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Prove that if n is a perfect square, then n+1 can never be a perfect square
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Prove that if n is a perfect square, then n+1 can never be a perfect square

User Swpd
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1 Answer

3 votes

Answer:

Proved

Explanation:

To prove that if n is a perfect square, then n+1 can never be a perfect square

Let n be a perfect square


n=x^2

Let
n+1 = y^2

Subtract to get


1 = y^2-x^2 =(y+x)(y-x)

Solution is y+x=y-x=1

This gives x=0

So only 0 and 1 are consecutive integers which are perfect squares

No other integer satisfies y+x=y-x=1

User Nishant B
by
5.7k points
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