Chapter 7.3, Problem 8E

(a)

To determine

To find : whether the ordered pair is the solution to the given system of equation

Answer to Problem 8E

The ordered pair $\left(3,-1,2\right)$ is NOT THE SOLUTION for the given system of equation

Explanation of Solution

Given information : The system of equation and ordered pair is given below:

  $\{\begin{array}{l}3x+4y-z=17\\ 5x-y+2z=-2\\ 2x-3y+7z=-21\end{array}$

  $\left(3,-1,2\right)$

Concept Involved:

Solution of a system of equation is the point which makes both the equation TRUE.

We need to substitute the given point in each equation and see whether it makes all the three of the equations true.

If yes, then the given ordered pair is solution to the system of equation.

If not, then given ordered pair is not the solution to the system of equation.

Graphically the solution to the system of equation is the point where the three planes meet.

Calculation:

Description	Steps
Substituting $\left(3,-1,2\right)$ in 1stequation $3x+4y-z=17$ and checking whether it makes it TRUE	$\begin{array}{l}3\left(3\right)+4\left(-1\right)-2=17\\ 9-4-2=17\\ 3=17\boxed{FALSE}\end{array}$
Substituting $\left(3,-1,2\right)$ in 2ndequation $5x-y+2z=-2$ and checking whether it makes it TRUE	$\begin{array}{l}5\left(3\right)-\left(-1\right)+2\left(2\right)=-2\\ 15+1+4=-2\\ 20=-2\boxed{FALSE}\end{array}$
Substituting $\left(3,-1,2\right)$ in 3rdequation $2x-3y+7z=-21$ and checking whether it makes it TRUE	$\begin{array}{l}2\left(3\right)-3\left(-1\right)+7\left(2\right)=-21\\ 6+3+14=-21\\ 23=-21\boxed{FALSE}\end{array}$

(b)

To determine

To find : whether the ordered pair is the solution to the given system of equation

Answer to Problem 8E

The ordered pair $\left(1,3,-2\right)$ is SOLUTION for the given system of equation

Explanation of Solution

Given information : The system of equation and ordered pair is given below:

  $\{\begin{array}{l}3x+4y-z=17\\ 5x-y+2z=-2\\ 2x-3y+7z=-21\end{array}$

  $\left(1,3,-2\right)$

Concept Involved:

Solution of a system of equation is the point which makes both the equation TRUE.

We need to substitute the given point in each equation and see whether it makes all the three of the equations true.

If yes, then the given ordered pair is solution to the system of equation.

If not, then given ordered pair is not the solution to the system of equation.

Graphically the solution to the system of equation is the point where the three planes meet.

Calculation:

Description	Steps
Substituting $\left(1,3,-2\right)$ in 1stequation $3x+4y-z=17$ and checking whether it makes it TRUE	$\begin{array}{l}3\left(1\right)+4\left(3\right)-\left(-2\right)=17\\ 3+12+2=17\\ 17=17\boxed{TRUE}\end{array}$
Substituting $\left(1,3,-2\right)$ in 2ndequation $5x-y+2z=-2$ and checking whether it makes it TRUE	$\begin{array}{l}5\left(1\right)-\left(3\right)+2\left(-2\right)=-2\\ 5-3-4=-2\\ -2=-2\boxed{TRUE}\end{array}$
Substituting $\left(1,3,-2\right)$ in 3rdequation $2x-3y+7z=-21$ and checking whether it makes it TRUE	$\begin{array}{l}2\left(1\right)-3\left(3\right)+7\left(-2\right)=-21\\ 2-9-14=-21\\ -21=-21\boxed{TRUE}\end{array}$

(c)

To determine

To find : whether the ordered pair is the solution to the given system of equation

Answer to Problem 8E

The ordered pair $\left(1,5,6\right)$ is NOT THE SOLUTION for the given system of equation

Explanation of Solution

Given information : The system of equation and ordered pair is given below:

  $\{\begin{array}{l}3x+4y-z=17\\ 5x-y+2z=-2\\ 2x-3y+7z=-21\end{array}$

  $\left(1,5,6\right)$

Concept Involved:

Solution of a system of equation is the point which makes both the equation TRUE.

We need to substitute the given point in each equation and see whether it makes all the three of the equations true.

If yes, then the given ordered pair is solution to the system of equation.

If not, then given ordered pair is not the solution to the system of equation.

Graphically the solution to the system of equation is the point where the three planes meet.

Calculation:

Description	Steps
Substituting $\left(1,5,6\right)$ in 1stequation $3x+4y-z=17$ and checking whether it makes it TRUE	$\begin{array}{l}3\left(1\right)+4\left(5\right)-2\left(6\right)=17\\ 3+20-12=17\\ 11=17\boxed{FALSE}\end{array}$
Substituting $\left(1,5,6\right)$ in 2ndequation $5x-y+2z=-2$ and checking whether it makes it TRUE	$\begin{array}{l}5\left(1\right)-\left(5\right)+2\left(6\right)=-2\\ 5-5+12=-2\\ 12=-2\boxed{FALSE}\end{array}$
Substituting $\left(1,5,6\right)$ in 3rdequation $2x-3y+7z=-21$ and checking whether it makes it TRUE	$\begin{array}{l}2\left(1\right)-3\left(5\right)+7\left(6\right)=-21\\ 2-15+42=-21\\ 29=-21\boxed{FALSE}\end{array}$

(d)

To determine

To find : whether the ordered pair is the solution to the given system of equation

Answer to Problem 8E

The ordered pair $\left(1,-2,2\right)$ is NOT THE SOLUTIONfor the given system of equation

Explanation of Solution

Given information : The system of equation and ordered pair is given below:

  $\{\begin{array}{l}3x+4y-z=17\\ 5x-y+2z=-2\\ 2x-3y+7z=-21\end{array}$

  $\left(1,-2,2\right)$

Concept Involved:

Solution of a system of equation is the point which makes both the equation TRUE.

We need to substitute the given point in each equation and see whether it makes all the three of the equations true.

If yes, then the given ordered pair is solution to the system of equation.

If not, then given ordered pair is not the solution to the system of equation.

Graphically the solution to the system of equation is the point where the three planes meet.

Calculation:

Description	Steps
Substituting $\left(1,-2,2\right)$ in 1stequation $3x+4y-z=17$ and checking whether it makes it TRUE	$\begin{array}{l}3\left(1\right)+4\left(-2\right)-2=17\\ 3-8-2=17\\ -7=17\boxed{FALSE}\end{array}$
Substituting $\left(1,-2,2\right)$ in 2ndequation $5x-y+2z=-2$ and checking whether it makes it TRUE	$\begin{array}{l}5\left(1\right)-\left(-2\right)+2\left(2\right)=-2\\ 5+2+4=-2\\ 11=-2\boxed{FALSE}\end{array}$
Substituting $\left(1,-2,2\right)$ in 3rdequation $2x-3y+7z=-21$ and checking whether it makes it TRUE	$\begin{array}{l}2\left(1\right)-3\left(-2\right)+7\left(2\right)=-21\\ 2+6+14=-21\\ 22=-21\boxed{FALSE}\end{array}$