PRESENTATION BY DIVYAM kumar -1.pptx mathematics

PRESENTATION BY
DIVYAM KUMAR
CLASS- 9th B
NUMBER
SYSTEM

CONTEXT
Presentation
title
• TYPES OF NUMBER SYSTEM
• RELATED RULES
• QUESTIONS/EXAMPLES
• SUMMARY
• HISTORY OF THE TOPIC
• INTRODUCTON
NUMBER
SYSTEM

HISTORY OF NUMBER SYSTEM
The history of number system
dates back thousands of
years ,with a early civilization like
ancient Babylonians ,Sumerians
etc. developing their own system.
The HinduArabic number system
introduced in the 7th century AE
revolutionized mathematics with
followed use of digits

4
INTRODUCTION
A NUMBER SYSTEM IS OF WRITING FOR EXPRESSING NUMBERS . IT IS THE
MATHEMATICAL NOTATION FOR REPRESENTING NUMBERS OF A GIVEN
SET BY USING DIGITS OR OTHER SYMBOLS IN A CONSTANT MANNER .
IT PROVIDES A UNIQE REPRESENTATION TO EVERY NUMBER AND
REPRESENT THE ARTHEMATICS AND AIGEBRAIC STRUCTURE OF THE
FIGURES .
IT ALSO ALLOWS US TO OPERATE ARTHEMATICS OPERATIONS LIKE
ADDATION , SUBTRATION AND DIVISION

TYPES OF NUMBER SYSTEM
NUMBER
SYSTEM
DECIMAL
NUMBERS
BINARY
NUMBERS
OCTAL
NUMBERS
HEXADECIMAL
NUMBERS
BASE 10
(0,9)
BASE 2
(0,1)
BASE 16
(0,9,A..F)
BASE 8
(0,7)

REAL NUMBER
• NATURAL NUMBER :- COUNTING NUMBERS are KNOWN AS NATURAL NUMBER
EG : THUS ,1,2,3,4,5,6 …etc. ., are ALL NATURAL NUMBER
• WHOLE NUMBER :- ALL NATURAL NUMBERS TOGATHER WITH 0 FORM THE
COLLECTION OF ALL WHOLE NUMBERS e.g. : 0,1,2,3,4,5,6,7 etc.
• INTEGERS :- ALL NATURAL NUMBERS , 0 AND NEGATIVE OF NATURAL NUMBERS
FORM THE COLLECTION OF ALL INTEGERS. EG. : THUS .. -5,-4,-3,-2,-1, 0,1,2,3,4 etc..
ARE ALL INTEGERS

RATIONAL NUMBER
 THE NUMBER IN THE FORM OF P/Q ,WHERE P & Q ARE INTEGERS
AND Q !=0, ARE KNOWN AS RATIONAL NUMBERS.
REMARKS :- (i) 0 IS A RATIONAL NUMBER, SINCE WE CAN WRITE ,0
=0/1.
(ii) EVERY NATURAL NUMBER IS RATIONAL NUMBER ,
SINCE WE
CAN WRITE , 1=1/1,2=2/1 etc.…
(iii) EVERY INTEGER IS A RATIONAL NUMBER , SINCE AN
INTEGER IS A RATIONAL NUMBER , SINCE AN
INTEGER CAN
BE WRITEN AS a/1.

PROPERTIES OF RATIONAL NUMBER
 RATIONAL NUMBERS FOLLOW THE COMMUTATIVE AND ASSOCIATIVE LAW
OF ADDITION AND MULTIPLICATION.THEY ALSO FOLLOW THE
DISTRIBUTIVE LAW OF MULTIPLICATION OVER ADDITION.IF A,B AND C ARE
THRE NUMBERS , THEN
a+b=b+a (commutative law of addition)
A*b=b*a (commutative law of multiplication)
A+(b+c)=(a+b)+c (associative law of addition)
A*(b*c)=(a*b)*c (associative law of multiplication)
A*(b+c)=a*b+a*c (law of distribution)
(b+c)a=b*a+c*a (law of distribution)

9
IRRATIONAL NUMBER
 A NUMBER WHICH CAN NEITHER BE EXPRESSED AS TERMINATING
DECIMAL NOR AS A REPEATING DECIMAL, IS CALEED AN IRRATIONAL
NUMBER.
 THUS , NON TERMINATING , NOIN REPEATING DECIMALS ARE
IRRATIONAL NUMBERS.

PROPERTIES OF IRRATIONAL NUMBER
(i) IRRATIONAL NUMBERS SATISFY THE COMMUTATIVE , ASSOCIATIVE AND DISTRIBUTIVE
LAWS FOR ADDITION AND MULTIPLICATION.
(ii) (a)SUM OF RATIONAL AND IRRATIONAL IS IRRATIONAL.
(b)DIFFERENCE OF A RATIONAL AND AN IRRATIONAL IS IRRATIONAL.
(c)PRODUCT OF RATIONAL AND AN IRRATIONAL IS IRRATIONAL.
(d) QUOTINET OF A RATIONAL AND IRRATIONAL IS IRRATIONAL

Summary
11
Presentation
title
IN THIS CHAPTER I HAVE LEARNT MANY THINGS
SOME OF THEM ARE
• THE COCEPT OF REAL NUMER AND HISTORY OF NUMBER SYSTEM
•MATHEMATICATION NAME OR HER CONTRIBUTION IN MATHEMATICS LIKE
PYTHAGORAS ,HIPPACUS, ARCHYTAS
• REPRESENTATION OF IRRATIONAL NUMBER IN THE NUMBER LINE
• LAWS OF EXPONENTS FOR A REAL NUMBER
• RATIONALISATION FACTORS or ETC…..

PRESENTATION BY DIVYAM kumar -1.pptx mathematics

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