Before the furniture store began its ad campaign, it averaged 235 customers per day. The manager is investigating if the average is smaller since the ad came out. The data for the 13 randomly selected days since the ad campaign began is shown below: 221, 246, 229, 237, 231, 205, 217, 216, 239, 216, 244, 226, 235 Assuming that the distribution is normal, what can be concluded at the αα = 0.10 level of significance? For this study, we should use Select an answer t-test for a population mean z-test for a population proportion The null and alternative hypotheses would be: H0:H0: ? p μ Select an answer ≠ < > = H1:H1: ? μ p Select an answer > = < ≠ The test statistic ? t z = (please show your answer to 3 decimal places.) The p-value = (Please show your answer to 4 decimal places.) The p-value is ? ≤ > αα Based on this, we should Select an answer accept reject fail to reject the null hypothesis. Thus, the final conclusion is that ... The data suggest the populaton mean is significantly less than 235 at αα = 0.10, so there is sufficient evidence to conclude that the population mean number of customers since the ad campaign began is less than 235. The data suggest the population mean is not significantly less than 235 at αα = 0.10, so there is sufficient evidence to conclude that the population mean number of customers since the ad campaign began is equal to 235. The data suggest that the population mean number of customers since the ad campaign began is not significantly less than 235 at αα = 0.10, so there is insufficient evidence to conclude that the population mean number of customers since the ad campaign began is less than 235. Interpret the p-value in the context of the study. There is a 2.94054663% chance of a Type I error. If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 2.94054663% chance that the sample mean for these 13 days would be less than 227.8. If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 2.94054663% chance that the population mean number of customers since the ad campaign began would be less than 235. There is a 2.94054663% chance that the population mean number of customers since the ad campaign began is less than 235. Interpret the level of significance in the context of the study. There is a 10% chance that there will be no customers since everyone shops online nowadays. If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 10% chance that we would end up falsely concuding that the population mean number of customers since the ad campaign began is less than 235. There is a 10% chance that the population mean number of customers since the ad campaign began is less than 235. If the population mean number of customers since the ad campaign began is less than 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 10% chance that we would end up falsely concuding that the population mean number of customers since the ad campaign is equal to 235.
Before the furniture store began its ad campaign, it averaged 235 customers per day. The manager is investigating if the average is smaller since the ad came out. The data for the 13 randomly selected days since the ad campaign began is shown below: 221, 246, 229, 237, 231, 205, 217, 216, 239, 216, 244, 226, 235 Assuming that the distribution is normal, what can be concluded at the αα = 0.10 level of significance? For this study, we should use Select an answer t-test for a population mean z-test for a population proportion The null and alternative hypotheses would be: H0:H0: ? p μ Select an answer ≠ < > = H1:H1: ? μ p Select an answer > = < ≠ The test statistic ? t z = (please show your answer to 3 decimal places.) The p-value = (Please show your answer to 4 decimal places.) The p-value is ? ≤ > αα Based on this, we should Select an answer accept reject fail to reject the null hypothesis. Thus, the final conclusion is that ... The data suggest the populaton mean is significantly less than 235 at αα = 0.10, so there is sufficient evidence to conclude that the population mean number of customers since the ad campaign began is less than 235. The data suggest the population mean is not significantly less than 235 at αα = 0.10, so there is sufficient evidence to conclude that the population mean number of customers since the ad campaign began is equal to 235. The data suggest that the population mean number of customers since the ad campaign began is not significantly less than 235 at αα = 0.10, so there is insufficient evidence to conclude that the population mean number of customers since the ad campaign began is less than 235. Interpret the p-value in the context of the study. There is a 2.94054663% chance of a Type I error. If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 2.94054663% chance that the sample mean for these 13 days would be less than 227.8. If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 2.94054663% chance that the population mean number of customers since the ad campaign began would be less than 235. There is a 2.94054663% chance that the population mean number of customers since the ad campaign began is less than 235. Interpret the level of significance in the context of the study. There is a 10% chance that there will be no customers since everyone shops online nowadays. If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 10% chance that we would end up falsely concuding that the population mean number of customers since the ad campaign began is less than 235. There is a 10% chance that the population mean number of customers since the ad campaign began is less than 235. If the population mean number of customers since the ad campaign began is less than 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 10% chance that we would end up falsely concuding that the population mean number of customers since the ad campaign is equal to 235.
MATLAB: An Introduction with Applications
6th Edition
ISBN:9781119256830
Author:Amos Gilat
Publisher:Amos Gilat
Chapter1: Starting With Matlab
Section: Chapter Questions
Problem 1P
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Before the furniture store began its ad campaign, it averaged 235 customers per day. The manager is investigating if the average is smaller since the ad came out. The data for the 13 randomly selected days since the ad campaign began is shown below:
221, 246, 229, 237, 231, 205, 217, 216, 239, 216, 244, 226, 235
Assuming that the distribution is normal, what can be concluded at the αα = 0.10 level of significance?
- For this study, we should use Select an answer t-test for a population
mean z-test for a population proportion - The null and alternative hypotheses would be:
H0:H0: ? p μ Select an answer ≠ < > =
H1:H1: ? μ p Select an answer > = < ≠
- The test statistic ? t z = (please show your answer to 3 decimal places.)
- The p-value = (Please show your answer to 4 decimal places.)
- The p-value is ? ≤ > αα
- Based on this, we should Select an answer accept reject fail to reject the null hypothesis.
- Thus, the final conclusion is that ...
- The data suggest the populaton mean is significantly less than 235 at αα = 0.10, so there is sufficient evidence to conclude that the population mean number of customers since the ad campaign began is less than 235.
- The data suggest the population mean is not significantly less than 235 at αα = 0.10, so there is sufficient evidence to conclude that the population mean number of customers since the ad campaign began is equal to 235.
- The data suggest that the population mean number of customers since the ad campaign began is not significantly less than 235 at αα = 0.10, so there is insufficient evidence to conclude that the population mean number of customers since the ad campaign began is less than 235.
- Interpret the p-value in the context of the study.
- There is a 2.94054663% chance of a Type I error.
- If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 2.94054663% chance that the sample mean for these 13 days would be less than 227.8.
- If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 2.94054663% chance that the population mean number of customers since the ad campaign began would be less than 235.
- There is a 2.94054663% chance that the population mean number of customers since the ad campaign began is less than 235.
- Interpret the level of significance in the context of the study.
- There is a 10% chance that there will be no customers since everyone shops online nowadays.
- If the population mean number of customers since the ad campaign began is 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 10% chance that we would end up falsely concuding that the population mean number of customers since the ad campaign began is less than 235.
- There is a 10% chance that the population mean number of customers since the ad campaign began is less than 235.
- If the population mean number of customers since the ad campaign began is less than 235 and if you collect data for another 13 days since the ad campaign began, then there would be a 10% chance that we would end up falsely concuding that the population mean number of customers since the ad campaign is equal to 235.
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