Chapter 10, Problem 3RCC

To determine

To describe: operation on a linear system that result in an equivalent system.

Answer to Problem 3RCC

1. Add a nonzero multiple of one equation to another.

2. Multiply an equation by a nonzero constant.

3. Interchange the positions of two equations.

Explanation of Solution

1. Add a nonzero multiple of one equation to another.

For example, if the system

  $\{\begin{array}{l}x+2y+2z=6\text{ Equation 1}\\ x-y=-1\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}$

Eliminate the X-term from Equation 1 by subtracting Equation 2 from Equation 1.

  $\begin{array}{l}x+2y+2z=6\text{ Equation 1}\\ -[x-y=-1]\left(-1\right)\times \text{ Equation 2}\\ 3y+2z=7\text{ Equation 1+Equation 2}=\text{new Equation 1}\end{array}$

Our new system, with the new Equation 1, is

  $\{\begin{array}{l}3y+2z=6\text{ Equation 1}\\ x-y=-1\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}$

This is equivalent to the original system. Alternatively, add twice Equation 2 to Equation 1 in order to cancel the y-terms.

  $\begin{array}{l}x+2y+2z=6\text{ Equation 1}\\ +2[x-y=-1]\left(2\right)\times \text{ Equation 2}\\ 3x+2z=7\text{ Equation 1}\left(2\right)\text{+Equation 2}=\text{new Equation 1}\end{array}$

Our new system, with the new Equation 1, is

  $\{\begin{array}{l}3x+2z=6\text{ Equation 1}\\ x-y=-1\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}$

This is equivalent to the original system.

2. Multiply an equation by a nonzero constant.

For example, if the system

  $\{\begin{array}{l}x+2y+2z=6\text{ Equation 1}\\ x-y=-1\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}$

Multiply the second equation by 2 in order to get a -2y term.

  $\begin{array}{l}\{\begin{array}{l}x+2y+2z=6\text{ Equation 1}\\ 2x-\text{2}y\text{ =}-2\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}\\ \end{array}$

This is equivalent to the original system.

3. Interchange the positions of two equations.

For example, if the system

  $\{\begin{array}{l}x+2y+2z=6\text{ Equation 1}\\ x-y\text{ =}-1\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}$

Switch any two equations.

  $\{\begin{array}{l}x-y=-1\text{ Equation 1}\\ x+\text{2 }y+2z=6\text{ Equation 2}\\ \text{2}x+y+3z=7\text{ Equation 3}\end{array}$

This is an equivalent system. This operation can also be used to identify triangular systems. The system

  $\{\begin{array}{l}z=3\text{ Equation 1}\\ x-\text{2 }y-z=1\text{ Equation 2}\\ y+2z=5\text{ Equation 3}\end{array}$

can be rewritten as

  $\{\begin{array}{l}x-2y-z=1\text{ Equation 1}\\ y+2z=5\text{ Equation 2}\\ z=3\text{ Equation 3}\end{array}$

Now, use back-substitution more easily.