Augmented Matrices and Solving Systems of Equations

To increase the number of equations

To simplify the process of finding solutions

To visualize the equations graphically

To eliminate the need for variables

By using only the constant terms

By multiplying the equations

By combining the coefficient matrix with constant terms

By rearranging the variables

Adding a multiple of one row to another

Dividing a row by a nonzero number

Interchanging two rows

Multiplying a row by zero

The matrix is triangular

The main diagonal consists of ones or zeros

All elements are zeros

The matrix is symmetric

The system has a unique solution

The system has infinite solutions

The system has no solution

The system is inconsistent

It helps in identifying the type of system

It consists of ones or zeros, aiding in solving the system

It indicates the rank of the matrix

It determines the number of solutions

They are all ones

They are all zeros

They are equal to the elements below the diagonal

They are greater than the elements below the diagonal

The system has a unique solution

The system has infinite solutions

The system has no solution

The system is dependent

By inspection

By solving each row as an equation

By graphing the matrix

By converting it back to row echelon form

Row echelon form has more zeros

Reduced row echelon form has zeros above the main diagonal

Reduced row echelon form is less structured

Row echelon form is easier to solve