The sum of the squares of 4 consecutive integers is an even integer.

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Jillan asked Apr 3, 2023

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The sum of the squares of 4 consecutive integers is an even integer.

Mathematics
high-school

Jillan asked Apr 3, 2023

by Jillan

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15 votes

Answer:

yes

Explanation:

Let's call the first integer n and let's compute.
$n^2 + (n+1)^2 + (n+2)^2 +(n+3)^2 = \\n^2 + \\n^2+2n+1 + \\\ n^2+4n+4 + \\\ n^2+6n+9+\\\ n^2+8n+16 =\\4n^2+20n +30 = 2 (2n^2+10n+15)$

Which is indeed of the form 2(something), so it is even.

Gheese answered Apr 10, 2023

by Gheese

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