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LCM of Polynomials

Use Euclid’s ...

Question

Use Euclid’s Division Algorithm to show that the squares of following numbers is either of form 3m or 3m + 1 for some integer m.
707

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Solution

Euclid’s Division Algorithm: For any two positive integers a and b, $a = b q + r, 0 \leq r < b$
Assume:
Let a be any positive integer and b = 3.
Then a = 3q + r for some integer q ≥ 0
And r = 0, 1, 2 because 0 ≤ r < 3
Therefore, a = 3q or 3q + 1 or 3q + 2
Case 1: a = 3q
$\begin{array}{rcl} a^{2} & = & {(3 q)}^{2} \\ = & 9 q^{2} \\ = & 3 \times 3 q^{2} \\ = & 3 m, where m = 3 q^{2} \end{array}$
Case 2: a = 3q + 1
$\begin{array}{rcl} a^{2} & = & {(3 q + 1)}^{2} \\ = & 9 q^{2} + 6 q + 1 \\ = & 3 \times (3 q^{2} + 2 q) + 1 \\ = & 3 m + 1, where m = 3 q^{2} + 2 q \end{array}$
Case 3: a = 3q + 2
$\begin{array}{rcl} a^{2} & = & {(3 q + 2)}^{2} \\ = & 9 q^{2} + 12 q + 4 \\ = & 3 \times (3 q^{2} + 4 q + 1) + 1 \\ = & 3 m + 1, where m = 3 q^{2} + 4 q + 1 \end{array}$
Thus, it can be said that the square of any positive integer is either of the form 3m or 3m + 1.
Hence, the square of 707 is either of the form 3m or 3m + 1.

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