exercise:Cb30e81684: Difference between revisions

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Once upon a time, there were two railway trains competing for the passenger traffic of 1000 people leaving from Chicago at the same hour and
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going to Los Angeles.  Assume that passengers are equally likely to choose each train.  How many seats must a train have to assure a probability of .99 or
\newcommand{\mat}[1]{{\bf#1}}
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\newcommand{\mathds}{\mathbb}</math></div>  Once upon a time, there were two railway trains competing for the
passenger traffic of 1000 people leaving from Chicago at the same hour and
going to Los Angeles.  Assume that passengers are equally likely to choose each
train.  How many seats must a train have to assure a probability of .99 or
better of having a seat for each passenger?
better of having a seat for each passenger?

Latest revision as of 22:57, 14 June 2024

Once upon a time, there were two railway trains competing for the passenger traffic of 1000 people leaving from Chicago at the same hour and going to Los Angeles. Assume that passengers are equally likely to choose each train. How many seats must a train have to assure a probability of .99 or better of having a seat for each passenger?

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