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Question
Prove that the product of two consecutive positive integers is divisible by 2
Solution
Let n – 1 and n be two consecutive positive integer, then the product is n(n – 1)
n(n – 1) = n2 – n
We know that any positive integers is of the form 2q or 2q + 1 for same integer q
Case 1:
when n = 2 q
n2 – n = (2q)2 – 2q
= 4q2 – 2q
= 2q (2q – 1)
= 2 [q(2q – 1)]
n2 – n = 2 r
r = q(2q – 1)
Hence n2 – n. divisible by 2 for every positive integer.
Case 2:
when n = 2q + 1
n2 – n = (2q + 1)2 – (2q + 1)
= (2q + 1) [2q + 1 – 1]
= 2q (2q + 1)
n2 – n = 2r
r = q (2q + 1)
n2 – n divisible by 2 for every positive integer.
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