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Deck 10: Hypothesis Testing, Effect Size, and and Confidence Intervals: Two-Sample Designs

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Question
The simple experiment described in Chapter 10 compared only two groups.
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Question
In the simple experiment described by your text, the groups were made equivalent with a two step process of matching and review.
Question
The t test was developed as a way to analyze data from experiments with rats in mazes.
Question
The two kinds of t tests described in Chapter 10 were independent samples and paired samples.
Question
The denominator of an independent-samples t test is a standard error of a difference.
Question
To be a small effect size, d must be .05 or less.
Question
To capture the size of the difference between two population means, your textbook used an effect size index.
Question
The formula for power is 1 - μ\mu .
Question
Your textbook recommends sample sizes of 30 or more to ensure that the p values from a t test be reliable.
Question
The alternative hypothesis is called the hypothesis of no difference.
Question
In the simple experiment described by your text, the groups were made equivalent with random assignment.
Question
The t test was developed as a way to analyze flavors in taste experiments.
Question
The two kinds of t tests described in Chapter 10 were independent samples and orthogonal samples.
Question
The denominator of a paired-samples t test is a standard error of a difference.
Question
A value of d such as 0.50 indicates a medium effect size.
Question
To capture the size of the difference between two population means, your textbook used confidence intervals.
Question
The formula for power is 1 - μ\mu .
Question
Both α\alpha and N help determine the amount of power a t test has.
Question
Normally distributed populations with equal variances are most likely to give accurate p values for a t test.
Question
The null hypothesis states that the sample means are identical.
Question
In the simple experiment described by your text, extraneous variables were controlled using random assignment.
Question
The t test was developed as a way to determine how well data fit the normal curve.
Question
The two kinds of t tests described in Chapter 10 were power samples and paired samples.
Question
The numerator of an independent-samples t test is a standard error of a difference.
Question
Values of d greater than 1.00 indicate a large effect size.
Question
A confidence interval about a mean difference gives a degree of confidence about the difference between two population means.
Question
The formula for power is 1 - μ\mu .
Question
As the value of p goes down, the value of d goes up.
Question
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-The standard error of the difference for Data Set 10-1 is

A) 2.50
B) 3.69
C) 5.00
Question
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-A t test of Data Set 10-1 would result in a t value of

A) 1.60
B) 0.90
C) 0.61
D) 1.80
Question
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-The proper conclusion for the experiment described in Data Set 10-1 is

A) there was a significant shift in attitudes from conservative to liberal (p < .05)
B) there was a significant shift in attitudes from liberal to conservative (p < .05)
C) there was no significant shift in attitudes.
Question
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-The effect size index for Data Set 10-1 is

A) 0.45
B) 0.90
C) 3.60
Question
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The study described in Data Set 10-2 is an example of

A) an independent samples design
B) a paired-samples design
C) comparing a sample mean to a known population mean
D) unknown more information is required in order to decide, namely
Question
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The standard error of the difference for Data Set 10-2 is

A) 16.00
B) 4.00
C) 2.00
D) 1.00
Question
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The conclusion from Data Set 10-2 is that those in special education

A) have significantly lower IQs than those not in special education
B) have significantly higher IQs than those not in special education
C) are not significantly different in IQ than those not in special education.
Question
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The numerical value of the effect size index for Data Set 10-2 is

A) 0. to .50
B) 0.51 to 1.00
C) 1.01 to 3.00
D) 3.01 to 10.00
E) greater than 10.
Question
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The experiment described in Data Set 10-3 is an example of

A) a paired samples design
B) an independent samples design
C) determining the probability that a sample was drawn from a population with a known mean
D) cannot be determined from the information given.
Question
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The standard error of the difference for Data Set 10-3 is

A) 3.34
B) 4.69
C) 4.35
D) 2.17
Question
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The conclusion from Data Set 10-3 is that

A) the more you fast the less you eat
B) the more you fast the more you eat
C) there is no significant difference in the amount eaten if you haven't eaten for 24 or 48 hours
D) additional information is needed namely .
Question
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The effect size index for Data Set 10-3 is

A) 0.77
B) 1.53
C) 3.07
D) 2.36
Question
Data Set 10-4: Gerbils were used to assess the effect of Natural Neutral, a drug designed to reduce emotionality in high-drive people. Each of 20 gerbils spent 10 solitary minutes in an open field. The investigator recorded the number of fecal boluses for each animal. Then each animal was given an injection of Natural Neutral and the open field task was repeated. The following data were produced (large numbers indicate high emotionality).
 No Drug  Drug  mean number of boluses 68 standard deviation of boluses 22\begin{array} { l l l } & \text { No Drug } & \text { Drug } \\ \text { mean number of boluses } & 6 & 8 \\\text { standard deviation of boluses } & 2 & 2 \\\end{array}
 correlation coefficient between Drug and No Drug Score =.50\text { correlation coefficient between Drug and No Drug Score } = .50

-The design in Data Set 10-4 is one of

A) paired samples
B) independent samples
C) testing the significance of a correlation
D) none of the other alternatives are correct.
Question
Data Set 10-4: Gerbils were used to assess the effect of Natural Neutral, a drug designed to reduce emotionality in high-drive people. Each of 20 gerbils spent 10 solitary minutes in an open field. The investigator recorded the number of fecal boluses for each animal. Then each animal was given an injection of Natural Neutral and the open field task was repeated. The following data were produced (large numbers indicate high emotionality).
 No Drug  Drug  mean number of boluses 68 standard deviation of boluses 22\begin{array} { l l l } & \text { No Drug } & \text { Drug } \\ \text { mean number of boluses } & 6 & 8 \\\text { standard deviation of boluses } & 2 & 2 \\\end{array}
 correlation coefficient between Drug and No Drug Score =.50\text { correlation coefficient between Drug and No Drug Score } = .50

-The proper conclusion from Data Set 10-4 is that Natural Neutral

A) reduces emotionality
B) increases emotionality
C) has no significant effect on emotionality.
Question
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The experiment described in Data Set 10-5

A) is an independent samples design
B) is a paired samples design
C) isn't given in enough detail to determine the design.
Question
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The t value for Data Set 10-5 is

A) less than 1.00
B) 1.00-1.99
C) 2.00-2.99
D) 3.00-4.00
E) greater than 4.00.
Question
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The proper conclusion for Data Set 10-5 is that the leisurely schedule results in productivity that is

A) significantly greater than a rushed schedule
B) significantly less than a rushed schedule
C) not significantly different from a rushed schedule
Question
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The effect size index for Data Set 10-5 is

A) 1.23
B) 2.04
C) 2.45
Question
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The study described in Data Set 10-6 is an example of

A) an independent-samples design
B) a paired-samples design
C) comparing a sample mean to a known population mean
D) unknown more information is required in order to decide, namely
Question
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The standard error of the difference for Data Set 10-6 is

A) 5.94
B) 2.00
C) 1.63
D) 1.16
Question
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The conclusion from Data Set 10-6 (which is the same arrived at by some of the actual research) is that schizophrenics

A) have significantly more dopamine than the control group
B) have significantly less dopamine than the control group
C) and control groups don't differ significantly in dopamine.
Question
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The effect size index for Data Set 10-6 is

A) 0.26
B) 0.78
C) 1.55
D) 2.58
Question
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-The design of the study described in Data Set 10-7 is

A) independent samples
B) paired samples
C) comparing a sample mean to a population mean
D) not enough information is given.
Question
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-The standard error of the difference of the data in Data Set 10-7 is

A) 6.25
B) 1.87
C) 0.625
D) 2.50
Question
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-Which of the following conclusions is proper for Data Set 10-7?

A) The Hatfields had a significantly higher injury score than the McCoys
B) The McCoys had a significantly higher injury score than the Hatfields
C) There was no significant difference between the Hatfields and the McCoys
D) Not enough information is contained in Data Set 10-7 to support one of the other alternatives.
Question
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-The effect size index for Data Set 10-7 is

A) 0.70
B) 0.99
C) 1.40
Question
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The experimenter described in Data Set 10-8 is an example of

A) a paired samples design
B) an independent samples design
C) determining the probability that a sample was drawn from a population with a known mean
D) cannot be determined from the information given.
Question
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The standard error of difference for Data Set 10-8 is

A) 0.374
B) 0.837
C) 1.871
D) 3.50
Question
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The proper conclusion from Data Set 10-8 is that

A) aloe reduces emotionality more than vera
B) vera reduces emotionality more than aloe
C) there is no significant difference in the effect of the two drugs on emotionality
D) there is a significant change in emotionality, but the direction cannot be determined.
Question
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The effect size index for Data Set 10-8 is

A) 2.62
B) 1.18
C) 0.70
D) 1.05
Question
For a simple experiment, which of the following is true?

A) As a null hypothesis, assume that the two groups represent different populations.
B) Apply the dependent variable to both groups and then measure the changes in the independent variable.
C) Find the probability that the two samples are from different populations by using a t distribution.
D) Treat both groups exactly alike except for one thing.
Question
The book's description of an experiment included the phrase, "treat them exactly alike except for one thing."The italicized phrases are related to a(n)_________ variable and a(n)_________ variable, respectively.

A) independent, dependent
B) dependent, independent
C) extraneous, independent
D) dependent, extraneous.
Question
In a simple experiment, treat two groups exactly the same except for one thing and then measure the individuals in both groups on some scale. Treating the two groups differently on the one thing constitutes

A) the independent variable
B) the dependent variable
C) an extraneous variable
D) none of the other alternatives are correct.
Question
Which of these phrases is not like the others? Which of these phrases doesn't belong with the other three?

A) independent variable
B) dependent variable
C) experimental group
D) treatment.
Question
Which of these phrases doesn't belong with the other three?

A) extraneous variable
B) independent variable
C) treatment
D) experimental group.
Question
With an acknowledgment to Sesame Street, "Which of these things is not like the others, which of these things doesn't belong?"

A) repeated measures
B) natural pairs
C) independent samples
D) matched pairs.
Question
According to your text, the reason we do experiments is to be able to tell

A) whether all extraneous variables were controlled
B) whether the samples were representative of the population
C) how scores on the dependent variable are affected by the independent variable
D) all of the other alternatives are correct.
Question
The notion of generalizing from an experiment to a population was described by your text as the of an experiment.

A) prima facie
B) quid pro quid
C) modus tollens
D) raison d'etre.
Question
According to your text is the reason for doing an experiment.

A) performing an inferential statistics test
B) being able to make statements that are more inclusive than those possible from the sample alone
C) determining just what the facts are in the case at hand
D) determining what percent of the results is due to chance.
Question
Null hypothesis statistical testing (NHST) allows you to conclude that the null hypothesis is

A) probably true
B) true
C) probably false
D) any of the other alternatives, depending on the value of p.
Question
The logic of null hypothesis statistical testing (NHST) is to

A) assume that two populations have equal means and then demonstrate that they areprobably equal
B) assume that two populations have unequal means and then demonstrate that they areprobably unequal
C) assume that two populations have equal means and then demonstrate that they areprobably unequal
D) assume that two populations have unequal means and then demonstrate that they areprobably equal.
Question
The logic of null hypothesis statistical testing (NHST) is to assume that two populations have

A) means that are equal and then see if sample data will permit you to conclude that they are probably equal
B) means that are equal and then see if sample data will permit you to conclude that they are probably unequal
C) means that are not equal and then see if sample data will permit you to conclude that they are probably unequal
D) means that are not equal and then see if sample data will permit you to conclude that they are probably equal.
Question
Which conclusion is not appropriate when using null hypothesis statistical testing (NHST)?

A) The two sample means probably came from two different populations.
B) The two samples probably came from the same population.
C) Retain the hypothesis that the two samples came from the same population.
D) all of the other alternatives are correct.
Question
This question requires careful thinking. The logic of null hypothesis statistical testing (NHST) involves assuming that

A) two populations have equal means and then using sample data to conclude that they are probably equal
B) two populations have unequal means and then using sample data to conclude that they are probably unequal
C) two populations have equal means and then using sample data to conclude that they are probably unequal
D) two populations have unequal means and then using sample data to conclude that they are probably equal.
Question
Null hypothesis statistical testing (NHST) allows an experimenter to conclude that the null hypothesis is

A) probably false
B) probably true
C) both of the descriptive alternatives are correct
D) neither of the descriptive alternatives is correct.
Question
The null hypothesis is

A) μ\mu 1 = μ\mu 2
B) μ\mu 1 \neq μ\mu 2
C) μ\mu 1 \neqμ\mu 2
D) μ\mu 1 \neq μ\mu 2
E) any of the alternative answers are correct.
Question
The null hypothesis is a statement about

A) populations
B) samples
C) both of the descriptive alternatives are correct
D) neither of the descriptive alternatives is correct.
Question
Which of the following is not an example of the null hypothesis?

A) μ\mu 1 \neqμ\mu 2.
B) μ\mu 1 \neqμ\mu 2..
C) μ\mu 1 \neqμ\mu 2
D) all of the other alternatives are correct..
Question
"There is no difference in the two populations"is a statement of

A) the null hypothesis
B) a one-tailed alternative hypothesis
C) a two-tailed alternative hypothesis
Question
"The difference between the two_________means is zero"is a statement of the null hypothesis.

A) sample
B) population
C) sample or population
D) none of the descriptive alternatives are correct.
Question
Determining whether there is a logical reason to pair two scores in a two-sample experiment is necessary in deciding whether

A) to use a one-tailed or two-tailed test
B) the design is a paired-samples or an independent-samples design
C) to use hypothesis testing or confidence intervals
D) all of the descriptive alternatives are correct.
Question
If you find that there is a logical reason to pair the scores from the two groups in a two-group experiment, you know whether

A) the design is a paired-samples or an independent-samples design
B) to use hypothesis testing or confidence intervals
C) to use a one-tailed or two-tailed test
D) all of the descriptive alternatives are correct.
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Deck 10: Hypothesis Testing, Effect Size, and and Confidence Intervals: Two-Sample Designs
1
The simple experiment described in Chapter 10 compared only two groups.
True
2
In the simple experiment described by your text, the groups were made equivalent with a two step process of matching and review.
False
3
The t test was developed as a way to analyze data from experiments with rats in mazes.
False
4
The two kinds of t tests described in Chapter 10 were independent samples and paired samples.
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5
The denominator of an independent-samples t test is a standard error of a difference.
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6
To be a small effect size, d must be .05 or less.
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7
To capture the size of the difference between two population means, your textbook used an effect size index.
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8
The formula for power is 1 - μ\mu .
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9
Your textbook recommends sample sizes of 30 or more to ensure that the p values from a t test be reliable.
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10
The alternative hypothesis is called the hypothesis of no difference.
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11
In the simple experiment described by your text, the groups were made equivalent with random assignment.
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12
The t test was developed as a way to analyze flavors in taste experiments.
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13
The two kinds of t tests described in Chapter 10 were independent samples and orthogonal samples.
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14
The denominator of a paired-samples t test is a standard error of a difference.
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15
A value of d such as 0.50 indicates a medium effect size.
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16
To capture the size of the difference between two population means, your textbook used confidence intervals.
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17
The formula for power is 1 - μ\mu .
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18
Both α\alpha and N help determine the amount of power a t test has.
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19
Normally distributed populations with equal variances are most likely to give accurate p values for a t test.
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20
The null hypothesis states that the sample means are identical.
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21
In the simple experiment described by your text, extraneous variables were controlled using random assignment.
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22
The t test was developed as a way to determine how well data fit the normal curve.
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23
The two kinds of t tests described in Chapter 10 were power samples and paired samples.
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24
The numerator of an independent-samples t test is a standard error of a difference.
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25
Values of d greater than 1.00 indicate a large effect size.
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26
A confidence interval about a mean difference gives a degree of confidence about the difference between two population means.
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27
The formula for power is 1 - μ\mu .
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28
As the value of p goes down, the value of d goes up.
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29
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-The standard error of the difference for Data Set 10-1 is

A) 2.50
B) 3.69
C) 5.00
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30
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-A t test of Data Set 10-1 would result in a t value of

A) 1.60
B) 0.90
C) 0.61
D) 1.80
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31
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-The proper conclusion for the experiment described in Data Set 10-1 is

A) there was a significant shift in attitudes from conservative to liberal (p < .05)
B) there was a significant shift in attitudes from liberal to conservative (p < .05)
C) there was no significant shift in attitudes.
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32
Data Set 10-1: A college teacher was assigned 4 freshmen advisees. He administered an attitude scale that measured liberalism-conservatism. Four years later, just before graduation, all 4 took the same scale again. High scores indicate conservative attitude. The following scores were obtained.
200620102615222317141510\begin{array} { c c } 2006 & 2010 \\\hline 26 & 15 \\22 & 23 \\17 & 14 \\15 & 10\end{array}

-The effect size index for Data Set 10-1 is

A) 0.45
B) 0.90
C) 3.60
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33
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The study described in Data Set 10-2 is an example of

A) an independent samples design
B) a paired-samples design
C) comparing a sample mean to a known population mean
D) unknown more information is required in order to decide, namely
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34
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The standard error of the difference for Data Set 10-2 is

A) 16.00
B) 4.00
C) 2.00
D) 1.00
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35
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The conclusion from Data Set 10-2 is that those in special education

A) have significantly lower IQs than those not in special education
B) have significantly higher IQs than those not in special education
C) are not significantly different in IQ than those not in special education.
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36
Data Set 10-2: The IQs of a group of special education students were compared to the IQs of their siblings who were not in special education. The following data were obtained.
 Special Ed  Not Special Ed 7010465996795\begin{array} { c c } \text { Special Ed } & \text { Not Special Ed } \\\hline 70 & 104 \\65 & 99 \\67 & 95\end{array}

-The numerical value of the effect size index for Data Set 10-2 is

A) 0. to .50
B) 0.51 to 1.00
C) 1.01 to 3.00
D) 3.01 to 10.00
E) greater than 10.
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37
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The experiment described in Data Set 10-3 is an example of

A) a paired samples design
B) an independent samples design
C) determining the probability that a sample was drawn from a population with a known mean
D) cannot be determined from the information given.
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38
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The standard error of the difference for Data Set 10-3 is

A) 3.34
B) 4.69
C) 4.35
D) 2.17
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39
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The conclusion from Data Set 10-3 is that

A) the more you fast the less you eat
B) the more you fast the more you eat
C) there is no significant difference in the amount eaten if you haven't eaten for 24 or 48 hours
D) additional information is needed namely .
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40
Data Set 10-3: An experimenter matched by weight four pairs of volunteers. One member of each pair was randomly assigned to one of the two groups. One group fasted for 24 hours and the other for 48 hours. Scores below represent the number of ounces of Yummi (very vanilla) consumed during the first 10 minutes after the fast. Test for a difference at the .05 level.
24 hours 48 hours 2618352423173014\begin{array} { c c } 24 \text { hours } & 48 \text { hours } \\\hline 26 & 18 \\35 & 24 \\23 & 17 \\30 & 14\end{array}

-The effect size index for Data Set 10-3 is

A) 0.77
B) 1.53
C) 3.07
D) 2.36
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41
Data Set 10-4: Gerbils were used to assess the effect of Natural Neutral, a drug designed to reduce emotionality in high-drive people. Each of 20 gerbils spent 10 solitary minutes in an open field. The investigator recorded the number of fecal boluses for each animal. Then each animal was given an injection of Natural Neutral and the open field task was repeated. The following data were produced (large numbers indicate high emotionality).
 No Drug  Drug  mean number of boluses 68 standard deviation of boluses 22\begin{array} { l l l } & \text { No Drug } & \text { Drug } \\ \text { mean number of boluses } & 6 & 8 \\\text { standard deviation of boluses } & 2 & 2 \\\end{array}
 correlation coefficient between Drug and No Drug Score =.50\text { correlation coefficient between Drug and No Drug Score } = .50

-The design in Data Set 10-4 is one of

A) paired samples
B) independent samples
C) testing the significance of a correlation
D) none of the other alternatives are correct.
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42
Data Set 10-4: Gerbils were used to assess the effect of Natural Neutral, a drug designed to reduce emotionality in high-drive people. Each of 20 gerbils spent 10 solitary minutes in an open field. The investigator recorded the number of fecal boluses for each animal. Then each animal was given an injection of Natural Neutral and the open field task was repeated. The following data were produced (large numbers indicate high emotionality).
 No Drug  Drug  mean number of boluses 68 standard deviation of boluses 22\begin{array} { l l l } & \text { No Drug } & \text { Drug } \\ \text { mean number of boluses } & 6 & 8 \\\text { standard deviation of boluses } & 2 & 2 \\\end{array}
 correlation coefficient between Drug and No Drug Score =.50\text { correlation coefficient between Drug and No Drug Score } = .50

-The proper conclusion from Data Set 10-4 is that Natural Neutral

A) reduces emotionality
B) increases emotionality
C) has no significant effect on emotionality.
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43
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The experiment described in Data Set 10-5

A) is an independent samples design
B) is a paired samples design
C) isn't given in enough detail to determine the design.
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44
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The t value for Data Set 10-5 is

A) less than 1.00
B) 1.00-1.99
C) 2.00-2.99
D) 3.00-4.00
E) greater than 4.00.
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45
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The proper conclusion for Data Set 10-5 is that the leisurely schedule results in productivity that is

A) significantly greater than a rushed schedule
B) significantly less than a rushed schedule
C) not significantly different from a rushed schedule
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46
Data Set 10-5: This experiment is modeled after part of the data needed to demonstrate the Hawthorne Effect. Four assembly-line workers, who normally had two coffee breaks and an hour for lunch, participated in a week-long experiment in which they gave up both coffee breaks and half their lunch hour. Productivity (units produced per hour) for these four was measured under both conditions and is shown below.  Productivity/hour  Leisurely Schedule  Rushed Schedule 66354556\begin{array} { c c } { \text { Productivity/hour } } \\\text { Leisurely Schedule } & \text { Rushed Schedule } \\\hline 6 & 6 \\3 & 5 \\4 & 5 \\5 & 6\end{array}

-The effect size index for Data Set 10-5 is

A) 1.23
B) 2.04
C) 2.45
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47
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The study described in Data Set 10-6 is an example of

A) an independent-samples design
B) a paired-samples design
C) comparing a sample mean to a known population mean
D) unknown more information is required in order to decide, namely
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48
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The standard error of the difference for Data Set 10-6 is

A) 5.94
B) 2.00
C) 1.63
D) 1.16
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49
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The conclusion from Data Set 10-6 (which is the same arrived at by some of the actual research) is that schizophrenics

A) have significantly more dopamine than the control group
B) have significantly less dopamine than the control group
C) and control groups don't differ significantly in dopamine.
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50
Data Set 10-6: Drugs used in treating schizophrenia all block the reception of dopamine by neurons. (Dopamine is a neurotransmitter, which, when released by the axons of one nerve, inhibits the firing of the next nerve.) This fact led to the idea that schizophrenia occurs when too much dopamine is produced. Suppose the following data on dopamine production were obtained.
 Schizophrenics  Control Group 423331272918\begin{array} { c c } \text { Schizophrenics } & \text { Control Group } \\\hline 42 & 33 \\31 & 27 \\29 & 18\end{array}

-The effect size index for Data Set 10-6 is

A) 0.26
B) 0.78
C) 1.55
D) 2.58
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51
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-The design of the study described in Data Set 10-7 is

A) independent samples
B) paired samples
C) comparing a sample mean to a population mean
D) not enough information is given.
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52
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-The standard error of the difference of the data in Data Set 10-7 is

A) 6.25
B) 1.87
C) 0.625
D) 2.50
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53
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-Which of the following conclusions is proper for Data Set 10-7?

A) The Hatfields had a significantly higher injury score than the McCoys
B) The McCoys had a significantly higher injury score than the Hatfields
C) There was no significant difference between the Hatfields and the McCoys
D) Not enough information is contained in Data Set 10-7 to support one of the other alternatives.
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54
Data Set 10-7: In that long standing feud between the Hatfields and the McCoys, Old Doc Sawbones has been keeping score. During the last 16 years he noted in his feudian notebook a "degree of injury"
measure each time he patched up, sewed up, or made a coroner's report on anyone in the two families. Summary statistics were:
 Hatfields  McCoys Xˉ4134S^68N1616\begin{array} { c c c } & \text { Hatfields } & \text { McCoys } \\\bar { X } & 41 & 34 \\\hat { S } & 6 & 8 \\N & 16 & 16\end{array}

-The effect size index for Data Set 10-7 is

A) 0.70
B) 0.99
C) 1.40
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55
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The experimenter described in Data Set 10-8 is an example of

A) a paired samples design
B) an independent samples design
C) determining the probability that a sample was drawn from a population with a known mean
D) cannot be determined from the information given.
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56
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The standard error of difference for Data Set 10-8 is

A) 0.374
B) 0.837
C) 1.871
D) 3.50
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57
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The proper conclusion from Data Set 10-8 is that

A) aloe reduces emotionality more than vera
B) vera reduces emotionality more than aloe
C) there is no significant difference in the effect of the two drugs on emotionality
D) there is a significant change in emotionality, but the direction cannot be determined.
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58
Data Set 10-8: Drugs that reduce emotionality make big money for drug companies. These drugs undergo extensive testing, some of which is done with animals. One common test of emotionality in rats is the number of fecal boluses that are dropped when an animal is left for 10 minutes in an open field (a 4' x 4' space). Greater emotionality is indicated by more boluses. Imagine that two drugs, aloe and vera were compared. Five rats were given aloe and five were given vera. The numbers below represent the number of boluses dropped in the open field.  Aloe  Vera 421297610764\begin{array} { r l } \text { Aloe } & \text { Vera } \\\hline 4 & 2 \\12 & 9 \\7 & 6 \\10 & 7 \\6 & 4\end{array}

-The effect size index for Data Set 10-8 is

A) 2.62
B) 1.18
C) 0.70
D) 1.05
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59
For a simple experiment, which of the following is true?

A) As a null hypothesis, assume that the two groups represent different populations.
B) Apply the dependent variable to both groups and then measure the changes in the independent variable.
C) Find the probability that the two samples are from different populations by using a t distribution.
D) Treat both groups exactly alike except for one thing.
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60
The book's description of an experiment included the phrase, "treat them exactly alike except for one thing."The italicized phrases are related to a(n)_________ variable and a(n)_________ variable, respectively.

A) independent, dependent
B) dependent, independent
C) extraneous, independent
D) dependent, extraneous.
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61
In a simple experiment, treat two groups exactly the same except for one thing and then measure the individuals in both groups on some scale. Treating the two groups differently on the one thing constitutes

A) the independent variable
B) the dependent variable
C) an extraneous variable
D) none of the other alternatives are correct.
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62
Which of these phrases is not like the others? Which of these phrases doesn't belong with the other three?

A) independent variable
B) dependent variable
C) experimental group
D) treatment.
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63
Which of these phrases doesn't belong with the other three?

A) extraneous variable
B) independent variable
C) treatment
D) experimental group.
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64
With an acknowledgment to Sesame Street, "Which of these things is not like the others, which of these things doesn't belong?"

A) repeated measures
B) natural pairs
C) independent samples
D) matched pairs.
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65
According to your text, the reason we do experiments is to be able to tell

A) whether all extraneous variables were controlled
B) whether the samples were representative of the population
C) how scores on the dependent variable are affected by the independent variable
D) all of the other alternatives are correct.
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66
The notion of generalizing from an experiment to a population was described by your text as the of an experiment.

A) prima facie
B) quid pro quid
C) modus tollens
D) raison d'etre.
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67
According to your text is the reason for doing an experiment.

A) performing an inferential statistics test
B) being able to make statements that are more inclusive than those possible from the sample alone
C) determining just what the facts are in the case at hand
D) determining what percent of the results is due to chance.
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68
Null hypothesis statistical testing (NHST) allows you to conclude that the null hypothesis is

A) probably true
B) true
C) probably false
D) any of the other alternatives, depending on the value of p.
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69
The logic of null hypothesis statistical testing (NHST) is to

A) assume that two populations have equal means and then demonstrate that they areprobably equal
B) assume that two populations have unequal means and then demonstrate that they areprobably unequal
C) assume that two populations have equal means and then demonstrate that they areprobably unequal
D) assume that two populations have unequal means and then demonstrate that they areprobably equal.
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70
The logic of null hypothesis statistical testing (NHST) is to assume that two populations have

A) means that are equal and then see if sample data will permit you to conclude that they are probably equal
B) means that are equal and then see if sample data will permit you to conclude that they are probably unequal
C) means that are not equal and then see if sample data will permit you to conclude that they are probably unequal
D) means that are not equal and then see if sample data will permit you to conclude that they are probably equal.
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Unlock for access to all 206 flashcards in this deck.
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71
Which conclusion is not appropriate when using null hypothesis statistical testing (NHST)?

A) The two sample means probably came from two different populations.
B) The two samples probably came from the same population.
C) Retain the hypothesis that the two samples came from the same population.
D) all of the other alternatives are correct.
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72
This question requires careful thinking. The logic of null hypothesis statistical testing (NHST) involves assuming that

A) two populations have equal means and then using sample data to conclude that they are probably equal
B) two populations have unequal means and then using sample data to conclude that they are probably unequal
C) two populations have equal means and then using sample data to conclude that they are probably unequal
D) two populations have unequal means and then using sample data to conclude that they are probably equal.
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Unlock for access to all 206 flashcards in this deck.
Unlock Deck
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73
Null hypothesis statistical testing (NHST) allows an experimenter to conclude that the null hypothesis is

A) probably false
B) probably true
C) both of the descriptive alternatives are correct
D) neither of the descriptive alternatives is correct.
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Unlock for access to all 206 flashcards in this deck.
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74
The null hypothesis is

A) μ\mu 1 = μ\mu 2
B) μ\mu 1 \neq μ\mu 2
C) μ\mu 1 \neqμ\mu 2
D) μ\mu 1 \neq μ\mu 2
E) any of the alternative answers are correct.
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Unlock for access to all 206 flashcards in this deck.
Unlock Deck
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75
The null hypothesis is a statement about

A) populations
B) samples
C) both of the descriptive alternatives are correct
D) neither of the descriptive alternatives is correct.
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Unlock for access to all 206 flashcards in this deck.
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76
Which of the following is not an example of the null hypothesis?

A) μ\mu 1 \neqμ\mu 2.
B) μ\mu 1 \neqμ\mu 2..
C) μ\mu 1 \neqμ\mu 2
D) all of the other alternatives are correct..
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77
"There is no difference in the two populations"is a statement of

A) the null hypothesis
B) a one-tailed alternative hypothesis
C) a two-tailed alternative hypothesis
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78
"The difference between the two_________means is zero"is a statement of the null hypothesis.

A) sample
B) population
C) sample or population
D) none of the descriptive alternatives are correct.
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Unlock Deck
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79
Determining whether there is a logical reason to pair two scores in a two-sample experiment is necessary in deciding whether

A) to use a one-tailed or two-tailed test
B) the design is a paired-samples or an independent-samples design
C) to use hypothesis testing or confidence intervals
D) all of the descriptive alternatives are correct.
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Unlock for access to all 206 flashcards in this deck.
Unlock Deck
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80
If you find that there is a logical reason to pair the scores from the two groups in a two-group experiment, you know whether

A) the design is a paired-samples or an independent-samples design
B) to use hypothesis testing or confidence intervals
C) to use a one-tailed or two-tailed test
D) all of the descriptive alternatives are correct.
Unlock Deck
Unlock for access to all 206 flashcards in this deck.
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Unlock Deck
Unlock for access to all 206 flashcards in this deck.
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