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Deck 10: Comparisons Involving Means, Experimental Design, and Analysis of Variance

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Question
An experimental design where the experimental units are randomly assigned to the treatments is known as

A) factor block design
B) random factor design
C) completely randomized design
D) None of these alternatives is correct.
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Question
The ANOVA procedure is a statistical approach for determining whether or not

A) the means of two samples are equal
B) the means of two or more samples are equal
C) the means of more than two samples are equal
D) the means of two or more populations are equal
Question
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
In an analysis of variance where the total sample size for the experiment is nT and the number of populations is K, the mean square within treatments is

A) SSE/nT - K)
B) SSTR/nT - K)
C) SSE/K - 1)
D) SSE/K
Question
The standard error of is the xˉ1xˉ2\bar { x } _ { 1 } - \bar { x } _ { 2 }

A) variance of
B) variance of the sampling distribution of
C) standard deviation of the sampling distribution of
D) difference between the two means
Question
In the analysis of variance procedure ANOVA), "factor" refers to

A) the dependent variable
B) the independent variable
C) the level of confidence
D) the critical value of F
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
Question
The variable of interest in an ANOVA procedure is called

A) a partition
B) a treatment
C) either a partition or a treatment
D) a factor
Question
The critical F value with 6 numerator and 60 denominator degrees of freedom at α = .05 is

A) 3.74
B) 2.25
C) 2.37
D) 1.96
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 a Poisson distribution
B) will have a variance of one
C) can be approximated by a normal distribution
D) will have a mean of one
Question
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
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) None of these alternatives is correct.
Question
In an analysis of variance problem involving 3 treatments and 10 observations per treatment, SSE = 399.6. The MSE for this situation is

A) 133.2
B) 13.32
C) 14.8
D) 30.0
Question
In the ANOVA, treatment refers to

A) experimental units
B) different levels of a factor
C) the dependent variable
D) applying antibiotic to a wound
Question
When developing an interval estimate for the difference between two sample 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
When an analysis of variance is performed on samples drawn from K populations, the mean square between treatments MSTR) is

A) SSTR/nT
B) SSTR/nT - 1)
C) SSTR/K
D) SSTR/K - 1)
Question
If we are interested in testing whether the mean of items in population 1 is larger than the mean of items in population 2, the

A) null hypothesis should state μ1 - μ2 < 0
B) null hypothesis should state μ1 - μ2 > 0
C) alternative hypothesis should state μ1 - μ2 > 0
D) alternative hypothesis should state μ1 - μ2 < 0
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) None of these alternatives is correct.
Question
The F ratio in a completely randomized ANOVA is the ratio of

A) MSTR/MSE
B) MST/MSE
C) MSE/MSTR
D) MSE/MST
Question
For testing the following hypothesis at 95% confidence, the null hypothesis will be rejected if Η0: μ1 - μ2 ≤ 0
Ηα: μ1 - μ2 > 0

A) p-value ≤ 0.05
B) p-value > 0.05
C) p-value > 0.95
D) p-value ≥ 0.475
Question
In a completely randomized design involving four treatments, the following information is provided.  Treatment 1 Treatment 2 Treatment 3 Treatment 4 Sample Size 50181517 Sample Mean 32384248\begin{array}{llcc}&\text { Treatment } 1&\text { Treatment } 2&\text { Treatment } 3&\text { Treatment } 4\\\text { Sample Size } &50&18&15&17 \\\text { Sample Mean } &32&38&42&48\end{array} The overall mean the grand mean) for all treatments is

A) 40.0
B) 37.3
C) 48.0
D) 37.0
Question
In an analysis of variance problem if SST = 120 and SSTR = 80, then SSE is

A) 200
B) 40
C) 80
D) 120
Question
Independent simple random samples are taken to test the difference between the means of two populations whose variances are known. The sample sizes are n1 = 38 and n2 = 42. The correct distribution to use is the

A) normal distribution
B) t distribution with 80 degrees of freedom
C) t distribution with 79 degrees of freedom
D) t distribution with 78 degrees of freedom
Question
A term that means the same as the term "variable" in an ANOVA procedure is

A) factor
B) treatment
C) replication
D) variance within
Question
In an analysis of variance, one estimate of σ2 is based upon the differences between the treatment means and the

A) means of each sample
B) overall sample mean
C) sum of observations
D) populations have equal means
Question
In a completely randomized design involving three treatments, the following information is provided:  Treatment 1 Treatment 2 Treatment 3 Sample Size 5105 Sample Mean 489\begin{array}{llcc}&\text { Treatment } 1&\text { Treatment } 2&\text { Treatment } 3\\\text { Sample Size } & 5 & 10 & 5 \\\text { Sample Mean } & 4 & 8 & 9\end{array} The overall mean for all the treatments is

A) 7.00
B) 6.67
C) 7.25
D) 4.89
Question
The critical F value with 8 numerator and 29 denominator degrees of freedom at α = 0.01 is

A) 2.28
B) 3.20
C) 3.33
D) 3.64
Question
The required condition for using an ANOVA procedure on data from several populations is that the

A) the selected samples are dependent on each other
B) sampled populations are all uniform
C) sampled populations have equal variances
D) sampled populations have equal means
Question
An ANOVA procedure is used for data that was obtained from four sample groups each comprised of five observations. The degrees of freedom for the critical value of F are

A) 3 and 20
B) 3 and 16
C) 4 and 17
D) 3 and 19
Question
If we are interested in testing whether the mean of population 1 is significantly larger than the mean of population 2, the correct null hypothesis is

A) H0: μ1- μ2 ≥ 0
B) H0: μ1- μ2 = 0
C) H0: μ1- μ2 > 0
D) H0: μ1- μ2 < 0
Question
An ANOVA procedure is used for data obtained from five populations. five samples, each comprised of 20 observations, were taken from the five populations. The numerator and denominator respectively) degrees of freedom for the critical value of F are

A) 5 and 20
B) 4 and 20
C) 4 and 99
D) 4 and 95
Question
In order to determine whether or not the means of two populations are equal,

A) a t test must be performed
B) an analysis of variance must be performed
C) either a t test or an analysis of variance can be performed
D) a chi-square test must be performed
Question
Which of the following is not a required assumption for the analysis of variance?

A) The random variable of interest for each population has a normal probability distribution.
B) The variance associated with the random variable must be the same for each population.
C) At least 2 populations are under consideration.
D) Populations have equal means.
Question
Which of the following is not a required assumption for the analysis of variance?

A) The random variable of interest for each population has a normal probability distribution.
B) The variance associated with the random variable must be the same for each population.
C) At least 2 populations are under consideration.
D) Populations have equal means.
Question
If we are interested in testing whether the mean of population 1 is significantly different from the mean of population 2, the correct null hypothesis is

A) H0: μ1- μ2 ≥ 0
B) H0: μ1- μ2 = 0
C) H0: μ1- μ2 > 0
D) H0: μ1- μ2 = 0
Question
An ANOVA procedure is applied to data obtained from 6 samples where each sample contains 20 observations. The degrees of freedom for the critical value of F are

A) 6 numerator and 20 denominator degrees of freedom
B) 5 numerator and 20 denominator degrees of freedom
C) 5 numerator and 114 denominator degrees of freedom
D) 6 numerator and 20 denominator degrees of freedom
Question
The mean square is the sum of squares divided by

A) the total number of observations
B) its corresponding degrees of freedom
C) its corresponding degrees of freedom minus one
D) None of these alternatives is correct.
Question
In ANOVA, which of the following is not affected by whether or not the population means are equal?

A) xˉ\bar { x }
B) between-samples estimate of ?2
C) within-samples estimate of ?2
D) None of these alternatives is correct.
Question
If we are interested in testing whether the mean of items in population 1 is significantly smaller than the mean of items in population 2, the

A) null hypothesis should state μ1- μ2 < 0
B) null hypothesis should state P1 - P2 ≥ 0
C) alternative hypothesis should state P1 - P2 > 0
D) alternative hypothesis should state μ1- μ2 < 0
Question
An ANOVA procedure is used for data obtained from four populations. Four samples, each comprised of 30 observations, were taken from the four populations. The numerator and denominator respectively) degrees of freedom for the critical value of F are

A) 3 and 30
B) 4 and 30
C) 3 and 119
D) 3 and 116
Question
In hypothesis testing if the null hypothesis is rejected,

A) no conclusions can be drawn from the test
B) the alternative hypothesis is true
C) the data must have been accumulated incorrectly
D) the sample size has been too small
Question
We are interested in testing the following hypotheses. H0: μ1- μ2 ≥ 0 Ha: μ1- μ2 < 0
Based on 40 degrees of freedom, the test statistic t is computed to be 2.423. The p-value for this test is

A) 0.01
B) 0.02
C) 0.025
D) between 0.025 to 0.05
Question
For a one-tailed test lower tail) at 93.7% confidence, Z =

A) -1.86
B) -1.53
C) -1.96
D) -1.645
Question
We are interested in testing the following hypotheses. H0: μ1- μ2 = 0 Ha: μ1- μ2 ? 0
The test statistic Z is computed to be 1.85. The p-value for this test is

A) 0.4678
B) 0.9678
C) 0.0322
D) 0.0644
Question
If the p-value is larger than 1,

A) the null hypothesis must be rejected.
B) the alternative hypothesis must be accepted.
C) the value of Z must be zero.
D) a mistake must have been made in computations.
Question
When the following hypotheses are being tested at a level of significance of α, H0: μ1- μ2 ≥ 0 Ha: μ1- μ2 < 0
The null hypothesis will be rejected if the p-value is

A) 1 − α
B) > α
C) > α/2
D) ≤ α
Question
For a two-tailed test at 98.5% confidence, Z =

A) ± 2.17
B) ± 1.96
C) ± 2.98
D) ± 2.43
Question
The p-value

A) is the same as the Z statistic
B) measures the number of standard deviations from the mean
C) is a distance
D) is a probability
Question
We are interested in testing the following hypotheses. H0: μ1- μ2 ≥ 0 Ha: μ1- μ2 < 0
The test statistic Z is computed to be 2.83. The p-value for this test is

A) 0.4977
B) 0.0023
C) 0.0046
D) 0.9977
Question
If a hypothesis is rejected at 95% confidence, it

A) will not be rejected at 90% confidence
B) will also be rejected at 90% confidence
C) will sometimes be rejected at 90% confidence
D) None of these alternatives is correct.
Question
For a two-tailed test at 86.12% confidence, Z =

A) 1.96
B) 1.48
C) 1.09
D) 0.8612
Question
Which of the following does not need to be known in order to compute the p-value?

A) knowledge of whether the test is one-tailed or two-tailed
B) the value of the test statistic
C) the level of significance
D) None of these alternatives is correct.
Question
When the p-value is used for hypothesis testing, the null hypothesis is not rejected if the

A) p­value ≤ α
B) p­value > α
C) p­value ≥ 1
D) p-value < 0
Question
In order to test the following hypotheses at an α level of significance, H0: μ1- μ2 ≤ 0 Ha: μ1- μ2 > 0
The null hypothesis will be rejected if the test statistic Z is

A) ≤ Zα
B) ≥ Zα
C) < -Zα
D) < 0
Question
For a one-tailed test lower tail) at 99.7% confidence, Z =

A) ± 1.86
B) - 2.75
C) ±1.96
D) -1.645
Question
When the p-value is used for hypothesis testing, the null hypothesis is rejected if

A) p-value ≤ α
B) α < p-value
C) p-value ≥ α
D) p-value = 1 - α
Question
The p-value

A) ranges between minus infinity to plus infinity
B) ranges between minus 1 to plus 1
C) is larger than 1
D) ranges between 0 to 1
Question
We are interested in testing the following hypotheses. H0: μ1­ μ2 = 0
Ha: μ1­ μ2 ≠ 0
The test statistic Z is computed to be 2.00. The p-value for this test is

A) 0.9772
B) 1.9544
C) 0.0228
D) 0.0456
Question
The level of significance

A) can be any positive value
B) can be any value
C) is 1 - confidence level)
D) can be any value between -1.96 to 1.96
Question
When using inference regarding two population means for "matched samples," the following values were found for d = Score After - Score Before: 2, -4, 1, 2, -1
The test statistics for this situation is

A) 0
B) 1
C) Since the confidence level is not known, it cannot be answered.
D) Not enough information is given to answer this question.
Question
Exhibit 10-2
The following information was obtained from matched samples.
The daily production rates for a sample of workers before and after a training program are shown below.
 Worker  Before  After 12022225233272742320522256201971718\begin{array} { c c c } \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}

-Refer to Exhibit 10-2. The point estimate for the difference between the means of the two populations is

A) -1
B) -2
C) 0
D) 1
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. If you are interested in testing whether or not the 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
In a one tail upper bound) hypothesis test, the critical value of Z has been 2 and the test statistic has been 1.96. In this situation,

A) the null hypothesis should be rejected.
B) the alternative hypothesis is true.
C) since the standard deviation is not known, no answer can be given.
D) the sample size has been too small.
Question
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The p-value for the difference between the two population means is

A) .0013
B) .0026
C) .4987
D) .9987
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. At 95% confidence, the conclusion is the

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) None of these alternatives is correct.
Question
Exhibit 10-2
The following information was obtained from matched samples.
The daily production rates for a sample of workers before and after a training program are shown below.
 Worker  Before  After 12022225233272742320522256201971718\begin{array} { c c c } \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}

-Refer to Exhibit 10-2. Based on the results of question 18, the

A) null hypothesis should be rejected
B) null hypothesis should not be rejected
C) alternative hypothesis should be accepted
D) None of these alternatives is correct.
Question
Exhibit 10-2
The following information was obtained from matched samples.
The daily production rates for a sample of workers before and after a training program are shown below.
 Worker  Before  After 12022225233272742320522256201971718\begin{array} { c c c } \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}

-Refer to Exhibit 10-2. The null hypothesis to be tested is H0: ?d = 0. The test statistic is

A) -1.96
B) 1.96
C) 0
D) 1.645
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. At 95% confidence, the margin of error is

A) 1.96
B) 1.645
C) 3.920
D) 2.000
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. The p-value is

A) 0.0668
B) 0.0334
C) 1.336
D) 1.96
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. 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) -0.92 to 6.92
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. The standard error for the difference between the two means is

A) 4
B) 7.46
C) 4.24
D) 2.0
Question
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The standard error of is

A) 12.9
B) 9.3
C) 4
D) 2
Question
Exhibit 10-4
The following information was obtained from independent random samples. Assume normally distributed populations with equal variances.
 Sample 1 Sample 2  Sample Mean 4542 Sanple Variance 8590 Sample Size 1012\begin{array} { l c c } & \text { Sample } 1 & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sanple Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

-Refer to Exhibit 10-4. The point estimate for the difference between the means of the two populations is

A) 0
B) 2
C) 3
D) 15
Question
Exhibit 10-4
The following information was obtained from independent random samples. Assume normally distributed populations with equal variances.
 Sample 1 Sample 2  Sample Mean 4542 Sanple Variance 8590 Sample Size 1012\begin{array} { l c c } & \text { Sample } 1 & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sanple Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

-Refer to Exhibit 10-4. The standard error of is

A) 3.0
B) 4.0
C) 8.372
D) 19.48
Question
Exhibit 10-4
The following information was obtained from independent random samples. Assume normally distributed populations with equal variances.
 Sample 1 Sample 2  Sample Mean 4542 Sanple Variance 8590 Sample Size 1012\begin{array} { l c c } & \text { Sample } 1 & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sanple Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

-Refer to Exhibit 10-4. The degrees of freedom for the t-distribution are

A) 22
B) 23
C) 24
D) 19
Question
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. 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) There is a difference, but it is not significant.
Question
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The test statistic for the difference between the two population means is

A) -.47
B) -.65
C) -1.5
D) -3
Question
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The 95% confidence interval for the difference between the two population means is

A) -9.92 to -2.08
B) -3.92 to 3.92
C) -13.84 to 1.84
D) -24.228 to 12.23
Question
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. The point estimate of the difference between the means of the two populations is

A) -28
B) 3
C) 4
D) -4
Question
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. 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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Deck 10: Comparisons Involving Means, Experimental Design, and Analysis of Variance
1
An experimental design where the experimental units are randomly assigned to the treatments is known as

A) factor block design
B) random factor design
C) completely randomized design
D) None of these alternatives is correct.
C
2
The ANOVA procedure is a statistical approach for determining whether or not

A) the means of two samples are equal
B) the means of two or more samples are equal
C) the means of more than two samples are equal
D) the means of two or more populations are equal
D
3
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
D
4
In an analysis of variance where the total sample size for the experiment is nT and the number of populations is K, the mean square within treatments is

A) SSE/nT - K)
B) SSTR/nT - K)
C) SSE/K - 1)
D) SSE/K
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5
The standard error of is the xˉ1xˉ2\bar { x } _ { 1 } - \bar { x } _ { 2 }

A) variance of
B) variance of the sampling distribution of
C) standard deviation of the sampling distribution of
D) difference between the two means
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6
In the analysis of variance procedure ANOVA), "factor" refers to

A) the dependent variable
B) the independent variable
C) the level of confidence
D) the critical value of F
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7
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
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8
The variable of interest in an ANOVA procedure is called

A) a partition
B) a treatment
C) either a partition or a treatment
D) a factor
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9
The critical F value with 6 numerator and 60 denominator degrees of freedom at α = .05 is

A) 3.74
B) 2.25
C) 2.37
D) 1.96
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10
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 a Poisson 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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11
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
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12
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) None of these alternatives is correct.
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13
In an analysis of variance problem involving 3 treatments and 10 observations per treatment, SSE = 399.6. The MSE for this situation is

A) 133.2
B) 13.32
C) 14.8
D) 30.0
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14
In the ANOVA, treatment refers to

A) experimental units
B) different levels of a factor
C) the dependent variable
D) applying antibiotic to a wound
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15
When developing an interval estimate for the difference between two sample 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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16
When an analysis of variance is performed on samples drawn from K populations, the mean square between treatments MSTR) is

A) SSTR/nT
B) SSTR/nT - 1)
C) SSTR/K
D) SSTR/K - 1)
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17
If we are interested in testing whether the mean of items in population 1 is larger than the mean of items in population 2, the

A) null hypothesis should state μ1 - μ2 < 0
B) null hypothesis should state μ1 - μ2 > 0
C) alternative hypothesis should state μ1 - μ2 > 0
D) alternative hypothesis should state μ1 - μ2 < 0
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18
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) None of these alternatives is correct.
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19
The F ratio in a completely randomized ANOVA is the ratio of

A) MSTR/MSE
B) MST/MSE
C) MSE/MSTR
D) MSE/MST
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20
For testing the following hypothesis at 95% confidence, the null hypothesis will be rejected if Η0: μ1 - μ2 ≤ 0
Ηα: μ1 - μ2 > 0

A) p-value ≤ 0.05
B) p-value > 0.05
C) p-value > 0.95
D) p-value ≥ 0.475
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21
In a completely randomized design involving four treatments, the following information is provided.  Treatment 1 Treatment 2 Treatment 3 Treatment 4 Sample Size 50181517 Sample Mean 32384248\begin{array}{llcc}&\text { Treatment } 1&\text { Treatment } 2&\text { Treatment } 3&\text { Treatment } 4\\\text { Sample Size } &50&18&15&17 \\\text { Sample Mean } &32&38&42&48\end{array} The overall mean the grand mean) for all treatments is

A) 40.0
B) 37.3
C) 48.0
D) 37.0
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22
In an analysis of variance problem if SST = 120 and SSTR = 80, then SSE is

A) 200
B) 40
C) 80
D) 120
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23
Independent simple random samples are taken to test the difference between the means of two populations whose variances are known. The sample sizes are n1 = 38 and n2 = 42. The correct distribution to use is the

A) normal distribution
B) t distribution with 80 degrees of freedom
C) t distribution with 79 degrees of freedom
D) t distribution with 78 degrees of freedom
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24
A term that means the same as the term "variable" in an ANOVA procedure is

A) factor
B) treatment
C) replication
D) variance within
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25
In an analysis of variance, one estimate of σ2 is based upon the differences between the treatment means and the

A) means of each sample
B) overall sample mean
C) sum of observations
D) populations have equal means
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26
In a completely randomized design involving three treatments, the following information is provided:  Treatment 1 Treatment 2 Treatment 3 Sample Size 5105 Sample Mean 489\begin{array}{llcc}&\text { Treatment } 1&\text { Treatment } 2&\text { Treatment } 3\\\text { Sample Size } & 5 & 10 & 5 \\\text { Sample Mean } & 4 & 8 & 9\end{array} The overall mean for all the treatments is

A) 7.00
B) 6.67
C) 7.25
D) 4.89
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27
The critical F value with 8 numerator and 29 denominator degrees of freedom at α = 0.01 is

A) 2.28
B) 3.20
C) 3.33
D) 3.64
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28
The required condition for using an ANOVA procedure on data from several populations is that the

A) the selected samples are dependent on each other
B) sampled populations are all uniform
C) sampled populations have equal variances
D) sampled populations have equal means
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29
An ANOVA procedure is used for data that was obtained from four sample groups each comprised of five observations. The degrees of freedom for the critical value of F are

A) 3 and 20
B) 3 and 16
C) 4 and 17
D) 3 and 19
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30
If we are interested in testing whether the mean of population 1 is significantly larger than the mean of population 2, the correct null hypothesis is

A) H0: μ1- μ2 ≥ 0
B) H0: μ1- μ2 = 0
C) H0: μ1- μ2 > 0
D) H0: μ1- μ2 < 0
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31
An ANOVA procedure is used for data obtained from five populations. five samples, each comprised of 20 observations, were taken from the five populations. The numerator and denominator respectively) degrees of freedom for the critical value of F are

A) 5 and 20
B) 4 and 20
C) 4 and 99
D) 4 and 95
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32
In order to determine whether or not the means of two populations are equal,

A) a t test must be performed
B) an analysis of variance must be performed
C) either a t test or an analysis of variance can be performed
D) a chi-square test must be performed
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33
Which of the following is not a required assumption for the analysis of variance?

A) The random variable of interest for each population has a normal probability distribution.
B) The variance associated with the random variable must be the same for each population.
C) At least 2 populations are under consideration.
D) Populations have equal means.
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34
Which of the following is not a required assumption for the analysis of variance?

A) The random variable of interest for each population has a normal probability distribution.
B) The variance associated with the random variable must be the same for each population.
C) At least 2 populations are under consideration.
D) Populations have equal means.
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35
If we are interested in testing whether the mean of population 1 is significantly different from the mean of population 2, the correct null hypothesis is

A) H0: μ1- μ2 ≥ 0
B) H0: μ1- μ2 = 0
C) H0: μ1- μ2 > 0
D) H0: μ1- μ2 = 0
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36
An ANOVA procedure is applied to data obtained from 6 samples where each sample contains 20 observations. The degrees of freedom for the critical value of F are

A) 6 numerator and 20 denominator degrees of freedom
B) 5 numerator and 20 denominator degrees of freedom
C) 5 numerator and 114 denominator degrees of freedom
D) 6 numerator and 20 denominator degrees of freedom
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37
The mean square is the sum of squares divided by

A) the total number of observations
B) its corresponding degrees of freedom
C) its corresponding degrees of freedom minus one
D) None of these alternatives is correct.
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38
In ANOVA, which of the following is not affected by whether or not the population means are equal?

A) xˉ\bar { x }
B) between-samples estimate of ?2
C) within-samples estimate of ?2
D) None of these alternatives is correct.
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39
If we are interested in testing whether the mean of items in population 1 is significantly smaller than the mean of items in population 2, the

A) null hypothesis should state μ1- μ2 < 0
B) null hypothesis should state P1 - P2 ≥ 0
C) alternative hypothesis should state P1 - P2 > 0
D) alternative hypothesis should state μ1- μ2 < 0
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40
An ANOVA procedure is used for data obtained from four populations. Four samples, each comprised of 30 observations, were taken from the four populations. The numerator and denominator respectively) degrees of freedom for the critical value of F are

A) 3 and 30
B) 4 and 30
C) 3 and 119
D) 3 and 116
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41
In hypothesis testing if the null hypothesis is rejected,

A) no conclusions can be drawn from the test
B) the alternative hypothesis is true
C) the data must have been accumulated incorrectly
D) the sample size has been too small
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42
We are interested in testing the following hypotheses. H0: μ1- μ2 ≥ 0 Ha: μ1- μ2 < 0
Based on 40 degrees of freedom, the test statistic t is computed to be 2.423. The p-value for this test is

A) 0.01
B) 0.02
C) 0.025
D) between 0.025 to 0.05
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43
For a one-tailed test lower tail) at 93.7% confidence, Z =

A) -1.86
B) -1.53
C) -1.96
D) -1.645
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44
We are interested in testing the following hypotheses. H0: μ1- μ2 = 0 Ha: μ1- μ2 ? 0
The test statistic Z is computed to be 1.85. The p-value for this test is

A) 0.4678
B) 0.9678
C) 0.0322
D) 0.0644
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45
If the p-value is larger than 1,

A) the null hypothesis must be rejected.
B) the alternative hypothesis must be accepted.
C) the value of Z must be zero.
D) a mistake must have been made in computations.
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46
When the following hypotheses are being tested at a level of significance of α, H0: μ1- μ2 ≥ 0 Ha: μ1- μ2 < 0
The null hypothesis will be rejected if the p-value is

A) 1 − α
B) > α
C) > α/2
D) ≤ α
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47
For a two-tailed test at 98.5% confidence, Z =

A) ± 2.17
B) ± 1.96
C) ± 2.98
D) ± 2.43
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48
The p-value

A) is the same as the Z statistic
B) measures the number of standard deviations from the mean
C) is a distance
D) is a probability
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49
We are interested in testing the following hypotheses. H0: μ1- μ2 ≥ 0 Ha: μ1- μ2 < 0
The test statistic Z is computed to be 2.83. The p-value for this test is

A) 0.4977
B) 0.0023
C) 0.0046
D) 0.9977
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50
If a hypothesis is rejected at 95% confidence, it

A) will not be rejected at 90% confidence
B) will also be rejected at 90% confidence
C) will sometimes be rejected at 90% confidence
D) None of these alternatives is correct.
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51
For a two-tailed test at 86.12% confidence, Z =

A) 1.96
B) 1.48
C) 1.09
D) 0.8612
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52
Which of the following does not need to be known in order to compute the p-value?

A) knowledge of whether the test is one-tailed or two-tailed
B) the value of the test statistic
C) the level of significance
D) None of these alternatives is correct.
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53
When the p-value is used for hypothesis testing, the null hypothesis is not rejected if the

A) p­value ≤ α
B) p­value > α
C) p­value ≥ 1
D) p-value < 0
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54
In order to test the following hypotheses at an α level of significance, H0: μ1- μ2 ≤ 0 Ha: μ1- μ2 > 0
The null hypothesis will be rejected if the test statistic Z is

A) ≤ Zα
B) ≥ Zα
C) < -Zα
D) < 0
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55
For a one-tailed test lower tail) at 99.7% confidence, Z =

A) ± 1.86
B) - 2.75
C) ±1.96
D) -1.645
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56
When the p-value is used for hypothesis testing, the null hypothesis is rejected if

A) p-value ≤ α
B) α < p-value
C) p-value ≥ α
D) p-value = 1 - α
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57
The p-value

A) ranges between minus infinity to plus infinity
B) ranges between minus 1 to plus 1
C) is larger than 1
D) ranges between 0 to 1
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58
We are interested in testing the following hypotheses. H0: μ1­ μ2 = 0
Ha: μ1­ μ2 ≠ 0
The test statistic Z is computed to be 2.00. The p-value for this test is

A) 0.9772
B) 1.9544
C) 0.0228
D) 0.0456
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59
The level of significance

A) can be any positive value
B) can be any value
C) is 1 - confidence level)
D) can be any value between -1.96 to 1.96
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60
When using inference regarding two population means for "matched samples," the following values were found for d = Score After - Score Before: 2, -4, 1, 2, -1
The test statistics for this situation is

A) 0
B) 1
C) Since the confidence level is not known, it cannot be answered.
D) Not enough information is given to answer this question.
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61
Exhibit 10-2
The following information was obtained from matched samples.
The daily production rates for a sample of workers before and after a training program are shown below.
 Worker  Before  After 12022225233272742320522256201971718\begin{array} { c c c } \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}

-Refer to Exhibit 10-2. 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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62
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. If you are interested in testing whether or not the 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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63
In a one tail upper bound) hypothesis test, the critical value of Z has been 2 and the test statistic has been 1.96. In this situation,

A) the null hypothesis should be rejected.
B) the alternative hypothesis is true.
C) since the standard deviation is not known, no answer can be given.
D) the sample size has been too small.
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64
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The p-value for the difference between the two population means is

A) .0013
B) .0026
C) .4987
D) .9987
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65
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. At 95% confidence, the conclusion is the

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) None of these alternatives is correct.
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66
Exhibit 10-2
The following information was obtained from matched samples.
The daily production rates for a sample of workers before and after a training program are shown below.
 Worker  Before  After 12022225233272742320522256201971718\begin{array} { c c c } \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}

-Refer to Exhibit 10-2. Based on the results of question 18, the

A) null hypothesis should be rejected
B) null hypothesis should not be rejected
C) alternative hypothesis should be accepted
D) None of these alternatives is correct.
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67
Exhibit 10-2
The following information was obtained from matched samples.
The daily production rates for a sample of workers before and after a training program are shown below.
 Worker  Before  After 12022225233272742320522256201971718\begin{array} { c c c } \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}

-Refer to Exhibit 10-2. The null hypothesis to be tested is H0: ?d = 0. The test statistic is

A) -1.96
B) 1.96
C) 0
D) 1.645
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68
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. At 95% confidence, the margin of error is

A) 1.96
B) 1.645
C) 3.920
D) 2.000
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69
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. The p-value is

A) 0.0668
B) 0.0334
C) 1.336
D) 1.96
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70
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. 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) -0.92 to 6.92
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71
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. The standard error for the difference between the two means is

A) 4
B) 7.46
C) 4.24
D) 2.0
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72
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The standard error of is

A) 12.9
B) 9.3
C) 4
D) 2
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73
Exhibit 10-4
The following information was obtained from independent random samples. Assume normally distributed populations with equal variances.
 Sample 1 Sample 2  Sample Mean 4542 Sanple Variance 8590 Sample Size 1012\begin{array} { l c c } & \text { Sample } 1 & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sanple Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

-Refer to Exhibit 10-4. 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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74
Exhibit 10-4
The following information was obtained from independent random samples. Assume normally distributed populations with equal variances.
 Sample 1 Sample 2  Sample Mean 4542 Sanple Variance 8590 Sample Size 1012\begin{array} { l c c } & \text { Sample } 1 & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sanple Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

-Refer to Exhibit 10-4. The standard error of is

A) 3.0
B) 4.0
C) 8.372
D) 19.48
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75
Exhibit 10-4
The following information was obtained from independent random samples. Assume normally distributed populations with equal variances.
 Sample 1 Sample 2  Sample Mean 4542 Sanple Variance 8590 Sample Size 1012\begin{array} { l c c } & \text { Sample } 1 & \text { Sample 2 } \\\text { Sample Mean } & 45 & 42 \\\text { Sanple Variance } & 85 & 90 \\\text { Sample Size } & 10 & 12\end{array}

-Refer to Exhibit 10-4. The degrees of freedom for the t-distribution are

A) 22
B) 23
C) 24
D) 19
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76
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. 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) There is a difference, but it is not significant.
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77
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The test statistic for the difference between the two population means is

A) -.47
B) -.65
C) -1.5
D) -3
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78
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. The 95% confidence interval for the difference between the two population means is

A) -9.92 to -2.08
B) -3.92 to 3.92
C) -13.84 to 1.84
D) -24.228 to 12.23
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79
Exhibit 10-1
Salary information regarding male and female employees of a large company is shown below.
 Male  Female  Sample Size 6436 Sample Mean Salary in $1,000)4441 Population Variance σ2 ) 12872\begin{array} { l c c } & \text { Male } & \text { Female } \\\text { Sample Size } & 64 & 36 \\\text { Sample Mean Salary in } \$ 1,000) & 44 & 41 \\\text { Population Variance } \sigma^{2} \text { ) } & 128 & 72\end{array}

-Refer to Exhibit 10-1. 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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80
Exhibit 10-3
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 x82.088σ2112.554n45.036\begin{array}{l}& \text { Today } & \text { Five Years Ago } \\\overline { \mathrm { x } } & 82.0 & 88 \\\sigma ^ { 2 } & 112.5 & 54 \\\mathrm { n } & 45.0 & 36\end{array}
 Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today } & \text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array}  Today  Five Years Ago 82.088112.55445.036\begin{array}{cc}\text { Today }&\text { Five Years Ago }\\82.0 & 88 \\112.5 & 54 \\45.0 & 36\end{array} n

-Refer to Exhibit 10-3. 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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Unlock Deck
Unlock for access to all 194 flashcards in this deck.
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