Your company makes lamps. 95% pass final inspection (and 5% fail and need to be fixed)....

2. According to company records, 5% of all automobiles brought to Geoff’s Garage last year for...

2. According to company records, 5% of all automobiles brought to Geoff’s Garage last year for a state-mandated annual inspection did not pass. Of the next 10 automobiles entering the inspection station, what is the probability that none will pass inspection? what is the probability that all will pass inspection? what is the probability that exactly 2 will not pass inspection? what is the probability that more than 3 will not pass inspection? what is the probability that fewer than...

manufacturer of electroluminescent lamps knows that the amount of luminescent ink deposited on one of its...

manufacturer of electroluminescent lamps knows that the amount of luminescent ink deposited on one of its products is normally distributed with a mean of 1.2 grams and a standard deviation of 0.03 grams. Any lamp with less than 1.14 grams of luminescent ink will fail to meet customer's specifications. A random sample of 25 lamps is collected and the mass of luminescent ink on each is measured. Round your answers to three decimal places (e.g. 98.765). (a) What is the...

Because of the outbreak of the coronavirus, students of UM are allowed to opt for Pass/Fail...

Because of the outbreak of the coronavirus, students of UM are allowed to opt for Pass/Fail grade for courses they enroll in the second semester of 2019/2020. An instructor of ISOM2002 believes that there will be more than 35% of the students in the course choosing this option. A random sample of 40 students of ISOM2002 reveals that 16 of them prefer to take the Pass/Fail option. What would be the two hypotheses if we want to test the instructor’s...

Because of the outbreak of the coronavirus, students of UM are allowed to opt for Pass/Fail...

Because of the outbreak of the coronavirus, students of UM are allowed to opt for Pass/Fail grade for courses they enroll in the second semester of 2019/2020. An instructor of ISOM2002 believes that there will be more than 35% of the students in the course choosing this option. A random sample of 40 students of ISOM2002 reveals that 16 of them prefer to take the Pass/Fail option. At 5% level of significance, what would be the rejection rule if we...

Because of the outbreak of the coronavirus, students of UM are allowed to opt for Pass/Fail...

Because of the outbreak of the coronavirus, students of UM are allowed to opt for Pass/Fail grade for courses they enroll in the second semester of 2019/2020. An instructor of ISOM2002 believes that there will be more than 35% of the students in the course choosing this option. A random sample of 40 students of ISOM2002 reveals that 16 of them prefer to take the Pass/Fail option. At 5% level of significance, what would be the rejection rule if we...

Cabs pass your workplace according to a Poisson process with a mean of five cabs per...

Cabs pass your workplace according to a Poisson process with a mean of five cabs per hour. a. Determine the mean and standard deviation of the number of cabs per 10-hour day. b. Approximate the probability that more than 65 cabs pass within a 10-hour day. c. Approximate the probability that between 50 and 65 cabs pass in a 10-hour day. d. Determine the mean hourly rate so that the probability is approximately 0.95 that 100 or more cabs pass...

Suppose a company that makes video game consoles samples 20 consoles for inspection. The probability a...

Suppose a company that makes video game consoles samples 20 consoles for inspection. The probability a gaming console fails prior to the end of the warranty period is 0.08 and the failure of a console is independent between consoles. What type of distribution will best model the number of consoles out of the 20 that will fail prior to the end of the warranty period? a) Poisson b) Exponential c) Normal d) Binomial ** explain why an answer is correct...

Use the following for the next 4 questions. New heat lamps are reported to have the...

Use the following for the next 4 questions. New heat lamps are reported to have the mean lifespan of 100 hours with a standard deviation of 15 hours. Before replacing their current lamp to the new heat lamps for the university, OSU decided to test whether the mean lifetime is equal to 100 or not by sampling 36 heat lamps. They turned them on and recorded the time, in hours, until each lamp failed. The sample provided a mean lifespan...

According to a local insurance company, 23% of drivers aged 60 - 62 fail the written...

According to a local insurance company, 23% of drivers aged 60 - 62 fail the written driver's test. With the conditions of the Binomial distribution being satisfied if we had randomly picked 10 of the drivers from this age group, then find the following: a) The probability that exactly 3 of the 10 drivers aged 60 - 62 fail the written driver's test. Round answer to 3 decimal places. b) The mean and the standard deviation of this Binomial distribution....

Question 1. Which of the following is the CORRECT interpretation of a 95% confidence interval? a)...

Question 1. Which of the following is the CORRECT interpretation of a 95% confidence interval? a) There is a 95% probability that the interval contains the population value b) There is a 95% chance that the true population value is inside the interval c) if we sampled from a population repeatedly and created confidence intervals, 95% of those confidence intervals would contain the population mean d) We are 95% sure of the sample statistic Question 2. What is the mean...