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Associative Property | Rational Number | Class 8 Maths | CBSE | NCERT
Associative Property | Sums | Examples | Properties of Rational Numbers | Rational Number Class 8 Maths | rational numbers | number system | closure | whole numbers | integers | division | class 8 maths chapter 1 | class 8 maths | ncert solution for class 8 maths | ncert class 8 maths | ncert solution | cbse | ncert
Dear Students, in this video we are going to study a very important topic Associative Property from Chapter Rational Numbers from CBSE Class 8 Maths. Hope you find it helpful & interesting. Enjoy Learning!
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Rational Numbers
In the number system, rational numbers are numbers that can be expressed as a ratio of two integers. They can also be the quotient of the ratio if the rational number is an integer. If the rational number is represented by the ratio p/q, then q must be a non-zero integer. Since the denominator can be 1, every integer is a rational number.
Whole Numbers and Natural Numbers
Natural numbers are set of numbers starting from 1 counting up to infinity. The set of natural numbers is denoted as ′N′.
Whole numbers are set of numbers starting from 0 and going up to infinity. So basically they are natural numbers with zero added to the set. The set of whole numbers is denoted as ′W′.
Closure Property
Closure property is applicable for whole numbers in the case of addition and multiplication while it isn’t in the case for subtraction and division.
Commutative Property
The commutative property applies for whole numbers and natural numbers in the case of addition and multiplication but not in the case of subtraction and division.
Associative Property
The associative property applies for whole numbers and natural numbers in the case of addition and multiplication but not in the case of subtraction and division.
A rational number is a number that can be represented as a fraction of two integers in the form of p/q, where q must be non-zero. The set of rational numbers is denoted as Q.
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