Chapter 10 creating and manipulating matrices, Definitions, Chapter 10 – HP 50g Graphing Calculator User Manual

Page 10-1

Chapter 10

!

Creating and manipulating matrices

This chapter shows a number of examples aimed at creating matrices in the
calculator and demonstrating manipulation of matrix elements.

Definitions

A matrix is simply a rectangular array of objects (e.g., numbers, algebraics)
having a number of rows and columns. A matrix A having n rows and m
columns will have, therefore, n

×m elements. A generic element of the matrix is

represented by the indexed variable a

ij

, corresponding to row i and column j.

With this notation we can write matrix A as A = [a

ij

]

n

×m

. The full matrix is

shown next:

A matrix is square if m = n. The transpose of a matrix is constructed by
swapping rows for columns and vice versa. Thus, the transpose of matrix A, is
A

T

= [(a

T

)

ij

]

m

×n

= [a

ji

]

m

×n

. The main diagonal of a square matrix is the

collection of elements a

ii

. An identity matrix, I

n

×n

, is a square matrix whose

main diagonal elements are all equal to 1, and all off-diagonal elements are
zero. For example, a 3

×3 identity matrix is written as

An identity matrix can be written as I

n

×n

= [

δ

ij

], where

δ

ij

is a function known as

Kronecker’s delta, and defined as

.

.

]

[

2

1

2

22

21

1

12

11

⎥

⎥

⎥

⎥

⎦

⎤

⎢

⎢

⎢

⎢

⎣

⎡

=

=

×

nm

n

n

m

m

m

n

ij

a

a

a

a

a

a

a

a

a

a

L

O

M

M

L

L

A

⎥

⎥

⎥

⎦

⎤

⎢

⎢

⎢

⎣

⎡

=

1

0

0

0

1

0

0

0

1

I

⎩

⎨

⎧

≠

=

=

j

i

if

j

i

if

ij

,

0

,

1

δ