Introductory maths analysis chapter 06 official

INTRODUCTORY MATHEMATICALINTRODUCTORY MATHEMATICAL
ANALYSISANALYSISFor Business, Economics, and the Life and Social Sciences
©2007 Pearson Education Asia
Chapter 6Chapter 6
Matrix AlgebraMatrix Algebra

INTRODUCTORY MATHEMATICAL
ANALYSIS
0. Review of Algebra
1. Applications and More Algebra
2. Functions and Graphs
3. Lines, Parabolas, and Systems
4. Exponential and Logarithmic Functions
5. Mathematics of Finance
6. Matrix Algebra
7. Linear Programming
8. Introduction to Probability and Statistics

9. Additional Topics in Probability
10. Limits and Continuity
11. Differentiation
12. Additional Differentiation Topics
13. Curve Sketching
14. Integration
15. Methods and Applications of Integration
16. Continuous Random Variables
17. Multivariable Calculus
INTRODUCTORY MATHEMATICAL
ANALYSIS

• Concept of a matrix.
• Special types of matrices.
• Matrix addition and scalar multiplication operations.
• Express a system as a single matrix equation using
matrix multiplication.
• Matrix reduction to solve a linear system.
• Theory of homogeneous systems.
• Inverse matrix.
• Use a matrix to analyze the production of sectors of an
economy.
Chapter 6: Matrix Algebra
Chapter ObjectivesChapter Objectives

Matrices
Matrix Addition and Scalar Multiplication
Matrix Multiplication
Solving Systems by Reducing Matrices
Solving Systems by Reducing Matrices
(continued)
Inverses
Leontief’s Input—Output Analysis
6.1)
6.2)
6.3)
6.4)
Chapter OutlineChapter Outline
6.5)
6.6)
6.7)

6.1 Matrices6.1 Matrices
• A matrix consisting of m horizontal rows and n
vertical columns is called an m×n matrix or a
matrix of size m×n.
• For the entry aij, we call i the row subscript and j
the column subscript.




















mnmm
n
n
aaa
aaa
aaa
...
......
......
......
...
...
21
21221
11211

a. The matrix has size .
b. The matrix has size .
c. The matrix has size .
d. The matrix has size .
6.1 Matrices
Example 1 – Size of a Matrix
[ ]021 31×









 −
49
15
61
23×
[ ]7 11×










−−
−
11126
865119
42731
53×

6.1 Matrices
Example 3 – Constructing Matrices
Equality of Matrices
• Matrices A = [aij ] and B = [bij] are equal if they
have the same size and aij = bij for each i and j.
Transpose of a Matrix
• A transpose matrix is denoted by AT
.
If , find .
Solution:
Observe that .






=
654
321
A










=
63
52
41
T
A
( ) AA
TT
=
T
A

6.2 Matrix Addition and Scalar Multiplication6.2 Matrix Addition and Scalar Multiplication
Example 1 – Matrix Addition
Matrix Addition
• Sum A + B is the m × n matrix obtained by adding
corresponding entries of A and B.
a.
b. is impossible as matrices are not of the same
size.










−=










++
+−
−+
=










−
−
+










68
83
08
0635
4463
2271
03
46
27
63
52
41






+





1
2
43
21

6.2 Matrix Addition and Scalar Multiplication
Example 3 – Demand Vectors for an Economy
Demand for the consumers is
For the industries is
What is the total demand for consumers and the
industries?
Solution:
Total:
[ ] [ ] [ ]12641170523 321 === DDD
[ ] [ ] [ ]05308020410 === SEC DDD
[ ] [ ] [ ] [ ]1825712641170523321 =++=++ DDD
[ ] [ ] [ ] [ ]1265005308020410 =++=++ SEC DDD
[ ] [ ] [ ]3031571265018257 =+

Scalar Multiplication
• Properties of Scalar Multiplication:
Subtraction of Matrices
• Property of subtraction is ( )AA 1−=−

Example 5 – Matrix Subtraction
a.
b.










−
−
−
=










−+
−−−
+−
=









 −
−










−
13
08
84
3203
1144
2662
30
14
26
23
14
62






−−
=




 −
−





−
=−
52
80
42
66
10
26
2BAT

6.3 Matrix Multiplication6.3 Matrix Multiplication
Example 1 – Sizes of Matrices and Their Product
• AB is the m× p matrix C whose entry cij is given by
A = 3 × 5 matrix
B = 5 × 3 matrix
AB = 3 × 3 matrix but BA = 5 × 5 matrix.
C = 3 × 5 matrix
D = 7 × 3 matrix
CD = undefined but DC = 7 × 5 matrix.
njinji
n
k
jikjikij babababac +++== ∑=
...22
1
11

6.3 Matrix Multiplication
Example 3 – Matrix Products
a.
b.
c.
d.
[ ] [ ]32
6
5
4
321 =










[ ]










=










183
122
61
61
3
2
1










−−
−
−
=










−
−−










−
−
1047
0110
11316
212
312
201
401
122
031






++
++
=











2222122121221121
2212121121121111
2221
1211
2221
1211
babababa
babababa
bb
bb
aa
aa

Example 5 – Cost Vector
Given the price and the quantities, calculate the total
cost.
Solution:
The cost vector is
[ ]432=P
Cofunits
Bofunits
Aofunits
11
5
7










=Q
[ ] [ ]73
11
5
7
432 =










=PQ

Example 7 – Associative Property
If
compute ABC in two ways.
Solution 1: Solution 2:
Note that A(BC) = (AB)C.










=




 −
=





−−
−
=
11
20
01
211
103
43
21
CBA
( )





 −−
=




 −






−−
−
=
































−−
−
=
196
94
43
12
43
21
11
20
01
211
103
43
21
BCA ( )





 −−
=
















−
−−
=






























−−
−
=
196
94
11
20
01
1145
521
11
20
01
211
103
43
21
CAB

Example 9 – Raw Materials and Cost
Find QRC when
Solution:
[ ]975=Q










=
1358256
21912187
17716205
R
















=
1500
150
800
1200
2500
C










=


























=
71650
81550
75850
1500
150
800
1200
2500
1358256
21912187
17716205
RC
( ) [ ] [ ]900,809,1
71650
81550
75850
1275 =










== RCQQRC

Example 11 – Matrix Operations Involving I and O
If
compute each of the following.
Solution:
00
00
10
01
41
23
10
3
10
1
5
1
5
2






=





=





−
−
=





= OIBA
31
22
41
23
10
01
a. 





−−
−−
=





−





=− AI
( ) 





=













−





=













−





=−
63
63
20
02
41
23
3
10
01
2
41
23
323b. IA
OAO =











=
00
00
41
23
c.
IAB =





=





−
−






=
10
01
41
23
d.
10
3
10
1
5
1
5
2

Example 13 – Matrix Form of a System Using Matrix Multiplication
Write the system
in matrix form by using matrix multiplication.
Solution:
If
then the single matrix equation is



=+
=+
738
452
21
21
xx
xx






=





=





=
7
4
38
52
2
1
B
x
x
XA






=











=
7
4
38
52
2
1
x
x
BAX

6.4 Solving Systems by Reducing Matrices6.4 Solving Systems by Reducing Matrices
Elementary Row Operations
1. Interchanging two rows of a matrix
2. Multiplying a row of a matrix by a nonzero number
3. Adding a multiple of one row of a matrix to a
different row of that matrix

Properties of a Reduced Matrix
• All zero-rows at the bottom.
• For each nonzero-row, leading entry is 1 and the
rest zeros.
• Leading entry in each row is to the right of the
leading entry in any row above it.

6.4 Solving Systems by Reducing Matrices
Example 1 – Reduced Matrices
For each of the following matrices, determine whether
it is reduced or not reduced.
Solution:
a. Not reduced b. Reduced
c. Not reduced d. Reduced
e. Not reduced f. Reduced












































0000
2100
3010
f.
010
000
001
e.
000
000
d.
01
10
c.
010
001
b.
30
01
a.

Example 3 – Solving a System by Reduction
By using matrix reduction, solve the system
Solution:
Reducing the augmented coefficient matrix of the
system,
We have









 −
1
5
1
11
12
32





=+
=+
−=+
1
52
132
yx
yx
yx










−
0
3
4
00
10
01



−=
=
3
4
y
x

Example 5 – Parametric Form of a Solution
Using matrix reduction, solve
Solution:
Reducing the matrix of the system,
We have and x4 takes on any real value.










− 9
2
10
6303
1210
6232





=+−
=++
=+++
9633
22
06232
431
432
4321
xxx
xxx
xxxx










1
0
4
100
0010
001
2
1
2
5





−=
=
−=
42
1
3
2
42
5
1
1
0
4
xx
x
xx

(continued)(continued)
Example 1 – Two-Parameter Family of Solutions
Using matrix reduction, solve
Solution:
The matrix is reduced to
The solution is





=+−−
−=+++
−=+++
32
143
3552
4321
4321
4321
xxxx
xxxx
xxxx










−
0
2
1
0000
1210
3101







=
=
−−−=
−−=
sx
rx
srx
srx
4
3
2
1
22
31

6.5 Solving Systems by Reducing Matrices (Continue)
• The system
is called a homogeneous system if c1 = c2 = … =
cm = 0.
• The system is non-homogeneous if at least one
of the c’s is not equal to 0.










=+++
=+++
mnmnmm
nn
cxaxaxa
cxaxaxa
...
.
.
.
.
...
2211
11212111
Concept for number of solutions:
1. k < n  infinite solutions
2. k = n  unique solution

6.5 Solving Systems by Reducing Matrices (Continue)
Example 3 – Number of Solutions of a Homogeneous System
Determine whether the system has a unique solution
or infinitely many solutions.
Solution:
2 equations (k), homogeneous system, 3 unknowns
(n).
The system has infinitely many solutions.



=−+
=−+
0422
02
zyx
zyx

6.6 Inverses6.6 Inverses
Example 1 – Inverse of a Matrix
• When matrix CA = I, C is an inverse of A and A is
invertible.
Let and . Determine whether C is
an inverse of A.
Solution:
Thus, matrix C is an inverse of A.






=
73
21
A 





−
−
=
13
27
C
ICA =





=











−
−
=
10
01
73
21
13
27

6.6 Inverses
Example 3 – Determining the Invertibility of a Matrix
Determine if is invertible.
Solution: We have
Matrix A is invertible where
Method to Find the Inverse of a Matrix
• When matrix is reduced, ,
- If R = I, A is invertible and A−1
= B.
- If R ≠ I, A is not invertible.
[ ] [ ]BRIA →→ 






=
22
01
A
[ ] 





=
10
01
22
01
IA [ ]BI=





− 2
1
1
01
10
01






−
=−
2
1
1
1
01
A

6.6 Inverses
Example 5 – Using the Inverse to Solve a System
Solve the system by finding the inverse of the
coefficient matrix.
Solution:
We have
For inverse,
The solution is given by X = A−1
B:





−=−+
=+−
=−
1102
224
12
321
321
31
xxx
xxx
xx










−
−
−
=
1021
124
201
A










−
−
=−
115
4
229
2
9
2
411
A










−
−
−
=










−









−
−
−
=










4
17
7
1
2
1
115
4
229
2
9
2
41
3
2
1
x
x
x

6.7 Leontief’s Input-Output Analysis6.7 Leontief’s Input-Output Analysis
Example 1 – Input-Output Analysis
• Entries are called input–output coefficients.
• Use matrices to show inputs and outputs.
Given the input–output matrix,
suppose final demand changes to be 77 for A, 154 for
B, and 231 for C. Find the output matrix for the
economy. (The entries are in millions of dollars.)

6.7 Leontief’s Input-Output Analysis
Example 1 – Input-Output Analysis
Solution:
Divide entries by the total value of output to get A:
Final-demand matrix:
Output matrix is










=
231
154
77
D
( )










=−=
−
495
380
5.692
1
DAIX

Introductory maths analysis chapter 06 official

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