n 2016, it was reported that 16% of 500 Utah families had incomes below the poverty...
n 2016, it was reported that 16% of 500 Utah families had incomes below the poverty level. At the same time, 11.3% of 450 Wyoming families had incomes below the poverty level. You need to find out if there was a significant difference in proportion of families with incomes below the poverty level in these two states Find the p value.
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n 2016, it was reported that 16% of 500 Utah families had
incomes below the poverty...
Please answer each question and show work. 2. In 2001, 38% of families reported that their...
Please answer each question and show work.
2. In 2001, 38% of families reported that their family regularly ate dinner together. A researcher at this proportion has decreased. In a recent poll, 35.9% of 1122 families reported that their family regularly ate dinner together. Use a = 0.05 You may use the 1-PropZTest on your graphing calculator. (a) State the null and alternative hypotheses. (b) This time p = 0.359 and n = 1122 are given to you. Find x...
Part 3: Hypothesis Testing In 2011, the national percent of low-income working families had an ap...
Part 3: Hypothesis Testing In 2011, the national percent of low-income working families had an approximately normal distribution with a mean of 31.3% and a standard deviation of 6.2% (The Working Poor Families Project, 2011). Although it remained slow, some politicians claimed that the recovery from the Great Recession was steady and noticeable. As a result, it was believed that the national percent of low-income working families was significantly lower in 2014 than it was in 2011. To support this...
(1 point) Family transportation costs are usually higher than most people believe. Eighteen randomly selected families...
(1 point) Family transportation costs are usually higher than most people believe. Eighteen randomly selected families in three major cities are asked to use their records to estimate a monthly figure for transportation cost. Use the data obtained and ANOVA to test whether there is a significant difference in monthly transportation costs for families living in these cities. Use a = 0.05. Edmonton 650 480 550 600 675 540 TE Toronto Vancouver 250 850 525 700 950 175 780 500...
1. A random sample of n measurements was selected from a population with standard deviation σ=13.6...
1. A random sample of n measurements was selected from a population with standard deviation σ=13.6 and unknown mean μ. Calculate a 90 % confidence interval for μ for each of the following situations: (a) n=45, x¯¯¯=89.8 ≤μ≤ (b) n=70, x¯¯¯=89.8 ≤μ≤ (c) n=100, x¯¯¯=89.8 ≤μ≤ (d) In general, we can say that for the same confidence level, increasing the sample size the margin of error (width) of the confidence interval. (Enter: ''DECREASES'', ''DOES NOT CHANGE'' or ''INCREASES'', without the...
Gun Murders - Texas vs New York - Significance Test In 2011, New York had much...
Gun Murders - Texas vs New York - Significance Test In 2011, New York had much stricter gun laws than Texas. For that year, the proportion of gun murders in Texas was greater than in New York. Here we test whether or not the proportion was significantly greater in Texas. The table below gives relevant information. Here, the p̂'s are population proportions but you should treat them as sample proportions. The standard error (SE) is given to save calculation time...
Assume that both populations are normally distributed. a) Test whether H1 H2 at the a= 0.01...
Assume that both populations are normally distributed. a) Test whether H1 H2 at the a= 0.01 level of significance for the given sample data. b) Construct a 99% confidence interval about 11 -42 n Sample 1 20 53.5 9.4 Sample 2 13 44.8 11.3 х s Click the icon to view the Student t-distribution table. a) Perform a hypothesis test. Determine the null and alternative hypotheses. A. HO HH2, H:17H2 O B. Ho H1 H2, H7:41 H2 OC. Ho H1...
Say a 95% confidence interval for P2 - P2, the difference between two proportions, is (0.152,...
Say a 95% confidence interval for P2 - P2, the difference between two proportions, is (0.152, 0.392). This indicates that the difference between the two proportions is not significant. A) True-- Yes OB) False--No O C) Can't tell without the data Question 7 (1 point) According to National Eye Institute (NEI), in 2010, 61% of Americans with cataract were women and 39% were men. Suppose you want to conduct a test for the difference in proportions to test whether females...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had to move back in with their parents. In a 2012 survey, suppose 165 out of 813 randomly selected young adults (ages 18–34) had to move back in with their parents after living alone. In a similar survey from the year 2000, suppose 294 out of 1834 young adults had to move back in with their parents. The table below summarizes this information. The standard...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had to move back in with their parents. In a 2012 survey, suppose 155 out of 813 randomly selected young adults (ages 18–34) had to move back in with their parents after living alone. In a similar survey from the year 2000, suppose 288 out of 1824 young adults had to move back in with their parents. The table below summarizes this information. The standard...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had to move back in with their parents. In a 2012 survey, suppose 155 out of 803 randomly selected young adults (ages 18-34) had to move back in with their parents after living alone. In a similar survey from the year 2000, suppose 288 out of 1824 young adults had to move back in with their parents. The table below summarizes this information. The standard...
Please answer each question and show work.
2. In 2001, 38% of families reported that their family regularly ate dinner together. A researcher at this proportion has decreased. In a recent poll, 35.9% of 1122 families reported that their family regularly ate dinner together. Use a = 0.05 You may use the 1-PropZTest on your graphing calculator. (a) State the null and alternative hypotheses. (b) This time p = 0.359 and n = 1122 are given to you. Find x...
(1 point) Family transportation costs are usually higher than most people believe. Eighteen randomly selected families in three major cities are asked to use their records to estimate a monthly figure for transportation cost. Use the data obtained and ANOVA to test whether there is a significant difference in monthly transportation costs for families living in these cities. Use a = 0.05. Edmonton 650 480 550 600 675 540 TE Toronto Vancouver 250 850 525 700 950 175 780 500...
Assume that both populations are normally distributed. a) Test whether H1 H2 at the a= 0.01 level of significance for the given sample data. b) Construct a 99% confidence interval about 11 -42 n Sample 1 20 53.5 9.4 Sample 2 13 44.8 11.3 х s Click the icon to view the Student t-distribution table. a) Perform a hypothesis test. Determine the null and alternative hypotheses. A. HO HH2, H:17H2 O B. Ho H1 H2, H7:41 H2 OC. Ho H1...
Say a 95% confidence interval for P2 - P2, the difference between two proportions, is (0.152, 0.392). This indicates that the difference between the two proportions is not significant. A) True-- Yes OB) False--No O C) Can't tell without the data Question 7 (1 point) According to National Eye Institute (NEI), in 2010, 61% of Americans with cataract were women and 39% were men. Suppose you want to conduct a test for the difference in proportions to test whether females...
Boomerang Generation: The Boomerang Generation refers to the recent generation of young adults who have had to move back in with their parents. In a 2012 survey, suppose 155 out of 803 randomly selected young adults (ages 18-34) had to move back in with their parents after living alone. In a similar survey from the year 2000, suppose 288 out of 1824 young adults had to move back in with their parents. The table below summarizes this information. The standard...
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