EXAMPLE 1 Solve system (3). SOLUTION

The result of this calculation is written in place of the original third original third equation:

Now, multiply equation 2 by ½ in order to obtain 1 as the coefficient for . (This calculation will simplify the arithmetic in the next step.)

Use the in equation 2 to eliminate the 10 in equation 3. The “mental” computation is

The result of this calculation is written in place of the previous third equation (row):

Now, multiply equation 3 by 1/30 in order to obtain 1 as the coefficient for . (This calculation will simplify the arithmetic in the next step.)

The new system has a triangular form (the intuitive term triangular will be replaced by a precise term in the next section):

Eventually, you want to eliminate the term from equation 1, but it is more efficient to use the in equation 3 first, to eliminate the and terms in equations 2 and 1. The two “mental” calculations are.

It is convenient to combine the results of these two operations:

Now, having cleaned out the column above the in equation 3, move back to the in equation 2 and use it to eliminate the above it. Because of the previous work with , there is now no arithmetic involving terms. Add 2 times equation 2 to equation 1 and obtain the system:

The work is essentially done. It shows that the only solution of the original system is . However, since there are so many calculations involved, it is a good practice to check the work. To verify that is a solution, substitute these values into the left side of the original system, and compute:

The results agree with the right side of the original system, so is a solution of the system.

Example 1 illustrates how operations on equations in a linear system correspond to operations on the appropriate rows of the augmented matrix. The three basic operations listed earlier correspond to the following operation on the following operation on the augemented matrix.