H utsa.blackboard,com E ,1\" Content :5 Question Completion Status: Question 2 (20 points) Members of the Willow Creek Emergency Rescue Squad know from past experience that they will receive between zero and six emergency calls each night, according to the following discrete probability distribution: Calls Probability 0.05 0.12 0.15 0.25 0.22 0.15 0.06 The rescue squad classies each emergency call into one of three categories: minor, regular, or major emergency. The probability that a particular call will be each type of emergency is as follows: Emergency Type Probability Minor 0.30 Regular 0.56 Major 0.14 The type of emergency call determines the size of the crew sent in response. A minor emergency requires a two-person crew, a regular call requires a three-person crew, and a major emergency requires a ve-person crew. Simulate the emergency calls received by the rescue squad for 10 nights, compute the average number of each type of emergency call per night, and determine the maximum number of crew members that might be needed on any given night. Use the following random numbers in order (from left to right, rst row rst - as you need them) for the simulation of emergency calls received by the rescue squad and the type of emergency. Please note that you must conduct the simulation night-by-night (rst night rst and then second night, then third night so on). mmmmmmm 9 k\". laillx''e'": (WIN AFWW S o MonAugS 2:24PM H utsa.blackboard,com E ,1" Content :5 Question Completion Status: Calls Probability 0.05 22-0...24.oo PM 0.12 0.15 0.25 0.22 0.15 0.06 The rescue squad classies each emergency call into one of three categories: minor, regular, or major emergency. The probability that a particular call will be each type of emergency is as follows: Emergency Type Probability Minor 0.30 Regular 0.56 Major 0.14 The type of emergency call determines the size of the crew sent in response. A minor emergency requires a two-person crew, a regular call requires a three-person crew, and a major emergency requires a ve-person crew. Simulate the emergency calls received by the rescue squad for 10 nights, compute the average number of each type of emergency call per night, and determine the maximum number of crew members that might be needed on any given night. Use the following random numbers in order (from left to right, rst row rst - as you need them) for the simulation of emergency calls received by the rescue squad and the type of emergency. Please note that you must conduct the simulation night-by-night (rst night rst and then second night, then third night so on). [0.65 .71 |0.18 |o.12 0.08 0.90 .04 | 0.47 0.68 .60 9 M\". (330N357 (WIN AFWW