the difference between the squares of two consecutive numbers is always odd? Verify it with three consecutive 3-digit numbers
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square of an even number gives an even number while square of an odd number gives an odd number. And we all know addition of an odd and even number gives an odd number ..
For eg. I will pick 2 and 3 as my numbers. 2^2+3^2=4+9=13
three consecutive integers example:-
will pick 5,6 &7 as my numbers.
5^2+6^2+7^2=25+36+49=110
Thus it is not true in the case of three consecutive integers
For eg. I will pick 2 and 3 as my numbers. 2^2+3^2=4+9=13
three consecutive integers example:-
will pick 5,6 &7 as my numbers.
5^2+6^2+7^2=25+36+49=110
Thus it is not true in the case of three consecutive integers
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² of An Even number gives an even number while square of an odd number gives an odd number.
For example we will take 2 and 3 as our numbers. 2² + 3² = 4 + 9 = 13.
Three consecutive integers examples are
will pick 5,6 &7 as our numbers.
5² + 6² + 7² = 25 + 36 + 49 = 110.
∴ It is not true in the case of three consecutive integers.
For example we will take 2 and 3 as our numbers. 2² + 3² = 4 + 9 = 13.
Three consecutive integers examples are
will pick 5,6 &7 as our numbers.
5² + 6² + 7² = 25 + 36 + 49 = 110.
∴ It is not true in the case of three consecutive integers.
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