1. Math 1320 Chapter 3: Systems of Linear Equations and Matrices 3.2 Using Matrices to Solve Systems of Equations

2. Definitions

3. Example

4. Why? The reason for matrices is to make an organized system in which we no longer need to write the variable each time. We will always have our equations line up appropriately, so each column represents a specific variable. Just as we use the elimination method for solving systems, we have a method for solving a matrix.

5. Elementary Row Operations 1.We can multiply or divide an entire row by any nonzero number. 2.We can multiply a row by a nonzero number and add or subtract a multiple of another row. 3.We can switch the order of the rows.

6. Facts Gauss-Jordan row reduction uses these operations to arrive at a matrix in reduced- row echelon form where we have 1’s on the diagonals, 0’s elsewhere and constants in the far right column. Matrices are best on the (graphing) calculator. You are welcome to explore this on YouTube if you would like to learn more about it.

7. Examples: Solve