To make: A stem plot for the distribution of body temperature of 20 healthy adults.

Question

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Answer 1

Question

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

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Answer 2

Question

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Question

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Question

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

Answer 6

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

Answer 7

Chapter 19, Problem 19.55SE

a.

To determine

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

Answer 8

a.

Expert Solution

Answer to Problem 19.55SE

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 1

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given info:

The data represent average body temperatures for 20 healthy adults daily.

Calculation:

Software procedure:

Step-by-step software procedure to draw stemplot using the MINITAB software is as follows:

Select Graph > Stem and leaf.
Select the column of Degrees in Graph variables.
Select OK.

Observation:

Symmetric distribution:

When the left and right sides of the distribution are approximately equal or mirror images of each other, then it is symmetric distribution.

In the stemplot, the observations of the data set are extended approximately equal to the left and to the right in bell shape. Thus, the distribution of daily average temperatures is approximately normal.

The 1.5×IQR rule for outliers:

A observation is a suspected outlier, if it is more than Q3+(1.5×IQR) or less than Q1−(1.5×IQR) .

Software procedure:

Step-by-step software procedure for first quartile and third quartile in the MINITAB software is as follows:

Choose Stat > Basic Statistics > Display Descriptive Statistics.
In Variables enter the columns Degrees.
Choose option statistics, and select first quartile, third quartile, inter quartile range.
Click OK.

Output using the MINITAB software is as follows:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 2

From Minitab output, the first quartile is 97.847, third quartile is 98.690, and interquartile range is 0.843.

Substitute IQR in the 1.5×IQR rule

Q3+(1.5×IQR)=98.690+(1.5×0.843)=98.690+1.2645=99.9545

Q1−(1.5×IQR)=97.847−(1.5×0.843)=97.847−1.2645=96.5825

The 1.5×IQR rule suspects one outlier in the body temperatures of 20 healthy adults. Because there is a value not in between limits Q1−(1.5×IQR)=96.5825 and Q3+(1.5×IQR)=99.9545 .

Justification:

Thus, the stemplot shows that data of times are symmetrically distributed with one oulier.

Answer 13

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

Answer 14

b.

To determine

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

Answer 15

b.

Expert Solution

Answer to Problem 19.55SE

Yes, the data give evidence that the mean body temperature for all healthy adults is not equal to 98.6℉.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given info:

The body temperature varies normally with standard deviation σ=0.7°F .

Calculation:

STATE:

Does the data give evidence that mean body temperature for all healthy adults is not equal to the traditional 98.6℉?

PLAN:

Parameter:

Define the parameter μ as the mean body temperature.

The hypotheses are given below:

Null Hypothesis:

H0:μ=98.6℉.

That is, the mean body temperature is equal to 98.6℉.

Alternative hypothesis:

Ha:μ≠98.6℉.

That is, the mean body temperature is not equal to 98.6℉.

Hence, the alternative hypothesis is two sided.

SOLVE:

Conditions for a valid test:

A sample of 20 healthy adults’ body temperature is randomly selected and times follow a normal distribution with standard deviation σ=0.7°F .

Test statistic and P-value:

Software procedure:

Step-by-step procedure to obtain test statistic and P-value using the MINITAB software:

Choose Stat > Basic Statistics > 1-Sample Z.
In Samples in Column, enter the column of Degrees.
In Standard deviation, enter 0.7.
In Perform hypothesis test, enter the test mean 98.6.
Check Options, enter Confidence level as 95.
Choose not equal in alternative.
Click OK in all dialogue boxes.

Output using the MINITAB software is given below:

BASIC PRACTICE OF STATISTICS >C<, Chapter 19, Problem 19.55SE , additional homework tip 3

From the MINITAB output, the test statistic is –2.54 and the P-value is 0.011.

Decision criteria for the P-value method:

If P-value≤α(=0.05) , then reject the null hypothesis (H0) .

If P-value>α(=0.05) , then fail to reject the null hypothesis (H0) .

CONCLUDE:

Use a significance level, α=0.05 .

Here, P-value is 0.011, which is less than the value of α=0.05 .

That is, P-value(=0.011)<α(=0.05) .

Therefore, the null hypothesis is rejected.

Thus, there is good evidence that is the mean body temperature for all healthy adults is not equal to the traditional 98.6°F.

Answer 20

Ch. 19 - Prob. 19.1TY Ch. 19 - Prob. 19.2TY Ch. 19 - Prob. 19.3TY Ch. 19 - Prob. 19.4TY Ch. 19 - Prob. 19.5TY Ch. 19 - Prob. 19.6TY Ch. 19 - Prob. 19.7TY Ch. 19 - Prob. 19.8TY Ch. 19 - Prob. 19.9TY Ch. 19 - Prob. 19.10TY

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

To make: A stem plot for the distribution of body temperature of 20 healthy adults.

Answer to Problem 19.55SE

Explanation of Solution

To check: Whether the data give evidence that the mean body temperature for all healthy adults is not equal to the traditional 98.6℉.

Answer to Problem 19.55SE

Explanation of Solution

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