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.

PLEASE FULLY SOLVE AND MAKE ANSWER CLEAR TO READ!!!!

 

Also is the system consistant or inconsistant? (answer aftear answering the other parts

Transcribed Image Text:

Let u = 15 - 1 Let b = a and v= с 15 1 Show that How can it be shown that a vector b is in Span {u, v}? a 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}. 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 с is in Span {u, v} for all a and c. How is a system determined as consistent? Find the augmented matrix u v b A. A system is consistent if there is one solution or infinitely many solutions. B. A system is consistent only if all of the variables equal each other. C. A system is consistent if there are no solutions. D. Solve for the variables after setting the equations equal to 0. Row reduce the augmented matrix to its reduced echelon form.