The estimated Coronavirus Mortality Rate is 0.2%, meaning that there is one death for every 500 people. The number of death cases has a Poisson distribution. 1. What is the probability that a town of 60000 people will have 135 death cases? Answer. (Hint Calculate the mean first. Given that there is one death for every 500 people, how many deaths are expected for \((60000)) people?) 2. If a city with a population of 500,000 has fewer than \((952}\) deaths due to Coronavirus, can it be considered that the city has managed the situation better than the average? (No answer given) = (Hint To determine whether this statement is true, you need to check whether the probability of less than \((952)) deaths in a city of 500,000 is less than 5% If the probability is less than 5%, you could consider the statement to be true, choose "True" if this is the case, otherwise choose "False")
The estimated Coronavirus Mortality Rate is 0.2%, meaning that there is one death for every 500 people. The number of death cases has a Poisson distribution. 1. What is the probability that a town of 60000 people will have 135 death cases? Answer. (Hint Calculate the mean first. Given that there is one death for every 500 people, how many deaths are expected for \((60000)) people?) 2. If a city with a population of 500,000 has fewer than \((952}\) deaths due to Coronavirus, can it be considered that the city has managed the situation better than the average? (No answer given) = (Hint To determine whether this statement is true, you need to check whether the probability of less than \((952)) deaths in a city of 500,000 is less than 5% If the probability is less than 5%, you could consider the statement to be true, choose "True" if this is the case, otherwise choose "False")
Chapter8: Sequences, Series,and Probability
Section8.7: Probability
Problem 11ECP: A manufacturer has determined that a machine averages one faulty unit for every 500 it produces....
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The estimated Coronavirus Mortality Rate is 0.2%, meaning that there is one death for every 500 people. The number of death cases has a Poisson distribution.
1. What is the probability that a town of 60000 people will have 135 death cases? Answer:
Hint Calculate the mean first. Given that there is one death for every 500 people, how many deaths are expected for \((60000))) people?)
2. If a city with a population of 500,000 has fewer than \((952}\) deaths due to Coronavirus, can it be considered that the city has managed the situation better than the average?
(No answer given) +
(Hint To determine whether this statement is true, you need to check whether the probability of less than \((952))) deaths in a city of 500,000 is less than 5%. If the probability is less than 5%, you
could consider the statement to be true, choose "True" if this is the case, otherwise choose "False")
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