It is suspected that the bags of French fries delivered to a fast food restaurant are lighter than what is specified in the supply contract. The manager of the restaurant would like to take a simple random sample of bags of French fries delivered and perform a statistic test to confirm that this is indeed the case.
What would be the null and alternative hypothesis for this research?
What is the type I error in this situation?
What is the type II error in this situation?
Consider this hypothesis test:
H0: µ ≥ 30
Ha: µ < 30
A simple random sample with size 80 provided a sample mean of 29.5. Assume that the population standard deviation is 2.4
Compute the test statistic.
What is the p-value?
Using α=0.05, what is your conclusion on the null hypothesis?
Using α=0.05, find the critical value.
Specify the rejection rule using the critical value approach. What is your conclusion?
A simple random sample of 100 items is taken from an inventory and the average unit cost on the items is $25. The population standard deviation σ is known to be $5.
Test the hypothesis that the population mean is greater than $24.5 using the p-value approach and a 0.05 level of significance.
Test the hypothesis that the population mean is different from $24.2. using the p-value approach and a 0.05 level of significance.
Use α=0.05 and the critical value approach to test whether the population mean is less than 26.2.
Consider this hypothesis test:
H0: µ ≤ 12.5
Ha: µ > 12.5
A simple random sample with size 100 provided a sample mean of 13.1 and a sample standard deviation of 2.25.
Compute the test statistic and its degree of freedom.
What is the p-value?
Using α=0.05, what is your conclusion on the null hypothesis?
Using α=0.05, find the critical value
Specify the rejection rule using the critical value approach. What is your conclusion?
A simple random sample of 80 items is taken from an inventory and the average unit cost on the items is $23.4. The population standard deviation σ is not known. Instead the sample standard deviation s is also calculated from the sample and is found to be $5.2.
Test the hypothesis that the population mean is greater than $22 using the p-value approach and a 0.05 level of significance.
Test the hypothesis that the population mean is different from $24.2 using the p-value approach and a 0.05 level of significance.
Use α=0.05 and the critical value approach to test whether the population mean is less than $23.8.
Use BUSI1013-Case.xls and the description of this file in Assignment 1 to answer this question
Perform a statistical test to see whether the average income of customers in the population is higher than $48,500. Use the p-value approach and a 0.05 level of significance.
Perform a statistical test to see whether the average age of customers in the population is less than 46.4. Use the critical value approach and a 0.05 level of significance?
Consider this hypothesis test:
H0: p ≥ 0.45
Ha: p < 0.45
A simple random sample with size 500 provided a sample proportion of 0.41
Compute the test statistic.
What is the p-value?
Using α=0.05, what is your conclusion on the null hypothesis?
Using α=0.05, find the critical value.Specify the rejection rule using the critical value approach. What is your conclusion?
The proportion of female customers in a recent satisfaction survey of 500 listeners for a Toronto radio station is found to be 0.535.
Test the hypothesis that the population proportion is greater than 0.5 using the p-value approach and a 0.05 level of significance.
Test the hypothesis that the population proportion is different from 0.55 using the p-value approach and a 0.05 level of significance.
Use α=0.05 and the critical value approach to test whether the population proportion is less than 0.56.
Use BUSI1013-Case.xls and the description of this file in Assignment 1 to answer this question.
Perform a statistical test to see whether the proportion of male customers in the population is lower than 49.5%. Use the p-value approach and a 0.05 level of significance.
Perform a statistical test to see whether proportion of customers who would recommend the Credit Union to their friends before the pilot is greater than 0.61. Use the critical value approach and a 0.05 level of significance.
Attachment:- for_question_6.zip