Let u = 57 an 15 -1 Let b = a -[:] C and v= 15 1 Show that How can it be shown that a vector b is in Span {u, v}? A. Determine if the system containing u, v, and b is consistent. If the system is consistent, b might be in Span {u, v}. B. Determine if the system containing u, v, and b is consistent. If the system is consistent, then b is in Span {u, v}. C. Determine if the system containing u, v, and b is consistent. If the system is consistent, then b is not in Span {u, v}. O D. Determine if the system containing u, v, and b is consistent. If the system is inconsistent, then b is in Span {u, v}. 15 15 a -1 1 c [:] Find the augmented matrix [ is in Span {u, v} for all a and c. How is a system determined as consistent? u v b ]. O A. A system is consistent if there is one solution or infinitely many solutions. OB. A system is consistent only if all of the variables equal each other. O C. A system is consistent if there are no solutions. O D. Solve for the variables after setting the equations equal to 0. Row reduce the augmented matrix to its reduced echelon form.
Let u = 57 an 15 -1 Let b = a -[:] C and v= 15 1 Show that How can it be shown that a vector b is in Span {u, v}? A. Determine if the system containing u, v, and b is consistent. If the system is consistent, b might be in Span {u, v}. B. Determine if the system containing u, v, and b is consistent. If the system is consistent, then b is in Span {u, v}. C. Determine if the system containing u, v, and b is consistent. If the system is consistent, then b is not in Span {u, v}. O D. Determine if the system containing u, v, and b is consistent. If the system is inconsistent, then b is in Span {u, v}. 15 15 a -1 1 c [:] Find the augmented matrix [ is in Span {u, v} for all a and c. How is a system determined as consistent? u v b ]. O A. A system is consistent if there is one solution or infinitely many solutions. OB. A system is consistent only if all of the variables equal each other. O C. A system is consistent if there are no solutions. O D. Solve for the variables after setting the equations equal to 0. Row reduce the augmented matrix to its reduced echelon form.
Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter6: Vector Spaces
Section6.6: The Matrix Of A Linear Transformation
Problem 7AEXP
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Also is the system consistant or inconsistant? (answer aftear answering the other parts
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