Show that exactly one of the numbers n, n+2, n+4 is divisible by 3
Answers
Let n = 3k, 3k + 1 or 3k + 2.
(i) When n = 3k:
n is divisible by 3.
n + 2 = 3k + 2 ⇒ n + 2 is not divisible by 3.
n + 4 = 3k + 4 = 3(k + 1) + 1 ⇒ n + 4 is not divisible by 3.
(ii) When n = 3k + 1:
n is not divisible by 3.
n + 2 = (3k + 1) + 2 = 3k + 3 = 3(k + 1) ⇒ n + 2 is divisible by 3.
n + 4 = (3k + 1) + 4 = 3k + 5 = 3(k + 1) + 2 ⇒ n + 4 is not divisible by 3.
(iii) When n = 3k + 2:
n is not divisible by 3.
n + 2 = (3k + 2) + 2 = 3k + 4 = 3(k + 1) + 1 ⇒ n + 2 is not divisible by 3.
n + 4 = (3k + 2) + 4 = 3k + 6 = 3(k + 2) ⇒ n + 4 is divisible by 3.
Hence, exactly one of the numbers n, n + 2 or n + 4 is divisible by 3.
HOPE IT HELPED ^_^
Step-by-step explanation:
Euclid's division Lemma any natural number can be written as: .
where r = 0, 1, 2,. and q is the quotient.
thus any number is in the form of 3q , 3q+1 or 3q+2.
case I: if n =3q
n = 3q = 3(q) is divisible by 3,
n + 2 = 3q + 2 is not divisible by 3.
n + 4 = 3q + 4 = 3(q + 1) + 1 is not divisible by 3.
case II: if n =3q + 1
n = 3q + 1 is not divisible by 3.
n + 2 = 3q + 1 + 2 = 3q + 3 = 3(q + 1) is divisible by 3.
n + 4 = 3q + 1 + 4 = 3q + 5 = 3(q + 1) + 2 is not divisible by 3.
case III: if n = 3q + 2
n =3q + 2 is not divisible by 3.
n + 2 = 3q + 2 + 2 = 3q + 4 = 3(q + 1) + 1 is not divisible by 3.
n + 4 = 3q + 2 + 4 = 3q + 6 = 3(q + 2) is divisible by 3.
thus one and only one out of n , n+2, n+4 is divisible by 3.
Hence, it is solved
THANKS
#BeBrainly.