An m x n system of linear equations consists of m linear equations in n unknowns. Describe the system to the left.

What can you say about the system?

$$x\ +\ 2y\ =\ 3$$

$$x\ +\ 2y\ =\ 4$$

What can you say about the system?

$$x\ +\ 3y\ =\ 5$$

$$2x\ +\ 6y\ =\ 10$$

A consistent system can have:

Write the augmented matrix that corresponds to the system

Which of the following is the correct representation for the system of equations?

What is left out in an augmented matrix?

What is the coefficient of x₃ from the second equation?

Which of the following represents the third equation?

Write the system that corresponds to the augmented matrix.

Write the system of linear equations represented by the augmented matrix

Write the system of linear equations and solve.

Back-substitute to calculate the solution from the augmented matrix Matrix.

Solve the system of equations represented by the augmented matrix.

What is the solution to the systems of equations represented by the 3x4 Matrix?

Complete the row operation.

$$R_2=-2r_1+r_2$$  

Write the system as an augmented matrix and multiply the first row by 3.

$$x+y=4$$

$$3x+3y\ =\ a$$

For what value(s) of a is the system consistent?

Write the system as an augmented matrix and multiply the second row by -2.

$$2x-y=5$$

$$-x+ay=3$$

For what value(s) of a is the system inconsistent?

Does linear algebra look interesting so far?