Given: Female Mean is 178.8 and Standard Deviation is 63.29 N=20 Male Mean is 231.9 and...

2)Given: Mean is 235.97 and Standard deviation is 87.04 and N is 30. Use a 0.01...

2)Given: Mean is 235.97 and Standard deviation is 87.04 and N is 30. Use a 0.01 significance level to test the claim of a Forest Ranger that the mean weight of the population is greater than 220 pounds. a) Hypothesis B) Diagram C) Conclusion D)Check that the requirements for performing the hypothesis test have been met. Any assumptions that you had to make?

There are 16 female bears out of a total of 30 bears. Use a 0.05 significance...

There are 16 female bears out of a total of 30 bears. Use a 0.05 significance level to test the claim of a Forest Ranger that the proportion of female bears is not equal to 0.50. a)Hypotheses b)Diagram c)Conclusion Check that the requirements for performing the hypothesis test have been met. Any assumptions that you had to make?

A marketing study was conducted to compare the mean age of male and female purchasers of...

A marketing study was conducted to compare the mean age of male and female purchasers of a certain product. Random and independent samples were selected for both male and female purchasers of the product.It was desired to test to determine if the mean age of all female purchasers exceeds the mean age of all male purchasers. The sample data is shown here: Female: n = 20, sample mean = 50.30, sample standard deviation = 13.215 Male: n = 20, sample...

A marketing study was conducted to compare the mean age of male and female purchasers of...

A marketing study was conducted to compare the mean age of male and female purchasers of a certain product. Random and independent samples were selected for both male and female purchasers of the product. It was desired to test to determine if the mean age of all female purchasers exceeds the mean age of all male purchasers. The sample data is shown here: Female: n = 10, sample mean = 50.30, sample standard deviation = 13.215 Male: n = 10,...

8. We know that the mean weight of men is greater than the mean weight of...

8. We know that the mean weight of men is greater than the mean weight of women, and the mean height of men is greater than the mean height of women. A person’s body mass index (BMI) is computed by dividing weight (kg) by the square of height (m). Use α = 0.05 significance level to test the claim that females and males have the same mean BMI. Below are the statistics for random samples of females and males. Female...

Gender Armspan Male 174.0 Female 163.0 Male 200.5 Female 174.0 Female 162.0 Female 162.5 Male 193.0...

Gender Armspan Male 174.0 Female 163.0 Male 200.5 Female 174.0 Female 162.0 Female 162.5 Male 193.0 Female 172.5 Female 163.0 Female 195.5 Male 170.0 Male 181.0 Female 168.0 Female 168.0 Male 185.0 Female 170.0 Female 168.5 Female 162.0 Male 169.0 Female 164.5 Female 165.5 Male 177.5 Female 174.0 Female 175.0 Male 174.5 Male 173.0 Female 160.0 Female 172.0 Male 180.0 Female 173.0 Male 178.0 Male 185.5 Female 154.5 Female 170.0 Female 170.0 Female 171.0 Female 157.5 Male 185.0 Female 161.5...

Two Samples Z test: Male and female muscle flexibility were measured and reported as follows. Test...

Two Samples Z test: Male and female muscle flexibility were measured and reported as follows. Test the hypothesis of mean equality at .01 significance level Sample             mean              SD Male                           45                    18.64              3.29 Female                       31                    20.99                 2.07 Hypothesis being tested: M1=M2 Critical Value What is the appropriate calculated T or Z Statistical conclusion Practical conclusion

Bob claims that a population mean u=94. The value of the population standard deviation is known...

Bob claims that a population mean u=94. The value of the population standard deviation is known to be o=10. To test Bob's claim, we take a simple random sample of size n=70 from this population. The sample mean turns out to be x=107. Use the information from the sample to test Bob's claim at the a(alpha) =0.05 significance level. Report the final result of the hypothesis test. A. Reject the null hypothesis B. Cannot reject the null hypothesis

The mean birth weight of male babies born to 121 mothers taking a vitamin supplement is...

The mean birth weight of male babies born to 121 mothers taking a vitamin supplement is 3.633.63 kilograms with a standard deviation of 0.630.63 kilogram. Use a 0.05 significance level to test the claim that the mean birth weight of all babies born to mothers taking the vitamin supplement is equal to 3.39​ kilograms, which is the mean for the population of all male babies. State the null and alternative hypotheses. Find the z-score and the P value and make...

In an olympiad contest, the mean score for 43 male participants is 21.1 and the standard...

In an olympiad contest, the mean score for 43 male participants is 21.1 and the standard deviation is 5. The mean score for 56 female participants is 20.9 and the standard deviation is 4.7. At = 0:01; can you reject the claim that male and female have equal score? a. Identify the claim and state H0 and Ha: b. Find the critical value and identify the rejection region. c. Find the standardized test statistic. d. Decide whether to reject the...