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Question
Show that the square of any positive integer is either of the form 4q or 4q + 1 for some integer q.
Solution
Let a be an arbitrary positive integer.
Then by Euclid’s division algorithm, corresponding to the positive integers a and 4, there exists non-negative integers m and r, such that
a = 4m + r, where 0 ≤ r < 4
`\implies` a2 = 16m2 + r2 + 8mr
Where, 0 ≤ r < 4 ......(i) [∵ (a + b)2 = a2 + 2ab + b2]
Case I: When r = 0,
Then putting r = 0 in equation (i), we get
a2 = 16m2
= 4(4m2)
= 4q
Where, q = 4m2 is an integer.
Case II: When r = 1,
Then putting r = 1 in equation (i), we get
a2 = 16m2 + 1 + 8m
= 4(4m2 + 2 in) + 1
= 4q + 1
Where, q = (4m2 + 2m) is an integer.
Case III: When r = 2,
Then putting r = 2 in equation (i), we get
a2 = 16m2 + 4 + 16m
= 4(4m2 + 4m + 1)
= 4q
Where, q = (4m2 + 4m + 1) is an integer.
Case IV: When r = 3,
Then putting r = 3 in equation (i), we get
a2 = 16m2 + 9 + 24m
= 16m2 + 24m + 8 + 1
= 4(4m2 + 6m + 2) + 1
= 4q + 1
Where, q = (4m2 + 6m + 2) is an integer.
Hence, the square of any positive integer is either of the form 4q or 4q + 1 for some integer q.
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