Math, asked by sonalbaisa2143, 1 month ago

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


Answers

Answered by officialboy88
1

refer the image for your answer

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Answered by bloomingstarjasmime
0

Answer:

Let a be the positive integer and b = 6.

Then, by Euclid’s algorithm,

a = 6q + r for some integer q ≥ 0 and r = 0, 1, 2, 3, 4, 5 because 0 ≤ r < 5.

So, a = 6q or 6q + 1 or 6q + 2 or 6q + 3 or 6q + 4 or 6q + 5. (6q)2 = 36q2 = 6(6q2) = 6m,

where m is any integer. (6q + 1)2 = 36q2 + 12q + 1 = 6(6q2 + 2q) + 1 = 6m + 1,

where m is any integer. (6q + 2)2 = 36q2 + 24q + 4 = 6(6q2 + 4q) + 4 = 6m + 4, where m is any integer.

(6q + 3)2 = 36q2 + 36q + 9 = 6(6q2 + 6q + 1) + 3 = 6m + 3, where m is any integer. (6q + 4)2 = 36q2 + 48q + 16 = 6(6q2 + 7q + 2) + 4 = 6m + 4, where m is any integer.

(6q + 5)2 = 36q2 + 60q + 25 = 6(6q2 + 10q + 4) + 1 = 6m + 1, where m is any integer.

Hence, The square of any positive integer is of the form 6m, 6m + 1, 6m + 3, 6m + 4 and cannot be of the form 6m + 2 or 6m + 5 for any integer m.

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