Chapter 10.2, Problem 20E

To determine

The complete solution of linear system or show that it is inconsistent.

Answer to Problem 20E

The solution for given system is $\left(x,y,z\right)=\left(1,-3,2\right)$ .

Explanation of Solution

Given:

Equation given,

  $\begin{array}{l}x+y+z=0\\ -x+2y+5z=3\\ 3x-y=6\end{array}$

Concept Used:

The concept of Gaussian elimination is used to concert the linear system into row echelon form.

Calculation:

Consider first the given equations,

  $x+y+z=0$ ….. $\left(1\right)$

  $-x+2y+5z=3$ …… $\left(2\right)$

  $3x-y=6$ …… $\left(3\right)$

Step1:

In the first step first from equation $\left(3\right)$ express in terms of $y$

  $3x-y=6$

  $\boxed{y=3x-6}$

Now put ,

  $y=3x-6$ in equation $\left(1\right)$ and equation $\left(2\right)$

For equation $\left(1\right)$ ,

  $\begin{array}{l}x+y+z=0\\ x+\left(3x-6\right)+z=0\\ x+3x-6+z=0\end{array}$

  $4x+z=6$ …Simplified equation.

For equation $\left(2\right)$

  $\begin{array}{l}-x+2y+5z=3\\ -x+2*\left(3x-6\right)+5z=3\\ -x+6x-12+5z=3\end{array}$

  $5x+5z=15$ …..Simplified equation,

Step 2:

In this step now, Multiply the First simplified equation by $-5$

  $\begin{array}{l}-5*\left(4x+z=6\right)\\ -20x-5z=-30\end{array}$

Now add both the equations to eliminate $z$

  $\boxed{-20x+5x}+\boxed{-5z+5z}=\boxed{-30+15}$

The

  $\begin{array}{l}-15x=-15\\ x=1\\ \boxed{x=1}\end{array}$

Substitute the value of $x=1$ to find $y,z$

  $4x+z=6$

  $\begin{array}{l}4*\left(1\right)+z=6\\ 4+z=6\\ z=6-4\\ \boxed{z=2}\end{array}$

And,

  $\begin{array}{l}y=3x-6\\ y=3*\left(1\right)-6\\ y=3-6\\ \boxed{y=-3}\end{array}$

Conclusion:

Hence, the solution for given system is. $\left(x,y,z\right)=\left(1,-3,2\right)$