Find the likelihood that 32 or more consider nutrition important.

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 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

d.

To determine

Find the probability that exactly 44 consider diet important.

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 6

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider,

P(X=44)=P(Z<1.64)−P(Z<1.37)=0.9495−0.9147=0.0348

Therefore, the probability that exactly 44 consider diet important is 0.0348.

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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 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

d.

To determine

Find the probability that exactly 44 consider diet important.

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 6

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider,

P(X=44)=P(Z<1.64)−P(Z<1.37)=0.9495−0.9147=0.0348

Therefore, the probability that exactly 44 consider diet important is 0.0348.

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

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 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

d.

To determine

Find the probability that exactly 44 consider diet important.

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 6

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider,

P(X=44)=P(Z<1.64)−P(Z<1.37)=0.9495−0.9147=0.0348

Therefore, the probability that exactly 44 consider diet important is 0.0348.

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 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

d.

To determine

Find the probability that exactly 44 consider diet important.

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 6

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider,

P(X=44)=P(Z<1.64)−P(Z<1.37)=0.9495−0.9147=0.0348

Therefore, the probability that exactly 44 consider diet important is 0.0348.

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Answer 5

Chapter 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

d.

To determine

Find the probability that exactly 44 consider diet important.

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 6

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider,

P(X=44)=P(Z<1.64)−P(Z<1.37)=0.9495−0.9147=0.0348

Therefore, the probability that exactly 44 consider diet important is 0.0348.

Answer 6

Chapter 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

Answer 7

Chapter 7, Problem 57CE

a.

To determine

Find the likelihood that 32 or more consider nutrition important.

Answer 8

a.

Expert Solution

Answer to Problem 57CE

The likelihood that 32 or more consider nutrition important is 0.9678.

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

In order to qualify as a binomial problem, it must satisfy the following conditions.

There are only two mutually exclusive outcomes, nutrition is a top priority in their lives and nutrition is not a top priority in their lives.
The number of trials is fixed, that is 60 men.
The probability is constant for each trial, which is 0.64.
The trials are independent of each other.

Thus, the problem satisfies all the conditions of a binomial distribution.

The mean can be obtained as follows:

μ=nπ=60(0.64)=38.4

The expected number of men who feel nutrition is important is 38.4.

The standard deviation can be obtained as follows:

σ=nπ(1−π)=60(0.64)(1−0.64)=60(0.64)(0.36)=13.824

=3.72

The standard deviation of men who feel nutrition is important is 3.72.

The conditions for normal approximation to the binomial distribution are checked below:

The number of men (n) is 60 and probability that nutrition is a top priority in their lives. (π) is 0.64.

Condition 1:

nπ=60(0.64)=38.4>5

The condition 1 is satisfied.

Condition 2:

n(1−π)=60(1−0.64)=60(0.36)=21.6>5

The condition 2 is satisfied.

The conditions 1 and 2 for normal approximation to the binomial distribution are satisfied.

Let the random variable X be the number of number of men who consider nutrition important, which follows normal distribution with population mean μ as 38.4 men and population standard deviation σ as 3.72 men.

The likelihood that 32 or more consider nutrition important can be obtained as follows:

P(X≥32)=P(X≥32−0.5) [Apply the continuity correction factor]=P(X>31.5)=1−P(X−μσ<31.5−38.43.72)=1−P(X−μσ<−6.93.72)

=1−P(Z<−1.85)

Step-by-step procedure to obtain probability of Z less than –1.85 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.85.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 1

From the above output, the probability of Z less than –1.85 is 0.0322.

Now consider the following:

P(X≥32)=1−P(Z<−1.85)=1−0.0322=0.9678

Therefore, the likelihood that 32 or more consider nutrition important is 0.9678.

Answer 13

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

Answer 14

b.

To determine

Find the likelihood that 44 or more consider nutrition important.

Answer 15

b.

Expert Solution

Answer to Problem 57CE

The likelihood that 44 or more consider nutrition important is 0.0853.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

The likelihood that 44 or more consider nutrition important can be obtained as follows:

P(X≥44)=P(X≥44−0.5) [Apply the continuity correction factor]=P(X>43.5)=1−P(X−μσ<43.5−38.43.72)=1−P(X−μσ<5.13.72)

=1−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 2

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider the following:

P(X≥44)=1−P(Z<1.37)=1−0.9147=0.0853

Therefore, the likelihood that 44 or more consider nutrition important is 0.0853.

Answer 20

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Answer 21

c.

To determine

Find the probability that more than 32 but fewer than 43 consider nutrition important.

Answer 22

c.

Expert Solution

Answer to Problem 57CE

The probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Answer 23

c.

Expert Solution

Answer 24

c.

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

The probability that more than 32 but fewer than 43 consider nutrition important can be obtained as follows:

P(32<X<43)=P(32+0.5<X≤43−0.5) [Apply the continuity correction factor]=P(32.5<X<42.5)=P(X<42.5)−P(X<32.5) =P(X−μσ<42.5−38.43.72)−P(X−μσ<32−38.43.72)

=P(Z<1.10)−P(Z<−1.59)

Step-by-step procedure to obtain probability of Z less than 1.10 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.10.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 3

From the above output, the probability of Z less than 1.10 is 0.8643.

Step-by-step procedure to obtain probability of Z less than –1.59 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as –1.59.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 4

From the above output, the probability of Z less than –1.59 is 0.0559.

Now consider,

P(32<X<43)=P(Z<1.10)−P(Z<−1.59)=0.8643−0.0559=0.8084

Therefore, the probability that more than 32 but fewer than 43 consider nutrition important is 0.8084.

Answer 27

d.

To determine

Find the probability that exactly 44 consider diet important.

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 6

From the above output, the probability of Z less than 1.37 is 0.9147.

Now consider,

P(X=44)=P(Z<1.64)−P(Z<1.37)=0.9495−0.9147=0.0348

Therefore, the probability that exactly 44 consider diet important is 0.0348.

Answer 28

d.

To determine

Find the probability that exactly 44 consider diet important.

Answer 29

d.

Expert Solution

Answer to Problem 57CE

The probability that exactly 44 consider diet important is 0.0348.

Answer 30

d.

Expert Solution

Answer 31

d.

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

The probability that exactly 44 consider diet important can be obtained as follows:

P(X=44)=P(44−0.5≤X≤44+0.5) [Apply the continuity correction factor]=P(43.5<X<44.5)=P(X<44.5)−P(X<43.5) =P(X−μσ<44.5−38.43.72)−P(X−μσ<43.5−38.43.72)

=P(Z<1.64)−P(Z<1.37)

Step-by-step procedure to obtain probability of Z less than 1.64 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.64.
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.

The output obtained using Excel is represented as follows:

EBK STATISTICAL TECHNIQUES IN BUSINESS, Chapter 7, Problem 57CE , additional homework tip 5

From the above output, the probability of Z less than 1.64 is 0.9495.

Step-by-step procedure to obtain probability of Z less than 1.37 using Excel:

Click on the Formulas tab in the top menu.
Select Insert function. Then from category box, select Statistical and below that NORM.S.DIST.
Click OK.
In the dialog box, Enter Z value as 1.37
Enter Cumulative as TRUE.
Click OK, the answer appears in Spreadsheet.