A population consists of the following N – 6 scores : 2, 4, 1, 2, 7, 2 a. Compute μ and σ for the population. b. Find the z-score for each score in the population. c. Transform the original population into a new population of N = 5 scores with a mean of μ = 50 and a standard deviation of σ = 10.

Question

Want to see more full solutions like this?

Answer 1

Textbook Question

Chapter 5, Problem 24P

A population consists of the following N – 6 scores: 2, 4, 1, 2, 7, 2

a. Compute μ and σ for the population.
b. Find the z-score for each score in the population.
c. Transform the original population into a new population of N = 5 scores with a mean of μ = 50 and a standard deviation of σ = 10.

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 + ...

(a)

Expert Solution

To determine

To Find: The mean and standard deviation for the population scores.

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

(b)

Expert Solution

To determine

To Find: The z-score for each score in the population.

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

(c)

Expert Solution

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

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!

Students have asked these similar questions

A well-known company predominantly makes flat pack furniture for students. Variability with the automated machinery means the wood components are cut with a standard deviation in length of 0.45 mm. After they are cut the components are measured. If their length is more than 1.2 mm from the required length, the components are rejected. a) Calculate the percentage of components that get rejected. b) In a manufacturing run of 1000 units, how many are expected to be rejected? c) The company wishes to install more accurate equipment in order to reduce the rejection rate by one-half, using the same ±1.2mm rejection criterion. Calculate the maximum acceptable standard deviation of the new process.

5. Let X and Y be independent random variables and let the superscripts denote symmetrization (recall Sect. 3.6). Show that (X + Y) X+ys.

8. Suppose that the moments of the random variable X are constant, that is, suppose that EX" =c for all n ≥ 1, for some constant c. Find the distribution of X.

Answer 2

Textbook Question

Chapter 5, Problem 24P

A population consists of the following N – 6 scores: 2, 4, 1, 2, 7, 2

a. Compute μ and σ for the population.
b. Find the z-score for each score in the population.
c. Transform the original population into a new population of N = 5 scores with a mean of μ = 50 and a standard deviation of σ = 10.

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 + ...

(a)

Expert Solution

To determine

To Find: The mean and standard deviation for the population scores.

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

(b)

Expert Solution

To determine

To Find: The z-score for each score in the population.

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

(c)

Expert Solution

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

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 3

Textbook Question

Chapter 5, Problem 24P

A population consists of the following N – 6 scores: 2, 4, 1, 2, 7, 2

a. Compute μ and σ for the population.
b. Find the z-score for each score in the population.
c. Transform the original population into a new population of N = 5 scores with a mean of μ = 50 and a standard deviation of σ = 10.

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 + ...

(a)

Expert Solution

To determine

To Find: The mean and standard deviation for the population scores.

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

(b)

Expert Solution

To determine

To Find: The z-score for each score in the population.

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

(c)

Expert Solution

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

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

Textbook Question

Chapter 5, Problem 24P

A population consists of the following N – 6 scores: 2, 4, 1, 2, 7, 2

a. Compute μ and σ for the population.
b. Find the z-score for each score in the population.
c. Transform the original population into a new population of N = 5 scores with a mean of μ = 50 and a standard deviation of σ = 10.

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 + ...

(a)

Expert Solution

To determine

To Find: The mean and standard deviation for the population scores.

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

(b)

Expert Solution

To determine

To Find: The z-score for each score in the population.

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

(c)

Expert Solution

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

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

Textbook Question

Answer 6

Textbook Question

Answer 7

(a)

Expert Solution

To determine

To Find: The mean and standard deviation for the population scores.

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

(b)

Expert Solution

To determine

To Find: The z-score for each score in the population.

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

(c)

Expert Solution

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Answer 8

(a)

Expert Solution

To determine

To Find: The mean and standard deviation for the population scores.

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

To determine

To Find: The mean and standard deviation for the population scores.

Answer 13

Answer to Problem 24P

The mean and standard deviation for the population scores is 3 and 2.

Answer 14

Explanation of Solution

Given info:

The population consists of the score is, 2, 4, 1, 2, 7, and 2.

Calculation:

The formula for calculating the population mean is,

μ=∑xiN

The formula for calculating the population standard deviation is,

σ=∑(x−μ)2N

The population mean is,

μ=∑xiN=2+4+1+2+7+26=186=3

The population standard deviation is,

σ=∑(x−μ)2N=(2−3)2+(4−3)2+(1−3)2+(2−3)2+(7−3)2+(2−3)26=4=2

Conclusion:

Therefore, the required population mean and standard deviation are 3 and 2.

Answer 15

(b)

Expert Solution

To determine

To Find: The z-score for each score in the population.

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

To determine

To Find: The z-score for each score in the population.

Answer 20

Answer to Problem 24P

The z-score for each score in the population is,

X- score	z -score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Answer 21

Explanation of Solution

Given Info:

The population has mean μ=3 and standard deviation σ=2.

Calculation:

The formula for calculating the z-score is,

z=X−μσ

The z-score corresponding to X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding to X score 4 is,

z=X−μσ=4−32=0.50

The z-score corresponding to X score 1 is,

z=X−μσ=1−32=−1.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

The z-score corresponding X score 7 is,

z=X−μσ=7−32=2.00

The z-score corresponding X score 2 is,

z=X−μσ=2−32=−0.50

Conclusion:

The required z-score for each score in the population is,

X- score	z-score
2	–0.5
4	0.5
1	–1
2	–0.5
7	2
2	–0.5

Answer 22

(c)

Expert Solution

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Answer 23

(c)

Expert Solution

Answer 24

(c)

Expert Solution

Answer 25

Expert Solution

Answer 26

To determine

To find: Transform original population in to new population with mean μ=50 and standard deviation σ=10.

Answer 27

Answer to Problem 24P

The transformed original population in to new population is,

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Answer 28

Explanation of Solution

Given Info:

The sample has mean μ=50 and standard deviation σ=10.

Calculation:

The formula for transform original population in to new population is,

X=μ+z×σ

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 4 is transfer into a new population is,

X=μ+z×σ=50+(0.50)×10=55

The original population value 1 is transfer into a new population is,

X=μ+z×σ=50+(−1.00)×10=40

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

The original population value 7 is transfer into a new population is,

X=μ+z×σ=50+(2.00)×10=70

The original population value 2 is transfer into a new population is,

X=μ+z×σ=50+(−0.50)×10=45

Conclusion:

Thus, the below table shows the transformed original population in to new population:

Original X-score	z-score	Transformed X
2	–0.5	45
4	0.5	55
1	–1	40
2	–0.5	45
7	2	70
2	–0.5	45

Answer 29

Ch. 5.2 - What location in a distribution corresponds to z =...Ch. 5.2 - For a population with = 80 and = 12, what is the...Ch. 5.2 - For a sample with M 72and s 4, what is the X...Ch. 5.3 - In a population with = 60. a score of X = 58...Ch. 5.3 - In a sample with a standard deviation of s = 8, a...Ch. 5.3 - Prob. 3LC Ch. 5.3 - Prob. 4LC Ch. 5.4 - Prob. 1LC Ch. 5.4 - A sample with a mean of M = 50 and a standard...Ch. 5.4 - Which of the following is an advantage of...

Concept explainers

Videos

Answer to Problem 24P

Explanation of Solution

Answer to Problem 24P

Explanation of Solution

Answer to Problem 24P

Explanation of Solution

Want to see more full solutions like this?

Chapter 5 Solutions