On a Roll Again: Analysis of a Dice Removal Game

Abstract

Suppose we have n dice, each with s faces (assume s≥ n). On the first turn, roll all of them, and remove from play those that rolled an n. Roll all of the remaining dice. In general, if at a certain turn you are left with k dice, roll all of them and remove from play those that rolled a k. The game ends when you are left with no dice to roll. For n,s ∈ N \0\ such that s ≥ n, let Yns be the random variable for the number of turns to finish the game rolling n dice with s faces. We find recursive and non-recursive solutions for E(Yns) and Var(Yns), and bounds for both values. Moreover, we show that Yns can also be modeled as the maximum of a sequence of i.i.d. geometrically distributed random variables. Although, as far as we know, this game hasn't been studied before, similar problems have.

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