HP 48gII User Manual

Page 11-32

If you were performing these operations by hand, you would write the
following:





















−

−

−

−

≅





















−

−

−

−

=

4

3

7

1

2

4

1

2

3

3

2

1

4

3

14

1

2

4

1

2

3

6

4

2

aug

A





















−

−

−

≅





















−

−

−

−

−

−

≅

32

3

7

13

6

0

1

1

0

3

2

1

32

24

7

13

6

0

8

8

0

3

2

1

aug

A





















−

−

≅

14

3

7

7

0

0

1

1

0

3

2

1

aug

A

The symbol

≅ (“ is equivalent to”) indicates that what follows is equivalent to

the previous matrix with some row (or column) operations involved.

The resulting matrix is upper-triangular, and equivalent to the set of equations

X +2Y+3Z = 7,

Y+ Z = 3,

-7Z = -14,

which can now be solved, one equation at a time, by backward substitution,
as in the previous example.

Gauss-Jordan elimination using matrices
Gauss-Jordan elimination consists in continuing the row operations in the
upper-triangular matrix resulting from the forward elimination process until an
identity matrix results in place of the original

A matrix. For example, for the

case we just presented, we can continue the row operations as follows:

Multiply row 3 by –1/7:

7\Y 3 @RCI!

Multiply row 3 by –1, add it to row 2, replacing it:

1\ # 3

#2 @RCIJ!