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A sociologist will conduct a two-sample t-test for a difference in means to investigate whether there is a significant difference, on average, between the salaries of people with bachelor’s degrees and people with master’s degrees. From a random sample of 32 people with a bachelor’s degree, the average salary was $55,000 with standard deviation $3,500. From a random sample of 28 people with a master’s degree, the average salary was $58,000 with a standard deviation of $4,000.
With a null hypothesis of no difference in the means, which of the following is the test statistic for the appropriate test to investigate whether there is a difference in population means (master’s degree minus bachelor’s degree)?
A two-sample t-test for a difference in means was conducted to investigate whether defensive players on a football team can bench-press more weight, on average, than offensive players. The conditions for inference were met, and the test produced a test statistic of t = 1.083 and a p-value of 0.15.
Based on the p-value and a significance level of 5% , which of the following is the correct conclusion?
A) Reject the null hypothesis because 0.15 > 0.05. There is not convincing evidence that defensive players can bench-press more weight, on average, than offensive players.
B) Reject the null hypothesis because 0.15 > 0.05. There is convincing evidence that defensive players can bench-press more weight, on average, than offensive players.
C) Fail to reject the null hypothesis because 0.15 > 0.05. There is not convincing evidence that defensive players can bench-press more weight, on average, than offensive players.
D) Fail to reject the null hypothesis because 0.15 > 0.05. There is convincing evidence that defensive players can bench-press more weight, on average, than offensive players.
E) Fail to reject the null hypothesis because 0.15 > 0.05. There is convincing evidence that defensive players can bench-press the same amount of weight, on average, as offensive players.
Animal researchers studying cows and horses conducted a two-sample t-test for a difference in means to investigate whether grazing cows eat more grass, on average, than grazing horses. All conditions for inference were met, and the test produced a test statistic of t = 1.664 and a p-value of 0.0487.
Which of the following is a correct interpretation of the p-value?
A) The probability that cows eat more grass than horses, on average, is 0.0487.
B) The probability that cows eat the same amount of grass as horses, on average, is 0.0487.
C) Assuming that the mean amount of grass eaten by cows is greater than the mean amount of grass eaten by horses, the probability of observing a test statistic of at most 1.664 is 0.0487.
D) Assuming that the mean amount of grass eaten by cows is equal to the mean amount of grass eaten by horses, the probability of observing a test statistic of at most 1.664 is 0.0487.
E) Assuming that the mean amount of grass eaten by cows is equal to the mean amount of grass eaten by horses, the probability of observing a test statistic of at least 1.664 is 0.0487.
A team of ecologists will select a random sample of nesting robins in a certain region to estimate the average number of eggs per nest for all robins in the region. Which of the following is a correct inference procedure for the ecologists to use?
A) A one-sample t-interval for a sample mean
B) A one-sample t-interval for a population mean
C) A one-sample t-interval for a population proportion
D) A two-sample t-interval for a difference between means
E) A two-sample t-interval for a difference between proportions
The director of fitness for a large corporation with over 5,000 employees recorded the resting heart rate, in beats per minute (bpm) , for 35 employees who were known to wear activity trackers. The following boxplot summarizes the result.
The director wants to estimate the resting heart rate for all employees with a confidence interval. Have all conditions for inference been met?
A) Yes, all conditions have been met.
B) No, the distribution of the sample data is not approximately symmetric.
C) No, the sample size is greater than 10 percent of the population size.
D) No, the distribution of resting heart rate in the population cannot be assumed to be approximately normal.
E) No, the sample was not selected at random
Researchers investigated whether there is a difference between two headache medications, R and S. Researchers measured the mean times required to obtain relief from a headache for patients taking one of the medications. From a random sample of 75 people with chronic headaches, 38 were randomly assigned to medication R and the remaining 37 were assigned to medication S. The time, in minutes, until each person experienced relief from a headache was recorded. The sample mean times were calculated for each medication.
Have the conditions been met for inference with a confidence interval for the difference in population means?
A) Yes, all conditions have been met.
B) No, because the data were not collected using a random sample.
C) No, because cause and effect cannot be inferred since there is a random sample.
D) No, because the sample sizes are not large enough to assume the distribution of the difference in sample means is approximately normal.
E) No, because the sample sizes are not the same.
To test the durability of cell phone screens, phones are dropped from a height of 1 meter until they break. A random sample of 40 phones was selected from each of two manufacturers. The phones in the samples were dropped until the screens broke. The difference in the mean number of drops was recorded and used to construct the 90 percent confidence interval (0.46, 1.82) to estimate the population difference in means.
Consider the sampling procedure taking place repeatedly. Each time samples are selected, the phones are dropped and the statistics are used to construct a 90 percent confidence interval for the difference in means. Which of the following statements is a correct interpretation of the intervals?
A) Approximately 90 percent of the intervals will extend from 0.46 to 1.82.
B) Approximately 90 percent of the intervals constructed will capture the difference in sample means.
C) Approximately 90 percent of the intervals constructed will capture the difference in population means.
D) Approximately 90 percent of the intervals constructed will capture at least one of the sample means.
E) Approximately 90 percent of the intervals constructed will capture at least one of the population means.
A reporter responsible for the food section of a magazine investigated the belief that grocery stores sell beef at a higher price in the fall than in the spring. The reporter selected independent random samples of grocery-store beef prices in November and April and computed the mean and standard deviation for the samples. Which of the following are the correct null and alternative hypotheses for the reporter’s investigation, where represents the mean price of beef in the fall and represents the mean price of beef in the spring?
A study was conducted to investigate whether the mean price of a dozen eggs was different for two different grocery stores, Store A and Store B, in a large city. A carton of one dozen eggs from each store was randomly selected for each of 35 weeks, for a total sample size of 35 cartons from each store. The mean price of the 35 cartons was recorded for each store. The difference in the mean carton price for the stores will be calculated.
Which of the following is the appropriate test for the study?
A) A one-sample t-test for a population proportion
B) A one-sample t-test for a sample mean
C) A matched-pairs t-test for a mean difference
D) A two-sample t-test for a difference between population means
E) A two-sample t-test for a difference between population proportions
A two-sample t-test for a difference in means will be conducted to investigate mean gasoline prices in two states. From each state, 45 gasoline stations will be selected at random. On the same day, the price of regular gasoline will be recorded for each selected station and the sample mean price for each state will be calculated.
Have all conditions for inference been met?
A) Yes, all conditions have been met.
B) No, the data are not collected using a random method.
C) No, the sample sizes are greater than 10 percent of the population.
D)
No, the sample sizes are not large enough to assume the sampling distribution is approximately normal.
E) No, the distributions of the sample data are not approximately normal.
A two-sample t-test for a difference in means will be conducted to investigate whether the average length of a cell phone call is shorter this year compared with 5 years ago. From a random sample of 35 phone call records this year, the average length was 25 minutes with a standard deviation of 4 minutes. From a random sample of 32 phone call records from 5 years ago, the average length was 27 minutes with a standard deviation of 5 minutes. The difference (this year minus five years ago) in means will be calculated.
With a null hypothesis of no difference in length, which of the following is a correct test statistic for the test?
A study will be conducted to investigate whether there is a difference in mean tail lengths between two populations of snow leopards. Random samples of leopards will be selected from both populations, and the mean sample tail length will be calculated for each sample.
Which of the following is the appropriate test for the study?
A) A two-sample t-test for a difference between population means
B) A two-sample t-test for a difference between population means
C) A one-sample z-test for a population proportion
D) A one-sample t-test for a sample mean
E) A one-sample t-test for a population mean
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