Use the Gauss-Jordanmethod to solve the system of equations. If thesystem has infinitely many solutions, give the solution set with Zarbitrary.

x + y - 3z = -10

3x - 3y + 2z = -7

x + 3y - 2z = -13

Select the correct shoice below and fill in any answers ith yourchoice.

A) there are no solutions

B) there are infinitely many solutions and the solution set is{(x=_, y=_, z)}

C) the system is inconsistent and the solution set isundefined

Use the Gauss-Jordan method to solve the system ofequations.

x - y = 7

y - z = -1

x + z = 0

Select the correct shoice below and fill in anyanswers ith your choice.

A) there are no solutions

B) there are infinitely many solutions and thesolution set is {(x=_, y=_, z)}

C) the system is inconsistent and the solution set isundefined

Use the Gauss-Jordan method to solve the system of equations. Ifthe system has infinitely many solutions give the solution with Zarbitrary

x + y -3z = -9

3x - 3y + 2z = -10

x + 3y -2z = -10