Question

use Euclid's division lemma to show that the sqaure of any positive integer is either of the form of 3m or 3m+1 for some imteger​

Answer 1

Answer:

Let 'a' be any positive integer.

On dividing it by 3 , let 'q' be the quotient and 'r' be the remainder.

Such that ,

a = 3q + r , where r = 0 ,1 , 2

When, r = 0

∴ a = 3q

When, r = 1

∴ a = 3q + 1

When, r = 2

∴ a = 3q + 2

When , a = 3q

On squaring both the sides,

When, a = 3q + 1

On squaring both the sides ,

When, a = 3q + 2

On squaring both the sides,

Therefore , the square of any positive integer is either of the form 3m or 3m+1.

Mark me as brainlist!

Answer 2

Answer:

It is the correct answer.

Step-by-step explanation:

Hope this attachment helps you.