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Deck 10: T Tests, Two-Way Tables, and Anova

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Question
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence interval for the population mean. If the sample size is 11, the sample mean x is 32, and the sample standard deviation s is 12.6, what is the margin of error? Show your answer to 2 decimal places.
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Question
-The t distribution can be used when finding a confidence interval for the population mean whenever the sample size is small.<div style=padding-top: 35px>

-The t distribution can be used when finding a confidence interval for the population mean whenever the sample size is small.
Question
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence interval for the population mean. If the sample size is 8, the sample mean x is 22, and the sample standard deviation s is 6.3, what is the margin of error? Show your answer to 2 decimal places.
Question
The partial t-table below can be used where necessary.
The partial t-table below can be used where necessary. -The t distribution can be used when finding a confidence interval for the mean with a small sample whenever the data comprise a simple random sample.<div style=padding-top: 35px>

-The t distribution can be used when finding a confidence interval for the mean with a small sample whenever the data comprise a simple random sample.
Question
-Data from the test in Problem 5 resulted in a sample mean of 163.2 yards with a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05<div style=padding-top: 35px>

-Data from the test in Problem 5 resulted in a sample mean of 163.2 yards with a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05
Question
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-Find the value of the ?2 statistic for the data .
Question
One hundred people are selected at random and tested for colorblindness to determine whether gender and colorblindness are independent. The following counts were observed.

 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}
If gender and colorblindness are independent, find the expected values corresponding to the four combinations of gender and colorblindness, and enter them in the table below along with row and column totals.

 Colorblind  Not Colorblind  Total  Male  Female  Total \begin{array}{|l|l|l|l|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & & & \\\hline \text { Female } & & & \\\hline \text { Total } & & & \\\hline\end{array}
Question
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-State the null and alternative hypothesis for the test associated with the data
Question
A 95% confidence interval for the mean of a normal population is found to be 15.6 < µ < 25.2. What is the margin of error?
Question
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-The critical value of ?2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the ?2 statistic iS 3.427, state your conclusion about the relationship between gender and colorblindness.
Question
A 95% confidence interval for the mean of a normal population is found to be 13.2 < µ < 22.4. What is the margin of error?
Question
The analysis of the data in Problem 9 resulted in the following output from Excel.
Anova: Single Factor

 SUMMARY \text { SUMMARY }
 Groups  Count  Sum  Average  Variance A411929.7512.25B41002513.33333C49423.527\begin{array}{lrrrr}\hline\text { Groups }&\text { Count } &{\text { Sum }} & {\text { Average }} &{\text { Variance }} \\\hline A&4 & 119 & 29.75 & 12.25 \\B&4 & 100 & 25 & 13.33333 \\C&4 & 94 & 23.5 & 27 \\\hline\end{array}

 ANOVA  Source of Variation  SS dfMSF P-value  F crit  Between Groups 85.16667242.583332.4294770.1433194.256492 Within Groups 157.75917.52778 Total242.916711\begin{array}{lrrrrrr}\text { ANOVA }\\\hline \text { Source of Variation } & \text { SS } & d f & M S & F & \text { P-value } & \text { F crit } \\\hline\text { Between Groups } & 85.16667 & 2 & 42.58333 & 2.429477 & 0.143319 & 4.256492 \\\text { Within Groups } & 157.75 & 9 & 17.52778 & & &\\\\\text { Total}& 242.9167&11\\\end{array}

If the significance level for the test is 0.05, which conclusion below is correct?

A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
Question
 Colorblind  Not Colorblind  Total  Male 75360 Female 13940 Total 892100\begin{array} { | l | c | c | c | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 7 & 53 & 60 \\\hline \text { Female } & 1 & 39 & 40 \\\hline \text { Total } & 8 & 92 & 100 \\\hline\end{array}

-Find the value of the ?2 statistic for the data
Question
The following data were analyzed using one-way analysis of variance.
ABC342719262331312922282122\begin{array} { c c c } \mathrm { A } & \mathrm { B } & \mathrm { C } \\\hline 34 & 27 & 19 \\26 & 23 & 31 \\31 & 29 & 22 \\28 & 21 & 22\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
Question
A golfer wished to find a ball that would travel more than 160 yards when hit with his 7-iron with a club speed of 90 miles per hour. He had a golf equipment lab test a low compression ball by having a robot swing his club 8 times at the required speed. State the null and alternative hypotheses for this test.
Question
One hundred people are selected at random and tested for colorblindness to determine whether gender and colorblindness are independent. The following counts were observed.
 Colorblind  Not Colorblind  Total  Male 75360 Female 13940 Total 892100\begin{array} { | l | c | c | c | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 7 & 53 & 60 \\\hline \text { Female } & 1 & 39 & 40 \\\hline \text { Total } & 8 & 92 & 100 \\\hline\end{array}
If gender and colorblindness are independent, find the expected values corresponding to the four combinations of gender and colorblindness, and enter them in the table below along with row and column totals.
 Colorblind  Not Colorblind  Total  Male  Female  Total \begin{array} { | l | l | l | l | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & & & \\\hline \text { Female } & & & \\\hline \text { Total } & & & \\\hline\end{array}
Question
-Resulted in a sample mean of 171.6 yards with a sample standard deviation of 2.4 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance<div style=padding-top: 35px>

-Resulted in a sample mean of 171.6 yards with a sample standard deviation of 2.4 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance
Question
The following data were analyzed using one-way analysis of variance.  A  B  C 242719262331312922282122\begin{array} { c c c } \text { A } & \text { B } & \text { C } \\\hline 24 & 27 & 19 \\26 & 23 & 31 \\31 & 29 & 22 \\28 & 21 & 22\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
Question
A golfer wished to find a ball that would travel more than 170 yards when hit with his 6-iron with a club head speed of 90 miles per hour. He had a golf equipment lab test a low compression ball by having a robot swing his club 12 times at the required speed. State the null and alternative hypotheses for this test.
Question
 Colorblind  Not Colorblind  Total  Male 75360 Female 13940 Total 892100\begin{array} { | l | c | c | c | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 7 & 53 & 60 \\\hline \text { Female } & 1 & 39 & 40 \\\hline \text { Total } & 8 & 92 & 100 \\\hline\end{array}

-The critical value of ? 2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the ? 2 statistic is 3.179, state your conclusion about the relationship between gender and colorblindness.
Question
The critical value of χ2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the
χ2 statistic in Problem 8 had been 4.216, state your conclusion about the relationship between
gender and colorblindness.
Question
The margin of error in estimating the population mean of a normal population is E = 6.3 when the sample standard deviation is 8.2. If the sample standard deviation were increased to 9.1 and the sample size stayed the same, would the margin of error be larger or smaller than 6.3? Explain your answer.
Question
The following data were analyzed using one-way analysis of variance.  A  B  C 342719262321312922282112\begin{array} { c c c } \text { A } & \text { B } & \text { C } \\\hline 34 & 27 & 19 \\26 & 23 & 21 \\31 & 29 & 22 \\28 & 21 & 12\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
Question
-Resulted in a sample mean of 184.2 yards and a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance<div style=padding-top: 35px>

-Resulted in a sample mean of 184.2 yards and a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance
Question
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence interval for the population mean. If the sample size is 12, the sample mean x
is 22, and the sample standard deviation s is 5.5, what is the margin of error? Show your answer to 2 decimal places.
Question
The following data were analyzed using one-way analysis of variance.  A  B  C 292719262321252925282117\begin{array} { c c c } \text { A } & \text { B } & \text { C } \\\hline 29 & 27 & 19 \\26 & 23 & 21 \\25 & 29 & 25 \\28 & 21 & 17\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
Question
A 95% confidence interval for the mean of a normal population is found to be 15.6 < µ < 24.8. What is the margin of error?
Question
The analysis of the data in Problem 9 resulted in the following output from Excel.

Anova: Single Factor

 SUMMARY \text { SUMMARY }
 Groups  Count  Sum  Average  Variance A4108273.333333B41002513.33333C48220.511.66667\begin{array}{lrrrr}\hline\text { Groups }&\text { Count } &{\text { Sum }} & {\text { Average }} &{\text { Variance }} \\\hline A&4 & 108 &27 & 3.333333 \\B&4 & 100 & 25 & 13.33333 \\C&4 &82 & 20.5 & 11.66667 \\\hline\end{array}

 ANOVA  Source of Variation  SS dfMSF P-value  F crit  Between Groups 88.66667244.333334.6941180.0401484.256492 Within Groups 8599.444444 Total173.666711\begin{array}{lrrrrrr}\text { ANOVA }\\\hline \text { Source of Variation } & \text { SS } & d f & M S & F & \text { P-value } & \text { F crit } \\\hline\text { Between Groups } & 88.66667& 2 & 44.33333&4.694118 &0.040148 & 4.256492\\\text { Within Groups } & 85& 9 & 9.444444 & & &\\\\\text { Total}& 173.6667&11\\\hline\end{array}

If the significance level for the test is 0.05, which conclusion below is correct?

A) The data provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
Question
A 95% confidence interval for the mean of a normal population is found to be 17.6 < µ < 23.6.
What is the margin of error?
Question
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence
interval for the population mean. If the sample size is 12, the sample mean x
is 32, and the
sample standard deviation s is 7.5, what is the margin of error? Show your answer to 2 decimal
places.
Question
State the null and alternative hypothesis for the test associated with the data in Problem 7.
Question
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-The critical value of ?2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the ?2 statistic is 4.613, state your conclusion about the relationship between gender and colorblindness.
Question
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-State the null and alternative hypothesis for the test associated with the data.
Question
One hundred people are selected at random and tested for colorblindness to determine whether
gender and colorblindness are independent. The following counts were observed.
Colorblind Not Colorblind Total  Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

If gender and colorblindness are independent, find the expected values corresponding to the four combinations of gender and colorblindness, and enter them in the following table along with row

 Colorblind  Not Colorblind  Total  Male  Female  Total \begin{array}{|l|l|l|l|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & & & \\\hline \text { Female } & & & \\\hline \text { Total } & & & \\\hline\end{array}
Question
The t distribution can be used when finding a confidence interval for the population mean
with a small sample whenever the sample comes from a symmetric population.
Question
level and determine whether the ball meets the golfer's requirements. Use the partial t-table
above.
One hundred people are selected at random and tested for colorblindness to determine whether
gender and colorblindness are independent. The following counts were observed. level and determine whether the ball meets the golfer's requirements. Use the partial t-table above. One hundred people are selected at random and tested for colorblindness to determine whether gender and colorblindness are independent. The following counts were observed. <div style=padding-top: 35px>
Question
Find the value of the χ2 statistic for the data in Problem 7.
131
Question
-The t distribution can be used when finding a confidence interval for the population mean with a small sample anytime the population standard deviation is unknown.<div style=padding-top: 35px>

-The t distribution can be used when finding a confidence interval for the population mean with a small sample anytime the population standard deviation is unknown.
Question
A golfer wished to find a ball that would travel more than 180 yards when hit with his 5-iron witha club speed of 90 miles per hour. He had a golf equipment lab test a low compression ball by having a robot swing his club 7 times at the required speed. State the null and alternative hypotheses for this test.
Question
The analysis of the data in Problem 9 resulted in the following output from Excel.

Anova: Single Factor

 SUMMARY \text { SUMMARY }
 Groups  Count  Sum  Average  Variance A410927.258.916667B41002513.33333C49423.527\begin{array}{lrrrr}\hline\text { Groups }&\text { Count } &{\text { Sum }} & {\text { Average }} &{\text { Variance }} \\\hline A&4 & 109 &27.25 & 8.916667 \\B&4 & 100 & 25 & 13.33333 \\C&4 & 94 & 23.5 & 27 \\\hline\end{array}

 ANOVA  Source of Variation  SS dfMSF P-value  F crit  Between Groups 28.5214.250.868020.4521614.256492 Within Groups 147.75916.41667 Total176.2511\begin{array}{lrrrrrr}\text { ANOVA }\\\hline \text { Source of Variation } & \text { SS } & d f & M S & F & \text { P-value } & \text { F crit } \\\hline\text { Between Groups } & 28.5 & 2 & 14.25 &0.86802 &0.452161 & 4.256492 \\\text { Within Groups } & 147.75 & 9 & 16.41667 & & &\\\\\text { Total}& 176.25&11\\\hline\end{array}

If the significance level for the test is 0.05, which conclusion below is correct?

A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
Question
The analysis of the data in Problem 9 resulted in the following output from Excel. Anova: Single Factor <strong>The analysis of the data in Problem 9 resulted in the following output from Excel. Anova: Single Factor If the significance level for the test is 0.05, which conclusion below is correct?</strong> A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related. B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different. C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different. D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different. E) None of the above. <div style=padding-top: 35px> If the significance level for the test is 0.05, which conclusion below is correct?

A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
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Deck 10: T Tests, Two-Way Tables, and Anova
1
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence interval for the population mean. If the sample size is 11, the sample mean x is 32, and the sample standard deviation s is 12.6, what is the margin of error? Show your answer to 2 decimal places.
df=8;E=2.22812.611=8.46\mathrm { df } = 8 ; E = 2.228 \frac { 12.6 } { \sqrt { 11 } } = 8.46
2
-The t distribution can be used when finding a confidence interval for the population mean whenever the sample size is small.

-The t distribution can be used when finding a confidence interval for the population mean whenever the sample size is small.
False
3
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence interval for the population mean. If the sample size is 8, the sample mean x is 22, and the sample standard deviation s is 6.3, what is the margin of error? Show your answer to 2 decimal places.
df=7;E=2.3656.38=5.869\mathrm { df } = 7 ; E = 2.365 \frac { 6.3 } { \sqrt { 8 } } = 5.869
4
The partial t-table below can be used where necessary.
The partial t-table below can be used where necessary. -The t distribution can be used when finding a confidence interval for the mean with a small sample whenever the data comprise a simple random sample.

-The t distribution can be used when finding a confidence interval for the mean with a small sample whenever the data comprise a simple random sample.
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5
-Data from the test in Problem 5 resulted in a sample mean of 163.2 yards with a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05

-Data from the test in Problem 5 resulted in a sample mean of 163.2 yards with a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05
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6
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-Find the value of the ?2 statistic for the data .
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7
One hundred people are selected at random and tested for colorblindness to determine whether gender and colorblindness are independent. The following counts were observed.

 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}
If gender and colorblindness are independent, find the expected values corresponding to the four combinations of gender and colorblindness, and enter them in the table below along with row and column totals.

 Colorblind  Not Colorblind  Total  Male  Female  Total \begin{array}{|l|l|l|l|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & & & \\\hline \text { Female } & & & \\\hline \text { Total } & & & \\\hline\end{array}
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8
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-State the null and alternative hypothesis for the test associated with the data
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9
A 95% confidence interval for the mean of a normal population is found to be 15.6 < µ < 25.2. What is the margin of error?
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10
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-The critical value of ?2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the ?2 statistic iS 3.427, state your conclusion about the relationship between gender and colorblindness.
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11
A 95% confidence interval for the mean of a normal population is found to be 13.2 < µ < 22.4. What is the margin of error?
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12
The analysis of the data in Problem 9 resulted in the following output from Excel.
Anova: Single Factor

 SUMMARY \text { SUMMARY }
 Groups  Count  Sum  Average  Variance A411929.7512.25B41002513.33333C49423.527\begin{array}{lrrrr}\hline\text { Groups }&\text { Count } &{\text { Sum }} & {\text { Average }} &{\text { Variance }} \\\hline A&4 & 119 & 29.75 & 12.25 \\B&4 & 100 & 25 & 13.33333 \\C&4 & 94 & 23.5 & 27 \\\hline\end{array}

 ANOVA  Source of Variation  SS dfMSF P-value  F crit  Between Groups 85.16667242.583332.4294770.1433194.256492 Within Groups 157.75917.52778 Total242.916711\begin{array}{lrrrrrr}\text { ANOVA }\\\hline \text { Source of Variation } & \text { SS } & d f & M S & F & \text { P-value } & \text { F crit } \\\hline\text { Between Groups } & 85.16667 & 2 & 42.58333 & 2.429477 & 0.143319 & 4.256492 \\\text { Within Groups } & 157.75 & 9 & 17.52778 & & &\\\\\text { Total}& 242.9167&11\\\end{array}

If the significance level for the test is 0.05, which conclusion below is correct?

A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
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13
 Colorblind  Not Colorblind  Total  Male 75360 Female 13940 Total 892100\begin{array} { | l | c | c | c | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 7 & 53 & 60 \\\hline \text { Female } & 1 & 39 & 40 \\\hline \text { Total } & 8 & 92 & 100 \\\hline\end{array}

-Find the value of the ?2 statistic for the data
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14
The following data were analyzed using one-way analysis of variance.
ABC342719262331312922282122\begin{array} { c c c } \mathrm { A } & \mathrm { B } & \mathrm { C } \\\hline 34 & 27 & 19 \\26 & 23 & 31 \\31 & 29 & 22 \\28 & 21 & 22\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
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15
A golfer wished to find a ball that would travel more than 160 yards when hit with his 7-iron with a club speed of 90 miles per hour. He had a golf equipment lab test a low compression ball by having a robot swing his club 8 times at the required speed. State the null and alternative hypotheses for this test.
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16
One hundred people are selected at random and tested for colorblindness to determine whether gender and colorblindness are independent. The following counts were observed.
 Colorblind  Not Colorblind  Total  Male 75360 Female 13940 Total 892100\begin{array} { | l | c | c | c | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 7 & 53 & 60 \\\hline \text { Female } & 1 & 39 & 40 \\\hline \text { Total } & 8 & 92 & 100 \\\hline\end{array}
If gender and colorblindness are independent, find the expected values corresponding to the four combinations of gender and colorblindness, and enter them in the table below along with row and column totals.
 Colorblind  Not Colorblind  Total  Male  Female  Total \begin{array} { | l | l | l | l | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & & & \\\hline \text { Female } & & & \\\hline \text { Total } & & & \\\hline\end{array}
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17
-Resulted in a sample mean of 171.6 yards with a sample standard deviation of 2.4 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance

-Resulted in a sample mean of 171.6 yards with a sample standard deviation of 2.4 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance
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18
The following data were analyzed using one-way analysis of variance.  A  B  C 242719262331312922282122\begin{array} { c c c } \text { A } & \text { B } & \text { C } \\\hline 24 & 27 & 19 \\26 & 23 & 31 \\31 & 29 & 22 \\28 & 21 & 22\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
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19
A golfer wished to find a ball that would travel more than 170 yards when hit with his 6-iron with a club head speed of 90 miles per hour. He had a golf equipment lab test a low compression ball by having a robot swing his club 12 times at the required speed. State the null and alternative hypotheses for this test.
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20
 Colorblind  Not Colorblind  Total  Male 75360 Female 13940 Total 892100\begin{array} { | l | c | c | c | } \hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 7 & 53 & 60 \\\hline \text { Female } & 1 & 39 & 40 \\\hline \text { Total } & 8 & 92 & 100 \\\hline\end{array}

-The critical value of ? 2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the ? 2 statistic is 3.179, state your conclusion about the relationship between gender and colorblindness.
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21
The critical value of χ2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the
χ2 statistic in Problem 8 had been 4.216, state your conclusion about the relationship between
gender and colorblindness.
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22
The margin of error in estimating the population mean of a normal population is E = 6.3 when the sample standard deviation is 8.2. If the sample standard deviation were increased to 9.1 and the sample size stayed the same, would the margin of error be larger or smaller than 6.3? Explain your answer.
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23
The following data were analyzed using one-way analysis of variance.  A  B  C 342719262321312922282112\begin{array} { c c c } \text { A } & \text { B } & \text { C } \\\hline 34 & 27 & 19 \\26 & 23 & 21 \\31 & 29 & 22 \\28 & 21 & 12\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
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24
-Resulted in a sample mean of 184.2 yards and a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance

-Resulted in a sample mean of 184.2 yards and a sample standard deviation of 5.8 yards. Assuming normality, carry out a hypothesis test at the 0.05 significance
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25
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence interval for the population mean. If the sample size is 12, the sample mean x
is 22, and the sample standard deviation s is 5.5, what is the margin of error? Show your answer to 2 decimal places.
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26
The following data were analyzed using one-way analysis of variance.  A  B  C 292719262321252925282117\begin{array} { c c c } \text { A } & \text { B } & \text { C } \\\hline 29 & 27 & 19 \\26 & 23 & 21 \\25 & 29 & 25 \\28 & 21 & 17\end{array} ` Which one of the following statements is correct?

A) The purpose of the analysis is to determine whether the groups A, B, and C are independent.
B) The purpose of the analysis is to test the hypothesis that the population means of the three groups are equal.
C) The purpose of the analysis is to test the hypothesis that the population variances of the three groups are equal.
D) The purpose of the analysis is to test the hypothesis that the sample means of the three groups are equal.
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27
A 95% confidence interval for the mean of a normal population is found to be 15.6 < µ < 24.8. What is the margin of error?
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28
The analysis of the data in Problem 9 resulted in the following output from Excel.

Anova: Single Factor

 SUMMARY \text { SUMMARY }
 Groups  Count  Sum  Average  Variance A4108273.333333B41002513.33333C48220.511.66667\begin{array}{lrrrr}\hline\text { Groups }&\text { Count } &{\text { Sum }} & {\text { Average }} &{\text { Variance }} \\\hline A&4 & 108 &27 & 3.333333 \\B&4 & 100 & 25 & 13.33333 \\C&4 &82 & 20.5 & 11.66667 \\\hline\end{array}

 ANOVA  Source of Variation  SS dfMSF P-value  F crit  Between Groups 88.66667244.333334.6941180.0401484.256492 Within Groups 8599.444444 Total173.666711\begin{array}{lrrrrrr}\text { ANOVA }\\\hline \text { Source of Variation } & \text { SS } & d f & M S & F & \text { P-value } & \text { F crit } \\\hline\text { Between Groups } & 88.66667& 2 & 44.33333&4.694118 &0.040148 & 4.256492\\\text { Within Groups } & 85& 9 & 9.444444 & & &\\\\\text { Total}& 173.6667&11\\\hline\end{array}

If the significance level for the test is 0.05, which conclusion below is correct?

A) The data provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
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29
A 95% confidence interval for the mean of a normal population is found to be 17.6 < µ < 23.6.
What is the margin of error?
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30
A simple random sample from a normal distribution is taken in order to obtain a 95% confidence
interval for the population mean. If the sample size is 12, the sample mean x
is 32, and the
sample standard deviation s is 7.5, what is the margin of error? Show your answer to 2 decimal
places.
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31
State the null and alternative hypothesis for the test associated with the data in Problem 7.
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32
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-The critical value of ?2 for a 2 x 2 table using a 0.05 significance level is 3.841. If the value of the ?2 statistic is 4.613, state your conclusion about the relationship between gender and colorblindness.
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33
 Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

-State the null and alternative hypothesis for the test associated with the data.
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34
One hundred people are selected at random and tested for colorblindness to determine whether
gender and colorblindness are independent. The following counts were observed.
Colorblind Not Colorblind Total  Colorblind  Not Colorblind  Total  Male 85260 Female 23840 Total 1090100\begin{array}{|l|c|c|c|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & 8 & 52 & 60 \\\hline \text { Female } & 2 & 38 & 40 \\\hline \text { Total } & 10 & 90 & 100 \\\hline\end{array}

If gender and colorblindness are independent, find the expected values corresponding to the four combinations of gender and colorblindness, and enter them in the following table along with row

 Colorblind  Not Colorblind  Total  Male  Female  Total \begin{array}{|l|l|l|l|}\hline & \text { Colorblind } & \text { Not Colorblind } & \text { Total } \\\hline \text { Male } & & & \\\hline \text { Female } & & & \\\hline \text { Total } & & & \\\hline\end{array}
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35
The t distribution can be used when finding a confidence interval for the population mean
with a small sample whenever the sample comes from a symmetric population.
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36
level and determine whether the ball meets the golfer's requirements. Use the partial t-table
above.
One hundred people are selected at random and tested for colorblindness to determine whether
gender and colorblindness are independent. The following counts were observed. level and determine whether the ball meets the golfer's requirements. Use the partial t-table above. One hundred people are selected at random and tested for colorblindness to determine whether gender and colorblindness are independent. The following counts were observed.
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37
Find the value of the χ2 statistic for the data in Problem 7.
131
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38
-The t distribution can be used when finding a confidence interval for the population mean with a small sample anytime the population standard deviation is unknown.

-The t distribution can be used when finding a confidence interval for the population mean with a small sample anytime the population standard deviation is unknown.
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39
A golfer wished to find a ball that would travel more than 180 yards when hit with his 5-iron witha club speed of 90 miles per hour. He had a golf equipment lab test a low compression ball by having a robot swing his club 7 times at the required speed. State the null and alternative hypotheses for this test.
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40
The analysis of the data in Problem 9 resulted in the following output from Excel.

Anova: Single Factor

 SUMMARY \text { SUMMARY }
 Groups  Count  Sum  Average  Variance A410927.258.916667B41002513.33333C49423.527\begin{array}{lrrrr}\hline\text { Groups }&\text { Count } &{\text { Sum }} & {\text { Average }} &{\text { Variance }} \\\hline A&4 & 109 &27.25 & 8.916667 \\B&4 & 100 & 25 & 13.33333 \\C&4 & 94 & 23.5 & 27 \\\hline\end{array}

 ANOVA  Source of Variation  SS dfMSF P-value  F crit  Between Groups 28.5214.250.868020.4521614.256492 Within Groups 147.75916.41667 Total176.2511\begin{array}{lrrrrrr}\text { ANOVA }\\\hline \text { Source of Variation } & \text { SS } & d f & M S & F & \text { P-value } & \text { F crit } \\\hline\text { Between Groups } & 28.5 & 2 & 14.25 &0.86802 &0.452161 & 4.256492 \\\text { Within Groups } & 147.75 & 9 & 16.41667 & & &\\\\\text { Total}& 176.25&11\\\hline\end{array}

If the significance level for the test is 0.05, which conclusion below is correct?

A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
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41
The analysis of the data in Problem 9 resulted in the following output from Excel. Anova: Single Factor <strong>The analysis of the data in Problem 9 resulted in the following output from Excel. Anova: Single Factor If the significance level for the test is 0.05, which conclusion below is correct?</strong> A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related. B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different. C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different. D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different. E) None of the above. If the significance level for the test is 0.05, which conclusion below is correct?

A) The data do not provide sufficient evidence to conclude that the groups A, B, and C are somehow related.
B) The data do not provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
C) The data do not provide sufficient evidence to conclude that the population variances of groups A, B, and C are different.
D) The data do provide sufficient evidence to conclude that the population means of groups A, B, and C are different.
E) None of the above.
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