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Odd number of digits in a palindrome to be divisible by 11? - Answers

No, not necessarily. 121 is a palindrome number with 3 digits (odd) and is divisible by 11. So this satisfies the premise, but 101, 111, 131, etc are not divisible by 11.An example which satisfies the premise does not prove it true, but one which contradicts the premise is enough to prove it false.



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Odd number of digits in a palindrome to be divisible by 11? - Answers

https://math.answers.com/math-and-arithmetic/Odd_number_of_digits_in_a_palindrome_to_be_divisible_by_11

No, not necessarily. 121 is a palindrome number with 3 digits (odd) and is divisible by 11. So this satisfies the premise, but 101, 111, 131, etc are not divisible by 11.An example which satisfies the premise does not prove it true, but one which contradicts the premise is enough to prove it false.



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https://math.answers.com/math-and-arithmetic/Odd_number_of_digits_in_a_palindrome_to_be_divisible_by_11

Odd number of digits in a palindrome to be divisible by 11? - Answers

No, not necessarily. 121 is a palindrome number with 3 digits (odd) and is divisible by 11. So this satisfies the premise, but 101, 111, 131, etc are not divisible by 11.An example which satisfies the premise does not prove it true, but one which contradicts the premise is enough to prove it false.

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      No, not necessarily. 121 is a palindrome number with 3 digits (odd) and is divisible by 11. So this satisfies the premise, but 101, 111, 131, etc are not divisible by 11.An example which satisfies the premise does not prove it true, but one which contradicts the premise is enough to prove it false.

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