Hitting k primes by dice rolls

Abstract

Let S=(d1,d2,d3, … ) be an infinite sequence of rolls of independent fair dice. For an integer k ≥ 1, let Lk=Lk(S) be the smallest i so that there are k integers j ≤ i for which Σt=1j dt is a prime. Therefore, Lk is the random variable whose value is the number of dice rolls required until the accumulated sum equals a prime k times. It is known that the expected value of L1 is close to 2.43. Here we show that for large k, the expected value of Lk is (1+o(1)) ke k, where the o(1)-term tends to zero as k tends to infinity. We also include some computational results about the distribution of Lk for k ≤ 100.

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