(b) Based on your sample, graph the 99% confidence interval for the population mean of the battery lifetimes for all phones of the manufacturer's latest model. • Enter the lower and upper limits on the graph to show your confidence interval. • For the point (•), enter the manufacturer's claim of 5.26 hours. 99% confidence interval: 0.00 10.00 5.00 0.00 2.00 4.00 6.00 8.00 10.00 ? (c) Does the 99% confidence interval you constructed contradict the manufacturer's claim? Choose the best answer from the choices below. O No, the confidence interval does not contradict the claim. The manufacturer's claim of 5.26 hours is inside the 99% confidence interval. O No, the confidence interval does not contradict the claim. The manufacturer's claim of 5.26 hours is outside the 99% confidence interval. O Yes, the confidence interval contradicts the claim. The manufacturer's claim of 5.26 hours is inside the 99% confidence interval. O Yes, the confidence interval contradicts the claim. The manufacturer's claim of 5.26 hours is outside the 99% confidence interval.

MATLAB: An Introduction with Applications
6th Edition
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Author:Amos Gilat
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Chapter1: Starting With Matlab
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(b) Based on your sample, graph the 99% confidence interval for the population mean of the battery lifetimes for all phones of the manufacturer's latest model.

- Enter the lower and upper limits on the graph to show your confidence interval.
- For the point (
Transcribed Image Text:(b) Based on your sample, graph the 99% confidence interval for the population mean of the battery lifetimes for all phones of the manufacturer's latest model. - Enter the lower and upper limits on the graph to show your confidence interval. - For the point (
A cell phone manufacturer tests the battery lifetimes of its cell phones by recording the time it takes for the battery charges to run out while testers are streaming videos on the phones continuously. The manufacturer claims that the population mean of the battery lifetimes of all phones of their latest model is 5.26 hours. As a researcher for a consumer information service, you want to test that claim. To do so, you select a random sample of 45 cell phones of the manufacturer’s latest model and record their battery lifetimes. Assume it is known that the population standard deviation of the battery lifetimes for that cell phone model is 2.42 hours.

Based on your sample, follow the steps below to construct a 99% confidence interval for the population mean of the battery lifetimes for all phones of the manufacturer’s latest model. Then state whether the confidence interval you construct contradicts the manufacturer’s claim. (If necessary, consult a list of formulas.)

(a) Click on "Take Sample" to see the results from your random sample of 45 phones of the manufacturer's latest model.

[Button] **Take Sample**

| Number of phones | Sample mean | Sample standard deviation | Population standard deviation |
|------------------|-------------|---------------------------|-------------------------------|
|                  |             |                           | 2.42                          |

Enter the values of the sample size, the point estimate for the population mean, the population standard deviation, and the critical value you need for your 99% confidence interval. (Choose the correct critical value from the table of critical values provided.) When you are done, select "Compute".

| Sample size:              | [ ]  |
|---------------------------|------|
| Point estimate:          | [ ]  |
| Population standard deviation: | [ ]  |
| Critical value:          | [ ]  |

[Button] **Compute**

**Standard error:**   
**Margin of error:**   
**99% confidence interval:**

[Graph/Diagram Explanation]

A critical values table is provided, showing the z-scores for different confidence levels:

- \( z_{0.005} = 2.576 \)
- \( z_{0.010} = 2.326 \)
- \( z_{0.025} = 1.960 \)
- \( z_{0.050} = 1.645 \)
- \( z_{0.100} = 1.282 \)

Use this table to select the correct critical
Transcribed Image Text:A cell phone manufacturer tests the battery lifetimes of its cell phones by recording the time it takes for the battery charges to run out while testers are streaming videos on the phones continuously. The manufacturer claims that the population mean of the battery lifetimes of all phones of their latest model is 5.26 hours. As a researcher for a consumer information service, you want to test that claim. To do so, you select a random sample of 45 cell phones of the manufacturer’s latest model and record their battery lifetimes. Assume it is known that the population standard deviation of the battery lifetimes for that cell phone model is 2.42 hours. Based on your sample, follow the steps below to construct a 99% confidence interval for the population mean of the battery lifetimes for all phones of the manufacturer’s latest model. Then state whether the confidence interval you construct contradicts the manufacturer’s claim. (If necessary, consult a list of formulas.) (a) Click on "Take Sample" to see the results from your random sample of 45 phones of the manufacturer's latest model. [Button] **Take Sample** | Number of phones | Sample mean | Sample standard deviation | Population standard deviation | |------------------|-------------|---------------------------|-------------------------------| | | | | 2.42 | Enter the values of the sample size, the point estimate for the population mean, the population standard deviation, and the critical value you need for your 99% confidence interval. (Choose the correct critical value from the table of critical values provided.) When you are done, select "Compute". | Sample size: | [ ] | |---------------------------|------| | Point estimate: | [ ] | | Population standard deviation: | [ ] | | Critical value: | [ ] | [Button] **Compute** **Standard error:** **Margin of error:** **99% confidence interval:** [Graph/Diagram Explanation] A critical values table is provided, showing the z-scores for different confidence levels: - \( z_{0.005} = 2.576 \) - \( z_{0.010} = 2.326 \) - \( z_{0.025} = 1.960 \) - \( z_{0.050} = 1.645 \) - \( z_{0.100} = 1.282 \) Use this table to select the correct critical
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