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phase 5 project
This week you will submit Phase 5, the final phase, of your course project. For Phase 5 of your course project, you will want to review your instructor's feedback from your Phase 4 submission and make any necessary corrections. Remember if you have questions about the feedback to ask your instructor for assistance.
Once you have made your corrections, you will make your final submission for the course project. Below is a summary of the expectations for Phase 5 of the course project:
Feedback from Instructor; Phase 1, standard deviation is incorrect, s = sqrt(variance); double check, Phase 2: Your confidence intervals were incorrect;
The CI = x-bar +/- t * s / sqrt (n), but technically, you should use t instead of z; Phase 3: Your test statistic was incorrect, t = (xbar – mu) / [s/sqrt(n)]; from phase 1, the mean should have been 61.8 and s=8.92;
The phrasing of the final conclusion was too strong; awkward.
This whole exercise was just like example #4 in the Mod 3 course materials – Hypothesis Testing Explained and Explored; Phase 4: Phase 2 confidence intervals are still incorrect;
x */ z* s/√60, should be xbar ± t * s/√60
You have already identified 61.8 as the mean, so where did 61.3334 come from?
t is not 1.8167, check a t-table with 59 degrees of freedom and two tails at .05 (.025 in each).
Too many inconsistencies in phase 3 too
Therefore t=(65-62.82)(8.3/√60)=, what is 62.82? you identified the sample mean already as 61.8? What is 8.3? You already know s is 8.92?
Clean this up.
- Introduce your scenario and data set.
- Provide a brief overview of the scenario you are given above and the data set that you will be analyzing.
- Classify the variables in your data set.
- Which variables are quantitative/qualitative?
- Which variables are discrete/continuous?
- Describe the level of measurement for each variable included in your data set.
- Discuss the importance of the Measures of Center and the Measures of Variation.
- What are the measures of center and why are they important?
- What are the measures of variation and why are they important?
- Calculate the measures of center and measures of variation. Interpret your results in context of the selected topic.
- Mean
- Median
- Mode
- Midrange
- Range
- Variance
- Standard Deviation
- Discuss the importance of constructing confidence intervals for the population mean.
- What are confidence intervals?
- What is a point estimate?
- What is the best point estimate for the population mean? Explain.
- Why do we need confidence intervals?
- Based on your selected topic, evaluate the following:
- Find the best point estimate of the population mean.
- Construct a 95% confidence interval for the population mean. Assume that your data is normally distributed and σ is unknown.
- Please show your work for the construction of this confidence interval and be sure to use the Equation Editor to format your equations.
- Write a statement that correctly interprets the confidence interval in context of your selected topic.
- Based on your selected topic, evaluate the following:
- Find the best point estimate of the population mean.
- Construct a 99% confidence interval for the population mean. Assume that your data is normally distributed and σ is unknown.
- Please show your work for the construction of this confidence interval and be sure to use the Equation Editor to format your equations.
- Write a statement that correctly interprets the confidence interval in context of your selected topic.
- Compare and contrast your findings for the 95% and 99% confidence interval.
- Did you notice any changes in your interval estimate? Explain.
- What conclusion(s) can be drawn about your interval estimates when the confidence level is increased? Explain.
- Discuss the process for hypothesis testing.
- Discuss the 8 steps of hypothesis testing?
- When performing the 8 steps for hypothesis testing, which method do you prefer; P-Value method or Critical Value method? Why?
- Perform the hypothesis test.
- If you selected Option 1:
- Original Claim: The average salary for all jobs in Minnesota is less than $65,000.
- Test the claim using α = 0.05 and assume your data is normally distributed and σ is unknown.
- If you selected Option 2:
- Original Claim: The average age of all patients admitted to the hospital with infectious diseases is less than 65 years of age.
- Test the claim using α = 0.05 and assume your data is normally distributed and σ is unknown.
- Based on your selected topic, answer the following:
- Write the null and alternative hypothesis symbolically and identify which hypothesis is the claim.
- Is the test two-tailed, left-tailed, or right-tailed? Explain.
- Which test statistic will you use for your hypothesis test; z-test or t-test? Explain.
- What is the value of the test-statistic? What is the P-value?What is the critical value?
- What is your decision; reject the null or do not reject the null?
- Explain why you made your decision including the results for your p-value and the critical value.
- State the final conclusion in non-technical terms.
- Conclusion
- Recap your ideas by summarizing the information presented in context of your chosen scenario.
Please be sure to show all of your work and use the Equation Editor to format your equations.
This assignment should be formatted using APA guidelines and a minimum of 2 pages in length.