A manufacturer of electronic components is interested in testing the lifetime of a certain type of...

In the past, the mean lifetime of a certain type of radio battery has been 9.8...

In the past, the mean lifetime of a certain type of radio battery has been 9.8 hours. The manufacturer has introduced a change in the production method and wants to perform a significance test to determine whether the mean lifetime has increased as a result. The hypotheses are: H0: μ = 9.8 hours Ha: μ > 9.8 hours Explain the meaning of a Type I error. A) Concluding that μ > 9.8 hours when in fact μ = 9.8 hours...

A manufacturer is interested in estimating the lifetime of printers. A confidence interval is constructed based...

A manufacturer is interested in estimating the lifetime of printers. A confidence interval is constructed based on a sample of 20 printers and the assumption that the population distribution of the lifetime of a printer is normal. If the population standard deviation is 1.5 and the upper end of a 95% confidence interval is 6.36, find the observed sample mean (show your final answer correct to two decimal places). If, instead, we only know the sample standard deviation (which is...

A modification has been made to the production line which produces a certain electronic component. Past...

A modification has been made to the production line which produces a certain electronic component. Past evidence shows that lifetimes of the components have a population standard deviation of 700 hours. It is believed that the modification will not affect the population standard deviation, but may affect the mean lifetime. The previous mean lifetime was 3250 hours. A random sample of 50 components made with the modification is taken and the sample mean lifetime for these components is found to...

A tire manufacturer states that a certain type of tire has a mean lifetime of 60,000...

A tire manufacturer states that a certain type of tire has a mean lifetime of 60,000 miles. Suppose lifetimes are normally distributed with standard deviation ơ = 3,500 miles. Find the probability that if you buy one such tire, it will last only 57,000 or fewer miles. If you had this experience, is it particularly strong evidence that the tire is not as good as claimed? The tire manufacturer offers a money back guarantee if the tire needs to be...

Lightbulbs of a certain type are advertised as having an average lifetime of 750 hours. The...

Lightbulbs of a certain type are advertised as having an average lifetime of 750 hours. The price of these bulbs is very favorable, so a potential customer has decided to go ahead with a purchase arrangement unless it can be conclusively demonstrated that the true average lifetime is smaller than what is advertised. A random sample of 44bulbs was selected, the lifetime of each bulb determined, and the appropriate hypotheses were tested using MINITAB, resulting in the accompanying output. Variable...

A battery manufacturer advertises that the mean reserve capacity of a certain battery is 1500 hours....

A battery manufacturer advertises that the mean reserve capacity of a certain battery is 1500 hours. You suspect that the batteries’ reserve time is less than the advertised value. To test this claim, you randomly select a sample of 20 batteries and find the mean reserve capacity to be 1320 hours. Assume that the population standard deviation is 320 hours. Do you have enough evidence to support the manufacturer’s claim? What assumption is necessary for this test to be valid?...

Lightbulbs of a certain type are advertised as having an average lifetime of 750 hours. The...

Lightbulbs of a certain type are advertised as having an average lifetime of 750 hours. The price of these bulbs is very favorable, so a potential customer has decided to go ahead with a purchase arrangement unless it can be conclusively demonstrated that the true average lifetime is smaller than what is advertised. A random sample of 40 bulbs was selected, the lifetime of each bulb determined, and the appropriate hypotheses were tested using MINITAB, resulting in the accompanying output....

Last year, the mean running time for a certain type of flashlight battery was 8.5 hours....

Last year, the mean running time for a certain type of flashlight battery was 8.5 hours. This year, the manufacturer has introduced a change in the production method which he hopes will increase the mean running time. A random sample of 40 of the new light bulbs was obtained and the mean running time was found to be 8.7 hours. Do the data provide sufficient evidence to conclude that the mean running time of the new light bulbs is larger...

A electronics manufacturer has developed a new type of remote control button that is designed to...

A electronics manufacturer has developed a new type of remote control button that is designed to operate longer before failing to work consistently. A random sample of 19 of the new buttons is selected and each is tested in continuous operation until it fails to work consistently. The resulting lifetimes are found to have a sample mean of x¯x¯ = 1254.2 hours and a sample standard deviation of s = 104.3. Independent tests reveal that the mean lifetime of the...

Let μ denote the mean lifetime (in hours) for a certain type of battery under controlled...

Let μ denote the mean lifetime (in hours) for a certain type of battery under controlled laboratory conditions. A test of H0: μ = 10 versus Ha: μ < 10 will be based on a sample of size 36. Suppose that σ is known to be 0.6, so σx = 0.1. The appropriate test statistic is then z = x − 10 0.1 (a) What is α for the test procedure that rejects H0 if z ≤ −1.38? (Round your...