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Natural numbers
- 1. THE CONCEPT OF NATURAL NUMBERS 2010 S
- 2. Definition S The set {0,1, 2, 3, 4, ...} is called the set of natural numbers and denoted by N, i.e. N = {0,1, 2, 3, 4, ...}
- 3. Betweenness in N If a and b are natural numbers with a >b, then there are (a – b) – 1 natural numbers between a and b.
- 4. Definition Two different natural numbers are called consecutive natural numbers if there is no natural number between them.
- 5. ADDITION OF NATURAL NUMBERS S If a, b, and c are natural numbers, where a + b = c, then a and b are called the addends and c is called the sum.
- 6. Properties of Addition in N Closure Property If a, b ∈ N, then (a + b) ∈ N. We say that N is closed under addition.
- 7. Properties of Addition in N Commutative Property If a, b ∈ N, then a + b = b + a . Therefore, addition is commutative in N.
- 8. Properties of Addition in N Associative Property If a, b, c ∈ N, then (a+b)+c = a+(b+c). Therefore, addition is associative in N.
- 9. Properties of Addition in N Identity Element S If a ∈ N, then a+0 = 0+a = a. Therefore, 0 is the additive identity or the identity element for addition in N.
- 10. SUBTRACTION OF NATURAL NUMBERS S If a, b, c ∈ N and a – b = c, then a is called the minuend, b is called the subtrahend, and c is called the difference.
- 11. Property S If a, b, c ∈ N where a – b = c, then a – c = b.
- 12. Properties of Subtraction in N S The set of natural numbers is not closed under subtraction. S The set of natural numbers is not commutative under subtraction. S The set of natural numbers is not associative under subtraction. S There is no identity element for N under subtraction.
- 13. MULTIPLICATION OF NATURAL NUMBERS S If a, b, c ∈ N, where a ⋅ b = c, then a and b are called thefactors and c is called theproduct.
- 14. Properties of Multiplication in N Closure Property S If a, b ∈ N, then a⋅ b ∈ N. Therefore, N is closed under multiplication.
- 15. Properties of Multiplication in N Commutative Property S If a, b ∈ N, then a⋅ b = b⋅ a. Therefore, multiplication is commutative in N.
- 16. Properties of Multiplication in N Associative Property S If a, b, c ∈ N, then a ⋅ (b ⋅ c) = (a ⋅ b) ⋅ c. Therefore, multiplication is associative in N.
- 17. Properties of Multiplication in N Identity Element S If a ∈ N, then a⋅ 1 = 1⋅ a = a. Therefore, 1 is the multiplicative identity or the identity element for multiplication in N.
- 18. Distributive Property of Multiplication Over Addition and Subtraction S For any natural numbers, a, b, and c: a⋅(b + c) = (a⋅b) + (a⋅c) and (b + c)⋅a = (b⋅a) + (c⋅a) and a⋅(b – c) = (a⋅b) – (a⋅c) and (b – c)⋅a = (b⋅a) – (c⋅a) In other words, multiplication is distributive over addition and subtraction.
- 19. DIVISION OF NATURAL NUMBERS S If a, b, c ∈ N, and a ÷ b = c, then a is called the dividend, b is called the divisor and c is calledthe quotient.
- 20. Division with Remainder S dividend = (divisor ⋅ quotient) + remainder
- 21. Zero in Division S If a ∈ N then 0 ÷ a = 0. However, a ÷ 0 and 0 ÷ 0 are undefined.
- 22. Properties of Division in N S The set of natural numbers is not closed under division. S The set of natural numbers is not commutative under division. S The set of natural numbers is not associative under division. S Division is not distributive over addition and subtraction in N.