exercise:A86a5bb531: Difference between revisions

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(Created page with "<div class="d-none"><math> \newcommand{\NA}{{\rm NA}} \newcommand{\mat}[1]{{\bf#1}} \newcommand{\exref}[1]{\ref{##1}} \newcommand{\secstoprocess}{\all} \newcommand{\NA}{{\rm NA}} \newcommand{\mathds}{\mathbb}</math></div> Three tanks fight a three-way duel. Tank A has probability 1/2 of destroying the tank at which it fires, tank B has probability 1/3 of destroying the tank at which it fires, and tank C has probability 1/6 of destroying the tank at which it fir...")
 
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\newcommand{\mathds}{\mathbb}</math></div> Three tanks fight a three-way duel.  Tank A has  
\newcommand{\mathds}{\mathbb}</math></div> Three tanks fight a three-way duel.  Tank A has probability 1/2 of destroying the tank at which it fires, tank B has probability 1/3 of destroying the tank at which it fires, and tank C has probability 1/6 of destroying the tank at which it fires.  The tanks fire together and each tank fires at the strongest opponent not yet destroyed.  Form a Markov chain by taking as states the subsets of the set of tanks.  Find <math>\mat{N},~\mat{N}\mat{c}</math>, and <math>\mat{N}\mat{R}</math>, and interpret your results.  '' Hint'': Take as states ABC, AC, BC, A, B, C, and none, indicating the tanks that could survive starting in state ABC.  You can omit AB because this state cannot be reached from ABC.
probability 1/2 of destroying the tank at which it fires, tank B has  
probability 1/3 of destroying the tank at which it fires, and tank C has  
probability 1/6 of destroying the tank at which it fires.  The tanks fire
together  
and each tank fires at the strongest opponent not yet destroyed.  Form a Markov  
chain by taking as states the subsets of the set of tanks.  Find
<math>\mat{N},~\mat{N}\mat{c}</math>,  
and <math>\mat{N}\mat{R}</math>, and interpret your results.  '' Hint'':
Take as states ABC, AC, BC, A, B, C, and none, indicating the tanks that could
survive starting in state ABC.  You can omit AB because this state cannot be
reached from ABC.

Latest revision as of 22:22, 15 June 2024

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Three tanks fight a three-way duel. Tank A has probability 1/2 of destroying the tank at which it fires, tank B has probability 1/3 of destroying the tank at which it fires, and tank C has probability 1/6 of destroying the tank at which it fires. The tanks fire together and each tank fires at the strongest opponent not yet destroyed. Form a Markov chain by taking as states the subsets of the set of tanks. Find [math]\mat{N},~\mat{N}\mat{c}[/math], and [math]\mat{N}\mat{R}[/math], and interpret your results. Hint: Take as states ABC, AC, BC, A, B, C, and none, indicating the tanks that could survive starting in state ABC. You can omit AB because this state cannot be reached from ABC.