poisson distribution

lapter 0 / Quiz Send to Gradebook Question 12 View Policies Current Attempt in Progress Indicate whether the central limit theorem will apply to describe the sampling distribution of the sample proportion. n = 95 and p = 0.21 The central limit theorem cannot be applied. The central limit theorem can be applied. Attempts: 0 of 3 use Send to GradebookProblem 1: A Central Limit Theorem Simulation Here we will perform a Central Limit Theorem simulation similar to the ones done in class. That is: Pick a distribution (that was not presented in class) Justify that the distribution will abide by the central limit theorem Find a parameter set and value for N where we can see that the central limit theorem clearly applies Find a parameter set and value for N Where we can see that the central limit theorem does not apply Code must be submitted (preferably in R, but MATLAB, Python, ForTran, and C++ will also be accepted). Name For the following word problems state if the problem requires using the Central Limit theorem or if does Not require using the Central limit theorem Circle the correct choice: 1. What is the probability of randomly selecting an adult with an IQ score less than 75? A. Requires the Central limit theorem. B. Does not require the central limit theorem. 2. If 30 cell phones are randomly selected what is the probability the cell phones will last an average of more than 23.8 months? A. Requires the Central limit theorem. B. Does not require the central limit theorem. 3. In general Marine platoons are around 50 strong, if a sample of a given platoon is taken from a population of Marines with a mean weight of 200 pounds and with standard deviation o = 10. What is the probability that the sample mean weight will be less than 196 pounds? A. Requires the Central limit theorem. B. Does not require the central limit theorem. 4. The mean age of baseball players is 27 years. Assuming the age of baseball players are normally distributed and that the average size of a baseball team is 25 players, what is the probability a baseball player is older than 30 years if the player is randomly selected. A. Requires the Central limit theorem. B. Does not require the central limit theorem. 5. Suppose that you have a sample of 81 students from a population with mean u = 500 and with standard deviation o = 108. What is the probability that the sample mean will be greater than 483. A. Requires the Central limit theorem. B. Does not require the central limit theorem. Page 1 of 171 central limit theorem homework problem Due 11/9/2020 Reference Wikipedia contributors. (2020, October 16). Central Birnit theorem, In Wilpedia, The Free Encyclopedia, Retrieved 18:02, November 2.: pam hopouton, witpoda ory windex pop? Bine = Central_limit_theorem oldid.983845031 Write an essay about the central limit theorem. Describe the content of the theorem, and why it is important for statistics