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Re: [PrimeNumbers] Re: Generalized Fermat from Primorial

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  • Andrey Kulsha
    ... [snip] ... p#^2^n+1 isn t primoproth, it s primo-generalized-fermat. So, 1801#^16+1 appears to be the largest known such number (p#^2^n+1)? Best wishes,
    Message 1 of 4 , Aug 4, 2002
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      > > Did anybody look for primes of the form p#^2^n+1 (or n!^2^n+1)?
      > E.g., 1801#^16+1 is prime.
      [snip]
      > Check out
      >
      > http://home.btclick.com/rw.smith/pp/page1.htm

      p#^2^n+1 isn't primoproth, it's primo-generalized-fermat.

      So, 1801#^16+1 appears to be the largest known such number (p#^2^n+1)?

      Best wishes,

      Andrey
    • Andrey Kulsha
      Please forgive me my spaming... ... 789 7457#^16+1 50805 p16 2000 Generalized Fermat I should be more attentive. Best wishes, Andrey
      Message 2 of 4 , Aug 4, 2002
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        Please forgive me my spaming...

        > So, 1801#^16+1 appears to be the largest known such number (p#^2^n+1)?

        789 7457#^16+1 50805 p16 2000 Generalized Fermat

        I should be more attentive.

        Best wishes,

        Andrey
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