Q1. Consider the population of adult female residents in Melbourne (or Jupiter if you prefer). Our...

Consider the population of adult female residents in Melbourne (or Jupiter if you prefer). Our focus...

Consider the population of adult female residents in Melbourne (or Jupiter if you prefer). Our focus is on the population mean height. Let height be called X. Assume we do not know ? (population standard deviation) or the population mean, µ. We take a sample of adult female residents in Melbourne (n=100) and calculate the sample mean height as 70 cm and the sample standard deviation of 25. i) Test the null hypothesis that µ=120, against the alternative that µ≠120....

Consider the population of adult females resident in Melbourne. Our focus is on the population mean...

Consider the population of adult females resident in Melbourne. Our focus is on the population mean height. Assume we do not know ? (population standard deviation) or the population mean, µ. We take a sample of adult females resident in Melbourne (n=100) and calculate the sample mean height as 70 cm and the sample standard deviation as 25cm. i) Derive the 95% confidence interval for the population mean ii) Compare your interval here and last week – which is larger...

Assume that the population variance is unknown. We test the hypothesis that Ho: µ=5 against the...

Assume that the population variance is unknown. We test the hypothesis that Ho: µ=5 against the one-sided alternative H1: µ≠5 at a level of significance of 5% and with a sample size of n=30. We calculate a test statistic = -1.699. The p-value of this hypothesis test is approximately ？ %. Write your answer in percent form. In other words, write 5% as 5.0.

You are interested in estimating the the mean weight of the local adult population of female...

You are interested in estimating the the mean weight of the local adult population of female white-tailed deer (doe). From past data, you estimate that the standard deviation of all adult female white-tailed deer in this region to be 39 pounds. What sample size would you need to in order to estimate the mean weight of all female white-tailed deer, with a 98% confidence level, to within 5 pounds of the actual weight? (Use Excel to find the appropriate critical...

Hypothesis Testing: Show ALL steps in your work. The average weight for the adult female population...

Hypothesis Testing: Show ALL steps in your work. The average weight for the adult female population is 195 with a standard deviation of 15. A researcher believes this value has changed. The researcher decides to test the weight of 75 random female adults. The average weight of the sample is 185. Is there enough evidence to suggest the average weight has changed? Use the level of significance of 0.05. will give great comments and feedback just need help (:

One urban affairs sociologist claims that the proportion, p , of adult residents of a particular...

One urban affairs sociologist claims that the proportion, p , of adult residents of a particular city who have been victimized by a criminal is at least 55% . A random sample of 245 adult residents of this city were questioned, and it was found that 119 of them had been victimized by a criminal. Based on these data, can we reject the sociologist's claim at the 0.05 level of significance? Perform a one-tailed test. Then fill in the table...

A laboratory claims that the mean sodium level, μ , of a healthy adult is 141...

A laboratory claims that the mean sodium level, μ , of a healthy adult is 141 mEq per liter of blood. To test this claim, a random sample of 26 adult patients is evaluated. The mean sodium level for the sample is 144 mEq per liter of blood. It is known that the population standard deviation of adult sodium levels is 11 mEq. Assume that the population is normally distributed. Can we conclude, at the 0.05 level of significance, that...

3. Suppose the population mean is hypothesized to be 368 with a population standard deviation of...

3. Suppose the population mean is hypothesized to be 368 with a population standard deviation of 13. Sample data is obtained to test this hypothesis (n=36, the sample mean is 373). a) Set up the two-tailed hypothesis test. b) Test the hypothesis using the .01 level of significance. Also test at the .05 level of significance. c) Interpret the results.

The International Coffee Association has reported the mean daily coffee consumption for adult U. S. residents...

The International Coffee Association has reported the mean daily coffee consumption for adult U. S. residents is 2 or more cups. A random sample of 18 adult U. S. residents showed an average of 1.8 cups with a standard deviation of 0.85 cups consumption per day. Is there enough evidence to prove The International Coffee Association claim is wrong? α = 0.01. Ho:____________________ Ha:______________________ Test Statistics: _______________________ Decision Rule: _______________________ Decision: _____________________ Interpretation: ___________________

Consider two populations. A random sample of 28 observations from the first population revealed a sample...

Consider two populations. A random sample of 28 observations from the first population revealed a sample mean of 40 and a sample standard deviation of 12. A random sample of 32 observations from the second population revealed a sample mean of 35 and a sample standard deviation of 14 (a) Using a .05 level of significance, test the hypotheses Ho : U1 - U2 = 0 and H1 : U1 - U2 =/ (not equal to) 0 respectively. Explain your...