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Summary Matrix and linear equations

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Matrices and linear equations are fundamental concepts in mathematics in field of linear algebra. Matrix is a rectangular array of numbers, symbols arranged in rows and columns. Matrices can be added, subtracted, and multiplied under certain conditions. Linear equation is an equation in which the...

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  • August 16, 2023
  • 13
  • 2023/2024
  • Summary
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Chapter 1 &
:MATRIX SYSTEM OF LINEAR
EQUATION
1.1 MATRIX Exp!


(a I
..B ( ). :(2,3]
A
= 36 =




Matrix · is a rectangular array of numbers.

·
the number in array are called entries


M is number of row


->
i) size of matrix(mxn)
n is number of column




ii) column matrix (column vector) -> B


iii) Row (row rector)
matrix -> c



iv) Entries of a matrix -> A [dij]
=




v)
square matrix -> (the
A diagonal is 3, 10)


Matrix Operations

2,).B
I ( Y,5]
Equal Matrix A
c exp:
=

:




·
if both matrixsame size =


the entries of a matrixsame
A B
-




i.
=




A:/2i7B) I
2
Addition and subtraction exp:

-
size of matrixmust same I




( i) ( ) (ii)
a B
+ =
-




-
=




(io)".o.)
3 Scalar Multiple of a Matrix Aexp.
is


<[A] [ cA] =




4 MatrixMultiplication -:
(5)()
I 1
B -1)
if A =




St),
·




pB=/ I
3x2

, 3 Partitioned Matrices Exp:




I I -Bit
a matrix can be subdivided or
partitioned into B 414
=



3


smaller matrices or submatrices: 0 -13 I



275 2


6 Transpose Matrix (AY exp!



I I I e
I
Anxm
2




SS
-

if Aman so the
transpose is A : A =




a 4

S 5 10 5


Trace
7 of a Matrix(tr)

-

if Ai s non matrix, then tr(A)= A,+dazt.... dun
expi




I -ii. I A(tr(A)
I 23
A 4
trace 6
=
1 + 10 +


21
+




-
= =


3

5

Rule of MatrixOperations & Inverse 6




Matrixoperation
a) Properties of
f)
Law of Exponents
not need to
AB and BA equal AB FBA if A is
square matrix, and s are integer, then



A "AS:Arts and (AV) Ars
=




invertible
b) Properties of MatrixArithmetic
(boleh terbalik)

B + A 9) Law of Exponents expiAB BA:In
A B
=


+
=




A(B c) + AB
=
+

AC if A
is invertible, then:


a(BC) =

(aB) c (ac)
= B ⑧ A "is
invertible and
(A)* A =
nonnegative
-X boleh-re
· A =LA")" for nonnegative n
-
hesti the 10 =




c)
Properties
"
Zero ·
if nonzero scalark, CKA)"=iA

A O:
+ O + A
= A



A A n)
0
Properties oft he transpose
n
=




A A
A - ⑧
(A) =




OA = O
LA B) +
*
= A +BY and (A-B):AT - BT


if cA 0
= then c 0
=
or A 0 (KAS KAY, =
K is a scalar


LABST BYAY
=




Multiplication Matrix (In=1nxn)
of Identity
d) invertibility
Invertibility Keterbalikkan
C
IfAi s man, a n dA In:A i) of transpose
I
then Alm:A a

transpose
If invertible matrix, then
A

e) Power Matrix Al is also can invertible

* -
matrix, (A 1)
-




If A
is square then (AT) =




A0 1
=
i) Invertible Matrix

Al A.A.A.... A (n times) is matrix and ifB issame size and
if A square
=

a
non singular
A=(A ) =A .A: A"(n times) square matrix whose AB:B A=1 i t said
then A invertible and B is inverse
determinant no
equal
to zero of A. Ifno such matrix B found, then A
is a

(invertible matrixcalled
singular. non
singular)
:

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