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Explanation :-Division is not commutative for whole Numbers, this method that if we readjust the bespeak of number in the division expression, the an outcome also changes. You are watching: Division of whole numbers is commutative Commutative residential property for division of entirety Numbers can be further understood with the assist of following examples :-Example 1= explain Commutative building for division of entirety Numbers, through given entirety numbers 8 & 4 ?Answer = Given entirety numbers = 8, 4 and their two orders space as complies with :-Order 1 = 8 ÷ 4 = 2Order 2 = 4 ÷ 8 = 1/2As, in both the order the result of department expression is not same,So, we deserve to say that division is not Commutative for whole numbers. Example 2= explain Commutative property for department of totality Numbers, with given totality numbers 27 & 9 ?Answer = Given totality numbers = 27, 9 and their 2 orders room as follows :-Order 1 = 27 ÷ 9 = 3Order 2 = 9 ÷ 27 = 1/3As, in both the order the result of department expression is no same,So, we have the right to say that department is not Commutative for entirety numbers. See more: Rank Up Fast Offline On Halo Reach How To Rank Up Fast Offline Example 3= explain Commutative home for department of entirety Numbers, through given entirety numbers 18 & 24 ?Answer = Given whole numbers = 8, 4 and their two orders are as follows :-Order 1 = 18 ÷ 24 = 3/4Order 2 = 24 ÷ 18 = 4/3As, in both the assignment the result of division expression is no same,So, we have the right to say that division is no Commutative for whole numbers. If p = 216 and q = 36, explain commutative residential property of department of entirety numbers, which claims that (p ÷ q) ≠ (q ÷ p). as per commutative building of division of entirety numbers we recognize that department is not commutative for totality numbers. Describe this with the aid of two various pairs of totality numbers. |