To find the median minutes spent standing or walking for each group and which group appears more active.

Question

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Answer 1

Question

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Chapter 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

(b)

To determine

To arrange all twenty observations in order and find the ranks.

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

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Answer 2

Question

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Chapter 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

(b)

To determine

To arrange all twenty observations in order and find the ranks.

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

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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

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Chapter 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

(b)

To determine

To arrange all twenty observations in order and find the ranks.

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

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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

Definition Definition Measure of central tendency that is the average of a given data set. The mean value is evaluated as the quotient of the sum of all observations by the sample size. The mean, in contrast to a median, is affected by extreme values. Very large or very small values can distract the mean from the center of the data. Arithmetic mean: The most common type of mean is the arithmetic mean. It is evaluated using the formula: μ = 1 N ∑ i = 1 N x i Other types of means are the geometric mean, logarithmic mean, and harmonic mean. Geometric mean: The nth root of the product of n observations from a data set is defined as the geometric mean of the set: G = x 1 x 2 ... x n n Logarithmic mean: The difference of the natural logarithms of the two numbers, divided by the difference between the numbers is the logarithmic mean of the two numbers. The logarithmic mean is used particularly in heat transfer and mass transfer. ln x 2 − ln x 1 x 2 − x 1 Harmonic mean: The inverse of the arithmetic mean of the inverses of all the numbers in a data set is the harmonic mean of the data. 1 1 x 1 + 1 x 2 + ...

Chapter 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

(b)

To determine

To arrange all twenty observations in order and find the ranks.

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

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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 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

(b)

To determine

To arrange all twenty observations in order and find the ranks.

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

Answer 6

Chapter 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

Answer 7

Chapter 27, Problem 27.1AYK

(a)

To determine

To find the median minutes spent standing or walking for each group and which group appears more active.

Answer 8

(a)

Expert Solution

Answer to Problem 27.1AYK

421.444 is the median minutes spent standing or walking for each group and lean subjects appears more active.

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now, to find the median minutes spent standing or walking for each group, let us arrange the whole data in ascending order and the bold ones are lean subjects. Then the data will be as:

260.244
267.344
319.212
347.375
358.65
367.138
374.831
410.631
413.667
416.531
426.356
464.756
504.7
511.1
543.388
555.656
578.869
584.644
607.925
677.188

Now, the median is calculated as:

=416.531+426.3562=421.444

And as we can see that the last part of the data contains the lean subjects more so their physical activities are more than the obese subjects. Thus, lean subjects are more active.

Answer 13

(b)

To determine

To arrange all twenty observations in order and find the ranks.

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

Answer 14

(b)

To determine

To arrange all twenty observations in order and find the ranks.

Answer 15

(b)

Expert Solution

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. Now let us arrange all data in order and gave rank by using excel by clicking on the sort icon in the home tab. The data with the ranks will be as:

Rank	Subjects
1	260.244
2	267.344
3	319.212
4	347.375
5	358.65
6	367.138
7	374.831
8	410.631
9	413.667
10	416.531
11	426.356
12	464.756
13	504.7
14	511.1
15	543.388
16	555.656
17	578.869
18	584.644
19	607.925
20	677.188

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

Answer 20

(c)

To determine

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

Answer 21

(c)

Expert Solution

Answer to Problem 27.1AYK

The value W is 142 and mean and standard deviation are 105 and 13.229 .

Answer 22

(c)

Expert Solution

Answer 23

(c)

Expert Solution

Answer 24

Expert Solution

Answer 25

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test.The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

Now, the value Wis 142 . The hypotheses will be defined as:

Null hypothesis: There is no difference in the distribution of subjects.

Alternative hypothesis: Lean subjects are higher than the obese subjects.

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Now let us calculate the P-value as:

P(W≥142)=P(Z≥142−10513.229)=P(Z≥2.80)=1−0.99744=0.00256

As we know that if the P-value is less than or equal to the significance level then the null hypothesis is rejected, so we have,

P<0.05⇒Reject H0

Thus, we have sufficient evidence to prove that the lean subjects spent more minutes standing or walking than the obese subjects.

Answer 26

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

Answer 27

(d)

To determine

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

Answer 28

(d)

Expert Solution

Answer to Problem 27.1AYK

No, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects.

Answer 29

(d)

Expert Solution

Answer 30

(d)

Expert Solution

Answer 31

Expert Solution

Answer 32

Explanation of Solution

In the question, it is given the table for the subjects spent standing or walking over a ten-day period. It concerned a study comparing the level of physical activity of lean and mildly obese people who do not exercise. The data are a bit irregular but not distinctly non-Normal. Let us use the Wilcoxon test for comparison with the two-sample t test. The ranks are given in part (b), so let us sum the ranks for the subjects. Then we have,

Subjects	Sum
Lean subjects	142
Obese subjects	68

And the mean and standard deviation is calculated as:

μW=n1(N+1)2=10(20+1)2=105σW=n1n2(N+1)12=10×10(20+1)12=13.229

Thus, comparing W with the mean and standard deviation does not suggest that the lean subjects are more active than the obese subjects because there is less difference between the value of W from the mean of W . so, we do not have a strong evidence from this that the lean subjects are more active than the obese subjects.

Answer 33

Ch. 27 - Prob. 27.1AYK Ch. 27 - Prob. 27.2AYK Ch. 27 - Prob. 27.3AYK Ch. 27 - Prob. 27.4AYK Ch. 27 - Prob. 27.5AYK Ch. 27 - Prob. 27.6AYK Ch. 27 - Prob. 27.7AYK Ch. 27 - Prob. 27.8AYK Ch. 27 - Prob. 27.9AYK Ch. 27 - Prob. 27.10AYK

To find the median minutes spent standing or walking for each group and which group appears more active.

To find the median minutes spent standing or walking for each group and which group appears more active.

Answer to Problem 27.1AYK

Explanation of Solution

To arrange all twenty observations in order and find the ranks.

Explanation of Solution

To find out what is the value of W and if null hypothesis is true what are the mean and standard deviation of W .

Answer to Problem 27.1AYK

Explanation of Solution

To explain does comparing W with the mean and standard deviation suggest that the lean subjects are more active than the obese subjects.

Answer to Problem 27.1AYK

Explanation of Solution

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