Topics

Explore all topics

Universities

uni logo
University of North Carolina at Chapel Hill
uni logo
University of Notre Dame
uni logo
Clemson University
Explore all Universities

Professors

Overall Quality
-/5
c c
Overall Quality
-/5
Billt Camp
Overall Quality
-/5
mathio g
Explore all Professors
Add Browser Extension
Start Free Trial
Need Help? Contact us
title
Textbook Solutions
Step-by-step solutions verified by experts
title
24/7 Homework Help
Complete assignments with the help of our community
title
Flashcards
Stimulate your visual memory & walk into test day with confidence
title
DocuAssist
Upload your study materials and we’ll help fill in the answers.
title
Campus Reps
Become a Campus Rep and earn up to 20% commission, plus weekly and monthly cash prizes.
title
My Courses
Add the courses you're enrolled in for tailored study material to meet your requirements
Explore all services
Add Browser Extension
Start Free Trial
Need Help? Contact us
back arrowfull exam logo
العربية
search
ai logoChat with AI
Servicesarrow
Textbook Solutions icon
Textbook Solutions
24/7 Homework Help icon
24/7 Homework Help
Flashcards icon
Flashcards
DocuAssist icon
DocuAssist
Campus Reps icon
Campus Reps
My Courses icon
My Courses
Mobile App icon
Mobile App
Explore All Services
Discoverarrow

Topics

Explore All Services

Universities

uni logo
University of North Carolina at Chapel Hill
uni logo
University of Notre Dame
uni logo
Clemson University
Explore all Universities

professors

/5
c c
/5
Billt Camp
/5
mathio g
Explore all Professors
Explore all topics
Discover more topics
HomeSchoolingAsk a question

Deck 13: Chi-Square Tests

Full screen (f)
exit full mode
Question
When we carry out a chi-square test of independence,the expected frequencies are based on the null hypothesis.
Use Space or
up arrow
down arrow
to flip the card.
Question
When using a chi-square goodness of fit test with multinomial probabilities,the rejection of the null hypothesis indicates that at least one of the multinomial probabilities is not equal to the value stated in the null hypothesis.
Question
The χ2 goodness of fit test requires the nominative level of data.
Question
In performing a chi-square test of independence,as the difference between the respective observed and expected frequencies decreases,the probability of concluding that the row variable is independent of the column variable decreases.
Question
When we carry out a chi-square test of independence,in the alternative hypothesis we state that the two classifications are statistically independent.
Question
When we carry out a chi-square test of independence,the chi-square statistic is based on (rc - 1)degrees of freedom,where r and c denote,respectively,the number of rows and columns in the contingency table.
Question
A multinomial probability distribution describes data that are classified into two or more categories when a multinomial experiment is carried out.
Question
When we carry out a chi-square test of independence,if ri is the row total for row i and cj is the column total for column j,then the estimated expected cell frequency corresponding to row i and column j equals (ri)(cj)/n.
Question
When using the chi-square goodness of fit test,if the value of the chi-square statistic is large enough,we reject the null hypothesis.
Question
The chi-square goodness of fit test can only be used to test whether a population has specified multinomial probabilities or to test if a sample has been selected from a normally distributed population.It cannot be applied to test if a sample data comes from other distribution forms such as the Poisson.
Question
A contingency table summarizes data that has been classified on two dimensions or scales.
Question
A fastener manufacturing company uses a chi-square goodness of fit test to determine if a population of all lengths of ¼-inch bolts it manufactures is distributed according to a normal distribution.If we reject the null hypothesis,it is reasonable to assume that the population distribution is at least approximately normally distributed.
Question
Expected cell frequencies for a multinomial distribution are calculated by assuming statistical dependence.
Question
The actual counts in the cells of a contingency table are referred to as the expected cell frequencies.
Question
In a contingency table,if all of the expected frequencies equal the observed frequencies,then we can conclude that there is a perfect association between rows and columns.
Question
In a contingency table,when all the expected frequencies equal the observed frequencies,the calculated χ2 statistic equals zero.
Question
The trials of a multinomial probability are assumed to be dependent.
Question
The chi-square distribution is a continuous probability distribution that is skewed to the left.
Question
One use of the chi-square goodness of fit test is to determine if specified multinomial probabilities in the null hypothesis are correct.
Question
In performing a chi-square goodness of fit test with multinomial probabilities,the smaller the difference between observed and expected frequencies,the higher the probability of concluding that the probabilities specified in the null hypothesis are correct.
Question
When we carry out a goodness of fit chi-square test,the expected frequencies are based on the alternative hypothesis.
Question
In performing a chi-square goodness of fit test for a normal distribution,if there are 7 intervals,then the degrees of freedom for the chi-square statistic is ______________.

A)7
B)3
C)4
D)6
Question
When we carry out a chi-square test of independence,as the differences between the respective observed and expected frequencies decrease,the probability of concluding that the row variable is independent of the column variable:

A)Decreases.
B)Increases.
C)May decrease or increase depending on the number of rows and columns.
D)Will be unaffecteD.
Question
A manufacturing company produces part 2205 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part 2205 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.At a significance level of .05,we performed a chi-square test to determine whether the quality of the items produced appears to be the same for all three processes.What is the null hypothesis?

A)H0: The number of defectives produced is independent of the production process used.
B)H0: The row and column variables are associated with each other.
C)H0: The proportion of defective units produced by the three production processes is the same.
D)Both H0: The number of defectives produced is independent of the production process used and H0: The proportion of defective units produced by the three production processes is the same are correct or at least acceptable ways of stating the null hypothesis.
E)H0: The number of defectives produced is independent of the production process used,H0: The row and column variables are associated with each other,and H0: The proportion of defective units produced by the three production processes is the same are all acceptable ways of stating the null hypothesis.
Question
An experiment consists of 400 observations and four mutually exclusive groups.If the probability of a randomly selected item being classified into any of the four groups is equal,then the expected number of items that will be classified into group 1 is _____.

A)25
B)100
C)125
D)150
Question
The chi-square goodness of fit test for multinomial probabilities with 5 categories has _____ degrees of freedom.

A)5
B)4
C)3
D)6
Question
In performing a chi-square goodness fit test for a normal distribution,a researcher wants to make sure that all of the expected cell frequencies are at least five.The sample is divided into 7 intervals.The second through the sixth intervals all have expected cell frequencies of at least five.The first and the last intervals have expected cell frequencies of 1.5 each.After adjusting the number of intervals,the degrees of freedom for the chi-square statistic is ____.

A)2
B)3
C)5
D)7
Question
When we carry out a chi-square goodness of fit test for a normal distribution,the null hypothesis states that the population:

A)Does not have a normal distribution.
B)Has a normal distribution.
C)Has a chi-square distribution.
D)Does not have a chi-square distribution.
E)Has k - 3 degrees of freedom.
Question
The number of degrees of freedom associated with a chi-square test for independence based upon a contingency table with 4 rows and 3 columns is _____.

A)7
B)12
C)5
D)6
Question
In performing a chi-square goodness of fit test with multinomial probabilities,the ___________ the difference between observed and expected frequencies,the higher the probability of concluding that the probabilities specified in the null hypothesis are correct.

A)larger
B)smaller
Question
When we carry out a chi-square test of independence,the alternate hypothesis states that the two relevant classifications:

A)Are mutually exclusive.
B)Form a contingency table with r rows and c columns.
C)Have (r - 1)(c - 1)degrees of freedom.
D)Are statistically dependent.
E)Are normally distributed.
Question
While a binomial distribution describes count data that can be classified into one of two mutually exclusive categories,a __________________ distribution describes count data that are classified into more than two mutually exclusive categories.

A)normal
B)skewed
C)uniform
D)multinomial
Question
The chi-square goodness of fit test will be valid if the average of the expected cell frequencies is ______________.

A)Greater than 0
B)Less than 5
C)Between 0 and 5
D)At least 1
E)At least 5
Question
The χ2 statistic is used to test whether the assumption of normality is reasonable for a given population distribution.The sample consists of 5000 observations and is divided into 6 categories (intervals).The degrees of freedom for the chi-square statistic are:

A)4999
B)6
C)5
D)4
E)3
Question
In performing a chi-square test of independence,as the differences between respective observed and expected frequencies _________,the probability of concluding that the row variable is independent of the column variable increases.

A)stay the same
B)decrease
C)increase
D)double
Question
The chi-square goodness of fit is _________ a one-tailed test with the rejection region in the right tail.

A)Always
B)Sometimes
C)Never
Question
A special version of the chi-square goodness of fit test that involves testing the null hypothesis that all of the multinomial probabilities are equal is called the test for ___________.

A)goodness of fit
B)statistical independence
C)normality
D)homogeneity
Question
The χ2 statistic from a contingency table with 6 rows and five columns will have:

A)30 degrees of freedom.
B)24 degrees of freedom.
C)5 degrees of freedom.
D)20 degrees of freedom.
E)25 degrees of freedom.
Question
Which,if any,of the following statements about the chi-square test of independence is false?

A)If ri is the row total for row i and cj is the column total for column j,then the estimated expected cell frequency corresponding to row i and column j equals (ri)(cj)/n.
B)The test is valid if all of the estimated cell frequencies are at least five.
C)The chi-square statistic is based on (r - 1)(c - 1)degrees of freedom,where r and c denote,respectively,the number of rows and columns in the contingency table.
D)The alternative hypothesis states that the two classifications are statistically independent.
E)All of these statements are true about the chi-square test of independencE.
Question
As the difference between observed frequency and expected frequency _______________,the probability of rejecting the null hypothesis increases.

A)stays the same
B)decreases
C)increases
D)go to 0
Question
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.At a significance level of .05,the management wants to perform a hypothesis test to determine whether the quality of items produced appears to be independent of the production process used.What is the rejection point condition?

A)Reject H0 if χ2 > .10257
B)Reject H0 if χ2 > 9.3484
C)Reject H0 if χ2 > 5.99147
D)Reject H0 if χ2 > 7.37776
E)Reject H0 if χ2 > 7.81473
Question
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.
Chi-Square Contingency Table Test for Independence   Row 1    Row 2   Total     Observed  Expected (OE)2/E Observed  Expected (OE)2/E Observed  Expected (OE)2/E Col 12921.053.00211218.950.29240240.003.29 Col 21215.790.91168164.210.09180180.001.00Col3913.161.31141136.840.13150150.001.44 Total 5050.005.22520520.000.50570570.005.73\begin{array}{c}\begin{array}{lll}\text { } \\\text { Row 1 } \\ \text { } \\\text { } \\\text { Row 2} \\\text { } \\\text { } \\\text { Total } \\\text { } \\\text { } \\\end{array}\begin{array}{l}\text { } \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E}\end{array}\begin{array}{|l|}\text { Col } 1\\\hline 29 \\\hline 21.05 \\\hline 3.00 \\\hline 211 \\\hline 218.95 \\\hline 0.29 \\\hline 240 \\\hline 240.00 \\\hline 3.29 \\\end{array}\begin{array}{l}\text { Col } 2\\\hline 12 \\\hline 15.79 \\\hline 0.91 \\\hline 168 \\\hline 164.21 \\\hline 0.09 \\\hline 180 \\\hline 180.00 \\\hline 1.00 \\ \end{array}\begin{array}{|l|}\operatorname{Col} 3\\\hline 9 \\\hline 13.16 \\\hline 1.31 \\\hline 141 \\\hline 136.84 \\\hline 0.13 \\\hline 150 \\\hline 150.00 \\\hline 1.44 \\ \end{array}\begin{array}{r}\text { Total } \\\hline 50 \\\hline 50.00 \\\hline 5.22 \\\hline 520 \\\hline 520.00 \\\hline 0.50 \\\hline 570 \\\hline 570.00 \\\hline 5.73 \end{array}\end{array}

\quad \quad \quad \quad \quad \quad \quad \quad \quad 5.73 chi-square .0571 p-value \begin{array}{cc}5.73 & \text { chi-square } \\.0571 & \text { p-value }\end{array}

At a significance level of .10,the management wants to perform a hypothesis test to determine if the quality of the items produced appears to be independent of the production process used.Based on the results summarized in the MegaStat/Excel output provided in the table above,we:

A)Reject H0 and conclude that the quality of the product is not the same for all processes.
B)Reject H0 and conclude that the quality of the product is dependent on the manufacturing process.
C)Do not reject H0,and conclude that the quality of the product does not significantly differ among the three processes.
D)Reject H0 and conclude that the quality of the product is independent of the production process utilizeD.
E)Both Reject H0 and conclude that the quality of the product is not the same for all processes and Reject H0 and conclude that the quality of the product is dependent on the manufacturing process are correct.
Question
Consider the 3 × 2 contingency table below.
Question
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
At a significance level of .05,what is the appropriate rejection point condition?

A)Reject H0 if ?2 > 12.5916
B)Reject H0 if ?2 > 11.0705
C)Reject H0 if ?2 > 9.3484
D)Reject H0 if ?2 > 7.81473
E)Reject H0 if ?2 > 9.48773
Question
Consider the 3 × 2 contingency table below.
Question
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
What are the degrees of freedom for the chi-square test?

A)2
B)3
C)4
D)5
E)6
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Question
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
At a significance level of .05,we:

A)Reject H0;conclude the residential home selling prices are not distributed according to a normal distribution.
B)Do not reject H0;conclude the residential home selling prices are not distributed according to a normal distribution.
C)Reject H0;conclude the residential home selling prices are distributed according to a normal distribution.
D)Do not reject H0;conclude the residential home selling prices are distributed according to a normal distribution.
Question
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
What is the appropriate null hypothesis?

A)H0: The residential home selling prices are distributed according to a normal distribution.
B)H0: The residential home selling prices are not distributed according to a normal distribution.
C)H0: The distribution of residential home selling prices is either right or left skewed.
D)H0: The distribution of the residential home selling prices is symmetric.
E)None of these is correct.
Question
Consider the 3 × 2 contingency table below.
Question
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.
Chi-Square Contingency Table Test for Independence   Row 1    Row 2   Total     Observed  Expected (OE)2/E Observed  Expected (OE)2/E Observed  Expected (OE)2/E Col 12921.053.00211218.950.29240240.003.29 Col 21215.790.91168164.210.09180180.001.00Col3913.161.31141136.840.13150150.001.44 Total 5050.005.22520520.000.50570570.005.73\begin{array}{c}\begin{array}{lll}\text { } \\\text { Row 1 } \\ \text { } \\\text { } \\\text { Row 2} \\\text { } \\\text { } \\\text { Total } \\\text { } \\\text { } \\\end{array}\begin{array}{l}\text { } \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E}\end{array}\begin{array}{|l|}\text { Col } 1\\\hline 29 \\\hline 21.05 \\\hline 3.00 \\\hline 211 \\\hline 218.95 \\\hline 0.29 \\\hline 240 \\\hline 240.00 \\\hline 3.29 \\\end{array}\begin{array}{l}\text { Col } 2\\\hline 12 \\\hline 15.79 \\\hline 0.91 \\\hline 168 \\\hline 164.21 \\\hline 0.09 \\\hline 180 \\\hline 180.00 \\\hline 1.00 \\ \end{array}\begin{array}{|l|}\operatorname{Col} 3\\\hline 9 \\\hline 13.16 \\\hline 1.31 \\\hline 141 \\\hline 136.84 \\\hline 0.13 \\\hline 150 \\\hline 150.00 \\\hline 1.44 \\ \end{array}\begin{array}{r}\text { Total } \\\hline 50 \\\hline 50.00 \\\hline 5.22 \\\hline 520 \\\hline 520.00 \\\hline 0.50 \\\hline 570 \\\hline 570.00 \\\hline 5.73 \end{array}\end{array}

\quad \quad \quad \quad \quad \quad \quad \quad \quad 5.73 chi-square .0571 p-value \begin{array}{cc}5.73 & \text { chi-square } \\.0571 & \text { p-value }\end{array}

At a significance level of .05,the management wants to perform a hypothesis test to determine if the quality of the items produced appears to be independent of the production process used.Based on the results summarized in the MegaStat/Excel output provided in the table above,we:

A)Reject H0 and conclude that the quality of the product is not the same for all processes.
B)Reject H0 and conclude that the quality of the product is dependent on the manufacturing process.
C)Do not reject H0,and conclude that the quality of the product does not significantly differ among the three processes.
D)Do not reject H0,and conclude that the quality of the product is not the same for all processes.
E)Reject H0 and conclude that the quality of the product is independent of the manufacturing process used.
Question
Consider the 3 × 2 contingency table below.
Question
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.At a significance level of .05,we performed a chi-square test of independence to determine if the quality of the items produced appears to be independent of the production process.What are the degrees of freedom for the chi-square statistic?

A)2
B)3
C)50
D)520
E)570
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed and expected frequencies.
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Question
Consider the 3 × 2 contingency table below.
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Question
Consider the 3 × 2 contingency table below.
Question
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Use α = .05 and determine the appropriate degrees of freedom and the rejection point condition associated with this goodness of fit test.
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.At α = .05,test to determine if the grade distribution for Dr.Johnson's class is different from the historical grade distribution.
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Question
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Question
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.If we assume at α = .05 that the null hypothesis is rejected,make a one-sentence managerial conclusion.
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Question
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Question
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Calculate the expected values for B's and C's.
Question
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Calculate the chi-square statistic.
Question
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Question
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Question
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Calculate the expected values for A's and D's.
Question
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed and expected frequencies.
Unlock Deck
Sign up to unlock the cards in this deck!
Unlock Deck
Unlock Deck
1/120
auto play flashcards
Play
simple tutorial
Full screen (f)
exit full mode
Deck 13: Chi-Square Tests
1
When we carry out a chi-square test of independence,the expected frequencies are based on the null hypothesis.
True
2
When using a chi-square goodness of fit test with multinomial probabilities,the rejection of the null hypothesis indicates that at least one of the multinomial probabilities is not equal to the value stated in the null hypothesis.
True
3
The χ2 goodness of fit test requires the nominative level of data.
True
4
In performing a chi-square test of independence,as the difference between the respective observed and expected frequencies decreases,the probability of concluding that the row variable is independent of the column variable decreases.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
5
When we carry out a chi-square test of independence,in the alternative hypothesis we state that the two classifications are statistically independent.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
6
When we carry out a chi-square test of independence,the chi-square statistic is based on (rc - 1)degrees of freedom,where r and c denote,respectively,the number of rows and columns in the contingency table.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
7
A multinomial probability distribution describes data that are classified into two or more categories when a multinomial experiment is carried out.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
8
When we carry out a chi-square test of independence,if ri is the row total for row i and cj is the column total for column j,then the estimated expected cell frequency corresponding to row i and column j equals (ri)(cj)/n.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
9
When using the chi-square goodness of fit test,if the value of the chi-square statistic is large enough,we reject the null hypothesis.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
10
The chi-square goodness of fit test can only be used to test whether a population has specified multinomial probabilities or to test if a sample has been selected from a normally distributed population.It cannot be applied to test if a sample data comes from other distribution forms such as the Poisson.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
11
A contingency table summarizes data that has been classified on two dimensions or scales.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
12
A fastener manufacturing company uses a chi-square goodness of fit test to determine if a population of all lengths of ¼-inch bolts it manufactures is distributed according to a normal distribution.If we reject the null hypothesis,it is reasonable to assume that the population distribution is at least approximately normally distributed.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
13
Expected cell frequencies for a multinomial distribution are calculated by assuming statistical dependence.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
14
The actual counts in the cells of a contingency table are referred to as the expected cell frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
15
In a contingency table,if all of the expected frequencies equal the observed frequencies,then we can conclude that there is a perfect association between rows and columns.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
16
In a contingency table,when all the expected frequencies equal the observed frequencies,the calculated χ2 statistic equals zero.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
17
The trials of a multinomial probability are assumed to be dependent.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
18
The chi-square distribution is a continuous probability distribution that is skewed to the left.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
19
One use of the chi-square goodness of fit test is to determine if specified multinomial probabilities in the null hypothesis are correct.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
20
In performing a chi-square goodness of fit test with multinomial probabilities,the smaller the difference between observed and expected frequencies,the higher the probability of concluding that the probabilities specified in the null hypothesis are correct.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
21
When we carry out a goodness of fit chi-square test,the expected frequencies are based on the alternative hypothesis.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
22
In performing a chi-square goodness of fit test for a normal distribution,if there are 7 intervals,then the degrees of freedom for the chi-square statistic is ______________.

A)7
B)3
C)4
D)6
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
23
When we carry out a chi-square test of independence,as the differences between the respective observed and expected frequencies decrease,the probability of concluding that the row variable is independent of the column variable:

A)Decreases.
B)Increases.
C)May decrease or increase depending on the number of rows and columns.
D)Will be unaffecteD.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
24
A manufacturing company produces part 2205 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part 2205 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.At a significance level of .05,we performed a chi-square test to determine whether the quality of the items produced appears to be the same for all three processes.What is the null hypothesis?

A)H0: The number of defectives produced is independent of the production process used.
B)H0: The row and column variables are associated with each other.
C)H0: The proportion of defective units produced by the three production processes is the same.
D)Both H0: The number of defectives produced is independent of the production process used and H0: The proportion of defective units produced by the three production processes is the same are correct or at least acceptable ways of stating the null hypothesis.
E)H0: The number of defectives produced is independent of the production process used,H0: The row and column variables are associated with each other,and H0: The proportion of defective units produced by the three production processes is the same are all acceptable ways of stating the null hypothesis.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
25
An experiment consists of 400 observations and four mutually exclusive groups.If the probability of a randomly selected item being classified into any of the four groups is equal,then the expected number of items that will be classified into group 1 is _____.

A)25
B)100
C)125
D)150
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
26
The chi-square goodness of fit test for multinomial probabilities with 5 categories has _____ degrees of freedom.

A)5
B)4
C)3
D)6
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
27
In performing a chi-square goodness fit test for a normal distribution,a researcher wants to make sure that all of the expected cell frequencies are at least five.The sample is divided into 7 intervals.The second through the sixth intervals all have expected cell frequencies of at least five.The first and the last intervals have expected cell frequencies of 1.5 each.After adjusting the number of intervals,the degrees of freedom for the chi-square statistic is ____.

A)2
B)3
C)5
D)7
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
28
When we carry out a chi-square goodness of fit test for a normal distribution,the null hypothesis states that the population:

A)Does not have a normal distribution.
B)Has a normal distribution.
C)Has a chi-square distribution.
D)Does not have a chi-square distribution.
E)Has k - 3 degrees of freedom.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
29
The number of degrees of freedom associated with a chi-square test for independence based upon a contingency table with 4 rows and 3 columns is _____.

A)7
B)12
C)5
D)6
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
30
In performing a chi-square goodness of fit test with multinomial probabilities,the ___________ the difference between observed and expected frequencies,the higher the probability of concluding that the probabilities specified in the null hypothesis are correct.

A)larger
B)smaller
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
31
When we carry out a chi-square test of independence,the alternate hypothesis states that the two relevant classifications:

A)Are mutually exclusive.
B)Form a contingency table with r rows and c columns.
C)Have (r - 1)(c - 1)degrees of freedom.
D)Are statistically dependent.
E)Are normally distributed.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
32
While a binomial distribution describes count data that can be classified into one of two mutually exclusive categories,a __________________ distribution describes count data that are classified into more than two mutually exclusive categories.

A)normal
B)skewed
C)uniform
D)multinomial
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
33
The chi-square goodness of fit test will be valid if the average of the expected cell frequencies is ______________.

A)Greater than 0
B)Less than 5
C)Between 0 and 5
D)At least 1
E)At least 5
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
34
The χ2 statistic is used to test whether the assumption of normality is reasonable for a given population distribution.The sample consists of 5000 observations and is divided into 6 categories (intervals).The degrees of freedom for the chi-square statistic are:

A)4999
B)6
C)5
D)4
E)3
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
35
In performing a chi-square test of independence,as the differences between respective observed and expected frequencies _________,the probability of concluding that the row variable is independent of the column variable increases.

A)stay the same
B)decrease
C)increase
D)double
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
36
The chi-square goodness of fit is _________ a one-tailed test with the rejection region in the right tail.

A)Always
B)Sometimes
C)Never
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
37
A special version of the chi-square goodness of fit test that involves testing the null hypothesis that all of the multinomial probabilities are equal is called the test for ___________.

A)goodness of fit
B)statistical independence
C)normality
D)homogeneity
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
38
The χ2 statistic from a contingency table with 6 rows and five columns will have:

A)30 degrees of freedom.
B)24 degrees of freedom.
C)5 degrees of freedom.
D)20 degrees of freedom.
E)25 degrees of freedom.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
39
Which,if any,of the following statements about the chi-square test of independence is false?

A)If ri is the row total for row i and cj is the column total for column j,then the estimated expected cell frequency corresponding to row i and column j equals (ri)(cj)/n.
B)The test is valid if all of the estimated cell frequencies are at least five.
C)The chi-square statistic is based on (r - 1)(c - 1)degrees of freedom,where r and c denote,respectively,the number of rows and columns in the contingency table.
D)The alternative hypothesis states that the two classifications are statistically independent.
E)All of these statements are true about the chi-square test of independencE.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
40
As the difference between observed frequency and expected frequency _______________,the probability of rejecting the null hypothesis increases.

A)stays the same
B)decreases
C)increases
D)go to 0
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
41
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.At a significance level of .05,the management wants to perform a hypothesis test to determine whether the quality of items produced appears to be independent of the production process used.What is the rejection point condition?

A)Reject H0 if χ2 > .10257
B)Reject H0 if χ2 > 9.3484
C)Reject H0 if χ2 > 5.99147
D)Reject H0 if χ2 > 7.37776
E)Reject H0 if χ2 > 7.81473
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
42
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.
Chi-Square Contingency Table Test for Independence   Row 1    Row 2   Total     Observed  Expected (OE)2/E Observed  Expected (OE)2/E Observed  Expected (OE)2/E Col 12921.053.00211218.950.29240240.003.29 Col 21215.790.91168164.210.09180180.001.00Col3913.161.31141136.840.13150150.001.44 Total 5050.005.22520520.000.50570570.005.73\begin{array}{c}\begin{array}{lll}\text { } \\\text { Row 1 } \\ \text { } \\\text { } \\\text { Row 2} \\\text { } \\\text { } \\\text { Total } \\\text { } \\\text { } \\\end{array}\begin{array}{l}\text { } \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E}\end{array}\begin{array}{|l|}\text { Col } 1\\\hline 29 \\\hline 21.05 \\\hline 3.00 \\\hline 211 \\\hline 218.95 \\\hline 0.29 \\\hline 240 \\\hline 240.00 \\\hline 3.29 \\\end{array}\begin{array}{l}\text { Col } 2\\\hline 12 \\\hline 15.79 \\\hline 0.91 \\\hline 168 \\\hline 164.21 \\\hline 0.09 \\\hline 180 \\\hline 180.00 \\\hline 1.00 \\ \end{array}\begin{array}{|l|}\operatorname{Col} 3\\\hline 9 \\\hline 13.16 \\\hline 1.31 \\\hline 141 \\\hline 136.84 \\\hline 0.13 \\\hline 150 \\\hline 150.00 \\\hline 1.44 \\ \end{array}\begin{array}{r}\text { Total } \\\hline 50 \\\hline 50.00 \\\hline 5.22 \\\hline 520 \\\hline 520.00 \\\hline 0.50 \\\hline 570 \\\hline 570.00 \\\hline 5.73 \end{array}\end{array}

\quad \quad \quad \quad \quad \quad \quad \quad \quad 5.73 chi-square .0571 p-value \begin{array}{cc}5.73 & \text { chi-square } \\.0571 & \text { p-value }\end{array}

At a significance level of .10,the management wants to perform a hypothesis test to determine if the quality of the items produced appears to be independent of the production process used.Based on the results summarized in the MegaStat/Excel output provided in the table above,we:

A)Reject H0 and conclude that the quality of the product is not the same for all processes.
B)Reject H0 and conclude that the quality of the product is dependent on the manufacturing process.
C)Do not reject H0,and conclude that the quality of the product does not significantly differ among the three processes.
D)Reject H0 and conclude that the quality of the product is independent of the production process utilizeD.
E)Both Reject H0 and conclude that the quality of the product is not the same for all processes and Reject H0 and conclude that the quality of the product is dependent on the manufacturing process are correct.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
43
Consider the 3 × 2 contingency table below.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
44
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
At a significance level of .05,what is the appropriate rejection point condition?

A)Reject H0 if ?2 > 12.5916
B)Reject H0 if ?2 > 11.0705
C)Reject H0 if ?2 > 9.3484
D)Reject H0 if ?2 > 7.81473
E)Reject H0 if ?2 > 9.48773
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
45
Consider the 3 × 2 contingency table below.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
46
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
What are the degrees of freedom for the chi-square test?

A)2
B)3
C)4
D)5
E)6
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
47
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
48
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
At a significance level of .05,we:

A)Reject H0;conclude the residential home selling prices are not distributed according to a normal distribution.
B)Do not reject H0;conclude the residential home selling prices are not distributed according to a normal distribution.
C)Reject H0;conclude the residential home selling prices are distributed according to a normal distribution.
D)Do not reject H0;conclude the residential home selling prices are distributed according to a normal distribution.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
49
A real estate company is analyzing the selling prices of residential homes in a given community.140 homes that have been sold in the past month are randomly selected and their selling prices are recorded.The statistician working on the project has stated that in order to perform various statistical tests,the data must be distributed according to a normal distribution.In order to determine whether the selling prices of homes included in the random sample are normally distributed,the statistician divides the data into 6 classes of equal size and records the number of observations in each class.She then performs a chi-square goodness of fit test for normal distribution.The results are summarized in the following table.
Goodness of Fit Test  Observed  Expected OE(OE)2E% of chi-square 103.1926.80814.52064.812319.0263.9740.8303.703747.78210.7822.43310.864047.7827.7821.2675.662719.0267.9743.34214.9233.1920.1920.0120.05140140.0000.00022.404100.0022.40 chi-square .0001 p-value \begin{array} { r | r | r | r | r } \text { Observed } & \text { Expected } & \mathrm { O } - \mathrm { E } & ( \mathrm { O } - \mathrm { E } ) ^ { 2 } \mathrm { E } & \% \text { of chi-square } \\\hline 10 & 3.192 & 6.808 & 14.520 & 64.81 \\\hline 23 & 19.026 & 3.974 & 0.830 & 3.70 \\\hline 37 & 47.782 & - 10.782 & 2.433 & 10.86 \\\hline 40 & 47.782 & - 7.782 & 1.267 & 5.66 \\\hline 27 & 19.026 & 7.974 & 3.342 & 14.92 \\\hline 3 & 3.192 & - 0.192 & 0.012 & 0.05 \\\hline 140 & 140.000 & 0.000 & 22.404 & 100.00 \\\hline & & & & \\\hline 22.40 & \text { chi-square } & & & \\\hline .0001 & \text { p-value } & & &\end{array}
What is the appropriate null hypothesis?

A)H0: The residential home selling prices are distributed according to a normal distribution.
B)H0: The residential home selling prices are not distributed according to a normal distribution.
C)H0: The distribution of residential home selling prices is either right or left skewed.
D)H0: The distribution of the residential home selling prices is symmetric.
E)None of these is correct.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
50
Consider the 3 × 2 contingency table below.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
51
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.
Chi-Square Contingency Table Test for Independence   Row 1    Row 2   Total     Observed  Expected (OE)2/E Observed  Expected (OE)2/E Observed  Expected (OE)2/E Col 12921.053.00211218.950.29240240.003.29 Col 21215.790.91168164.210.09180180.001.00Col3913.161.31141136.840.13150150.001.44 Total 5050.005.22520520.000.50570570.005.73\begin{array}{c}\begin{array}{lll}\text { } \\\text { Row 1 } \\ \text { } \\\text { } \\\text { Row 2} \\\text { } \\\text { } \\\text { Total } \\\text { } \\\text { } \\\end{array}\begin{array}{l}\text { } \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E} \\\hline \text { Observed } \\\hline \text { Expected } \\\hline(\mathrm{O}-\mathrm{E})^{2} / \mathrm{E}\end{array}\begin{array}{|l|}\text { Col } 1\\\hline 29 \\\hline 21.05 \\\hline 3.00 \\\hline 211 \\\hline 218.95 \\\hline 0.29 \\\hline 240 \\\hline 240.00 \\\hline 3.29 \\\end{array}\begin{array}{l}\text { Col } 2\\\hline 12 \\\hline 15.79 \\\hline 0.91 \\\hline 168 \\\hline 164.21 \\\hline 0.09 \\\hline 180 \\\hline 180.00 \\\hline 1.00 \\ \end{array}\begin{array}{|l|}\operatorname{Col} 3\\\hline 9 \\\hline 13.16 \\\hline 1.31 \\\hline 141 \\\hline 136.84 \\\hline 0.13 \\\hline 150 \\\hline 150.00 \\\hline 1.44 \\ \end{array}\begin{array}{r}\text { Total } \\\hline 50 \\\hline 50.00 \\\hline 5.22 \\\hline 520 \\\hline 520.00 \\\hline 0.50 \\\hline 570 \\\hline 570.00 \\\hline 5.73 \end{array}\end{array}

\quad \quad \quad \quad \quad \quad \quad \quad \quad 5.73 chi-square .0571 p-value \begin{array}{cc}5.73 & \text { chi-square } \\.0571 & \text { p-value }\end{array}

At a significance level of .05,the management wants to perform a hypothesis test to determine if the quality of the items produced appears to be independent of the production process used.Based on the results summarized in the MegaStat/Excel output provided in the table above,we:

A)Reject H0 and conclude that the quality of the product is not the same for all processes.
B)Reject H0 and conclude that the quality of the product is dependent on the manufacturing process.
C)Do not reject H0,and conclude that the quality of the product does not significantly differ among the three processes.
D)Do not reject H0,and conclude that the quality of the product is not the same for all processes.
E)Reject H0 and conclude that the quality of the product is independent of the manufacturing process used.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
52
Consider the 3 × 2 contingency table below.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
53
A manufacturing company produces part A732 for the aerospace industry.This particular part can be manufactured using 3 different production processes.The management wants to know if the quality of the units of part A732 is the same for all three processes.The production supervisor obtained the following data: Process 1 had 29 defective units in 240 items,Process 2 produced 12 defective units in 180 items,and Process 3 manufactured 9 defective units in 150 items.At a significance level of .05,we performed a chi-square test of independence to determine if the quality of the items produced appears to be independent of the production process.What are the degrees of freedom for the chi-square statistic?

A)2
B)3
C)50
D)520
E)570
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
54
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed and expected frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
55
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
56
Consider the 3 × 2 contingency table below.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
57
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
58
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
59
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
60
Consider the 3 × 2 contingency table below.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
61
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Use α = .05 and determine the appropriate degrees of freedom and the rejection point condition associated with this goodness of fit test.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
62
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
63
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.At α = .05,test to determine if the grade distribution for Dr.Johnson's class is different from the historical grade distribution.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
64
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
65
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
66
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
67
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
68
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
69
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.If we assume at α = .05 that the null hypothesis is rejected,make a one-sentence managerial conclusion.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
70
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
71
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
72
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
73
A U.S.-based Internet company offers an online proficiency course in basic accounting.Completing this online course satisfies the "Fundamentals of Accounting" course requirement in many MBA programs.In the first semester,315 students have enrolled in the course.The marketing research manager divided the country into seven regions of approximately equal population.The course enrollment values for each of the seven regions are given below.The management wants to know if there is equal interest in the course across all regions.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
74
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
75
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Calculate the expected values for B's and C's.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
76
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Calculate the chi-square statistic.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
77
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
78
On the most recent tax cut proposal,a random sample of Democrats and Republicans in the Congress cast their votes as follows:
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
79
In the past,of all the students enrolled in "Basic Business Statistics," 10 percent earned A's,20 percent earned B's,30 percent earned C's,20 percent earned D's,and the rest either failed or withdrew from the course.Dr.Johnson is a new professor teaching "Basic Business Statistics" for the first time this semester.At the conclusion of the semester,in Dr.Johnson's class of 60 students,there were 10 A's,20 B's,20 C's,5 D's,and 5 W's or F's.Assume that Dr.Johnson's class constitutes a random sample.Dr.Johnson wants to know if there is sufficient evidence to conclude that the grade distribution of his class is different from the historical grade distribution.Calculate the expected values for A's and D's.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
80
Consider a set of 50 measurements with mean 50.2 and standard deviation 18.7 and with the following observed and expected frequencies.
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
Unlock Deck
k this deck
locked card icon
Unlock Deck
Unlock for access to all 120 flashcards in this deck.
QuizPlus
surly
Quizplus
Work With Us
Policies
Download the App
Scan to downloadDownload the App
qr-code
Links
Links
Work With Us
Download the App
surly
English
English
العربية
Scan to downloadDownload the App
qr-code

English
English
العربية
Copyright © 2025 Quizplus LLC.
  • facebook-footer
  • instagram-footer
  • x-footer
  • tiktok
  • Linktree