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Deck 10: Inference About Means and Proportions With Two Populations

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Question
The following information was obtained from matched samples taken from two populations. The daily production rates for a sample of workers before and after a training program are shown below.Assume the population of differences is normally distributed.  Worker  Before  After 12022225233272742320522256201971718\begin{array}{lll}\text { Worker } & \text { Before } & \text { After } \\1 & 20 & 22 \\2 & 25 & 23 \\3 & 27 & 27 \\4 & 23 & 20 \\5 & 22 & 25 \\6 & 20 & 19 \\7 & 17 & 18\end{array}
The null hypothesis to be tested is H0: μ\mu d = 0.The test statistic is

A) -1.96.
B) 1.77.
C) 0.
D) 1.00.
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Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} If you are interested in testing whether or not the population average salary of males is significantly greater than that of females, the p-value is

A) .0668.
B) .0334.
C) .1336.
D) .9332.
Question
Two independent simple random samples are taken to test the difference between the means of two populations whose standard deviations are not known, but are assumed to be equal.The sample sizes are n1 = 25 and n2 = 35.The correct distribution to use is the

A) t distribution with 61 degrees of freedom.
B) t distribution with 60 degrees of freedom.
C) t distribution with 59 degrees of freedom.
D) t distribution with 58 degrees of freedom.
Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} The point estimate of the difference between the means of the two populations is

A) -28.
B) 3.
C) 4.
D) -4.
Question
To compute an interval estimate for the difference between the means of two populations, the t distribution

A) is restricted to small sample situations.
B) is not restricted to small sample situations.
C) can be applied when the populations have equal means.
D) can be applied only when the populations have equal standard deviations.
Question
When developing an interval estimate for the difference between two population means with sample sizes of n1 and n2,

A) n1 must be equal to n2.
B) n1 must be smaller than n2.
C) n1 must be larger than n2.
D) n1 and n2 can be of different sizes.
Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} If you are interested in testing whether or not the population average salary of males is significantly greater than that of females, at α\alpha = .05, the conclusion is that the population

A) average salary of males is significantly greater than females.
B) average salary of males is significantly lower than females.
C) salaries of males and females are equal.
D) average salary of males is greater than females cannot be proved.
Question
When each data value in one sample is matched with a corresponding data value in another sample, the samples are known as

A) corresponding samples.
B) matched samples.
C) independent samples.
D) pooled samples.
Question
To construct an interval estimate for the difference between the means of two populations when the standard deviations of the two populations are unknown and it can be assumed the two populations have equal variances, we must use a t distribution with (let n1 be the size of sample 1 and n2 the size of sample 2)

A) (n1 + n2) degrees of freedom.
B) (n1 + n2 - 1) degrees of freedom.
C) (n1 + n2 - 2) degrees of freedom.
D) (n1 - n2 + 2) degrees of freedom.
Question
Two independent simple random samples are taken to test the difference between the means of two populations whose variances are not known, but are assumed to be equal.The sample sizes are n1 = 32 and n2 = 40.The correct distribution to use is the

A) t distribution with 73 degrees of freedom.
B) t distribution with 72 degrees of freedom.
C) t distribution with 71 degrees of freedom.
D) t distribution with 70 degrees of freedom.
Question
The standard error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } is the

A) pooled estimator of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
B) variance of the sampling distribution of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
C) standard deviation of the sampling distribution of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
D) margin of error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
Question
The sampling distribution of pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } is approximated by a

A) normal distribution.
B) t distribution with n1 + n2 degrees of freedom.
C) t distribution with n1 + n2 - 1 degrees of freedom.
D) pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } distribution.
Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} At 95% confidence, the margin of error is

A) 1.960.
B) 1.645.
C) 3.920.
D) 2.000.
Question
If two independent large samples are taken from two populations, the sampling distribution of the difference between the two sample means

A) can be approximated by any distribution.
B) will have a variance of one.
C) can be approximated by a normal distribution.
D) will have a mean of one.
Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} If you are interested in testing whether or not the population average salary of males is significantly greater than that of females, the test statistic is

A) 2.0.
B) 1.5.
C) 1.96.
D) 1.645.
Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} The standard error of the difference between the two sample means is

A) 4.
B) 7.46.
C) 4.24.
D) 2.0.
Question
The following information was obtained from matched samples taken from two populations. The daily production rates for a sample of workers before and after a training program are shown below.Assume the population of differences is normally distributed.  Worker  Before  After 12022225233272742320522256201971718\begin{array}{lll}\text { Worker } & \text { Before } & \text { After } \\1 & 20 & 22 \\2 & 25 & 23 \\3 & 27 & 27 \\4 & 23 & 20 \\5 & 22 & 25 \\6 & 20 & 19 \\7 & 17 & 18\end{array}
Given that the null hypothesis to be tested is H0: μ\mu d = 0,

A) the null hypothesis should be rejected.
B) the null hypothesis should not be rejected.
C) the alternative hypothesis should be revised.
D) the null hypothesis should be revised.
Question
The following information was obtained from matched samples taken from two populations. The daily production rates for a sample of workers before and after a training program are shown below.Assume the population of differences is normally distributed.  Worker  Before  After 12022225233272742320522256201971718\begin{array}{lll}\text { Worker } & \text { Before } & \text { After } \\1 & 20 & 22 \\2 & 25 & 23 \\3 & 27 & 27 \\4 & 23 & 20 \\5 & 22 & 25 \\6 & 20 & 19 \\7 & 17 & 18\end{array}
The point estimate for the difference between the means of the two populations is

A) -1.
B) -2.
C) 0.
D) 1.
Question
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} The 95% confidence interval for the difference between the means of the two populations is

A) 0 to 6.92.
B) -2 to 2.
C) -1.96 to 1.96.
D) -.92 to 6.92.
Question
If we are interested in testing whether the proportion of items in population 1 is larger than the proportion of items in population 2, the

A) null hypothesis should state p1 - p2 < 0.
B) null hypothesis should state p1 - p2 > 0.
C) alternative hypothesis should state p1 - p2 > 0.
D) alternative hypothesis should state p1 - p2 < 0.
Question
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
If the null hypothesis H0: μ\mu d = 0 is tested at the 5% level,

A) the null hypothesis should be rejected.
B) the null hypothesis should not be rejected.
C) the alternative hypothesis should be revised.
D) the null hypothesis should be revised.
Question
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}
The standard error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } is

A) 3.0.
B) 4.
C) 8.372.
D) 19.48.
Question
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The standard error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } is

A) 12.9.
B) 9.3.
C) 4.
D) 2.
Question
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} A point estimate for the difference between the two population means is

A) 20.
B) .50.
C) .25.
D) 1.00.
Question
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
The null hypothesis tested is H0: μ\mu d = 0.The test statistic for the difference between the two population means is

A) 2.
B) 0.
C) -1.
D) -2.
Question
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}
The degrees of freedom for the t distribution are

A) 22.
B) 21.
C) 24.
D) 20.
Question
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

The point estimate for the difference between the means of the two populations is

A) 0.
B) 2.
C) 3.
D) 15.
Question
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}
The 95% confidence interval for the difference between the two population means is (use rounded standard error)

A) -5.344 to 11.344.
B) -5 to 3.
C) -4.86 to 10.86.
D) -2.65 to 8.65.
Question
In order to estimate the difference between the average hourly wages of employees of two branches of a department store, the following data have been gathered.  Downtown Store  North Mall Store  Sample size 2520 Sample mean $9$8 Sample standard deviation $2$1\begin{array}{lll}& \text { Downtown Store } & \text { North Mall Store } \\ \text { Sample size } & 25 & 20 \\\text { Sample mean }& \$ 9 & \$ 8 \\\text { Sample standard deviation } & \$ 2 & \$ 1\end{array} A 95% interval estimate for the difference between the two population means is

A) .071 to 1.929.
B) .226 to 1.774.
C) 1.09 to 4.078.
D) 1.078 to 2.922.
Question
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The point estimate for the difference between the means of the two populations is

A) 58.5.
B) 9.
C) -9.
D) -6.
Question
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The p-value for the difference between the two population means is

A) .0013.
B) .0026.
C) .4987.
D) .9987.
Question
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
The point estimate for the difference between the means of the two populations (Method 1 - Method 2) is

A) -1.
B) 0.
C) -4.
D) 2.
Question
The management of a department store is interested in estimating the difference between the mean credit purchases of customers using the store's credit card versus those customers using a national major credit card.You are given the following information.  Store’s Card  Major Credit Card  Sample size 6449 Sample mean $140$125 Population standard deviation $10$8\begin{array} { l l l } & \text { Store's Card } & \text { Major Credit Card } \\\text { Sample size } & 64 & 49 \\\text { Sample mean } & \$ 140 & \$ 125 \\\text { Population standard deviation } & \$ 10 & \$ 8\end{array} A 95% confidence interval estimate for the difference between the average purchases of all customers using the two different credit cards is

A) 13.31 to 16.69.
B) 11.68 to 18.32.
C) 12.22 to 17.78.
D) 13.04 to 16.96.
Question
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
What is the conclusion that can be reached about the difference in the average final examination scores between the two classes? (Use a .05 level of significance.)

A) There is a statistically significant difference in the average final examination scores between the two classes.
B) There is no statistically significant difference in the average final examination scores between the two classes.
C) It is impossible to make a decision on the basis of the information given.
D) The students who enrolled in statistics today are the same students who enrolled five years ago.
Question
The management of a department store is interested in estimating the difference between the mean credit purchases of customers using the store's credit card versus those customers using a national major credit card.You are given the following information.  Store’s Card  Major Credit Card  Sample size 6449 Sample mean $140$125 Population standard deviation $10$8\begin{array} { l l l } & \text { Store's Card } & \text { Major Credit Card } \\\text { Sample size } & 64 & 49 \\\text { Sample mean } & \$ 140 & \$ 125 \\\text { Population standard deviation } & \$ 10 & \$ 8\end{array} At 95% confidence, the margin of error is

A) 1.694.
B) 3.32.
C) 1.96.
D) 15.
Question
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Y ears Ago 8288112.5544536\begin{array}{l}\text { Today } \quad \text { Five Y ears Ago }\\\begin{array} { l l } 82 & 88 \\112.5 & 54 \\45 & 36\end{array}\end{array}
The 95% confidence interval for the difference between the two population means is

A) -9.92 to -2.08.
B) -3.08 to 3.92.
C) -13.84 to -1.16.
D) -24.77 to 12.23.
Question
The management of a department store is interested in estimating the difference between the mean credit purchases of customers using the store's credit card versus those customers using a national major credit card.You are given the following information.  Store’s Card  Major Credit Card  Sample size 6449 Sample mean $140$125 Population standard deviation $10$8\begin{array} { l l l } & \text { Store's Card } & \text { Major Credit Card } \\\text { Sample size } & 64 & 49 \\\text { Sample mean } & \$ 140 & \$ 125 \\\text { Population standard deviation } & \$ 10 & \$ 8\end{array} A point estimate for the difference between the mean purchases of all users of the two credit cards is

A) 2.
B) 18.
C) 265.
D) 15.
Question
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The test statistic for the difference between the two population means is

A) -.47.
B) -.65.
C) -1.5.
D) -3.0.
Question
In order to estimate the difference between the average hourly wages of employees of two branches of a department store, the following data have been gathered.  Downtown Store  North Mall Store  Sample size 2520 Sample mean $9$8 Sample standard deviation $2$1\begin{array}{lll}& \text { Downtown Store } & \text { North Mall Store } \\ \text { Sample size } & 25 & 20 \\\text { Sample mean }& \$ 9 & \$ 8 \\\text { Sample standard deviation } & \$ 2 & \$ 1\end{array} A point estimate for the difference between the two population means is

A) 1.
B) 2.
C) 3.
D) 4.
Question
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
The 95% confidence interval for the difference between the two population means is

A) -3.776 to 1.776.
B) -2.776 to 2.776.
C) -1.776 to 2.776.
D) -1.776 to 1.776.
Question
The sampling distribution of pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } is approximated by a normal distribution if _____ are all greater than or equal to 5.

A) n1p2, p2(1 - n2), n2p1, p1(1 - n1)
B) n1p1, p1(1 - n1), n2p2, p2(1 - n2)
C) n1p2, n1(1 - p2), n2p1, n2(1 - p1)
D) n1p1, n1(1 - p1), n2p2, n2(1 - p2)
Question
Of the two production methods, a company wants to identify the method with the smaller population mean completion time.One sample of workers is selected and each worker first uses one method and then uses the other method.The sampling procedure being used to collect completion time data is based on​

A) ​worker samples.
B) ​pooled samples.
C) ​independent samples.
D) ​matched samples.
Question
Two major automobile manufacturers have produced compact cars with engines of the same size.We are interested in determining whether or not there is a significant difference in the mean MPG (miles per gallon) when testing for the fuel efficiency of these two brands of automobiles.A random sample of eight cars from each manufacturer is selected, and eight drivers are selected to drive each automobile for a specified distance.The following data (in miles per gallon) show the results of the test.Assume the population of differences is normally distributed.  Driver Manufacturer A  Manufacturer B 1322822722326274262452524629257312882527\begin{array}{lll}\text { Driver} & \text { Manufacturer A } & \text { Manufacturer B } \\1 & 32 & 28 \\2 & 27 & 22 \\3 & 26 & 27 \\4 & 26 & 24 \\5 & 25 & 24 \\6 & 29 & 25 \\7 & 31 & 28 \\8 & 25 & 27\end{array}
The mean of the differences is

A) .5.
B) 1.5.
C) 2.0.
D) 2.5.
Question
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array} The 95% confidence interval estimate for the difference between the populations favoring the products is

A) -.024 to .064.
B) .6 to .7.
C) -.024 to .7.
D) .046 to .066.
Question
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} The p-value is

A) .0013.
B) .0026.
C) .0042.
D) .0084.
Question
The results of a recent poll on the preference of teenagers regarding the types of music they listen to are shown below.  Music Type  Teenagers Surveyed  Teenagers Favoring  Phis Typ e  Pop 800384 Rap 900450\begin{array}{lll}\text { Music Type } & \text { Teenagers Surveyed } & \text { Teenagers Favoring } \\&&\text { Phis Typ e } \\\text { Pop } & 800 & 384 \\\text { Rap } & 900 & 450\end{array} The point estimate of the difference between the two population proportions is

A) -.02.
B) .048.
C) .52.
D) -.5.
Question
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array}
The standard error of pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } is

A) .025.
B) .044.
C) .0225.
D) .68.
Question
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array} At 95% confidence, the margin of error is

A) .064.
B) .044.
C) .0225.
D) .025.
Question
An insurance company selected samples of clients under 18 years of age and over 18 and recorded the number of accidents they had in the previous year.The results are shown below.  Under Age of 18 Over Age of 18n1=500n2=600 Number of accidents =180 Number of accidents =150\begin{array}{ll}\text { Under Age of } 18 & \text { Over Age of } 18 \\n_{1}=500 & n_{2}=600 \\\text { Number of accidents }=180 & \text { Number of accidents }=150\end{array} We are interested in determining if the accident proportions differ between the two age groups.Let pu represent the proportion under and po the proportion over the age of 18.The null hypothesis is

A) pu - po \le 0.
B) pu - po \ge 0.
C) pu - po \neq 0.
D) pu - po = 0.
Question
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} At the 5% level of significance, the null hypothesis

A) should be rejected.
B) should not be rejected.
C) should be revised.
D) should not be tested.
Question
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array}
The point estimate for the difference between the two population proportions in favor of this product is

A) .07.
B) .68.
C) .44.
D) .02.
Question
An insurance company selected samples of clients under 18 years of age and over 18 and recorded the number of accidents they had in the previous year.The results are shown below.  Under Age of 18 Over Age of 18n1=500n2=600 Number of accidents =180 Number of accidents =150\begin{array}{ll}\text { Under Age of } 18 & \text { Over Age of } 18 \\n_{1}=500 & n_{2}=600 \\\text { Number of accidents }=180 & \text { Number of accidents }=150\end{array} We are interested in determining if the accident proportions differ between the two age groups.The p-value is

A) less than .001.
B) more than .10.
C) .0228.
D) .3.
Question
Regarding inferences about the difference between two population means, the sampling design that uses a pooled sample variance in cases of equal population standard deviations is based on

A) ​research samples.
B) ​pooled samples.
C) ​independent samples.
D) conditional samples.
Question
Two major automobile manufacturers have produced compact cars with engines of the same size.We are interested in determining whether or not there is a significant difference in the mean MPG (miles per gallon) when testing for the fuel efficiency of these two brands of automobiles.A random sample of eight cars from each manufacturer is selected, and eight drivers are selected to drive each automobile for a specified distance.The following data (in miles per gallon) show the results of the test.Assume the population of differences is normally distributed.  Driver Manufacturer A  Manufacturer B 1322822722326274262452524629257312882527\begin{array}{lll}\text { Driver} & \text { Manufacturer A } & \text { Manufacturer B } \\1 & 32 & 28 \\2 & 27 & 22 \\3 & 26 & 27 \\4 & 26 & 24 \\5 & 25 & 24 \\6 & 29 & 25 \\7 & 31 & 28 \\8 & 25 & 27\end{array}
The test statistic is

A) 1.616.
B) 1.906.
C) 2.096.
D) 2.256.
Question
The results of a recent poll on the preference of teenagers regarding the types of music they listen to are shown below.  Music Type  Teenagers Surveyed  Teenagers Favoring  Phis Typ e  Pop 800384 Rap 900450\begin{array}{lll}\text { Music Type } & \text { Teenagers Surveyed } & \text { Teenagers Favoring } \\&&\text { Phis Typ e } \\\text { Pop } & 800 & 384 \\\text { Rap } & 900 & 450\end{array} The 95% confidence interval for the difference between the two population proportions is

A) .5 to .52.
B) .48 to .5.
C) .028 to .068.
D) -.068 to .028.
Question
Two major automobile manufacturers have produced compact cars with engines of the same size.We are interested in determining whether or not there is a significant difference in the mean MPG (miles per gallon) when testing for the fuel efficiency of these two brands of automobiles.A random sample of eight cars from each manufacturer is selected, and eight drivers are selected to drive each automobile for a specified distance.The following data (in miles per gallon) show the results of the test.Assume the population of differences is normally distributed.  Driver Manufacturer A  Manufacturer B 1322822722326274262452524629257312882527\begin{array}{lll}\text { Driver} & \text { Manufacturer A } & \text { Manufacturer B } \\1 & 32 & 28 \\2 & 27 & 22 \\3 & 26 & 27 \\4 & 26 & 24 \\5 & 25 & 24 \\6 & 29 & 25 \\7 & 31 & 28 \\8 & 25 & 27\end{array}
At α\alpha = .10, the null hypothesis

A) should not be rejected.
B) should be rejected.
C) should be revised.
D) should not be tested.
Question
An insurance company selected samples of clients under 18 years of age and over 18 and recorded the number of accidents they had in the previous year.The results are shown below.  Under Age of 18 Over Age of 18n1=500n2=600 Number of accidents =180 Number of accidents =150\begin{array}{ll}\text { Under Age of } 18 & \text { Over Age of } 18 \\n_{1}=500 & n_{2}=600 \\\text { Number of accidents }=180 & \text { Number of accidents }=150\end{array} We are interested in determining if the accident proportions differ between the two age groups.
The pooled estimator of the population proportion is

A) .305.
B) .300.
C) .027.
D) .450.
Question
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} The test statistic is

A) .098.
B) 1.645.
C) 2.75.
D) 3.01.
Question
In testing the null hypothesis H0: <strong>In testing the null hypothesis H<sub>0</sub>: = 0, the computed test statistic is z = -1.66.The corresponding p-value is?</strong> A) .0485. B) .0970. C) .9515. D) .9030. <div style=padding-top: 35px> = 0, the computed test statistic is z = -1.66.The corresponding p-value is?

A) .0485.
B) .0970.
C) .9515.
D) .9030.
Question
In hypothesis tests about p1 - p2, the pooled estimator of p is a(n)

A) simple average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
B) weighted average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
C) geometric average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
D) exponential average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
Question
Generally, the ________ sample procedure for inferences about two population means provides better precision than the _______ sample approach.​

A) ​single, independent
B) ​independent, pooled​
C) ​matched, independent
D) ​matched, pooled
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Deck 10: Inference About Means and Proportions With Two Populations
1
The following information was obtained from matched samples taken from two populations. The daily production rates for a sample of workers before and after a training program are shown below.Assume the population of differences is normally distributed.  Worker  Before  After 12022225233272742320522256201971718\begin{array}{lll}\text { Worker } & \text { Before } & \text { After } \\1 & 20 & 22 \\2 & 25 & 23 \\3 & 27 & 27 \\4 & 23 & 20 \\5 & 22 & 25 \\6 & 20 & 19 \\7 & 17 & 18\end{array}
The null hypothesis to be tested is H0: μ\mu d = 0.The test statistic is

A) -1.96.
B) 1.77.
C) 0.
D) 1.00.
0.
2
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} If you are interested in testing whether or not the population average salary of males is significantly greater than that of females, the p-value is

A) .0668.
B) .0334.
C) .1336.
D) .9332.
.0668.
3
Two independent simple random samples are taken to test the difference between the means of two populations whose standard deviations are not known, but are assumed to be equal.The sample sizes are n1 = 25 and n2 = 35.The correct distribution to use is the

A) t distribution with 61 degrees of freedom.
B) t distribution with 60 degrees of freedom.
C) t distribution with 59 degrees of freedom.
D) t distribution with 58 degrees of freedom.
t distribution with 58 degrees of freedom.
4
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} The point estimate of the difference between the means of the two populations is

A) -28.
B) 3.
C) 4.
D) -4.
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5
To compute an interval estimate for the difference between the means of two populations, the t distribution

A) is restricted to small sample situations.
B) is not restricted to small sample situations.
C) can be applied when the populations have equal means.
D) can be applied only when the populations have equal standard deviations.
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6
When developing an interval estimate for the difference between two population means with sample sizes of n1 and n2,

A) n1 must be equal to n2.
B) n1 must be smaller than n2.
C) n1 must be larger than n2.
D) n1 and n2 can be of different sizes.
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7
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} If you are interested in testing whether or not the population average salary of males is significantly greater than that of females, at α\alpha = .05, the conclusion is that the population

A) average salary of males is significantly greater than females.
B) average salary of males is significantly lower than females.
C) salaries of males and females are equal.
D) average salary of males is greater than females cannot be proved.
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8
When each data value in one sample is matched with a corresponding data value in another sample, the samples are known as

A) corresponding samples.
B) matched samples.
C) independent samples.
D) pooled samples.
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9
To construct an interval estimate for the difference between the means of two populations when the standard deviations of the two populations are unknown and it can be assumed the two populations have equal variances, we must use a t distribution with (let n1 be the size of sample 1 and n2 the size of sample 2)

A) (n1 + n2) degrees of freedom.
B) (n1 + n2 - 1) degrees of freedom.
C) (n1 + n2 - 2) degrees of freedom.
D) (n1 - n2 + 2) degrees of freedom.
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10
Two independent simple random samples are taken to test the difference between the means of two populations whose variances are not known, but are assumed to be equal.The sample sizes are n1 = 32 and n2 = 40.The correct distribution to use is the

A) t distribution with 73 degrees of freedom.
B) t distribution with 72 degrees of freedom.
C) t distribution with 71 degrees of freedom.
D) t distribution with 70 degrees of freedom.
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11
The standard error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } is the

A) pooled estimator of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
B) variance of the sampling distribution of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
C) standard deviation of the sampling distribution of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
D) margin of error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } .
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12
The sampling distribution of pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } is approximated by a

A) normal distribution.
B) t distribution with n1 + n2 degrees of freedom.
C) t distribution with n1 + n2 - 1 degrees of freedom.
D) pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } distribution.
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13
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} At 95% confidence, the margin of error is

A) 1.960.
B) 1.645.
C) 3.920.
D) 2.000.
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14
If two independent large samples are taken from two populations, the sampling distribution of the difference between the two sample means

A) can be approximated by any distribution.
B) will have a variance of one.
C) can be approximated by a normal distribution.
D) will have a mean of one.
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15
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} If you are interested in testing whether or not the population average salary of males is significantly greater than that of females, the test statistic is

A) 2.0.
B) 1.5.
C) 1.96.
D) 1.645.
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16
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} The standard error of the difference between the two sample means is

A) 4.
B) 7.46.
C) 4.24.
D) 2.0.
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17
The following information was obtained from matched samples taken from two populations. The daily production rates for a sample of workers before and after a training program are shown below.Assume the population of differences is normally distributed.  Worker  Before  After 12022225233272742320522256201971718\begin{array}{lll}\text { Worker } & \text { Before } & \text { After } \\1 & 20 & 22 \\2 & 25 & 23 \\3 & 27 & 27 \\4 & 23 & 20 \\5 & 22 & 25 \\6 & 20 & 19 \\7 & 17 & 18\end{array}
Given that the null hypothesis to be tested is H0: μ\mu d = 0,

A) the null hypothesis should be rejected.
B) the null hypothesis should not be rejected.
C) the alternative hypothesis should be revised.
D) the null hypothesis should be revised.
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18
The following information was obtained from matched samples taken from two populations. The daily production rates for a sample of workers before and after a training program are shown below.Assume the population of differences is normally distributed.  Worker  Before  After 12022225233272742320522256201971718\begin{array}{lll}\text { Worker } & \text { Before } & \text { After } \\1 & 20 & 22 \\2 & 25 & 23 \\3 & 27 & 27 \\4 & 23 & 20 \\5 & 22 & 25 \\6 & 20 & 19 \\7 & 17 & 18\end{array}
The point estimate for the difference between the means of the two populations is

A) -1.
B) -2.
C) 0.
D) 1.
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19
Salary information regarding male and female employees of a large company is shown below.  Male  Female  Sample Size 6436 Sample Mean Salary ( in $1000)4441 Population Variance (σ2)12872\begin{array} { l r r } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary } ( \text { in } \$ 1000 ) & 44 & 41 \\\text { Population Variance } \left( \sigma ^ { 2 } \right)& 128 & 72\end{array} The 95% confidence interval for the difference between the means of the two populations is

A) 0 to 6.92.
B) -2 to 2.
C) -1.96 to 1.96.
D) -.92 to 6.92.
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20
If we are interested in testing whether the proportion of items in population 1 is larger than the proportion of items in population 2, the

A) null hypothesis should state p1 - p2 < 0.
B) null hypothesis should state p1 - p2 > 0.
C) alternative hypothesis should state p1 - p2 > 0.
D) alternative hypothesis should state p1 - p2 < 0.
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21
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
If the null hypothesis H0: μ\mu d = 0 is tested at the 5% level,

A) the null hypothesis should be rejected.
B) the null hypothesis should not be rejected.
C) the alternative hypothesis should be revised.
D) the null hypothesis should be revised.
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22
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}
The standard error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } is

A) 3.0.
B) 4.
C) 8.372.
D) 19.48.
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23
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The standard error of xˉ1\bar { x } _ { 1 } - xˉ2\bar { x } _ { 2 } is

A) 12.9.
B) 9.3.
C) 4.
D) 2.
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24
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} A point estimate for the difference between the two population means is

A) 20.
B) .50.
C) .25.
D) 1.00.
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25
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
The null hypothesis tested is H0: μ\mu d = 0.The test statistic for the difference between the two population means is

A) 2.
B) 0.
C) -1.
D) -2.
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26
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}
The degrees of freedom for the t distribution are

A) 22.
B) 21.
C) 24.
D) 20.
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27
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

The point estimate for the difference between the means of the two populations is

A) 0.
B) 2.
C) 3.
D) 15.
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28
The following information was obtained from independent random samples taken of two populations. Assume normally distributed populations with equal variances.  Sample 1  Sample 2  Sample Mean 4542 Sample Variance 8590 Sample Size 1012\begin{array} { l l l } & \text { Sample 1 } & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sample Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}
The 95% confidence interval for the difference between the two population means is (use rounded standard error)

A) -5.344 to 11.344.
B) -5 to 3.
C) -4.86 to 10.86.
D) -2.65 to 8.65.
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29
In order to estimate the difference between the average hourly wages of employees of two branches of a department store, the following data have been gathered.  Downtown Store  North Mall Store  Sample size 2520 Sample mean $9$8 Sample standard deviation $2$1\begin{array}{lll}& \text { Downtown Store } & \text { North Mall Store } \\ \text { Sample size } & 25 & 20 \\\text { Sample mean }& \$ 9 & \$ 8 \\\text { Sample standard deviation } & \$ 2 & \$ 1\end{array} A 95% interval estimate for the difference between the two population means is

A) .071 to 1.929.
B) .226 to 1.774.
C) 1.09 to 4.078.
D) 1.078 to 2.922.
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30
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The point estimate for the difference between the means of the two populations is

A) 58.5.
B) 9.
C) -9.
D) -6.
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31
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The p-value for the difference between the two population means is

A) .0013.
B) .0026.
C) .4987.
D) .9987.
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32
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
The point estimate for the difference between the means of the two populations (Method 1 - Method 2) is

A) -1.
B) 0.
C) -4.
D) 2.
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33
The management of a department store is interested in estimating the difference between the mean credit purchases of customers using the store's credit card versus those customers using a national major credit card.You are given the following information.  Store’s Card  Major Credit Card  Sample size 6449 Sample mean $140$125 Population standard deviation $10$8\begin{array} { l l l } & \text { Store's Card } & \text { Major Credit Card } \\\text { Sample size } & 64 & 49 \\\text { Sample mean } & \$ 140 & \$ 125 \\\text { Population standard deviation } & \$ 10 & \$ 8\end{array} A 95% confidence interval estimate for the difference between the average purchases of all customers using the two different credit cards is

A) 13.31 to 16.69.
B) 11.68 to 18.32.
C) 12.22 to 17.78.
D) 13.04 to 16.96.
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34
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
What is the conclusion that can be reached about the difference in the average final examination scores between the two classes? (Use a .05 level of significance.)

A) There is a statistically significant difference in the average final examination scores between the two classes.
B) There is no statistically significant difference in the average final examination scores between the two classes.
C) It is impossible to make a decision on the basis of the information given.
D) The students who enrolled in statistics today are the same students who enrolled five years ago.
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35
The management of a department store is interested in estimating the difference between the mean credit purchases of customers using the store's credit card versus those customers using a national major credit card.You are given the following information.  Store’s Card  Major Credit Card  Sample size 6449 Sample mean $140$125 Population standard deviation $10$8\begin{array} { l l l } & \text { Store's Card } & \text { Major Credit Card } \\\text { Sample size } & 64 & 49 \\\text { Sample mean } & \$ 140 & \$ 125 \\\text { Population standard deviation } & \$ 10 & \$ 8\end{array} At 95% confidence, the margin of error is

A) 1.694.
B) 3.32.
C) 1.96.
D) 15.
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36
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Y ears Ago 8288112.5544536\begin{array}{l}\text { Today } \quad \text { Five Y ears Ago }\\\begin{array} { l l } 82 & 88 \\112.5 & 54 \\45 & 36\end{array}\end{array}
The 95% confidence interval for the difference between the two population means is

A) -9.92 to -2.08.
B) -3.08 to 3.92.
C) -13.84 to -1.16.
D) -24.77 to 12.23.
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37
The management of a department store is interested in estimating the difference between the mean credit purchases of customers using the store's credit card versus those customers using a national major credit card.You are given the following information.  Store’s Card  Major Credit Card  Sample size 6449 Sample mean $140$125 Population standard deviation $10$8\begin{array} { l l l } & \text { Store's Card } & \text { Major Credit Card } \\\text { Sample size } & 64 & 49 \\\text { Sample mean } & \$ 140 & \$ 125 \\\text { Population standard deviation } & \$ 10 & \$ 8\end{array} A point estimate for the difference between the mean purchases of all users of the two credit cards is

A) 2.
B) 18.
C) 265.
D) 15.
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38
A statistics teacher wants to see if there is any difference in the abilities of students enrolled in statistics today and those enrolled five years ago.A sample of final examination scores from students enrolled today and from students enrolled five years ago was taken.You are given the following information.  Today  Five Years Ago xˉ8288σ2112.554n4536\begin{array}{ll}&\text { Today } & \text { Five Years Ago } \\\bar {x}&82 & 88 \\\sigma^2&112.5 & 54 \\n&45 & 36\end{array}
The test statistic for the difference between the two population means is

A) -.47.
B) -.65.
C) -1.5.
D) -3.0.
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39
In order to estimate the difference between the average hourly wages of employees of two branches of a department store, the following data have been gathered.  Downtown Store  North Mall Store  Sample size 2520 Sample mean $9$8 Sample standard deviation $2$1\begin{array}{lll}& \text { Downtown Store } & \text { North Mall Store } \\ \text { Sample size } & 25 & 20 \\\text { Sample mean }& \$ 9 & \$ 8 \\\text { Sample standard deviation } & \$ 2 & \$ 1\end{array} A point estimate for the difference between the two population means is

A) 1.
B) 2.
C) 3.
D) 4.
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40
The following information was obtained from matched samples taken from two populations.Assume the population of differences is normally distributed.  Individual  Method 1  Method 2 175259368477556\begin{array}{lll}\text { Individual } & \text { Method 1 } & \text { Method 2 } \\1 & 7 & 5 \\2 & 5 & 9 \\3 & 6 & 8 \\4 & 7 & 7 \\5 & 5 & 6\end{array}
The 95% confidence interval for the difference between the two population means is

A) -3.776 to 1.776.
B) -2.776 to 2.776.
C) -1.776 to 2.776.
D) -1.776 to 1.776.
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41
The sampling distribution of pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } is approximated by a normal distribution if _____ are all greater than or equal to 5.

A) n1p2, p2(1 - n2), n2p1, p1(1 - n1)
B) n1p1, p1(1 - n1), n2p2, p2(1 - n2)
C) n1p2, n1(1 - p2), n2p1, n2(1 - p1)
D) n1p1, n1(1 - p1), n2p2, n2(1 - p2)
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42
Of the two production methods, a company wants to identify the method with the smaller population mean completion time.One sample of workers is selected and each worker first uses one method and then uses the other method.The sampling procedure being used to collect completion time data is based on​

A) ​worker samples.
B) ​pooled samples.
C) ​independent samples.
D) ​matched samples.
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43
Two major automobile manufacturers have produced compact cars with engines of the same size.We are interested in determining whether or not there is a significant difference in the mean MPG (miles per gallon) when testing for the fuel efficiency of these two brands of automobiles.A random sample of eight cars from each manufacturer is selected, and eight drivers are selected to drive each automobile for a specified distance.The following data (in miles per gallon) show the results of the test.Assume the population of differences is normally distributed.  Driver Manufacturer A  Manufacturer B 1322822722326274262452524629257312882527\begin{array}{lll}\text { Driver} & \text { Manufacturer A } & \text { Manufacturer B } \\1 & 32 & 28 \\2 & 27 & 22 \\3 & 26 & 27 \\4 & 26 & 24 \\5 & 25 & 24 \\6 & 29 & 25 \\7 & 31 & 28 \\8 & 25 & 27\end{array}
The mean of the differences is

A) .5.
B) 1.5.
C) 2.0.
D) 2.5.
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44
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array} The 95% confidence interval estimate for the difference between the populations favoring the products is

A) -.024 to .064.
B) .6 to .7.
C) -.024 to .7.
D) .046 to .066.
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45
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} The p-value is

A) .0013.
B) .0026.
C) .0042.
D) .0084.
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46
The results of a recent poll on the preference of teenagers regarding the types of music they listen to are shown below.  Music Type  Teenagers Surveyed  Teenagers Favoring  Phis Typ e  Pop 800384 Rap 900450\begin{array}{lll}\text { Music Type } & \text { Teenagers Surveyed } & \text { Teenagers Favoring } \\&&\text { Phis Typ e } \\\text { Pop } & 800 & 384 \\\text { Rap } & 900 & 450\end{array} The point estimate of the difference between the two population proportions is

A) -.02.
B) .048.
C) .52.
D) -.5.
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47
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array}
The standard error of pˉ1\bar { p } _ { 1 } - pˉ2\bar { p } _ { 2 } is

A) .025.
B) .044.
C) .0225.
D) .68.
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48
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array} At 95% confidence, the margin of error is

A) .064.
B) .044.
C) .0225.
D) .025.
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49
An insurance company selected samples of clients under 18 years of age and over 18 and recorded the number of accidents they had in the previous year.The results are shown below.  Under Age of 18 Over Age of 18n1=500n2=600 Number of accidents =180 Number of accidents =150\begin{array}{ll}\text { Under Age of } 18 & \text { Over Age of } 18 \\n_{1}=500 & n_{2}=600 \\\text { Number of accidents }=180 & \text { Number of accidents }=150\end{array} We are interested in determining if the accident proportions differ between the two age groups.Let pu represent the proportion under and po the proportion over the age of 18.The null hypothesis is

A) pu - po \le 0.
B) pu - po \ge 0.
C) pu - po \neq 0.
D) pu - po = 0.
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50
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} At the 5% level of significance, the null hypothesis

A) should be rejected.
B) should not be rejected.
C) should be revised.
D) should not be tested.
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51
The results of a recent poll on the preference of shoppers regarding two products are shown below.  Product  Shoppers Surveyed  Shoppers Favoring  This Product  A 800560 B 900612\begin{array} { l l l } \text { Product } & \text { Shoppers Surveyed } & \text { Shoppers Favoring } \\& & \text { This Product } \\\text { A } & 800 & 560 \\\text { B } &900 & 612\end{array}
The point estimate for the difference between the two population proportions in favor of this product is

A) .07.
B) .68.
C) .44.
D) .02.
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52
An insurance company selected samples of clients under 18 years of age and over 18 and recorded the number of accidents they had in the previous year.The results are shown below.  Under Age of 18 Over Age of 18n1=500n2=600 Number of accidents =180 Number of accidents =150\begin{array}{ll}\text { Under Age of } 18 & \text { Over Age of } 18 \\n_{1}=500 & n_{2}=600 \\\text { Number of accidents }=180 & \text { Number of accidents }=150\end{array} We are interested in determining if the accident proportions differ between the two age groups.The p-value is

A) less than .001.
B) more than .10.
C) .0228.
D) .3.
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53
Regarding inferences about the difference between two population means, the sampling design that uses a pooled sample variance in cases of equal population standard deviations is based on

A) ​research samples.
B) ​pooled samples.
C) ​independent samples.
D) conditional samples.
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54
Two major automobile manufacturers have produced compact cars with engines of the same size.We are interested in determining whether or not there is a significant difference in the mean MPG (miles per gallon) when testing for the fuel efficiency of these two brands of automobiles.A random sample of eight cars from each manufacturer is selected, and eight drivers are selected to drive each automobile for a specified distance.The following data (in miles per gallon) show the results of the test.Assume the population of differences is normally distributed.  Driver Manufacturer A  Manufacturer B 1322822722326274262452524629257312882527\begin{array}{lll}\text { Driver} & \text { Manufacturer A } & \text { Manufacturer B } \\1 & 32 & 28 \\2 & 27 & 22 \\3 & 26 & 27 \\4 & 26 & 24 \\5 & 25 & 24 \\6 & 29 & 25 \\7 & 31 & 28 \\8 & 25 & 27\end{array}
The test statistic is

A) 1.616.
B) 1.906.
C) 2.096.
D) 2.256.
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55
The results of a recent poll on the preference of teenagers regarding the types of music they listen to are shown below.  Music Type  Teenagers Surveyed  Teenagers Favoring  Phis Typ e  Pop 800384 Rap 900450\begin{array}{lll}\text { Music Type } & \text { Teenagers Surveyed } & \text { Teenagers Favoring } \\&&\text { Phis Typ e } \\\text { Pop } & 800 & 384 \\\text { Rap } & 900 & 450\end{array} The 95% confidence interval for the difference between the two population proportions is

A) .5 to .52.
B) .48 to .5.
C) .028 to .068.
D) -.068 to .028.
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56
Two major automobile manufacturers have produced compact cars with engines of the same size.We are interested in determining whether or not there is a significant difference in the mean MPG (miles per gallon) when testing for the fuel efficiency of these two brands of automobiles.A random sample of eight cars from each manufacturer is selected, and eight drivers are selected to drive each automobile for a specified distance.The following data (in miles per gallon) show the results of the test.Assume the population of differences is normally distributed.  Driver Manufacturer A  Manufacturer B 1322822722326274262452524629257312882527\begin{array}{lll}\text { Driver} & \text { Manufacturer A } & \text { Manufacturer B } \\1 & 32 & 28 \\2 & 27 & 22 \\3 & 26 & 27 \\4 & 26 & 24 \\5 & 25 & 24 \\6 & 29 & 25 \\7 & 31 & 28 \\8 & 25 & 27\end{array}
At α\alpha = .10, the null hypothesis

A) should not be rejected.
B) should be rejected.
C) should be revised.
D) should not be tested.
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57
An insurance company selected samples of clients under 18 years of age and over 18 and recorded the number of accidents they had in the previous year.The results are shown below.  Under Age of 18 Over Age of 18n1=500n2=600 Number of accidents =180 Number of accidents =150\begin{array}{ll}\text { Under Age of } 18 & \text { Over Age of } 18 \\n_{1}=500 & n_{2}=600 \\\text { Number of accidents }=180 & \text { Number of accidents }=150\end{array} We are interested in determining if the accident proportions differ between the two age groups.
The pooled estimator of the population proportion is

A) .305.
B) .300.
C) .027.
D) .450.
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58
In order to determine whether or not there is a significant difference between the mean hourly wages paid by two companies (of the same industry), the following data have been accumulated.  Company A  Company B  Sample size 8060 Sample mean $16.75$16.25 Population standard deviation $1.00$.95\begin{array} { l l l } & \text { Company A } & \text { Company B } \\\text { Sample size } & 80 & 60 \\\text { Sample mean } & \$ 16.75 & \$ 16.25 \\\text { Population standard deviation } &\$ 1.00 & \$ .95\end{array} The test statistic is

A) .098.
B) 1.645.
C) 2.75.
D) 3.01.
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59
In testing the null hypothesis H0: <strong>In testing the null hypothesis H<sub>0</sub>: = 0, the computed test statistic is z = -1.66.The corresponding p-value is?</strong> A) .0485. B) .0970. C) .9515. D) .9030. = 0, the computed test statistic is z = -1.66.The corresponding p-value is?

A) .0485.
B) .0970.
C) .9515.
D) .9030.
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60
In hypothesis tests about p1 - p2, the pooled estimator of p is a(n)

A) simple average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
B) weighted average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
C) geometric average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
D) exponential average of pˉ1\bar { p } _ { 1 } and pˉ2\bar { p } _ { 2 } .
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61
Generally, the ________ sample procedure for inferences about two population means provides better precision than the _______ sample approach.​

A) ​single, independent
B) ​independent, pooled​
C) ​matched, independent
D) ​matched, pooled
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