Show that the square of any positive integer cannot be of the form $6 m + 2$ or $6 m + 5$ for any integer $m$ .

Open in App

Solution

To prove the square of any positive integer cannot be of the form $6 m + 2$ or $6 m + 5$ for any integer $m$ .
Euclid's Division Lemma: For any two positive integers $a$ and $b$ , there exists unique integer $q$ and satisfying $a = b q + r$ , where $0 \leq r < b$ .
If $b = 6$ then $a = 6 q + r$ where $0 \leq r < 6$ .
So, $r = 0, 1, 2, 3, 4, 5$ .
Case 1: When $r = 0$ ,
$\begin{array}{rcl} a & = & 6 q + 0 \\ = & 6 q \end{array}$
Squaring on both the sides.
$a^{2} = {(6 q)}^{2} a^{2} = 36 q^{2} a^{2} = 6 m where, [m = 6 q^{2}]$
Case 2: When $r = 1$ ,
$\begin{array}{rcl} a & = & 6 q + 1 \end{array}$
Squaring on both the sides.
$a^{2} = {(6 q + 1)}^{2} a^{2} = 36 q^{2} + 1 + 12 q a^{2} = 6 (6 q^{2} + 2 q) + 1 a^{2} = 6 m + 1 where, [m = 6 q^{2} + 2 q]$
Case 3: When $r = 2$ ,
$\begin{array}{rcl} a & = & 6 q + 2 \end{array}$
Squaring on both the sides.
$a^{2} = {(6 q + 2)}^{2} a^{2} = 36 q^{2} + 4 + 24 q a^{2} = 6 (6 q^{2} + 4 q) + 4 a^{2} = 6 m + 4 where, [m = 6 q^{2} + 4 q]$
Case 4: When $r = 3$ ,
$\begin{array}{rcl} a & = & 6 q + 3 \end{array}$
Squaring on both the sides.
$a^{2} = {(6 q + 3)}^{2} a^{2} = 36 q^{2} + 9 + 36 q a^{2} = 6 (6 q^{2} + 6 q + 1) + 3 a^{2} = 6 m + 3 where, [m = 6 q^{2} + 6 q + 1]$
Case 5: When $r = 4$ ,
$\begin{array}{rcl} a & = & 6 q + 4 \end{array}$
Squaring on both the sides.
$a^{2} = {(6 q + 4)}^{2} a^{2} = 36 q^{2} + 16 + 48 q a^{2} = 6 (6 q^{2} + 8 q + 2) + 4 a^{2} = 6 m + 4 where, [m = 6 q^{2} + 8 q + 2]$
Case 6: When $r = 5$ ,
$\begin{array}{rcl} a & = & 6 m + 5 \end{array}$
Squaring on both the sides.
$a^{2} = {(6 q + 5)}^{2} a^{2} = 36 q^{2} + 25 + 60 q a^{2} = 6 (6 q^{2} + 10 q + 4) + 1 a^{2} = 6 m + 1 where, [m = 6 q^{2} + 10 q + 4]$
Hence, it is showed that the square of any positive integer cannot be of the form $6 m + 2$ or $6 m + 5$ for any positive integer $m$ .

Suggest Corrections

Similar questions

Show that square of any positive integer cannot be of the form 6m+2 or 6m+5 for any integer m

Question 4
Show that the square of any positive integer cannot be of the form 6m + 2 or 6m + 5 for any integer m.

Question 4
Show that the square of any positive integer cannot be of the form 6m + 2 or 6m + 5 for any integer m.

Join BYJU'S Learning Program