palindrome number
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prove that, there exits no palindrome number of 2 digit which is a perfect square.no trial & error,plz.try to prove with logic.
- nafistiham
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Re: palindrome number
all the two digit palindromes are $10k+k=11k$ type. where $k$ can be $1,2,3,4,5,6,7,8,9$ but if $11k=p^2$ $11$ must divide $k$. which it does not.so it isn't possible.
\[\sum_{k=0}^{n-1}e^{\frac{2 \pi i k}{n}}=0\]
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Re: palindrome number
number 23. Reverse and add that number to 23 to yield the palindrome 55.
- nafistiham
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Re: palindrome number
sorry,but i am a little confused what are you trying to say.qeemat wrote:number 23. Reverse and add that number to 23 to yield the palindrome 55.
the condition says to find a two digit palindrome square.
\[\sum_{k=0}^{n-1}e^{\frac{2 \pi i k}{n}}=0\]
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Re: palindrome number
The palindromes of two digits always have the same digit .So there are $9$ palindromes of two digit number. If there remains a perfect square palindrome,its first digit must be $1,4,5,6,9$ .So the palindromes must be $11,44,55,66,99$ .But neither of them is perfect square.So there doesn't exist any palindrome perfect square.
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- zadid xcalibured
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Re: palindrome number
Prosenjit,
Your solution is close to brute force.you have to show that 11 must divide them.Eventually in order to be a perfect square 121 must divide them.Which is not possible.
Your solution is close to brute force.you have to show that 11 must divide them.Eventually in order to be a perfect square 121 must divide them.Which is not possible.