#PRODUCT OF TWO PRIMES

Suppose that you roll a fair die with n faces, starting at 0, and keep addin\

    g up the outcomes, until you reach an integer that has property, "IsPP"



approximating it  with the assumtion that you do it up to, 100,

    times , here are the averages from n=2 to n=N



If the fair die has, 2, faces , then the estimated expected duration is,

    5.233886719



If the fair die has, 3, faces , then the estimated expected duration is,

    4.577691612



If the fair die has, 4, faces , then the estimated expected duration is,

    4.614027232



If the fair die has, 5, faces , then the estimated expected duration is,

    4.409156615



If the fair die has, 6, faces , then the estimated expected duration is,

    3.788921291



If the fair die has, 7, faces , then the estimated expected duration is,

    3.865822943



If the fair die has, 8, faces , then the estimated expected duration is,

    3.882983038



If the fair die has, 9, faces , then the estimated expected duration is,

    3.879733053



If the fair die has, 10, faces , then the estimated expected duration is,

    3.545725324



If the fair die has, 11, faces , then the estimated expected duration is,

    3.622903864



If the fair die has, 12, faces , then the estimated expected duration is,

    3.726646355



If the fair die has, 13, faces , then the estimated expected duration is,

    3.744836687



If the fair die has, 14, faces , then the estimated expected duration is,

    3.511552691



If the fair die has, 15, faces , then the estimated expected duration is,

    3.330838911





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          This ends this paper that took, 193.804, seconds to prepare