9.6: Solving Systems with Gaussian Elimination
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Learning Objectives
 Write the augmented matrix of a system of equations.
 Write the system of equations from an augmented matrix.
 Perform row operations on a matrix.
 Solve a system of linear equations using matrices.
Carl Friedrich Gauss lived during the late \(18^{th}\) century and early \(19^{th}\) century, but he is still considered one of the most prolific mathematicians in history. His contributions to the science of mathematics and physics span fields such as algebra, number theory, analysis, differential geometry, astronomy, and optics, among others. His discoveries regarding matrix theory changed the way mathematicians have worked for the last two centuries.
We first encountered Gaussian elimination in Systems of Linear Equations: Two Variables. In this section, we will revisit this technique for solving systems, this time using matrices.
Writing the Augmented Matrix of a System of Equations
A matrix can serve as a device for representing and solving a system of equations. To express a system in matrix form, we extract the coefficients of the variables and the constants, and these become the entries of the matrix. We use a vertical line to separate the coefficient entries from the constants, essentially replacing the equal signs. When a system is written in this form, we call it an augmented matrix.
For example, consider the following \(2 × 2\) system of equations.
\[\begin{align*} 3x+4y&= 7\\ 4x2y&= 5 \end{align*}\]
We can write this system as an augmented matrix:
\(\left[ \begin{array}{ccc} 3&4&7\\4&2&5\end{array} \right]\)
We can also write a matrix containing just the coefficients. This is called the coefficient matrix.
\(\begin{bmatrix}3&4\\4&−2\end{bmatrix}\)
A threebythree system of equations such as
\[\begin{align*} 3xyz&= 0\\ x+y&= 5\\ 2x3z&= 2 \end{align*}\]
has a coefficient matrix
\(\begin{bmatrix}3&−1&−1\\1&1&0\\2&0&−3\end{bmatrix}\)
and is represented by the augmented matrix
\(\left[ \begin{array}{cccc}3&−1&−1&0\\1&1&0&5\\2&0&−3&2\end{array} \right]\)
Notice that the matrix is written so that the variables line up in their own columns: \(x\)terms go in the first column, \(y\)terms in the second column, and \(z\)terms in the third column. It is very important that each equation is written in standard form \(ax+by+cz=d\) so that the variables line up. When there is a missing variable term in an equation, the coefficient is \(0\).
How to: Given a system of equations, write an augmented matrix
 Write the coefficients of the \(x\)terms as the numbers down the first column.
 Write the coefficients of the \(y\)terms as the numbers down the second column.
 If there are \(z\)terms, write the coefficients as the numbers down the third column.
 Draw a vertical line and write the constants to the right of the line.
Example \(\PageIndex{1}\): Writing the Augmented Matrix for a System of Equations
Write the augmented matrix for the given system of equations.
\[\begin{align*} x+2yz&= 3\\ 2xy+2z&= 6\\ x3y+3z&= 4 \end{align*}\]
Solution
The augmented matrix displays the coefficients of the variables, and an additional column for the constants.
\(\left[ \begin{array}{cccc}1&2&−1&3\\2&−1&2&6\\1&−3&3&4\end{array} \right]\)
Exercise \(\PageIndex{1}\)
Write the augmented matrix of the given system of equations.
\[\begin{align*} 4x3y&= 11\\ 3x+2y&= 4 \end{align*}\]
 Answer

\(\left[ \begin{array}{ccc} 4&−3&11\\3&2&4\end{array} \right]\)
Writing a System of Equations from an Augmented Matrix
We can use augmented matrices to help us solve systems of equations because they simplify operations when the systems are not encumbered by the variables. However, it is important to understand how to move back and forth between formats in order to make finding solutions smoother and more intuitive. Here, we will use the information in an augmented matrix to write the system of equations in standard form.
Example \(\PageIndex{2}\): Writing a System of Equations from an Augmented Matrix Form
Find the system of equations from the augmented matrix.
\(\left[ \begin{array}{cccc}1&−3&−5&2\\2&−5&−4&5\\−3&5&4&6 \end{array} \right]\)
Solution
When the columns represent the variables \(x\), \(y\), and \(z\),
\[\left[ \begin{array}{cccc}1&3&5&2\\2&5&4&5\\3&5&4&6 \end{array} \right] \rightarrow \begin{align*} x3y5z&= 2\\ 2x5y4z&= 5\\ 3x+5y+4z&= 6 \end{align*}\]
Exercise \(\PageIndex{2}\)
Write the system of equations from the augmented matrix.
\(\left[ \begin{array}{cccc}1&−1& 1&5\\2&−1&3&1\\0&1&1&9\end{array}\right]\)
 Answer

\(\begin{align*} xy+z&= 5\\ 2xy+3z&= 1\\ y+z&= 9 \end{align*}\)
Performing Row Operations on a Matrix
Now that we can write systems of equations in augmented matrix form, we will examine the various row operations that can be performed on a matrix, such as addition, multiplication by a constant, and interchanging rows.
Performing row operations on a matrix is the method we use for solving a system of equations. In order to solve the system of equations, we want to convert the matrix to rowechelon form, in which there are ones down the main diagonal from the upper left corner to the lower right corner, and zeros in every position below the main diagonal as shown.
Rowechelon form \(\begin{bmatrix}1&a&b\\0&1&d\\0&0&1\end{bmatrix}\)
We use row operations corresponding to equation operations to obtain a new matrix that is rowequivalent in a simpler form. Here are the guidelines to obtaining rowechelon form.
 In any nonzero row, the first nonzero number is a \(1\). It is called a leading \(1\).
 Any allzero rows are placed at the bottom on the matrix.
 Any leading \(1\) is below and to the right of a previous leading \(1\).
 Any column containing a leading \(1\) has zeros in all other positions in the column.
To solve a system of equations we can perform the following row operations to convert the coefficient matrix to rowechelon form and do backsubstitution to find the solution.
 Interchange rows. (Notation: \(R_i ↔ R_j\))
 Multiply a row by a constant. (Notation: \(cR_i\))
 Add the product of a row multiplied by a constant to another row. (Notation: \(R_i+cR_j\))
Each of the row operations corresponds to the operations we have already learned to solve systems of equations in three variables. With these operations, there are some key moves that will quickly achieve the goal of writing a matrix in rowechelon form. To obtain a matrix in rowechelon form for finding solutions, we use Gaussian elimination, a method that uses row operations to obtain a \(1\) as the first entry so that row \(1\) can be used to convert the remaining rows.
GAUSSIAN ELIMINATION
The Gaussian elimination method refers to a strategy used to obtain the rowechelon form of a matrix. The goal is to write matrix \(A\) with the number \(1\) as the entry down the main diagonal and have all zeros below.
\(A=\begin{bmatrix}a_{11}&a_{12}&a_{13}\\a_{21}&a_{22}&a_{23}\\a_{31}&a_{32}&a_{33}\end{bmatrix}\xrightarrow{After\space Gaussian\space elimination} A=\begin{bmatrix}1&b_{12}& b_{13}\\0&1&b_{23}\\0&0&1\end{bmatrix}\)
The first step of the Gaussian strategy includes obtaining a \(1\) as the first entry, so that row \(1\) may be used to alter the rows below.
How to: Given an augmented matrix, perform row operations to achieve rowechelon form
 The first equation should have a leading coefficient of \(1\). Interchange rows or multiply by a constant, if necessary.
 Use row operations to obtain zeros down the first column below the first entry of \(1\).
 Use row operations to obtain a \(1\) in row 2, column 2.
 Use row operations to obtain zeros down column 2, below the entry of 1.
 Use row operations to obtain a \(1\) in row 3, column 3.
 Continue this process for all rows until there is a \(1 in every entry down the main diagonal and there are only zeros below.
 If any rows contain all zeros, place them at the bottom.
Example \(\PageIndex{3}\): Solving a \(2×2\) System by Gaussian Elimination
Solve the given system by Gaussian elimination.
\[\begin{align*} 2x+3y&= 6\\ xy&= \dfrac{1}{2} \end{align*}\]
Solution
First, we write this as an augmented matrix.
\(\left[ \begin{array}{ccc} 2&3&6\\1&−1&\dfrac{1}{2}\end{array} \right]\)
We want a \(1\) in row 1, column 1. This can be accomplished by interchanging row 1 and row 2.
\(R_1\leftrightarrow R_2\rightarrow \left[ \begin{array}{ccc} 1&−1&\dfrac{1}{2}\\2&3&6\end{array} \right]\)
We now have a \(1\) as the first entry in row 1, column 1. Now let’s obtain a \(0\) in row 2, column 1. This can be accomplished by multiplying row 1 by \(−2\), and then adding the result to row 2.
\(2R_1+R_2=R_2\rightarrow \left[ \begin{array}{ccc} 1&−1&\dfrac{1}{2}\\0&5&5\end{array} \right]\)
We only have one more step, to multiply row 2 by \(\dfrac{1}{5}\).
\(\dfrac{1}{5}R_2=R_2\rightarrow \left[ \begin{array}{ccc} 1&−1&\dfrac{1}{2}\\0&1&1\end{array} \right]\)
Use backsubstitution. The second row of the matrix represents \(y=1\). Backsubstitute \(y=1\) into the first equation.
\[\begin{align*} x(1)&= \dfrac{1}{2}\\ x&= \dfrac{3}{2} \end{align*}\]
The solution is the point \(\left(\dfrac{3}{2},1\right)\).
Exercise \(\PageIndex{3}\)
Solve the given system by Gaussian elimination.
\[\begin{align*} 4x+3y&= 11\\ x3y&= 1 \end{align*}\]
 Answer

\((2, 1)\)
Example \(\PageIndex{4}\): Using Gaussian Elimination to Solve a System of Equations
Use Gaussian elimination to solve the given \(2 × 2\) system of equations.
\[\begin{align*} 2x+y&= 1\\ 4x+2y&= 6 \end{align*}\]
Solution
Write the system as an augmented matrix.
\(\left[ \begin{array}{ccc} 2&1&1\\4&2&6\end{array} \right]\)
Obtain a \(1\) in row 1, column 1. This can be accomplished by multiplying the first row by \(\dfrac{1}{2}\).
\(\dfrac{1}{2} R_1=R_1\rightarrow \left[ \begin{array}{ccc} 1&\dfrac{1}{2}&\dfrac{1}{2}\\4&2&6\end{array} \right]\)
Next, we want a \(0\) in row 2, column 1. Multiply row 1 by \(−4\) and add row 1 to row 2.
\(4R_1+R_2=R_2\rightarrow \left[ \begin{array}{ccc} 1&\dfrac{1}{2}&\dfrac{1}{2}\\0&0&4\end{array} \right]\)
The second row represents the equation \(0=4\). Therefore, the system is inconsistent and has no solution.
Example \(\PageIndex{5}\): Solving a Dependent System
Solve the system of equations.
\[\begin{align*} 3x+4y&= 12\\ 6x+8y&= 24 \end{align*}\]
Solution
Perform row operations on the augmented matrix to try and achieve rowechelon form.
\(A=\left[ \begin{array}{ccc} 3&4&12\\6&8&24\end{array} \right]\)
\(\dfrac{1}{2}R_2+R_1=R_1\rightarrow \left[ \begin{array}{ccc} 0&0&0\\6&8&24\end{array} \right]\)
\(R_1\leftrightarrow R_2=\left[ \begin{array}{ccc} 6&8&24\\0&0&0\end{array} \right]\)
The matrix ends up with all zeros in the last row: \(0y=0\). Thus, there are an infinite number of solutions and the system is classified as dependent. To find the generic solution, return to one of the original equations and solve for \(y\).
\[\begin{align*} 3x+4y&= 12\\ 4y&= 123x\\ y&= 3\dfrac{3}{4}x \end{align*}\]
So the solution to this system is \(\left(x,3−\dfrac{3}{4}x\right)\).
Example \(\PageIndex{6}\): Performing Row Operations on a \(3×3\) Augmented Matrix to Obtain RowEchelon Form
Perform row operations on the given matrix to obtain rowechelon form.
\(\left[ \begin{array}{cccc} 1&3&4&3\\2&5&6&6\\3&3&4&6\end{array} \right]\)
Solution
The first row already has a \(1\) in row 1, column 1. The next step is to multiply row 1 by \(−2\) and add it to row 2. Then replace row 2 with the result.
\(2R_1+R_2=R_2 \left[ \begin{array}{cccc} 1&3&4&3\\0&1&2&0\\3&3&4&6\end{array} \right]\)
Next, obtain a zero in row 3, column 1.
\(3R_1+R_3=R_3 \left[ \begin{array}{cccc} 1&3&4&3\\0&1&2&0\\0&6&16&15\end{array} \right]\)
Next, obtain a zero in row 3, column 2.
\(6R_2+R_3=R_3 \left[ \begin{array}{cccc} 1&3&4&3\\0&1&2&0\\0&0&4&15\end{array} \right]\)
The last step is to obtain a 1 in row 3, column 3.
\(\dfrac{1}{4}R_3=R_3 \left[ \begin{array}{cccc} 1&3&4&3\\0&1&2&0\\0&0&1&\dfrac{15}{4}\end{array} \right]\)
Exercise \(\PageIndex{4}\)
Write the system of equations in rowechelon form.
\[\begin{align*} x−2y+3z &= 9 \\ −x+3y &= −4 \\ 2x−5y+5z &= 17 \end{align*}\]
 Answer

\(\left[ \begin{array}{cccc} 1&2&3&9\\0&1&3&5\\0&0&1&2\end{array} \right]\)
Solving a System of Linear Equations Using Matrices
We have seen how to write a system of equations with an augmented matrix, and then how to use row operations and backsubstitution to obtain rowechelon form. Now, we will take rowechelon form a step farther to solve a \(3\) by \(3\) system of linear equations. The general idea is to eliminate all but one variable using row operations and then backsubstitute to solve for the other variables.
Example \(\PageIndex{7}\): Solving a System of Linear Equations Using Matrices
Solve the system of linear equations using matrices.
\[\begin{align*} xy+z&= 8\\ 2x+3yz&= 2\\ 3x2y9z&= 9 \end{align*}\]
Solution
First, we write the augmented matrix.
\(\left[ \begin{array}{cccc} 1&1&1&8\\2&3&1&2\\3&2&9&9\end{array} \right]\)
Next, we perform row operations to obtain rowechelon form.
\(−2R_1+R_2=R_2\rightarrow \left[ \begin{array}{cccc} 1&1&1&8\\0&5&3&18\\3&2&9&9\end{array} \right]\)
\(−3R_1+R_3=R_3\rightarrow \left[ \begin{array}{cccc} 1&1&1&8\\0&5&3&18\\0&1&12&15\end{array} \right]\)
The easiest way to obtain a \(1\) in row 2 of column 1 is to interchange \(R_2\) and \(R_3\).
\(Interchange\space R_2\space and\space R_3\rightarrow\left[ \begin{array}{cccc} 1&1&1&8\\0&1&12&15\\0&5&3&18\end{array} \right]\)
Then
\(−5R_2+R_3=R_3\rightarrow\left[ \begin{array}{cccc} 1&1&1&8\\0&1&12&15\\0&0&57&57\end{array} \right]\)
\(−\dfrac{1}{57}R_3=R_3\rightarrow\left[ \begin{array}{cccc} 1&1&1&8\\0&1&12&15\\0&0&1&1\end{array} \right]\)
The last matrix represents the equivalent system.
\[\begin{align*} x−y+z &= 8 \\ y−12z &= −15 \\ z &= 1 \end{align*}\]
Using backsubstitution, we obtain the solution as \((4,−3,1)\).
Example \(\PageIndex{8}\): Solving a Dependent System of Linear Equations Using Matrices
Solve the following system of linear equations using matrices.
\[\begin{align*} −x−2y+z &= −1 \\ 2x+3y &= 2 \\ y−2z &= 0 \end{align*}\]
Solution
Write the augmented matrix.
\(\left[ \begin{array}{cccc} 1&2&1&1\\2&3&0&2\\0&1&2&0\end{array} \right]\)
First, multiply row 1 by \(−1\) to get a \(1\) in row 1, column 1. Then, perform row operations to obtain rowechelon form.
\(R_1\rightarrow \left[ \begin{array}{cccc} 1&2&1&1\\2&3&0&2\\0&1&2&0\end{array} \right]\)
\(R_2\leftrightarrow R_3\rightarrow \left[ \begin{array}{cccc} 1&2&1&1\\0&1&2&0\\2&3&0&2\end{array} \right]\)
\(−2R_1+R_3=R_3\rightarrow \left[ \begin{array}{cccc} 1&2&1&1\\0&1&2&0\\0&1&2&0\end{array} \right]\)
\(R_2+R_3=R_3\rightarrow \left[ \begin{array}{cccc} 1&2&1&1\\0&1&2&0\\0&0&0&0\end{array} \right]\)
The last matrix represents the following system.
\[\begin{align*} x+2y−z &= 1 \\ y−2z &= 0 \\ 0 &= 0 \end{align*}\]
We see by the identity \(0=0\) that this is a dependent system with an infinite number of solutions. We then find the generic solution. By solving the second equation for \(y\) and substituting it into the first equation we can solve for \(z\) in terms of \(x\).
\[\begin{align*} x+2y−z &= 1 \\ y &= 2z \\ x+2(2z)−z &= 1 \\ x+3z &= 1 \\ z &=\dfrac{1−x}{3} \end{align*}\]
Now we substitute the expression for \(z\) into the second equation to solve for \(y\) in terms of \(x\).
\[\begin{align*} y−2z &= 0 \\ z &= \dfrac{1−x}{3} \\ y−2\left(\dfrac{1−x}{3}\right) &= 0 \\ y &= \dfrac{2−2x}{3} \end{align*}\]
The generic solution is \(\left(x,\dfrac{2−2x}{3},\dfrac{1−x}{3}\right)\).
Exercise \(\PageIndex{5}\)
Solve the system using matrices.
\[\begin{align*} x+4yz&= 4\\ 2x+5y+8z&= 1\\ 5x+3y3z&= 1 \end{align*}\]
 Answer

\((1,1,1)\)
Q&A: Can any system of linear equations be solved by Gaussian elimination?
Yes, a system of linear equations of any size can be solved by Gaussian elimination.
How to: Given a system of equations, solve with matrices using a calculator
 Save the augmented matrix as a matrix variable \([A], [B], [C], ….\)
 Use the ref( function in the calculator, calling up each matrix variable as needed.
Example \(\PageIndex{9A}\): Solving Systems of Equations with Matrices Using a Calculator
Solve the system of equations.
\[\begin{align*} 5x+3y+9z&= 1\\ 2x+3yz&= 2\\ x4y+5z&= 1 \end{align*}\]
Solution
Write the augmented matrix for the system of equations.
\(\left[ \begin{array}{cccc} 5&3&9&1\\2&3&1&2\\1&4&5&1\end{array} \right]\)
On the matrix page of the calculator, enter the augmented matrix above as the matrix variable \([A]\).
\([A]=\left[ \begin{array}{cccc} 5&3&9&1\\2&3&1&2\\1&4&5&1\end{array} \right]\)
Use the ref( function in the calculator, calling up the matrix variable \([A]\).
ref([A])
Evaluate
\[\begin{array}{cc} {\left[ \begin{array}{cccc} 1&\dfrac{3}{5}&\dfrac{9}{5}&\dfrac{1}{5}\\0&1&\dfrac{13}{21}&\dfrac{4}{7}\\0&0&1&\dfrac{24}{187}\end{array} \right] \rightarrow} & {\begin{align*} x+\dfrac{3}{5}y+\dfrac{9}{5}z &= \dfrac{1}{5} \\ y+\dfrac{13}{21}z &= \dfrac{4}{7} \\ z &= \dfrac{24}{187} \end{align*}} \end{array}\]
Using backsubstitution, the solution is \(\left(\dfrac{61}{187},−\dfrac{92}{187},−\dfrac{24}{187}\right)\).
Example \(\PageIndex{9B}\): Applying \(2×2\) Matrices to Finance
Carolyn invests a total of \($12,000\) in two municipal bonds, one paying \(10.5%\) interest and the other paying \(12%\) interest. The annual interest earned on the two investments last year was \($1,335\). How much was invested at each rate?
Solution
We have a system of two equations in two variables. Let \(x=\) the amount invested at \(10.5%\) interest, and \(y=\) the amount invested at \(12%\) interest.
\[\begin{align*} x+y&= 12,000\\ 0.105x+0.12y&= 1,335 \end{align*}\]
As a matrix, we have
\(\left[ \begin{array}{ccc} 1&1&12,000\\0.105&0.12&1,335\end{array} \right]\)
Multiply row 1 by \(−0.105\) and add the result to row 2.
\(\left[ \begin{array}{ccc} 1&1&12,000\\0&0.015&75\end{array} \right]\)
Then,
\[\begin{align*} 0.015y &= 75 \\ y &= 5,000 \end{align*}\]
So \(12,000−5,000=7,000\).
Thus, \($5,000\) was invested at \(12%\) interest and \($7,000\) at \(10.5%\) interest.
Example \(\PageIndex{10}\): Applying \(3×3\) Matrices to Finance
Ava invests a total of \($10,000\) in three accounts, one paying \(5%\) interest, another paying \(8%\) interest, and the third paying \(9%\) interest. The annual interest earned on the three investments last year was \($770\). The amount invested at \(9%\) was twice the amount invested at \(5%\). How much was invested at each rate?
Solution
We have a system of three equations in three variables. Let \(x\) be the amount invested at \(5%\) interest, let \(y\) be the amount invested at \(8%\) interest, and let \(z\) be the amount invested at \(9%\) interest. Thus,
\[\begin{align*} x+y+z &= 10,000 \\ 0.05x+0.08y+0.09z &= 770 \\ 2x−z &= 0 \end{align*}\]
As a matrix, we have
\(\left[ \begin{array}{cccc} 1&1&1&10,000\\0.05&0.08&0.09&770\\2&0&1&0\end{array} \right]\)
Now, we perform Gaussian elimination to achieve rowechelon form.
\(−0.05R_1+R_2=R_2\rightarrow \left[ \begin{array}{cccc} 1&1&1&10,000\\0&0.03&0.04&270\\2&0&1&0\end{array} \right]\)
\(−2R_1+R_3=R_3\rightarrow \left[ \begin{array}{cccc} 1&1&1&10,000\\0&0.03&0.04&270\\0&2&3&20,000\end{array} \right]\)
\(\dfrac{1}{0.03}R_2=R_2\rightarrow \left[ \begin{array}{cccc} 1&1&1&10,000\\0&1&\dfrac{4}{3}&9,000\\0&2&3&20,000\end{array} \right]\)
\(2R_2+R_3=R_3\rightarrow \left[ \begin{array}{cccc} 1&1&1&10,000\\0&1&\dfrac{4}{3}&9,000\\0&0&\dfrac{1}{3}&2,000\end{array} \right]\)
The third row tells us \(−\dfrac{1}{3}z=−2,000\); thus \(z=6,000\).
The second row tells us \(y+\dfrac{4}{3}z=9,000\). Substituting \(z=6,000\),we get
\[\begin{align*} y+\dfrac{4}{3}(6,000) &= 9,000 \\ y+8,000 &= 9,000 \\ y &= 1,000 \end{align*}\]
The first row tells us \(x+y+z=10,000\). Substituting \(y=1,000\) and \(z=6,000\),we get
\[\begin{align*} x+1,000+6,000 &= 10,000 \\ x &= 3,000 \end{align*}\]
The answer is \($3,000\) invested at \(5%\) interest, \($1,000\) invested at \(8%\), and \($6,000\) invested at \(9%\) interest.
Exercise \(\PageIndex{6}\)
A small shoe company took out a loan of \($1,500,000\) to expand their inventory. Part of the money was borrowed at \(7%\), part was borrowed at \(8%\), and part was borrowed at \(10%\). The amount borrowed at \(10%\) was four times the amount borrowed at \(7%\), and the annual interest on all three loans was \($130,500\). Use matrices to find the amount borrowed at each rate.
 Answer

\($150,000\) at \(7%\), \($750,000\) at \(8%\), \($600,000\) at \(10%\)
Media
Access these online resources for additional instruction and practice with solving systems of linear equations using Gaussian elimination.
Key Concepts
 An augmented matrix is one that contains the coefficients and constants of a system of equations. See Example \(\PageIndex{1}\).
 A matrix augmented with the constant column can be represented as the original system of equations. See Example \(\PageIndex{2}\).
 Row operations include multiplying a row by a constant, adding one row to another row, and interchanging rows.
 We can use Gaussian elimination to solve a system of equations. See Example \(\PageIndex{3}\), Example \(\PageIndex{4}\), and Example \(\PageIndex{5}\).
 Row operations are performed on matrices to obtain rowechelon form. See Example \(\PageIndex{6}\).
 To solve a system of equations, write it in augmented matrix form. Perform row operations to obtain rowechelon form. Backsubstitute to find the solutions. See Example \(\PageIndex{7}\) and Example \(\PageIndex{8}\).
 A calculator can be used to solve systems of equations using matrices. See Example \(\PageIndex{9}\).
 Many realworld problems can be solved using augmented matrices. See Example \(\PageIndex{10}\) and Example \(\PageIndex{11}\).
Contributors and Attributions
Jay Abramson (Arizona State University) with contributing authors. Textbook content produced by OpenStax College is licensed under a Creative Commons Attribution License 4.0 license. Download for free at https://openstax.org/details/books/precalculus.