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Topic: The non existence of p'th root of any prime number, for (p>2)
prime

Replies: 46   Last Post: Oct 12, 2017 1:41 AM

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 bassam king karzeddin Posts: 1,651 Registered: 8/22/16
Re: The non existence of p'th root of any prime number, for (p>2) prime
Posted: Jul 30, 2017 7:10 AM

On Sunday, February 19, 2017 at 8:30:04 PM UTC+3, bassam king karzeddin wrote:
> Why does the trustiness of Fermat's last theorem implies directly the non existence of the real positive arithmetical p'th root of any prime number
> ($\sqrt[p]{q}$)?
>
> Where (p) is odd prime number, and (q) is prime number
>
> It is an easy task for school students NOW!
>
> Regards
> Bassam King Karzeddin
> 19/02/17

For those who don't understand yet the notation ($\sqrt[p]{q}$), which means the air-thematic p'th root of a prime number denoted by this also (q^{1/p}), where (p > 2) and (q) are prime nubers

BKK