The vector b is not in the span of the columns of the matrix A.