Find the standard deviation of the x distribution.

Question

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Answer 1

Question

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.

Output using MINITAB software is given below:

Bundle: Understandable Statistics: Concepts And Methods, 12th + Webassign, Single-term Printed Access Card, Chapter 6.3, Problem 33P

From Minitab output, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61.38.

Hence, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is approximately 61 beats per minute.

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Answer 2

Question

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.

Output using MINITAB software is given below:

Bundle: Understandable Statistics: Concepts And Methods, 12th + Webassign, Single-term Printed Access Card, Chapter 6.3, Problem 33P

From Minitab output, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61.38.

Hence, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is approximately 61 beats per minute.

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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

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.

Output using MINITAB software is given below:

Bundle: Understandable Statistics: Concepts And Methods, 12th + Webassign, Single-term Printed Access Card, Chapter 6.3, Problem 33P

From Minitab output, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61.38.

Hence, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is approximately 61 beats per minute.

Want to see more full solutions like this?

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

Answer 4

Question

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.

Output using MINITAB software is given below:

Bundle: Understandable Statistics: Concepts And Methods, 12th + Webassign, Single-term Printed Access Card, Chapter 6.3, Problem 33P

From Minitab output, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61.38.

Hence, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is approximately 61 beats per minute.

Want to see more full solutions like this?

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

Answer 5

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.

Output using MINITAB software is given below:

Bundle: Understandable Statistics: Concepts And Methods, 12th + Webassign, Single-term Printed Access Card, Chapter 6.3, Problem 33P

From Minitab output, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61.38.

Hence, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is approximately 61 beats per minute.

Answer 6

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

Answer 7

Chapter 6.3, Problem 33P

(a)

To determine

Find the standard deviation of the x distribution.

Answer 8

(a)

Expert Solution

Answer to Problem 33P

The standard deviation of the x distribution is 12 beats per minute.

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Calculation:

Rule of Thumb:

The formula for standard deviation using range is,

σ=Range4

In the formula, range is the obtained by subtracting the low value from the high value.

The variable x is a random variable that represents the resting heart rate for an adult horse.

The 95% of data range from 22 to 70 beats per minute.

The standard deviation is,

σ=70−224=484=12

Hence, the standard deviation of the x distribution is 12 beats per minute.

Answer 13

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Answer 14

(b)

To determine

Find the probability that the heart rate is fewer than 25 beats per minute.

Answer 15

(b)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Calculation:

Z score:

The number of standard deviations the original measurement x is from the value of mean μ is measured using the z-score or z value. The formula for z score is,

z=x−μσ

In the formula, x is the raw score, μ is the mean and σ is the standard deviation.

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

The probability is,

P(x<25)=P(z<−1.75)=0.0401

Hence, the probability that the heart rate is fewer than 25 beats per minute is 0.0401.

Answer 20

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

Answer 21

(c)

To determine

Find the probability that the heart rate is greater than 60 beats per minute.

Answer 22

(c)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is greater than 60 beats per minute is 0.1210.

Answer 23

(c)

Expert Solution

Answer 24

(c)

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Calculation:

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(x>60)=P(z>1.17)=1−P(z<1.17)=1−0.8790=0.1210

Hence, the probability that the heart rate is greater than 60 beats per minute is 0.1210.

Answer 27

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Answer 28

(d)

To determine

Find the probability that the heart rate is between 25 and 60 beats per minute.

Answer 29

(d)

Expert Solution

Answer to Problem 33P

The probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Answer 30

(d)

Expert Solution

Answer 31

(d)

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

Calculation:

Substitute x as 25, μ as 46 and σ as 12 in the formula of z score.

z=25−4612=−2112=−1.75

Substitute x as 60, μ as 46 and σ as 12 in the formula of z score.

z=60−4612=1412=1.17

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than –1.75.

Locate the value –1.7 in column z.
Locate the value 0.05 in top row.
The intersecting value of row and column is 0.0401.

Use the Appendix II: Tables, Table 5: Areas of a Standard Normal Distribution: to obtain probability less than 1.17.

Locate the value 1.1 in column z.
Locate the value 0.07 in top row.
The intersecting value of row and column is 0.8790.

The probability is,

P(25<x<60)=P(−1.75<z<1.17)=P(z<1.17)−P(z<−1.75)=0.8790−0.0401=0.8389

Hence, the probability that the heart rate is between 25 and 60 beats per minute is 0.8389.

Answer 34

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.

Output using MINITAB software is given below:

Bundle: Understandable Statistics: Concepts And Methods, 12th + Webassign, Single-term Printed Access Card, Chapter 6.3, Problem 33P

From Minitab output, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61.38.

Hence, the heart rate corresponding to the upper 10% cutoff point of the probability distribution is approximately 61 beats per minute.

Answer 35

(e)

To determine

Find heart rate corresponding to the upper 10% cutoff point of the probability distribution.

Answer 36

(e)

Expert Solution

Answer to Problem 33P

The heart rate corresponding to the upper 10% cutoff point of the probability distribution is 61 beats per minute.

Answer 37

(e)

Expert Solution

Answer 38

(e)

Expert Solution

Answer 39

Expert Solution

Answer 40

Explanation of Solution

Calculation:

Step by step procedure to obtain probability plot using MINITAB software is given below:

Choose Graph > Probability Distribution Plot choose View Probability > OK.
Enter the Mean as 46, and Standard deviation as 12.
From Distribution, choose ‘Normal’ distribution.
Click the Shaded Area tab.
Choose Probability and Right Tail, for the region of the curve to shade.
Enter the Probability as 0.10.
Click OK.