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Question
For any positive integer n, prove that (n3 – n) is divisible by 6.
Theorem
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Solution
Let a = n3 – n
`\implies` a = n – (n2 – 1)
`\implies` a = n – (n – 1)(n + 1) ...[∵ (a2 – b2) = (a – b)(a + b)]
`\implies` a = (n – 1) n (n + 1)
We know that, if a number is divisible by both 2 and 3, then it is also divisible by 6.
n – 1, n and n + 1 are three consecutive integers.
Now, a = (n – 1 ) n (n + 1) is product of three consecutive integers.
So, one out of these must be divisible by 2 and another one must be divisible by 3.
Therefore, a is divisible by both 2 and 3.
Thus, a = n3 – n is divisible by 6.
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