The number of emails that I get in weekday can be modeled by a Poisson distribution...

The number of incoming calls at a telephone exchange is modeled using a Poisson distribution with...

The number of incoming calls at a telephone exchange is modeled using a Poisson distribution with mean lambda= 2 per minute a What is the probability of having five or less calls in a 3 min interval b Show that given that there were in calls during the first t minutes the number of calls during the first S<t minutes follows a binomial with parameters n and s/t

The number of cars arriving at a gas station can be modelled by Poisson distribution with...

The number of cars arriving at a gas station can be modelled by Poisson distribution with the average rate of 5 cars per 10 minutes. a. The probability that one car will arrive to a gas station in a 5 -minute interval is _________ b. The probability that at least one car will arrive to the gas station in a 10 - minute interval is ______

The number of baskets (either team) in a NBA basketball game is modeled using a Poisson...

The number of baskets (either team) in a NBA basketball game is modeled using a Poisson process with rate 1.5 per minute. (a) What is the distribution for the number of baskets in the first quarter (12 minutes)? Write down the pmf. (b) What is the distribution for the number of baskets in the whole game (assume game length of 48 minutes, i.e. 12 minutes per quarter)? Write down the pmf. (c) Write down the formula for the probability that...

1. Suppose the number of junk emails you received per day has a Poisson distribution with...

1. Suppose the number of junk emails you received per day has a Poisson distribution with an average of five per day. a) What is the probability that you receive 3 junk emails per day? b) What is the probability that you receive at least 1 junk email per day? c) What is the probability that you receive at most 3 junk emails per day? d) What is the likelihood of receiving between 3 and 6 junk emails per day?

Number of visits to an emergency center is modeled as a Poisson process with average number...

Number of visits to an emergency center is modeled as a Poisson process with average number of arrivals being 6 per hour. What is the probability that it will take more than 15 minutes for the next two arrivals?

Number of visits to an emergency center is modeled as a poisson process with an average...

Number of visits to an emergency center is modeled as a poisson process with an average number of arravals being 6 per hour. What is the probability that it will take more than 15 minutes for the next two arrivals? PLEASE SHOW ALL WORK

The number of spam emails received each day follows a Poisson distribution with a mean of...

The number of spam emails received each day follows a Poisson distribution with a mean of 50. Approximate the following probabilities. Apply the ±½ correction factor and round value of standard normal random variable to 2 decimal places. Round your answer to four decimal places (e.g. 98.7654). (a) More than 50 and less than 60 spam emails in a day. (b) At least 50 spam emails in a day. (c) Less than 50 spam emails in a day. (d) Approximate...

Suppose that the number of spam emails that Alex receives has a Poisson distribution with µ...

Suppose that the number of spam emails that Alex receives has a Poisson distribution with µ = 2.3 per day. What is the probability that the number of spam emails Alex receives in a day is within one standard deviation of the mean? Clearly state the random variable of interest using the context of the problem and what probability distribution it follows.

A student receiving texts can be modeled as a Poisson process at a rate of 3...

A student receiving texts can be modeled as a Poisson process at a rate of 3 per hour. a) What is the probability that the student receives 2 or more texts in the next 30 minutes? b) Given that the student received 3 texts in the last 10 minutes, what is the probability that the next text will arrive within 15 minutes? c) Among a group of 10 students, what is the probability that at least 2 will receive at...

Suppose the time a student takes on an exam can be modeled by a Poisson process...

Suppose the time a student takes on an exam can be modeled by a Poisson process with a mean of 20 questions per hour Let X denote the number of questions completed. A)What is the probability of a student finishing exactly 18 questions in the next hour? B)What is the probability of a student finishing exactly 12 questions in 30 minutes? C) What is the probability of finishing at least 1 question in the next minute?