Show that the square of any positive integer cannot be in the form of 5q + 2 or 5q + 3 , for any integer "q "
class 10 - cbse
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Number divisible by 5 can be of the form:-
d = 5m + r,
where 0 ≤ r <5
If d = 5m, d² = 5.q,
where q is some integer and q = 5m²
If d = 5m + 1, d² = 5q + 1
If d = 5m + 2, d² = 5q + 4
If d = 5m + 3, d² = 5q + 4
If d = 5m + 4, d² = 5q + 1
Therefore, the square of any positive integer cannot be in the form of 5q + 2 or 5q + 3 for any integer "q".
d = 5m + r,
where 0 ≤ r <5
If d = 5m, d² = 5.q,
where q is some integer and q = 5m²
If d = 5m + 1, d² = 5q + 1
If d = 5m + 2, d² = 5q + 4
If d = 5m + 3, d² = 5q + 4
If d = 5m + 4, d² = 5q + 1
Therefore, the square of any positive integer cannot be in the form of 5q + 2 or 5q + 3 for any integer "q".
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