Consider the system of linear equations
`x_(1)+2x_(2)+x_(3)=3`
`2x_(1)+3x_(2)+x_(3)=3`
`3x_(1)+5x_(2)+2x_(3)=1`
Then, the system has

Consider the system of linear equations: x_(1) + 2x_(2) + x_(3) = 3 2x_(1) + 3x_(2) + x_(3) = 3 3x_(1) + 5x_(2) + 2x_(3) = 1 The system has

The system of linear equations x_(1)+2x_(2)+x_(3)=3, 2x_(1)+3x_(2)+x_(3)=3 and 3x_(1)+5x_(2)+2x_(3)=1 , has

Consider the system of linear equations: x_1+""2x_2+""x_3=""3 2x_1+""3x_2+""x_3=""3 3x_1+""5x_2+""2x_3=""1 The system has (1) exactly 3 solutions (2) a unique solution (3) no solution (4) infinite number of solutions

x_(1)+2x_(2)+3x_(3)=a2x_(1)+3x_(2)+x_(3)=b3x_(1)+x_(2)+2x_(3)=c this system of equations has

Consider the system of linear equations; x-1\ +2x_2+x_3=3 2x_1+3x_2+_3=3 3x_1+5x_2+2x_3=1 The system has Infinite number of solutions Exactly 3 solutions A unique solution No solution

If the system of linear equations x_(1)+2x_(2)+3x_(3)=6,x_(1)+3x_(2)+5x_(3)=9,2x_(1)+5x_(2)+ax_(3)=b, is consistent and has infinite number of solutions,then :-

Let lambda in R . The system of linear equations 2x_(1) - 4x_(2) + lambda x_(3) = 1 x_(1) -6x_(2) + x_(3) = 2 lambda x_(1) - 10x_(2) + 4 x_(3) = 3 is inconsistent for :

Solve the following linear system of equations x_(1)+x_(2)+x_(3)=3,4x_(1)+3x_(2)+4x_(3)=8,9x_(1)+3x_(2)+4x_(3)=7 using the Gauss elimination method.