HP 50g Graphing Calculator User Manual

Page 11-36

Now we are ready to start the Gauss-Jordan elimination with full pivoting. We
will need to keep track of the permutation matrix by hand, so take your
notebook and write the P matrix shown above.

First, we check the pivot a

11

. We notice that the element with the largest

absolute value in the first row and first column is the value of a

31

= 8. Since we

want this number to be the pivot, then we exchange rows 1 and 3, by using:

1#3L @RSWP. The augmented matrix and the permutation matrix
now are:

Checking the pivot at position (1,1) we now find that 16 is a better pivot than
8, thus, we perform a column swap as follows: 1#2‚N

@@OK@@

@RSWP. The augmented matrix and the permutation matrix now are:

Now we have the largest possible value in position (1,1), i.e., we performed
full pivoting at (1,1). Next, we proceed to divide by the pivot:
16Y1L @RCI@ . The permutation matrix does not change, but the
augmented matrix is now:

The next step is to eliminate the 2 from position (3,2) by using:
2\#1#3@RCIJ

8

16

-1

41

0 0 1

2

0

3

-1

0 1 0

1

2

3

2

1 0 0

16

8

-1

41

0 0 1

0

2

3

-1

1 0 0

2

1

3

2

0 1 0

1

1/2 -1/16 41/16

0 0 1

0

2

3

-1

1 0 0

2

1

3

2

0 1 0

1

1/2 -1/16 41/16

0

0

1

0

2

3

-1

1

0

0

0

0

25/8

-25/8

0

1

0