Please only right anwsers last 6 people gave me wrong anwsers and this is the last chance I have to anwser it right please. there is 5 posts. I need all anwsers to all questions posted, GODBLESS. I will be here in every other minute just to make sure questions are posted clearly.

Describe the difference between classical and empirical probability. Question lrst I 0 Question 1 Choose the correct answer below. A. The classical method obtains an approximate empirical probability of an event by conducting a probability experiment. The empirical method of computing probabilities does not require that a probability experiment actually be performed. Rather, it relies on counting techniques, and requires equally likely outcomes. 0 Question 2 . The empirical method obtains an approximate empirical probability of an event by conducting a probability experiment. The classical method of computing probabilities does not require that a probability experiment actually be performed. Rather, it relies on counting techniques. and requires equally likely outcomes. _ Cl C. The empirical method obtains an exact empirical probability of an event by conducting a probability experiment. The classical method of computing probabilities does not require that a O Questlon 3 probability experiment actually be performed. Rather, it relies on counting techniques, and requires equally likely outcomes. CI D. The classical method obtains an exact probability of an event by conducting a probability experiment. The empirical method of computing empirical probabilities does not require that a probability experiment actually be performed. Rather, it relies on counting techniques, and requires equally likely outcomes. 0 Question 4 0 Question 5 0 Question 6 0 Question 7 0 Question 8 0 Question 9 Statcrunch A probability experiment is conducted in which the sample space of the experiment is S = {3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14}, event E = {3, 4, 5, 6, 7, 8} and event G = {10, 11, 12, 13}. Assume Question list K that each outcome is equally likely. List the outcomes in E and G. Are E and G mutually exclusive? O Question 1 List the outcomes in E and G. Choose the correct answer below. O A. E and G = { } O Question 2 (Use a comma to separate answers as needed.) O B. E and G= { } Question 3 Are E and G mutually exclusive? O A. No, because the events E and G have outcomes in common. O Question 4 O B. Yes, because the events E and G have at least one outcome in common. O C. Yes, because the events E and G have no outcomes in common. O Question 5 O D. No, because the events E and G have at least one outcome in common. O Question 6 Question 7 O Question 8 O Question 9 Statcrunch NextQuestion list 0 Question 7 0 Question 8 0 Question 9 0 Question 10 0 Question 11 0 Question 12 0 Question 18 0 Question 14 0 Question 15 Statcrunch I In airline applications, failure of a component can result in catastrophe. As a result, many airline components utilize something called triple modular redundancy. This means that a critical component has two backup components that may be utilized should the initial component tail. Suppose a certain critical airline component has a probability of failure of 0.0051 and the system that utilizes the component is part of a triple modular redundancy. (a) Assuming each component's failure/success is independent of the others, what is the probability all three components fail, resulting in disaster for the ight? (b) What is the probability at least one of the components does not tail? (a) The probability is . (Round to eight decimal places as needed.) (b) The probability is . (Round to eight decimal places as needed.) _ _ In airline applications, failure of a component can result in catastrophe. As a result, many airline components utilize something called triple modular redundancy. This means that a critical Ques'hon I|st I6 component has two backup components that may be utilized should the initial component tail. Suppose a certain critical airline component has a probability of failure of 0.04 and the system that utilizes the component is part of a triple modular redundancy. (a) What is the probability that the system does not fail? (b) Engineers decide to the probability offailure is too high for this system. Use trial and error to determine the minimum number of components that should be included in the system to result in a system that has greater than a 0.9999999!) probability of not failing. 0 Question 7 0 Question 8 (a) The probability is . (Round to eight decimal places as needed.) (b) The minimum number of components that should be included in the system is 0 Question 9 (Type a whole number.) 0 Question 10 0 Question 11 0 Question 12 0 Question 13 0 Question 14 0 Question 15 Among 43- to 4B-yearolds, 38% say they have danced in public while under the influence of alcohol. Suppose three 43- to 48-year-olds are selected at random. Complete parts (a) through (d) Question list '6 below. 0 Question 9 (a) What is the probability that all three have danced in public while under the intluence of alcohol? 0 Question 10 (Round to tour decimal places as needed.) (b) What is the probability that at least one has not danced in public while under the influence of alcohol? 0 Question 11 (Round to tour decimal places as needed.) (I: What is the probability that none at the three have danced in publicwhile under the influence of alcohol? 0 Question 12 (Round to tour decimal places as needed.) 0 Question 13 (d) What is the probability that at least one has danced in public while under the inuence ofalcohol'? (Round to tour decimal places as needed.) 0 Question 14 0 Question 15 0 Question 16 0 Question 17 Suppose you have just received a shipment of 25 modems. Although you don't know this, 5 of the modems are defective. To determine whether you will accept the shipment, you randomly select Question list K 8 modems and test them. If all 8 modems work, you accept the shipment. Otherwise, the shipment is rejected. What is the probability of accepting the shipment? O Question 15 The probability of accepting the shipment is. (Round to four decimal places as needed.) O Question 16 Question 17 Question 18 Question 19 Question 20 O Question 21 O Question 22 O Question 23 Statcrunch Submit test