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Deck 12: Analysis of Variance

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Question
One characteristic of the F distribution is that the computed F can only range between -1 and +1.
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Question
Suppose that an automobile manufacturer designed a radically new lightweight engine and wants to recommend the grade of gasoline that will have the best fuel economy. The four grades are regular, economy, premium, and super premium. The test car made three trial runs on the test track using each of the four grades. The miles per gallon were recorded for each grade. At the 0.05 level, what is the critical value of F used to test the hypothesis that the miles per gallon for each fuel are the same? <strong>Suppose that an automobile manufacturer designed a radically new lightweight engine and wants to recommend the grade of gasoline that will have the best fuel economy. The four grades are regular, economy, premium, and super premium. The test car made three trial runs on the test track using each of the four grades. The miles per gallon were recorded for each grade. At the 0.05 level, what is the critical value of F used to test the hypothesis that the miles per gallon for each fuel are the same? </strong> A)1.96 B)4.07 C)2.33 D)12.00 <div style=padding-top: 35px>

A)1.96
B)4.07
C)2.33
D)12.00
Question
A large department store examined a sample of the 18 credit card sales and recorded the amounts charged for each of three types of credit cards: MasterCard, Visa, and Discover. Six MasterCard sales, seven Visa, and five Discover sales were recorded. The store used an ANOVA to test if the mean sales for each credit card were equal. What are the degrees of freedom for the F statistic?

A)18 in the numerator, 3 in the denominator
B)3 in the numerator, 18 in the denominator
C)2 in the numerator, 15 in the denominator
D)6 in the numerator, 15 in the denominator
Question
What distribution does the F distribution approach as the sample size increases?

A)Binomial
B)Normal
C)Poisson
D)Exponential
Question
For an ANOVA test, rejecting the null hypothesis does not identify which treatment means differ significantly.
Question
Which statement is correct about the F distribution?

A)Cannot be negative
B)Cannot be positive
C)Is the same as the t distribution
D)Is the same as the z distribution
Question
An F statistic is __________.

A)A ratio of two means
B)A ratio of two variances
C)The difference between three means
D)A population parameter
Question
To employ ANOVA, the populations should have approximately equal standard deviations.
Question
If we want to determine which treatment means differ, we compute a confidence interval for the difference between each pair of means.
Question
If the computed value of F is 0.99 and the F critical value is 3.89, we would not reject the null hypothesis.
Question
The F distribution's curve is positively skewed.
Question
Analysis of variance is used to _____________.

A)Compare nominal data
B)Compute a t test
C)Compare population proportions
D)Simultaneously compare several population means
Question
An experiment to determine the most effective way to teach safety principles applied four different teaching methods. Some employees were given programmed instruction booklets and worked through the course at their own pace. Other employees attended lectures. A third group watched a television presentation, and a fourth group was divided into small discussion groups. A high of 10 was possible. A sample of five tests was selected from each group. The test grade results were: <strong>An experiment to determine the most effective way to teach safety principles applied four different teaching methods. Some employees were given programmed instruction booklets and worked through the course at their own pace. Other employees attended lectures. A third group watched a television presentation, and a fourth group was divided into small discussion groups. A high of 10 was possible. A sample of five tests was selected from each group. The test grade results were: At the 0.01 level, what is the critical value?</strong> A)1.00 B)1.96 C)3.24 D)5.29 <div style=padding-top: 35px> At the 0.01 level, what is the critical value?

A)1.00
B)1.96
C)3.24
D)5.29
Question
If a confidence interval for the difference between a pair of treatment means includes 0, then we reject the null hypothesis that there is no difference in the pair of treatment means.
Question
The alternative hypothesis used in ANOVA is H1: All population means are equal.
Question
In an ANOVA table, k represents the total number of sample observations and n represents the total number of treatments.
Question
To employ ANOVA, the populations being studied must be approximately normally distributed.
Question
For the hypothesis test, For the hypothesis test, with n<sub>1</sub> = 10 and n<sub>2</sub> = 10, the F-test statistic is 2.56. At the 0.01 level of significance, we would reject the null hypothesis.<div style=padding-top: 35px> with n1 = 10 and n2 = 10, the F-test statistic is 2.56. At the 0.01 level of significance, we would reject the null hypothesis.
Question
Suppose a package delivery company purchased 14 trucks at the same time. Five trucks were purchased from manufacturer A, four from manufacturer B, and five from manufacturer C. The cost of maintaining each truck was recorded. The company used ANOVA to test if the mean maintenance costs of the trucks from each manufacturer were equal. To apply the F test, how many degrees of freedom must be in the denominator?

A)2
B)3
C)11
D)14
Question
Three different fertilizers were applied to a field of celery. In computing F, how many degrees of freedom are there in the numerator?

A)0
B)1
C)2
D)3
Question
When testing for differences between treatment means, the degrees of freedom for the t statistic are ___________.

A)k
B)(n - 1)
C)(n - k)
D)(1/n1 + 1/n2)
Question
Several employees have submitted different methods of assembling a subassembly. Sample data for each method are: <strong>Several employees have submitted different methods of assembling a subassembly. Sample data for each method are: How many treatments are there?</strong> A)3 B)4 C)12 D)0 <div style=padding-top: 35px> How many treatments are there?

A)3
B)4
C)12
D)0
Question
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What are the degrees of freedom for the treatment and error sources of variation?</strong> A)3 and 18 B)2 and 17 C)3 and 15 D)2 and 15 <div style=padding-top: 35px> What are the degrees of freedom for the treatment and error sources of variation?

A)3 and 18
B)2 and 17
C)3 and 15
D)2 and 15
Question
An electronics company wants to compare the quality of their cell phones to the cell phones from three competitors. They sample 10 phones from each company and count the number of defects for each phone. If ANOVA was used to compare the average number of defects, then the treatments would be defined as:

A)The number of cell phones sampled.
B)The average number of defects.
C)The total number of phones.
D)The four companies.
Question
A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. In an ANOVA table, what are the degrees of freedom for the error source of variation?</strong> A)3 B)10 C)27 D)30 <div style=padding-top: 35px> In an ANOVA table, what are the degrees of freedom for the error source of variation?

A)3
B)10
C)27
D)30
Question
In ANOVA analyses, when the null hypothesis is rejected, we can test for differences between treatment means by _____________.

A)Constructing confidence intervals
B)Adding another treatment
C)Doing an additional ANOVA
D)Doing a t test
Question
A preliminary study of hourly wages paid to unskilled employees in three metropolitan areas was conducted. Seven employees were included from Area A, 9 from Area B, and 12 from Area C. The test statistic was computed to be 4.91. What can we conclude at the 0.05 level?

A)Mean hourly wages of unskilled employees of all areas are equal.
B)Mean hourly wages in at least two metropolitan areas are different.
C)More degrees of freedom are needed.
D)None of these is correct.
Question
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the computed value of F?</strong> A)7.48 B)7.84 C)8.84 D)8.48 <div style=padding-top: 35px> What is the computed value of F?

A)7.48
B)7.84
C)8.84
D)8.48
Question
A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. In an ANOVA table, what are the total degrees of freedom?</strong> A)27 B)28 C)29 D)30 <div style=padding-top: 35px> In an ANOVA table, what are the total degrees of freedom?

A)27
B)28
C)29
D)30
Question
When testing for differences between treatment means, a confidence interval is computed with __________________.

A)The mean square error
B)The standard deviation
C)The sum of squared errors
D)The standard error of the mean
Question
When the null hypothesis for an ANOVA analysis comparing four treatment means is rejected, _________________

A)Two comparisons of treatment means can be made
B)Four comparisons of treatment means can be made
C)Six comparisons of treatment means can be made
D)Eight comparisons of treatment means can be made
Question
A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. In an ANOVA table, what are the degrees of freedom for the treatment source of variation?</strong> A)2 B)3 C)10 D)27 <div style=padding-top: 35px> In an ANOVA table, what are the degrees of freedom for the treatment source of variation?

A)2
B)3
C)10
D)27
Question
If an ANOVA test is conducted and the null hypothesis is rejected, what does this indicate?

A)The p-value is less than α.
B)The population means are equal.
C)At least one pair of population means is different.
D)All population means are different.
Question
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the critical value of F at the 5% level of significance?</strong> A)3.29 B)3.68 C)3.59 D)3.20 <div style=padding-top: 35px> What is the critical value of F at the 5% level of significance?

A)3.29
B)3.68
C)3.59
D)3.20
Question
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the treatment mean square?</strong> A)71.2 B)71.4 C)558 D)534 <div style=padding-top: 35px> What is the treatment mean square?

A)71.2
B)71.4
C)558
D)534
Question
A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. What is the critical value of F at the 1% level of significance?</strong> A)9.46 B)8.29 C)8.18 D)4.61 <div style=padding-top: 35px> What is the critical value of F at the 1% level of significance?

A)9.46
B)8.29
C)8.18
D)4.61
Question
When testing for differences between treatment means, the t statistic is based on ____________.

A)The treatment degrees of freedom
B)The total degrees of freedom
C)The error degrees of freedom
D)The ratio of treatment and error degrees of freedom
Question
A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. What is the critical value of F at the 5% level of significance?</strong> A)19.45 B)3.00 C)4.41 D)4.38 <div style=padding-top: 35px> What is the critical value of F at the 5% level of significance?

A)19.45
B)3.00
C)4.41
D)4.38
Question
The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> = 10, <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> = 12, <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> = 15, <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> = 18. The sample size for each treatment is the same. If ( <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> - <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> ) is significantly different from zero, then ___________.

A) <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> is significantly less than <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> ,
<strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> ,
<strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> .
B) <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> is significantly less than <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> , and
<strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> .
C) <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. <div style=padding-top: 35px> are significantly different.
D)The treatment means are all equal.
Question
In ANOVA, the null hypothesis is:

A) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D) <div style=padding-top: 35px>
B) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D) <div style=padding-top: 35px>
C) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D) <div style=padding-top: 35px>
D) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D) <div style=padding-top: 35px>
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px> What is the null hypothesis?

A) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
B) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
C) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
D) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What are the degrees of freedom for the denominator of the F ratio?</strong> A)20 B)18 C)10 D)9 <div style=padding-top: 35px> What are the degrees of freedom for the denominator of the F ratio?

A)20
B)18
C)10
D)9
Question
A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: <strong>A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: When comparing the mean annual incomes for executives with a high school education or less and those with an undergraduate degree, the 95% confidence interval shows an interval of 11.7 to 42.7 for the difference. This result indicates that __________________.</strong> A)There is no significant difference between the two incomes. B)The interval contains a difference of zero. C)Executives with an undergraduate degree earn significantly more than executives with a high school education or less. D)Executives with an undergraduate degree earn significantly less than executives with a high school education or less. <div style=padding-top: 35px> When comparing the mean annual incomes for executives with a high school education or less and those with an undergraduate degree, the 95% confidence interval shows an interval of 11.7 to 42.7 for the difference. This result indicates that __________________.

A)There is no significant difference between the two incomes.
B)The interval contains a difference of zero.
C)Executives with an undergraduate degree earn significantly more than executives with a high school education or less.
D)Executives with an undergraduate degree earn significantly less than executives with a high school education or less.
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the critical value of F at the 0.01 level of significance?</strong> A)5.85 B)5.35 C)6.51 D)4.03 <div style=padding-top: 35px> What is the critical value of F at the 0.01 level of significance?

A)5.85
B)5.35
C)6.51
D)4.03
Question
A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: <strong>A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: When comparing the mean annual incomes for executives with undergraduate and master's degrees or more, the following 95% confidence interval can be constructed:</strong> A)2.0 ± 2.052 * 6.52 B)2.0 ± 3.182 * 6.52 C)2.0 ± 2.052 * 42.46 D)2.0 ± 3.182 * 42.46 <div style=padding-top: 35px> When comparing the mean annual incomes for executives with undergraduate and master's degrees or more, the following 95% confidence interval can be constructed:

A)2.0 ± 2.052 * 6.52
B)2.0 ± 3.182 * 6.52
C)2.0 ± 2.052 * 42.46
D)2.0 ± 3.182 * 42.46
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the critical value of F at the 0.05 level of significance?</strong> A)5.85 B)5.35 C)3.18 D)4.03 <div style=padding-top: 35px> What is the critical value of F at the 0.05 level of significance?

A)5.85
B)5.35
C)3.18
D)4.03
Question
A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: <strong>A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: Based on the comparison between the mean annual computer technology expense for companies in the education and tax services industries, _________________.</strong> A)A confidence interval shows that the mean annual computer technology expenses are not significantly different B)The ANOVA results show that the mean annual computer technology expenses are significantly different C)A confidence interval shows that the mean annual computer technology expenses are significantly different D)The ANOVA results show that the mean annual computer technology expenses are not significantly different <div style=padding-top: 35px> Based on the comparison between the mean annual computer technology expense for companies in the education and tax services industries, _________________.

A)A confidence interval shows that the mean annual computer technology expenses are not significantly different
B)The ANOVA results show that the mean annual computer technology expenses are significantly different
C)A confidence interval shows that the mean annual computer technology expenses are significantly different
D)The ANOVA results show that the mean annual computer technology expenses are not significantly different
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: The calculated F ratio is ______.</strong> A)3.484 B)1.867 C)3.18 D)5.35 <div style=padding-top: 35px> The calculated F ratio is ______.

A)3.484
B)1.867
C)3.18
D)5.35
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: At the 5% level of significance, what is the decision regarding the null hypothesis?</strong> A)Reject the null hypothesis and conclude the variances are different. B)Fail to reject the null hypothesis and conclude no significant difference in the variances. C)Reject the null hypothesis and conclude the variances are the same. D)Fail to reject the null hypothesis and conclude the variances are the same. <div style=padding-top: 35px> At the 5% level of significance, what is the decision regarding the null hypothesis?

A)Reject the null hypothesis and conclude the variances are different.
B)Fail to reject the null hypothesis and conclude no significant difference in the variances.
C)Reject the null hypothesis and conclude the variances are the same.
D)Fail to reject the null hypothesis and conclude the variances are the same.
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px> What is the alternate hypothesis?

A) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
B) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
C) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
D) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D) <div style=padding-top: 35px>
Question
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the decision regarding the null hypothesis?</strong> A)Reject H<sub>0</sub>-there is a difference in treatment means. B)Fail to reject H<sub>0</sub>-there is a difference in treatment means. C)Reject H<sub>0</sub>-there is a difference in errors. D)Fail to reject H<sub>0</sub>-there is a difference in errors. <div style=padding-top: 35px> What is the decision regarding the null hypothesis?

A)Reject H0-there is a difference in treatment means.
B)Fail to reject H0-there is a difference in treatment means.
C)Reject H0-there is a difference in errors.
D)Fail to reject H0-there is a difference in errors.
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: At the 1% level of significance, what is the decision?</strong> A)Reject the null hypothesis and conclude the variances are different. B)Fail to reject the null hypothesis and conclude the variances are different. C)Reject the null hypothesis and conclude the variances are the same. D)Fail to reject the null hypothesis and conclude the variances are the same. <div style=padding-top: 35px> At the 1% level of significance, what is the decision?

A)Reject the null hypothesis and conclude the variances are different.
B)Fail to reject the null hypothesis and conclude the variances are different.
C)Reject the null hypothesis and conclude the variances are the same.
D)Fail to reject the null hypothesis and conclude the variances are the same.
Question
The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: <strong>The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: Based on the comparison between the mean annual dividend rate for companies in the utilities and insurance industries, _______________________.</strong> A)A confidence interval shows that the mean annual dividend rates are not significantly different B)The ANOVA results show that the mean annual dividend rates are significantly different C)A confidence interval shows that the mean annual dividend rates are significantly different D)The ANOVA results show that the mean annual dividend rates are not significantly different <div style=padding-top: 35px> Based on the comparison between the mean annual dividend rate for companies in the utilities and insurance industries, _______________________.

A)A confidence interval shows that the mean annual dividend rates are not significantly different
B)The ANOVA results show that the mean annual dividend rates are significantly different
C)A confidence interval shows that the mean annual dividend rates are significantly different
D)The ANOVA results show that the mean annual dividend rates are not significantly different
Question
A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: <strong>A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: Based on the comparison between the mean annual computer technology expense for companies in the tax service and food service industries, the 95% confidence interval shows an interval of -5.85 to 14.85 for the difference. This result indicates that _______________.</strong> A)There is no significant difference between the two industry technology expenses B)The interval contains a difference of 20.7 C)Companies in the food service industry spend significantly more than companies in the tax service industry D)Companies in the food service industry spend significantly less than companies in the tax service industry <div style=padding-top: 35px> Based on the comparison between the mean annual computer technology expense for companies in the tax service and food service industries, the 95% confidence interval shows an interval of -5.85 to 14.85 for the difference. This result indicates that _______________.

A)There is no significant difference between the two industry technology expenses
B)The interval contains a difference of 20.7
C)Companies in the food service industry spend significantly more than companies in the tax service industry
D)Companies in the food service industry spend significantly less than companies in the tax service industry
Question
The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: <strong>The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: Based on the comparison between the mean annual dividend rate for companies in utilities and banking, the 95% confidence interval shows an interval of 1.28 to 6.28 for the difference. This result indicates that _____________________.</strong> A)There is no significant difference between the two rates B)The interval contains a difference of 5.00 C)The annual dividend rate in the utilities industry is significantly less than the annual dividend rate in the banking industry D)The annual dividend rate in the banking industry is significantly less than the annual dividend rate in the utilities industry <div style=padding-top: 35px> Based on the comparison between the mean annual dividend rate for companies in utilities and banking, the 95% confidence interval shows an interval of 1.28 to 6.28 for the difference. This result indicates that _____________________.

A)There is no significant difference between the two rates
B)The interval contains a difference of 5.00
C)The annual dividend rate in the utilities industry is significantly less than the annual dividend rate in the banking industry
D)The annual dividend rate in the banking industry is significantly less than the annual dividend rate in the utilities industry
Question
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What are the degrees of freedom for the numerator of the F ratio?</strong> A)8 B)9 C)10 D)18 <div style=padding-top: 35px> What are the degrees of freedom for the numerator of the F ratio?

A)8
B)9
C)10
D)18
Question
A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: <strong>A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: When comparing the mean annual computer technology expense for companies in the education and tax services industries, the following 95% confidence interval can be constructed: _______________.</strong> A)13.5 ± 2.026 * 5.78 B)13.5 ± 2.021 * 5.78 C)13.5 ± 2.026 * 13.96 D)13.5 ± 2.021 * 13.96 <div style=padding-top: 35px> When comparing the mean annual computer technology expense for companies in the education and tax services industries, the following 95% confidence interval can be constructed: _______________.

A)13.5 ± 2.026 * 5.78
B)13.5 ± 2.021 * 5.78
C)13.5 ± 2.026 * 13.96
D)13.5 ± 2.021 * 13.96
Question
The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: <strong>The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: When comparing the mean annual dividend rate for companies in the utilities and insurance industries, the following 95% confidence interval can be constructed: _________________.</strong> A)5.78 ± 2.160 * 2.40 B)5.78 ± 2.120 * 2.40 C)5.78 ± 2.160 * 1.11 D)5.78 ± 2.120 * 1.11 <div style=padding-top: 35px> When comparing the mean annual dividend rate for companies in the utilities and insurance industries, the following 95% confidence interval can be constructed: _________________.

A)5.78 ± 2.160 * 2.40
B)5.78 ± 2.120 * 2.40
C)5.78 ± 2.160 * 1.11
D)5.78 ± 2.120 * 1.11
Question
A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: <strong>A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: Based on the comparison between the mean annual incomes for executives with undergraduate and master's degrees or more ________________.</strong> A)A confidence interval shows that the mean annual incomes are not significantly different. B)The ANOVA results show that the mean annual incomes are significantly different. C)A confidence interval shows that the mean annual incomes are significantly different. D)The ANOVA results show that the mean annual incomes are not significantly different. <div style=padding-top: 35px> Based on the comparison between the mean annual incomes for executives with undergraduate and master's degrees or more ________________.

A)A confidence interval shows that the mean annual incomes are not significantly different.
B)The ANOVA results show that the mean annual incomes are significantly different.
C)A confidence interval shows that the mean annual incomes are significantly different.
D)The ANOVA results show that the mean annual incomes are not significantly different.
Question
The F distribution is a ______________ distribution.
Question
In a one-way ANOVA, ______ degrees of freedom are associated with the numerator of the F ratio.
Question
In a one-way ANOVA, the degrees of freedom associated with the error sum of squares is __________.
Question
When H0: is rejected in ANOVA, we compute ____________ to identify pairs of means that differ.
Question
A sum of squares divided by its corresponding degrees of freedom is called a ________________.
Question
The statistical technique used to test the equality of three or more population means is ___________________.
Question
The minimum and maximum of values of an F statistic are _______ and ______.
Question
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. The F critical value for α = 0.05 is _____.
Question
In ANOVA, when we do not reject the null hypothesis, ______ inference is made about the population means.
Question
An ANOVA has three sources of variation. They are _____, _____, and _____.
Question
ANOVA requires that the populations should be ______, ______, and have _____.
Question
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. To select a critical F-statistic, the number of degrees of freedom for the numerator is _____.
Question
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. If the error sum of squares is 0.09, the mean square error is _____.
Question
The shape of the F distribution is _____________________.
Question
Assuming that the larger of two variances is in the numerator of an F-statistic, the rejection region to test a null hypothesis is in the _________ tail of the F distribution.
Question
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. If the brand sum of squares is 0.07 and the error sum of squares is 0.09, the calculated value of F is _____.
Question
The test statistic used to compare two variances is the ___________ statistic.
Question
All values in an F distribution must be _____________.
Question
The F distribution is useful when testing a requirement of two-sample tests of hypothesis. The requirement is _______________.
Question
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. If the sum of squares for the brands is 0.07, the mean square for brands is _____.
Question
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. To select a critical F-statistic, the number of degrees of freedom for the denominator is _____.
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Deck 12: Analysis of Variance
1
One characteristic of the F distribution is that the computed F can only range between -1 and +1.
False
2
Suppose that an automobile manufacturer designed a radically new lightweight engine and wants to recommend the grade of gasoline that will have the best fuel economy. The four grades are regular, economy, premium, and super premium. The test car made three trial runs on the test track using each of the four grades. The miles per gallon were recorded for each grade. At the 0.05 level, what is the critical value of F used to test the hypothesis that the miles per gallon for each fuel are the same? <strong>Suppose that an automobile manufacturer designed a radically new lightweight engine and wants to recommend the grade of gasoline that will have the best fuel economy. The four grades are regular, economy, premium, and super premium. The test car made three trial runs on the test track using each of the four grades. The miles per gallon were recorded for each grade. At the 0.05 level, what is the critical value of F used to test the hypothesis that the miles per gallon for each fuel are the same? </strong> A)1.96 B)4.07 C)2.33 D)12.00

A)1.96
B)4.07
C)2.33
D)12.00
4.07
3
A large department store examined a sample of the 18 credit card sales and recorded the amounts charged for each of three types of credit cards: MasterCard, Visa, and Discover. Six MasterCard sales, seven Visa, and five Discover sales were recorded. The store used an ANOVA to test if the mean sales for each credit card were equal. What are the degrees of freedom for the F statistic?

A)18 in the numerator, 3 in the denominator
B)3 in the numerator, 18 in the denominator
C)2 in the numerator, 15 in the denominator
D)6 in the numerator, 15 in the denominator
2 in the numerator, 15 in the denominator
4
What distribution does the F distribution approach as the sample size increases?

A)Binomial
B)Normal
C)Poisson
D)Exponential
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5
For an ANOVA test, rejecting the null hypothesis does not identify which treatment means differ significantly.
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6
Which statement is correct about the F distribution?

A)Cannot be negative
B)Cannot be positive
C)Is the same as the t distribution
D)Is the same as the z distribution
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7
An F statistic is __________.

A)A ratio of two means
B)A ratio of two variances
C)The difference between three means
D)A population parameter
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8
To employ ANOVA, the populations should have approximately equal standard deviations.
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9
If we want to determine which treatment means differ, we compute a confidence interval for the difference between each pair of means.
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10
If the computed value of F is 0.99 and the F critical value is 3.89, we would not reject the null hypothesis.
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11
The F distribution's curve is positively skewed.
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12
Analysis of variance is used to _____________.

A)Compare nominal data
B)Compute a t test
C)Compare population proportions
D)Simultaneously compare several population means
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13
An experiment to determine the most effective way to teach safety principles applied four different teaching methods. Some employees were given programmed instruction booklets and worked through the course at their own pace. Other employees attended lectures. A third group watched a television presentation, and a fourth group was divided into small discussion groups. A high of 10 was possible. A sample of five tests was selected from each group. The test grade results were: <strong>An experiment to determine the most effective way to teach safety principles applied four different teaching methods. Some employees were given programmed instruction booklets and worked through the course at their own pace. Other employees attended lectures. A third group watched a television presentation, and a fourth group was divided into small discussion groups. A high of 10 was possible. A sample of five tests was selected from each group. The test grade results were: At the 0.01 level, what is the critical value?</strong> A)1.00 B)1.96 C)3.24 D)5.29 At the 0.01 level, what is the critical value?

A)1.00
B)1.96
C)3.24
D)5.29
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14
If a confidence interval for the difference between a pair of treatment means includes 0, then we reject the null hypothesis that there is no difference in the pair of treatment means.
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15
The alternative hypothesis used in ANOVA is H1: All population means are equal.
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16
In an ANOVA table, k represents the total number of sample observations and n represents the total number of treatments.
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17
To employ ANOVA, the populations being studied must be approximately normally distributed.
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18
For the hypothesis test, For the hypothesis test, with n<sub>1</sub> = 10 and n<sub>2</sub> = 10, the F-test statistic is 2.56. At the 0.01 level of significance, we would reject the null hypothesis. with n1 = 10 and n2 = 10, the F-test statistic is 2.56. At the 0.01 level of significance, we would reject the null hypothesis.
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19
Suppose a package delivery company purchased 14 trucks at the same time. Five trucks were purchased from manufacturer A, four from manufacturer B, and five from manufacturer C. The cost of maintaining each truck was recorded. The company used ANOVA to test if the mean maintenance costs of the trucks from each manufacturer were equal. To apply the F test, how many degrees of freedom must be in the denominator?

A)2
B)3
C)11
D)14
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20
Three different fertilizers were applied to a field of celery. In computing F, how many degrees of freedom are there in the numerator?

A)0
B)1
C)2
D)3
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21
When testing for differences between treatment means, the degrees of freedom for the t statistic are ___________.

A)k
B)(n - 1)
C)(n - k)
D)(1/n1 + 1/n2)
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22
Several employees have submitted different methods of assembling a subassembly. Sample data for each method are: <strong>Several employees have submitted different methods of assembling a subassembly. Sample data for each method are: How many treatments are there?</strong> A)3 B)4 C)12 D)0 How many treatments are there?

A)3
B)4
C)12
D)0
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23
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What are the degrees of freedom for the treatment and error sources of variation?</strong> A)3 and 18 B)2 and 17 C)3 and 15 D)2 and 15 What are the degrees of freedom for the treatment and error sources of variation?

A)3 and 18
B)2 and 17
C)3 and 15
D)2 and 15
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24
An electronics company wants to compare the quality of their cell phones to the cell phones from three competitors. They sample 10 phones from each company and count the number of defects for each phone. If ANOVA was used to compare the average number of defects, then the treatments would be defined as:

A)The number of cell phones sampled.
B)The average number of defects.
C)The total number of phones.
D)The four companies.
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25
A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. In an ANOVA table, what are the degrees of freedom for the error source of variation?</strong> A)3 B)10 C)27 D)30 In an ANOVA table, what are the degrees of freedom for the error source of variation?

A)3
B)10
C)27
D)30
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26
In ANOVA analyses, when the null hypothesis is rejected, we can test for differences between treatment means by _____________.

A)Constructing confidence intervals
B)Adding another treatment
C)Doing an additional ANOVA
D)Doing a t test
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27
A preliminary study of hourly wages paid to unskilled employees in three metropolitan areas was conducted. Seven employees were included from Area A, 9 from Area B, and 12 from Area C. The test statistic was computed to be 4.91. What can we conclude at the 0.05 level?

A)Mean hourly wages of unskilled employees of all areas are equal.
B)Mean hourly wages in at least two metropolitan areas are different.
C)More degrees of freedom are needed.
D)None of these is correct.
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28
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the computed value of F?</strong> A)7.48 B)7.84 C)8.84 D)8.48 What is the computed value of F?

A)7.48
B)7.84
C)8.84
D)8.48
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29
A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. In an ANOVA table, what are the total degrees of freedom?</strong> A)27 B)28 C)29 D)30 In an ANOVA table, what are the total degrees of freedom?

A)27
B)28
C)29
D)30
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30
When testing for differences between treatment means, a confidence interval is computed with __________________.

A)The mean square error
B)The standard deviation
C)The sum of squared errors
D)The standard error of the mean
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31
When the null hypothesis for an ANOVA analysis comparing four treatment means is rejected, _________________

A)Two comparisons of treatment means can be made
B)Four comparisons of treatment means can be made
C)Six comparisons of treatment means can be made
D)Eight comparisons of treatment means can be made
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32
A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses three different processes. Management ordered a study of the production costs to see if there is a difference among the three processes. A summary of the findings is shown next. In an ANOVA table, what are the degrees of freedom for the treatment source of variation?</strong> A)2 B)3 C)10 D)27 In an ANOVA table, what are the degrees of freedom for the treatment source of variation?

A)2
B)3
C)10
D)27
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33
If an ANOVA test is conducted and the null hypothesis is rejected, what does this indicate?

A)The p-value is less than α.
B)The population means are equal.
C)At least one pair of population means is different.
D)All population means are different.
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34
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the critical value of F at the 5% level of significance?</strong> A)3.29 B)3.68 C)3.59 D)3.20 What is the critical value of F at the 5% level of significance?

A)3.29
B)3.68
C)3.59
D)3.20
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35
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the treatment mean square?</strong> A)71.2 B)71.4 C)558 D)534 What is the treatment mean square?

A)71.2
B)71.4
C)558
D)534
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36
A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. What is the critical value of F at the 1% level of significance?</strong> A)9.46 B)8.29 C)8.18 D)4.61 What is the critical value of F at the 1% level of significance?

A)9.46
B)8.29
C)8.18
D)4.61
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37
When testing for differences between treatment means, the t statistic is based on ____________.

A)The treatment degrees of freedom
B)The total degrees of freedom
C)The error degrees of freedom
D)The ratio of treatment and error degrees of freedom
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38
A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. <strong>A manufacturer of automobile transmissions uses two different processes. Management ordered a study of the production costs to see if there is a difference between the two processes. A summary of the findings is shown next. What is the critical value of F at the 5% level of significance?</strong> A)19.45 B)3.00 C)4.41 D)4.38 What is the critical value of F at the 5% level of significance?

A)19.45
B)3.00
C)4.41
D)4.38
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39
The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. = 10, <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. = 12, <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. = 15, <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. = 18. The sample size for each treatment is the same. If ( <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. - <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. ) is significantly different from zero, then ___________.

A) <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. is significantly less than <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. ,
<strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. ,
<strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. .
B) <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. is significantly less than <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. , and
<strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. .
C) <strong>The null hypothesis for an ANOVA analysis comparing four treatment means is rejected. The four sample means are = 10, = 12, = 15, = 18. The sample size for each treatment is the same. If ( - ) is significantly different from zero, then ___________.</strong> A) is significantly less than , , . B) is significantly less than , and . C) are significantly different. D)The treatment means are all equal. are significantly different.
D)The treatment means are all equal.
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40
In ANOVA, the null hypothesis is:

A) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D)
B) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D)
C) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D)
D) <strong>In ANOVA, the null hypothesis is:</strong> A) B) C) D)
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41
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D) What is the null hypothesis?

A) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D)
B) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D)
C) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D)
D) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the null hypothesis?</strong> A) B) C) D)
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42
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What are the degrees of freedom for the denominator of the F ratio?</strong> A)20 B)18 C)10 D)9 What are the degrees of freedom for the denominator of the F ratio?

A)20
B)18
C)10
D)9
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43
A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: <strong>A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: When comparing the mean annual incomes for executives with a high school education or less and those with an undergraduate degree, the 95% confidence interval shows an interval of 11.7 to 42.7 for the difference. This result indicates that __________________.</strong> A)There is no significant difference between the two incomes. B)The interval contains a difference of zero. C)Executives with an undergraduate degree earn significantly more than executives with a high school education or less. D)Executives with an undergraduate degree earn significantly less than executives with a high school education or less. When comparing the mean annual incomes for executives with a high school education or less and those with an undergraduate degree, the 95% confidence interval shows an interval of 11.7 to 42.7 for the difference. This result indicates that __________________.

A)There is no significant difference between the two incomes.
B)The interval contains a difference of zero.
C)Executives with an undergraduate degree earn significantly more than executives with a high school education or less.
D)Executives with an undergraduate degree earn significantly less than executives with a high school education or less.
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44
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the critical value of F at the 0.01 level of significance?</strong> A)5.85 B)5.35 C)6.51 D)4.03 What is the critical value of F at the 0.01 level of significance?

A)5.85
B)5.35
C)6.51
D)4.03
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45
A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: <strong>A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: When comparing the mean annual incomes for executives with undergraduate and master's degrees or more, the following 95% confidence interval can be constructed:</strong> A)2.0 ± 2.052 * 6.52 B)2.0 ± 3.182 * 6.52 C)2.0 ± 2.052 * 42.46 D)2.0 ± 3.182 * 42.46 When comparing the mean annual incomes for executives with undergraduate and master's degrees or more, the following 95% confidence interval can be constructed:

A)2.0 ± 2.052 * 6.52
B)2.0 ± 3.182 * 6.52
C)2.0 ± 2.052 * 42.46
D)2.0 ± 3.182 * 42.46
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46
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the critical value of F at the 0.05 level of significance?</strong> A)5.85 B)5.35 C)3.18 D)4.03 What is the critical value of F at the 0.05 level of significance?

A)5.85
B)5.35
C)3.18
D)4.03
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47
A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: <strong>A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: Based on the comparison between the mean annual computer technology expense for companies in the education and tax services industries, _________________.</strong> A)A confidence interval shows that the mean annual computer technology expenses are not significantly different B)The ANOVA results show that the mean annual computer technology expenses are significantly different C)A confidence interval shows that the mean annual computer technology expenses are significantly different D)The ANOVA results show that the mean annual computer technology expenses are not significantly different Based on the comparison between the mean annual computer technology expense for companies in the education and tax services industries, _________________.

A)A confidence interval shows that the mean annual computer technology expenses are not significantly different
B)The ANOVA results show that the mean annual computer technology expenses are significantly different
C)A confidence interval shows that the mean annual computer technology expenses are significantly different
D)The ANOVA results show that the mean annual computer technology expenses are not significantly different
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48
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: The calculated F ratio is ______.</strong> A)3.484 B)1.867 C)3.18 D)5.35 The calculated F ratio is ______.

A)3.484
B)1.867
C)3.18
D)5.35
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49
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: At the 5% level of significance, what is the decision regarding the null hypothesis?</strong> A)Reject the null hypothesis and conclude the variances are different. B)Fail to reject the null hypothesis and conclude no significant difference in the variances. C)Reject the null hypothesis and conclude the variances are the same. D)Fail to reject the null hypothesis and conclude the variances are the same. At the 5% level of significance, what is the decision regarding the null hypothesis?

A)Reject the null hypothesis and conclude the variances are different.
B)Fail to reject the null hypothesis and conclude no significant difference in the variances.
C)Reject the null hypothesis and conclude the variances are the same.
D)Fail to reject the null hypothesis and conclude the variances are the same.
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50
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D) What is the alternate hypothesis?

A) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D)
B) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D)
C) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D)
D) <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What is the alternate hypothesis?</strong> A) B) C) D)
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51
Given the following ANOVA table for three treatments each with six observations: <strong>Given the following ANOVA table for three treatments each with six observations: What is the decision regarding the null hypothesis?</strong> A)Reject H<sub>0</sub>-there is a difference in treatment means. B)Fail to reject H<sub>0</sub>-there is a difference in treatment means. C)Reject H<sub>0</sub>-there is a difference in errors. D)Fail to reject H<sub>0</sub>-there is a difference in errors. What is the decision regarding the null hypothesis?

A)Reject H0-there is a difference in treatment means.
B)Fail to reject H0-there is a difference in treatment means.
C)Reject H0-there is a difference in errors.
D)Fail to reject H0-there is a difference in errors.
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52
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: At the 1% level of significance, what is the decision?</strong> A)Reject the null hypothesis and conclude the variances are different. B)Fail to reject the null hypothesis and conclude the variances are different. C)Reject the null hypothesis and conclude the variances are the same. D)Fail to reject the null hypothesis and conclude the variances are the same. At the 1% level of significance, what is the decision?

A)Reject the null hypothesis and conclude the variances are different.
B)Fail to reject the null hypothesis and conclude the variances are different.
C)Reject the null hypothesis and conclude the variances are the same.
D)Fail to reject the null hypothesis and conclude the variances are the same.
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53
The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: <strong>The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: Based on the comparison between the mean annual dividend rate for companies in the utilities and insurance industries, _______________________.</strong> A)A confidence interval shows that the mean annual dividend rates are not significantly different B)The ANOVA results show that the mean annual dividend rates are significantly different C)A confidence interval shows that the mean annual dividend rates are significantly different D)The ANOVA results show that the mean annual dividend rates are not significantly different Based on the comparison between the mean annual dividend rate for companies in the utilities and insurance industries, _______________________.

A)A confidence interval shows that the mean annual dividend rates are not significantly different
B)The ANOVA results show that the mean annual dividend rates are significantly different
C)A confidence interval shows that the mean annual dividend rates are significantly different
D)The ANOVA results show that the mean annual dividend rates are not significantly different
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54
A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: <strong>A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: Based on the comparison between the mean annual computer technology expense for companies in the tax service and food service industries, the 95% confidence interval shows an interval of -5.85 to 14.85 for the difference. This result indicates that _______________.</strong> A)There is no significant difference between the two industry technology expenses B)The interval contains a difference of 20.7 C)Companies in the food service industry spend significantly more than companies in the tax service industry D)Companies in the food service industry spend significantly less than companies in the tax service industry Based on the comparison between the mean annual computer technology expense for companies in the tax service and food service industries, the 95% confidence interval shows an interval of -5.85 to 14.85 for the difference. This result indicates that _______________.

A)There is no significant difference between the two industry technology expenses
B)The interval contains a difference of 20.7
C)Companies in the food service industry spend significantly more than companies in the tax service industry
D)Companies in the food service industry spend significantly less than companies in the tax service industry
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55
The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: <strong>The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: Based on the comparison between the mean annual dividend rate for companies in utilities and banking, the 95% confidence interval shows an interval of 1.28 to 6.28 for the difference. This result indicates that _____________________.</strong> A)There is no significant difference between the two rates B)The interval contains a difference of 5.00 C)The annual dividend rate in the utilities industry is significantly less than the annual dividend rate in the banking industry D)The annual dividend rate in the banking industry is significantly less than the annual dividend rate in the utilities industry Based on the comparison between the mean annual dividend rate for companies in utilities and banking, the 95% confidence interval shows an interval of 1.28 to 6.28 for the difference. This result indicates that _____________________.

A)There is no significant difference between the two rates
B)The interval contains a difference of 5.00
C)The annual dividend rate in the utilities industry is significantly less than the annual dividend rate in the banking industry
D)The annual dividend rate in the banking industry is significantly less than the annual dividend rate in the utilities industry
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56
Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: <strong>Two accounting professors decided to compare the variance of their grading procedures. To accomplish this, they each graded the same 10 exams, with the following results: What are the degrees of freedom for the numerator of the F ratio?</strong> A)8 B)9 C)10 D)18 What are the degrees of freedom for the numerator of the F ratio?

A)8
B)9
C)10
D)18
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57
A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: <strong>A random sample of 40 companies with assets over $10 million was surveyed and asked to indicate their industry and annual computer technology expense. The ANOVA comparing the average computer technology expense among three industries rejected the null hypothesis. The Mean Square Error (MSE) was 195. The following table summarized the results: When comparing the mean annual computer technology expense for companies in the education and tax services industries, the following 95% confidence interval can be constructed: _______________.</strong> A)13.5 ± 2.026 * 5.78 B)13.5 ± 2.021 * 5.78 C)13.5 ± 2.026 * 13.96 D)13.5 ± 2.021 * 13.96 When comparing the mean annual computer technology expense for companies in the education and tax services industries, the following 95% confidence interval can be constructed: _______________.

A)13.5 ± 2.026 * 5.78
B)13.5 ± 2.021 * 5.78
C)13.5 ± 2.026 * 13.96
D)13.5 ± 2.021 * 13.96
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58
The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: <strong>The annual dividend rates for a random sample of 16 companies in three different industries, utilities, banking, and insurance were recorded. The ANOVA comparing the mean annual dividend rate among three industries rejected the null hypothesis that the dividend rates were equal. The Mean Square Error (MSE) was 3.36. The following table summarized the results: When comparing the mean annual dividend rate for companies in the utilities and insurance industries, the following 95% confidence interval can be constructed: _________________.</strong> A)5.78 ± 2.160 * 2.40 B)5.78 ± 2.120 * 2.40 C)5.78 ± 2.160 * 1.11 D)5.78 ± 2.120 * 1.11 When comparing the mean annual dividend rate for companies in the utilities and insurance industries, the following 95% confidence interval can be constructed: _________________.

A)5.78 ± 2.160 * 2.40
B)5.78 ± 2.120 * 2.40
C)5.78 ± 2.160 * 1.11
D)5.78 ± 2.120 * 1.11
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59
A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: <strong>A random sample of 30 executives from companies with assets over $1 million was selected and asked for their annual income and level of education. The ANOVA comparing the average income among three levels of education rejected the null hypothesis. The Mean Square Error (MSE) was 243.7. The following table summarized the results: Based on the comparison between the mean annual incomes for executives with undergraduate and master's degrees or more ________________.</strong> A)A confidence interval shows that the mean annual incomes are not significantly different. B)The ANOVA results show that the mean annual incomes are significantly different. C)A confidence interval shows that the mean annual incomes are significantly different. D)The ANOVA results show that the mean annual incomes are not significantly different. Based on the comparison between the mean annual incomes for executives with undergraduate and master's degrees or more ________________.

A)A confidence interval shows that the mean annual incomes are not significantly different.
B)The ANOVA results show that the mean annual incomes are significantly different.
C)A confidence interval shows that the mean annual incomes are significantly different.
D)The ANOVA results show that the mean annual incomes are not significantly different.
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60
The F distribution is a ______________ distribution.
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61
In a one-way ANOVA, ______ degrees of freedom are associated with the numerator of the F ratio.
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62
In a one-way ANOVA, the degrees of freedom associated with the error sum of squares is __________.
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63
When H0: is rejected in ANOVA, we compute ____________ to identify pairs of means that differ.
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64
A sum of squares divided by its corresponding degrees of freedom is called a ________________.
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65
The statistical technique used to test the equality of three or more population means is ___________________.
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66
The minimum and maximum of values of an F statistic are _______ and ______.
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67
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. The F critical value for α = 0.05 is _____.
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68
In ANOVA, when we do not reject the null hypothesis, ______ inference is made about the population means.
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69
An ANOVA has three sources of variation. They are _____, _____, and _____.
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70
ANOVA requires that the populations should be ______, ______, and have _____.
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71
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. To select a critical F-statistic, the number of degrees of freedom for the numerator is _____.
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72
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. If the error sum of squares is 0.09, the mean square error is _____.
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73
The shape of the F distribution is _____________________.
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74
Assuming that the larger of two variances is in the numerator of an F-statistic, the rejection region to test a null hypothesis is in the _________ tail of the F distribution.
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75
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. If the brand sum of squares is 0.07 and the error sum of squares is 0.09, the calculated value of F is _____.
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76
The test statistic used to compare two variances is the ___________ statistic.
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77
All values in an F distribution must be _____________.
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78
The F distribution is useful when testing a requirement of two-sample tests of hypothesis. The requirement is _______________.
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79
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. If the sum of squares for the brands is 0.07, the mean square for brands is _____.
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80
In a study of protein breakfast bars, five bars from each of three brands were tested to see if the mean amount of protein per bar differs among the brands. To select a critical F-statistic, the number of degrees of freedom for the denominator is _____.
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