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Question
Question 3
Prove that one of any three consecutive positive integers must be divisible by 3.
Prove that one of any three consecutive positive integers must be divisible by 3.
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Solution
Any three consecutive positive integers will be of the form;
n, (n + 1) and (n + 2), where n is any natural number i.e., n = 1, 2, 3, …..
Any number n, on dividing with 3 leaves 0, 1 and 2 as the remainders.
So, n = 3p or 3p+1 or 3p+2
Case 1 : n = 3p
⇒ 3 divides n
Case 2 : n = 3p+1 , then n+2 = (3p+1)+2 = 3p+3 = 3(p+1)
⇒ 3 divides n+2
Case 3 : n = 3p+2, then n+1 = (3p+2)+1 = 3p+3 =3(p+1)
⇒ 3 divides n+1
Hence, one of any three consecutive positive integers must be divisible by 3.
n, (n + 1) and (n + 2), where n is any natural number i.e., n = 1, 2, 3, …..
Any number n, on dividing with 3 leaves 0, 1 and 2 as the remainders.
So, n = 3p or 3p+1 or 3p+2
Case 1 : n = 3p
⇒ 3 divides n
Case 2 : n = 3p+1 , then n+2 = (3p+1)+2 = 3p+3 = 3(p+1)
⇒ 3 divides n+2
Case 3 : n = 3p+2, then n+1 = (3p+2)+1 = 3p+3 =3(p+1)
⇒ 3 divides n+1
Hence, one of any three consecutive positive integers must be divisible by 3.
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