Homework Answers
Final conclusion: We cannot support the claim that the variance of monthly income is higher for male students than it is for female students
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At a college, 61 female students were randomly selected and it was found that their monthly...
At a local store, 65 female employees were randomly selected and it was found that their...
At a local store, 65 female employees were randomly selected and it was found that their mean monthly income was $625 with a standard deviation of $121.50. 75 male employees were also randomly selected and their mean monthly income was found to be $667 with a standard deviation of $168.70. Find the test statistic to test the hypothesis that male employees have a higher monthly income than female employees. Use a =0.01. The test statistic is: 1.652 - 1.705 -1.533...
8) In one town, monthly incomes for men with college degrees are found to have a...
8) In one town, monthly incomes for men with college degrees are found to have a standard deviation of $650. Use a 0.01 significance level to test the claim that for men without college degrees in that town, incomes have a higher standard deviation. A random sample of 22 men without college degrees resulted in incomes with a standard deviation of $913.
) In one town, monthly incomes for men with college degrees are found to have a...
) In one town, monthly incomes for men with college degrees are found to have a standard deviation of $650. Use a 0.01 significance level to test the claim that for men without college degrees in that town, incomes have a higher standard deviation. A random sample of 22 men without college degrees resulted in incomes with a standard deviation of $973. a) State claim: b) Test statistic: (identify to two decimals) and critical value: (identify to two decimals) c)...
Show all work by hand. A statistics professor at an all-women's college determined that the standard deviation of women's heights is 2.5 inches. The professor claims that men's heights ar...
Show all work by hand.
A statistics professor at an all-women's college determined that the standard deviation of women's heights is 2.5 inches. The professor claims that men's heights are more variable than women's heights. To test the claim, he randomly selected 41 male students from a nearby all-male college and found the standard deviation to be 2.9 inches. Use this sample data and a significance level of a 0.01 to test the professor's claim that the standard deviation of...
In one town, monthly incomes for men with college degrees are found to have a standard...
In one town, monthly incomes for men with college degrees are found to have a standard deviation of $650. Use a 0.01 significance level to test the claim that for men without college degrees in that town, incomes have a higher standard deviation. A random sample of 22 men without college degrees resulted in incomes with a standard deviation of $913. A manufacturer uses a new production method to produce steel rods. A random sample of 17 steel rods resulted...
The mean score on a science assessment test for 49 randomly selected male high school students...
The mean score on a science assessment test for 49 randomly selected male high school students was 153. Assume the population standard deviation is 36. The mean score on the same test for 50 randomly selected female high school students was 147. Assume the population standard deviation is 34. At a= 0.05, can you support the claim that the mean score on the science assessment test for male high school students is greater than the mean score for female high...
Do male and female college students have the same distribution of living arrangements? Use a level...
Do male and female college students have the same distribution
of living arrangements? Use a level of significance of 0.05.
Suppose that 101 randomly selected male college students and 51
randomly selected female college students were asked about their
living arrangements: dormitory, apartment, or other. The results
are shown in Table. Do male and female college students have the
same distribution of living arrangements?
Dormitory
Apartment
Other
Male
41
34
26
Female
19
27
5
What is the chi-square test-statistic...
1) When 327 college students are randomly selected and surveyed, it is found that 121 own...
1) When 327 college students are randomly selected and surveyed, it is found that 121 own a car. Construct and interpret a 99% confidence interval for the percentage of all college students who own a car. Be sure to check the conditions.
For randomly selected adults, IQ scores are normally distributed with a standard deviation of 15. For...
For randomly selected adults, IQ scores are normally distributed with a standard deviation of 15. For a simple random sample of 25 randomly selected college students, their IQ scores have a standard deviation of 18. Use a 5% level of significance; test the claim that the IQ scores of college students are less consistent (higher standard deviation) compare to the IQ scores of the general population.
The weights of randomly selected 5 female students and 5 male students are given by the...
The weights of randomly selected 5 female students and 5 male students are given by the following: weights for male students:160,165,152,158,178 weights for female students:169,154,158,156,162. Let the weight distributions of male and female students follow N(μ1,σ1) and N(μ2,σ2) respectively. • Test H0 : u1 = μ2 VS u1 cant equal u2 at 5% level of significance. Use P(t8>2.30) =0.025. (5 points)
At a local store, 65 female employees were randomly selected and it was found that their mean monthly income was $625 with a standard deviation of $121.50. 75 male employees were also randomly selected and their mean monthly income was found to be $667 with a standard deviation of $168.70. Find the test statistic to test the hypothesis that male employees have a higher monthly income than female employees. Use a =0.01. The test statistic is: 1.652 - 1.705 -1.533...
8) In one town, monthly incomes for men with college degrees are found to have a standard deviation of $650. Use a 0.01 significance level to test the claim that for men without college degrees in that town, incomes have a higher standard deviation. A random sample of 22 men without college degrees resulted in incomes with a standard deviation of $913.
Show all work by hand.
A statistics professor at an all-women's college determined that the standard deviation of women's heights is 2.5 inches. The professor claims that men's heights are more variable than women's heights. To test the claim, he randomly selected 41 male students from a nearby all-male college and found the standard deviation to be 2.9 inches. Use this sample data and a significance level of a 0.01 to test the professor's claim that the standard deviation of...
In one town, monthly incomes for men with college degrees are found to have a standard deviation of $650. Use a 0.01 significance level to test the claim that for men without college degrees in that town, incomes have a higher standard deviation. A random sample of 22 men without college degrees resulted in incomes with a standard deviation of $913. A manufacturer uses a new production method to produce steel rods. A random sample of 17 steel rods resulted...
Do male and female college students have the same distribution
of living arrangements? Use a level of significance of 0.05.
Suppose that 101 randomly selected male college students and 51
randomly selected female college students were asked about their
living arrangements: dormitory, apartment, or other. The results
are shown in Table. Do male and female college students have the
same distribution of living arrangements?
Dormitory
Apartment
Other
Male
41
34
26
Female
19
27
5
What is the chi-square test-statistic...
1) When 327 college students are randomly selected and surveyed, it is found that 121 own a car. Construct and interpret a 99% confidence interval for the percentage of all college students who own a car. Be sure to check the conditions.
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