The number of emails arriving at a server during any one hour period is known to...

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.

The number of people arriving for treatment in one hour at an emergency room can be...

The number of people arriving for treatment in one hour at an emergency room can be modeled by a random variable X. Mean of X is 5. a) What’s the probability that at least 4 arrivals occurring? b) Suppose the probability of treating no patient in another emergency room is 0.05, which emergency room could be busier? Why?

Q: If you receive on average 2 spam emails per day, what is the probability that...

Q: If you receive on average 2 spam emails per day, what is the probability that you don't receive any spam email on a given day? Q: Given P(X)=0.2 P(X)=0.2, P(Y)=0.3 P(Y)=0.3 and P(X∩Y)=0.1 P(X∩Y)=0.1, what is P(X|Y)P(X|Y)? Q: What is the smallest possible sample mean of a bootstrap sample that you can obtain from the sample [1,2,3,4,5]? Q: An insurance company records on average 10 CTP claims per day. What is the probability that on a particular day at...

The number of people arriving for treatment at an emergency room can be modeled by a...

The number of people arriving for treatment at an emergency room can be modeled by a Poisson process with a rate parameter of five per hour. By using Poisson Distributions. Find: (i) What is the probability that exactly four arrivals occur during a particular hour? (ii) What is the probability that at least four people arrive during a particular hour? (iii) What is the probability that at least one person arrive during a particular minute? (iv) How many people do...

The number of cars arriving at a petrol station in a period of t minutes may...

The number of cars arriving at a petrol station in a period of t minutes may be assumed to have a Poisson distribution with mean 720t. Use this information to answer questions 31-32. Find the probability that exactly 12 cars will arrive in one and half hours. Find the probability that more than 24 cars will arrive in an hour.

The number of buses arriving at the bus stop for T minutes is defined as a...

The number of buses arriving at the bus stop for T minutes is defined as a random variable B. The average (expected value) of random variable B is T / 5. (1)A value indicating the average number of occurrences per unit time in the Poisson distribution. What is the average rate of arrival per second? (2)find PMF of B (3)Find the probability of 3 buses arriving in 2 minutes (4)Find the probability that the bus will not arrive in 10...

1. Suppose the number of messages arriving on a communication line seems to be describable by...

1. Suppose the number of messages arriving on a communication line seems to be describable by a Poisson Random Variable with an average arrival rate of 10 messages/second. Determine the following: a. The probability that no messages arrive in a one second period. b. The probability that 1 message arrives in a one second period. c. The probability that 2 messages arrives in a one second period. d. The probability that 3 messages arrives in a one second period. e.The...

Suppose that the number of persons using an ATM in any given hour between 9 a.m....

Suppose that the number of persons using an ATM in any given hour between 9 a.m. and 5 p.m. can be modeled by a Poisson distribution with a mean of 12. In this case, the “unit of measure” is an hour of time during the business day. Let X be the number of periods who use the ATM in a given hour. What is the standard deviation of the random variable X, i.e., the standard deviation of this Poisson distribution?...

Let X be the number of times I flip a head on a fair coin in...

Let X be the number of times I flip a head on a fair coin in 1 minute. From this description, we know that the random variable X follows a Poisson distribution. The probability function of a Poisson distribution is P[X = x] = e-λ λx / x! 1. What is the sample space of X? Explain how you got that answer. 2. Prove that the expected value of X is λ. 3. Given that λ = 30, what is...

Suppose that the number of eggs that a hen lays follows the Poisson distribution with parameter...

Suppose that the number of eggs that a hen lays follows the Poisson distribution with parameter λ = 2. Assume further that each of the eggs hatches with probability p = 0.8, and different eggs hatch independently. Let X denote the total number of survivors. (i) What is the distribution of X? (ii) What is the probability that there is an even number of survivors? (iii) Compute the probability mass function of the random variable sin(πX/2) and its expectation.