QNT 275 Entire Course

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QNT/275

STATISTICS FOR DECISION MAKING

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QNT 275 Week 1 Statistics in Business

Develop a 875-word response that addresses each of the following prompts:

Define statistics with citation and reference.
Contrast quantitative data and qualitative data. Use two Peer Reviewed references.
Evaluate tables and charts used to represent quantitative and qualitative data.
Describe the levels of data measurement.
Describe the role of statistics in business decision-making.
Provide at least two business research questions, or problem situations, in which statistics was used or could be used.
Use two peer reviewed references.

Format your assignment consistent with APA guidelines.

Click the Assignment Files tab to submit your assignment.

QNT 275 Week 1 Practice Set

Chapter 01, Section 1.3, Problem 008a

Correct.

Indicate if the following variable is quantitative or qualitative.

The amount of time a student spent studying for an exam is a

variable.

Chapter 01, Supplementary Exercises, Problem 043a

Correct.

State whether the following is an example of sampling with replacement or without replacement.

Selecting 60 patients out of 100 to test a new drug is sampling

replacement.

8th-ed Chapter 01, Section 1.2, Problem 006a

Correct.

Explain whether the following constitutes a population or a sample.

Opinions on a certain issue obtained from all adults living in a city constitute a

.

8th-ed Chapter 01, Section 1.3, Problem 009

The following table gives the number of dog bites reported to the police last year in six cities.

City Number of Bites

Center City 19

Elm Grove 38

Franklin 36

Bay City 33

Oakdale 38

Sand Point 53

With reference to this table, what is 38?

a measurement

a data set

a member

a variable

8th-ed Chapter 01, Section 1.3, Problem 011

Correct.

The following table gives the number of dog bites reported to the police last year in six cities.

City Number of Bites

Center City 46

Elm Grove 30

Franklin 51

Bay City 41

Oakdale 11

Sand Point 5

What is the variable for this data set?

The variable for this data set is the

.

How many observations are in this data set?

There is/are observation(s) in this data set.

How many elements does this data set contain?

There is/are element(s) in this data set.

8th-ed Chapter 01, Section 1.4, Problem 017

Correct.

Classify the following quantitative variable as discrete or continuous.

The amount of gasoline put into a car at a gas station is a

variable.

8th-ed Chapter 01, Section 1.6, Problem 021a

Correct.

Classify the following as cross-section or time-series data.

The average prices of houses in 500 cities is

data.

8th-ed Chapter 01, Section 1.7, Problem 023a

Correct.

The following table lists six pairs of m and f values.

m 5 4 23 11 11 19

f 15 10 16 7 3 13

Calculate the value of the following: ∑f=

exact number, no tolerance

8th-ed Chapter 01, Section 1.7, Problem 028a

Correct.

Nine randomly selected customers at a local fast-food restaurant ordered meals having the following calorie counts: 975, 520, 1560, 872, 1025, 431, 361, 502, and 1118. Let y denote the calorie content of a meal ordered at this restaurant. Find the following sum.

∑y=

exact number, no tolerance

QNT 275 Week 1 Quiz

Chapter 01, Testbank, Question 002

Under inferential statistics, we study

how a sample is taken from a population

the methods to make decisions about one or more populations based on sample results

tables composed of summary measures

how to make decisions about a mean, median, or mode

Chapter 01, Testbank, Question 046

Classify the variable as discrete or continuous.

Duration of your last 30 cell phone calls.

Chapter 01, Testbank, Question 048

An independent group wants to determine if the consumption of gasoline has increased due to changes in price. The group randomly selects 320 gas stations from 12 different states and collects data from the month of the year when gas is the cheapest and from the month of the year when gas is the most expensive. The data shows no significant difference in gas consumption between the two months.

In this example, what is the variable being studied?

The 320 gas stations chosen.

The price of gasoline.

The consumption of gasoline.

The 12 different states.

Chapter 02, Testbank, Question 046-051

The following table gives the frequency distribution of the number of telephones owned by a sample of 50 households selected from a city.

Number of Telephones Owned f

0 2

1 19

2 14

3 3

4 12

The relative frequency of the second class, rounded to two decimal places, is:

The number of households which own more than one telephone is:

The percentage of households which own three or more telephones is:

%

The number of households which own one or two telephones is:

The percentage of households which do not own a telephone is:

The number of classes for this frequency distribution table is:

Chapter 02, Section 2.2, Problem 012a

A data set on money spent on lottery tickets during the past year by 200 households has a lowest value of \$1 and a highest value of \$1640. Suppose we want to group these data into 6classes of equal widths.

Assuming we take the lower limit of the first class as \$1 and the width of each class equal to \$300, write the class limits for all six classes.

Number of Class Lower Limit Upper Limit

1 1 300

2 301 600

3 601 900

4 901 1200

5 1201 1500

6 1501 1640

Number of Class Lower Limit Upper Limit

1 1 299

2 300 599

3 600 899

4 900 1199

5 1200 1499

6 1500 1640

Number of Class Lower Limit Upper Limit

1 1 299

2 300 599

3 600 899

4 900 1199

5 1200 1499

6 1500 1799

Number of Class Lower Limit Upper Limit

1 1 300

2 300 600

3 600 900

4 900 1200

5 1200 1500

6 1500 1800

Number of Class Lower Limit Upper Limit

1 1 300

2 301 600

3 601 900

4 901 1200

5 1201 1500

6 1501 1800

Chapter 02, Testbank, Question 090

The following table shows the countries whose teams have won the UEFA Champions League.

Country Frequency

Spain 12

England 11

Italy 11

Germany 6

Portugal 4

Other 10

a) Calculate the relative frequency of each country. Round your answers to three decimal places.
Spain:

England:

Italy:

Germany:

Netherlands:

Other:

b) Select the pie chart that better describes the data.
I II III

QNT 275 Week 2 Learning Team Charter Assignment

Develop a 150- to 200-word individual response to the following:

Consider the multiple definitions of collaboration.

Define collaboration and how you will apply it in this course based upon the discussion with your Learning Team. Be sure to reference and cite your sources.

Click the Assignment Files tab to submit your assignment.

QNT 275 Week 2 Mini-Project 3-2

You are employed as a statistician for a company that makes household products, which are sold by part-time salespersons who work during their spare time. The company has four salespersons employed in a small town. Let us denote these salespersons by A, B, C, and D.

The sales records (in dollars) for the past 6 weeks for these four salespersons are shown in the table below.

Week A B C D
1 1774 2205 1330 1402
2 1808 1507 1295 1665
3 1890 2352 1502 1530
4 1932 1939 1104 1826
5 1855 2052 1189 1703
6 1726 1630 1441 1498
Your supervisor has asked you to prepare a brief report comparing the sales volumes and the consistency of sales of these four salespersons.

Use the mean sales for each salesperson to compare the sales volumes.

Choose an appropriate statistical measure to compare the consistency of sales.

Make the calculations and write a 700-word report comparing the sales volumes and the consistency of sales of these four salespersons.

Format your assignment consistent with APA guidelines.

Click the Assignment Files tab to submit your assignment.

QNT 275 Week 2 Practice Set

Chapter 03, Section 3.1, Problem 009

Correct.

The following data set belongs to a population:

4−220−1015127

Calculate the mean, median, and mode.

Mean =

Median =

Mode =

Chapter 03, Section 3.2, Problem 033

Correct.

The following data give the prices of seven textbooks randomly selected from a university bookstore.

\$85 \$173 \$105 \$122 \$51 \$156 \$141

Find the mean for these data. Calculate the deviations of the data values from the mean. Is the sum of these deviations zero?
Mean = \$

Deviation from the mean for \$173 = \$

Sum of these deviations = \$

Calculate the range, variance, and standard deviation. [Round your answers to 2 decimal places.]
Range = \$

Variance =

Standard deviation = \$

Chapter 03, Section 3.4, Problem 063

The one-way commuting times from home to work for all employees working at a large company have a bell-shaped curve with a mean of 32 minutes and a standard deviation of 9 minutes. Using the empirical rule, find the approximate percentages of the employees at this company who have one-way commuting times in the following intervals.

5 to 59 minutes

%

23 to 41 minutes

%

14 to 50 minutes

%

Chapter 03, Section 3.5, Problem 069a

Correct.

The following data give the speeds of 13 cars, measured by radar, traveling on I-84.

73 75 69 68 78 69 74

77 72 83 63 77 71

Find the values of the three quartiles and the interquartile range.

Q1=

Q2=

Q3=

IQR= 8

Chapter 03, Section 3.6, Problem 077

The following data give the 2015 bonuses (in thousands of dollars) of 15 randomly selected Wall Street managers.

107 122 163 95 48 347 75 273

60 786 127 203 402 239 71

Prepare a box-and-whisker plot.

QNT 275 Week 2 Quiz

Chapter 02, Section 2.1, Problem 006

The following data show the method of payment by 16 customers in a supermarket checkout line. Here, C refers to cash, C⁢K to check, C⁢C to credit card, and D to debit card, and O stands for other.

C O C⁢K D CC D D C⁢K

C⁢C C⁢C D C⁢C C⁢C O O O

Correct.

Prepare a frequency distribution table.
Category Frequency

C

C⁢K

C⁢C

D

O

Chapter 02, Section 2.2, Problem 021

The following data give the number of turnovers (fumbles and interceptions) made by both teams in each of the football games played by North Carolina State University during the 2014 and 2015 seasons.

2 3 1 1 6 5 3 5 5 1 5 2 1

5 3 4 4 5 8 4 5 2 2 2 6

Correct.

Construct a frequency distribution table for these data using single-valued classes.

Calculate the relative frequency and percentage for each class.

Turnovers Frequency Relative Frequency Percentage

1

2

3

4

5

6

7

8

Chapter 02, Section 2.3, Problem 027

The following data give the times (in minutes) taken by 50 students to complete a statistics examination that was given a maximum time of 75 minutes to finish.

41 28 45 60 53 69 70 50 63 68

37 44 42 38 74 53 66 65 52 64

26 45 66 35 43 44 39 55 64 54

38 52 59 72 67 65 43 65 68 27

64 48 71 75 46 69 57 73 53 72

Prepare a stem-and-leaf display for these data. Arrange the leaves for each stem in increasing order. Type only digits (without spaces, commas, etc).
2

3

4

5

6

7

Prepare a split stem-and-leaf display for the data. Split each stem into two parts. The first part should contain the leaves 0, 1, 2, 3, and 4, and the second part should contains the leaves 5, 6, 7, 8, and 9. Type only digits (without spaces, commas, etc).
2

3

3

4

4

5

5

6

6

7

7

Which display (the one in part a or the one in part b) provides a better representation of the features of the distribution?

Chapter 02, Section 2.4, Problem 035

The following data give the times (in minutes) taken by 50 students to complete a statistics examination that was given a maximum time of 75 minutes to finish.

41 28 45 59 53 69 70 51 63 68

37 44 42 38 74 53 66 65 52 64

26 45 66 34 43 44 39 55 64 54

38 52 58 72 67 65 43 65 68 27

64 50 71 75 45 69 56 73 53 72

Create a dotplot for these data.

Chapter 02, Section 2.2, Intelligent Tutoring Question 011

The following table gives the frequency distribution of the gallons of gasoline purchased by all customers on one day at a certain gas station.

Find a cumulative frequency distribution, the cumulative relative frequency and cumulative percentage for each class.

Chapter 02, Section 2.2, Intelligent Tutoring Question 011

What is the cumulative frequency for “0 to less than 16” ?

Click if you would like to Show Work for this question: Open Show Work

Attempts: 1 of 3 used

Chapter 02, Section 2.2, Intelligent Tutoring Question 011

Find the cumulative relative frequency for “0 to less than 12”.

Round answer to three decimal places.

Click if you would like to Show Work for this question: Open Show Work

Attempts: 1 of 3 used

Chapter 02, Section 2.2, Intelligent Tutoring Question 011

What is the cumulative percentage for “0 to less than 20”?

%

Round answer to one decimal place.

Click if you would like to Show Work for this question: Open Show Work

Attempts: 1 of 3 used

Chapter 02, Section 2.2, Intelligent Tutoring Question 011

Using similar calculations to the steps above, find the percentage of customers who purchased less than 8 gallons.

%

Round answer to one decimal place.

Click if you would like to Show Work for this question: Open Show Work

Chapter 02, Section 2.1, Additional Question 005

Correct.

Use the following data to construct a frequency table, using classes of [60, 65), [65, 70), etc.

86 90 79 82 86 95 91 90

88 92 93 80 92 95 64 90

Frequency table:

Class Interval Frequency

[60, 65)

[65, 70)

[70, 75)

[75, 80)

[80, 85)

[85, 90)

[90, 95)

[95, 100)

Chapter 02, Testbank, Question 092

Correct.

Find the histogram that better describes the data.

Value x Frequency Relative Frequency

1 5 0.28

2 2 0.11

3 4 0.22

4 4 0.22

5 3 0.17

Total 18 1.000

I II III

Chapter 03, Section 3.1, Problem 009

Correct.

The following data set belongs to a population:

5−430−914129

Calculate the mean, median, and mode.

Mean =

Median =

Mode =

Chapter 03, Section 3.1, Problem 025

Correct.

The mean age of six persons is 48 years. The ages of five of these six persons are 62, 40, 36, 46, and 44 years.

Find the age of the sixth person.

years

exact number, no tolerance

Chapter 03, Section 3.3, Problem 048

Using the sample formulas, find the mean, variance, and standard deviation for the grouped data displayed in the following table.

x f

0 to less than 4 19

4 to less than 8 21

8 to less than 12 16

12 to less than 16 12

16 to less than 20 7

20 to less than 24 5

Carry out all calculations exactly, round to 2 decimal places the final answers only.

Mean =

Variance =

Standard deviation =

QNT 275 Week 3 Business Decision Making Project Part 1

Identify a business problem or opportunity at a company where you work or with which you’re familiar. This will be a business problem that you use for the individual assignments in Weeks 3 to 5. It should be a problem/opportunity for which gathering and analyzing some type of data would help you understand the problem/opportunity better.

Identify a research variable within the problem/opportunity that could be measured with some type of data collection.

Consider methods for collecting a suitable sample of either qualitative or quantitative data for the variable.

Consider how you will know if the data collection method would be valid and reliable.

Develop a 1,050-word analysis to describe a company, problem, and variable.

Identify the name and description of the selected company.
Describe the problem at that company.
Identify one research variable from that problem.
Describe the methods you would use for collecting a suitable sample of either qualitative or quantitative data for the variable (Note: do not actually collect any data).
Analyze how you will know if the data collection method would generate valid and reliable data (Note: do not actually collect any data).
Format your assignment consistent with APA guidelines.

Click the Assignment Files tab to submit your assignment.

QNT 275 Week 3 Practice Set

Chapter 04, Section 4.1, Problem 009a

Correct.

In a group of adults, some own iPads, and others do not. Indicate whether the following is a simple or a compound event. Assume two persons are selected randomly.

One person has an iPad and the other does not.

Chapter 04, Section 4.1, Problem 009b

Correct.

In a group of adults, some own iPads, and others do not. Indicate whether the following is a simple or a compound event. Assume two persons are selected randomly.

At least one person has an iPad.

Chapter 04, Section 4.1, Problem 009c

Correct.

In a group of adults, some own iPads, and others do not. Indicate whether the following is a simple or a compound event. Assume two persons are selected randomly.

Not more than one person has an iPad.

Chapter 04, Section 4.1, Problem 009d

Correct.

In a group of adults, some own iPads, and others do not. Indicate whether the following is a simple or a compound event. Assume two persons are selected randomly.

The first person has an iPad and the second does not.

Chapter 04, Section 4.2, Problem 021

Correct.

A random sample of 1605 adults showed that 632 of them have shopped at least once on the Internet. What is the (approximate) probability that a randomly selected adult has shopped on the Internet?

the tolerance is +/-2%

Chapter 04, Section 4.3, Problem 036

Six hundred adults were asked whether or not they watch for calories and fat content when they buy groceries. The following table gives the two-way classification of their responses, where yes means that an adult watches for calories and fat content and no means he/she does not watch.

Yes No No Opinion

Men 75 169 56

Women 104 126 70

Give exact answers in fraction form.

is a man
Probability =

does not watch for calories and fat content
Probability =

iii. watches for calories and fat content given that this adult is a woman

Probability =

is a man given that this adult has no opinion
Probability =

Are events men and yes mutually exclusive?

What about yes and no opinion?

Are events men and no independent?

Chapter 05, Section 5.2, Problem 07d

Correct.

The following table gives the probability distribution of a discrete random variable x.

x 0 1 2 3 4 5 6

P(x) 0.12 0.18 0.28 0.15 0.12 0.07 0.08

Find P(1≤x≤4).

P(1≤x≤4)=

exact number, no tolerance

Chapter 05, Section 5.3, Problem 021

Correct.

The H2 Hummer limousine has eight tires on it. A fleet of 1214 H2 limos was fit with a batch of tires that mistakenly passed quality testing. The following table lists the frequency distribution of the number of defective tires on the 1214 H2 limos.

Number of defective tires 0 1 2 3 4 5 6 7 8

Number of H2 limos 55 209 347 301 203 75 17 4 3

Construct a probability distribution table for the numbers of defective tires on these limos.

x P(x)

0

1

2

3

4

5

6

7

8

Calculate the mean and standard deviation for the probability distribution you developed for the number of defective tires on all 1214 H2 Hummer limousines.

There is an average of defective tires per limo, with a standard deviation of tires.

QNT 275 Week 3 Quiz

Chapter 04, Section 4.2, Problem 015

Which of the following values cannot be probabilities of events?

15 0.94 -0.55 1.57 53 0.0 -27 1.0

Select all that apply.

-27

53

0.0

1.0

15

0.94

-0.55

1.57

Chapter 04, Section 4.2, Problem 017

The president of a company has a hunch that there is a 0.30 probability that the company will be successful in marketing a new brand of ice cream. Is this a case of classical, relative frequency, or subjective probability?

Relative frequency probability

Subjective probability

Classical probability

Chapter 04, Section 4.2, Problem 020

Correct.

A regular, six-sided die is rolled once.

What is the probability that a number less than 3 is obtained?

P(a number less than 3 is obtained)=

What is the probability that a number 2 to 5 is obtained?

P(a number 2 to 5 is obtained)=

Chapter 04, Section 4.2, Problem 021

Correct.

A random sample of 1115 adults showed that 539 of them have shopped at least once on the Internet. What is the (approximate) probability that a randomly selected adult has shopped on the Internet?

the tolerance is +/-5%

Chapter 05, Section 5.1, Problem 002a

Correct.

Classify the following random variable as discrete or continuous.

The time left on a parking meter.

Chapter 05, Section 5.1, Problem 002b

Correct.

Classify the following random variable as discrete or continuous.

The number of bats broken by a major league baseball team in a season.

Chapter 05, Section 5.2, Problem 07b

Correct.

The following table gives the probability distribution of a discrete random variable x.

x 0 1 2 3 4 5 6

P(x) 0.12 0.19 0.30 0.15 0.11 0.09 0.04

Find P(x≤2).

P(x≤2)=

exact number, no tolerance

Chapter 05, Section 5.4, Problem 029

Select each of the following experiments that are binomial experiments.

Drawing 3 balls with replacement from a box that contains 13 balls, 6 of which are red and7 are blue, and observing the colors of the drawn balls.

Selecting a few households from New York City and observing whether or not they own stocks when it is known that 30% of all households in New York City own stocks.

Drawing 3 balls without replacement from a box that contains 13 balls, 6 of which are red and 7 are blue, and observing the colors of the drawn balls.

Chapter 04, Section 4.2, Problem 019

Correct.

A hat contains 30 marbles. Of them, 17 are red and 13 are green. If one marble is randomly selected out of this hat, what is the probability that this marble is green?

P(A)=

the tolerance is +/-5%

8th-ed Chapter 04, Section 4.3, Problem 046a

Correct.

A statistical experiment has eight equally likely outcomes that are denoted by 1,2,3,4,5,6,7, and 8. Let event A= and event B=.

The events A and B

mutually exclusive events.

QNT 275 Week 4 Business Decision Making Project Part 2

Use the same business problem/opportunity and research variable you wrote about in Week 3.

Remember: Do not actually collect any data; think hypothetically.

Develop a 1,050-word report in which you:

Identify the types of descriptive statistics that might be best for summarizing the data, if you were to collect a sample.
Analyze the types of inferential statistics that might be best for analyzing the data, if you were to collect a sample.
Analyze the role probability or trend analysis might play in helping address the business problem.
Analyze the role that linear regression for trend analysis might play in helping address the business problem.
Analyze the role that a time series might play in helping address the business problem.
Format your assignment consistent with APA guidelines.

Click the Assignment Files tab to submit your assignment.

QNT 275 Week 4 Practice Set

Chapter 06, Section 6.1, Problem 013

Correct.

Find the area under the standard normal curve between z=-1.53 and z=2.37.

A=

the tolerance is +/-2%

Chapter 06, Section 6.1, Problem 015a

Correct.

Obtain the area under the standard normal curve to the right of z=1.37.

A=

the tolerance is +/-2%

Chapter 06, Section 6.2, Problem 019a

Correct.

Find the z value for x=33 for a normal distribution with μ=30 and σ=5.

z=

exact number, no tolerance

Chapter 06, Section 6.2, Intelligent Tutoring Problem 023

Compute probabilities.

Recall the following definitions from section 6.4 of the text.

The area under the normal curve from x = a to x = b with given mean and standard deviation is the probability that x assumes a value between x = a and x = b. If we are using Table IV in Appendix C, we need to standardize the random variable x using the formula z = (x− µ)/σ, before using the table.

Alternatively, you may use a graphing calculator to obtain more accurate calculations without standardizing the random variable x.

For example, using a TI83 plus we calculate the area under the normal curve from x = a to x = b by using the

normalcdf(a,b,µ,σ)

where µ is the mean and σ is the standard deviation of the normal distribution. We use 1E99 for ∞ and −1E99 for −∞, if needed.

Chapter 06, Section 6.2, Intelligent Tutoring Problem 023

Let x be a continuous random variable that is normally distributed with a mean of 24 and a standard deviation of 5.

(a) Standardize the variable value x = 26.9.

z =

(b) Standardize the variable value x = 49.0.

z =

Attempts: 1 of 3 used

Chapter 06, Section 6.2, Intelligent Tutoring Problem 023

Let x be a continuous random variable that is normally distributed with a mean of 24 and a standard deviation of 5.

(a) Write a cumulative probability statement for the area under the normal curve to find the probability that x assumes a value between 26.9 and 49.0:

(b) Write an equivalent standardized probability statement for (a) above using the results obtained in the previous step:

Attempts: 1 of 3 used

Chapter 06, Section 6.2, Intelligent Tutoring Problem 023

Area under normal curve between x = 26.9 and x = 49.0 is given by

P(26.9 < x < 49.0) = P( 0.58 < z < 5) =

the tolerance is +/-2%

Attempts: 1 of 3 used

Chapter 06, Section 6.2, Intelligent Tutoring Problem 023

Now, if the mean is 26 and the standard deviation is 6, find the probability that x assumes a value between 29.5 and 56.0.

The probability =

the tolerance is +/-2%

Chapter 07, Section 7.1, Video Quiz 1

Please view the following video before answering this question. Distribution of the Sample Mean

The 5 ages of the population have one mean. However, when looking at the 10 samples of 3 of those means, there are 10 means – one for each sample. State the symbols for the one mean and then the 10 means.

µ, x¯.

x¯, x¯.

x¯, µ.

µ, µ.

QNT 275 Week 4 Quiz

Chapter 06, Testbank, Question 001

A continuous random variable is a random variable that can:

assume no continuous random frequency

assume any value in one or more intervals

have no random sample

assume only a countable set of values

Chapter 06, Testbank, Question 009

Which of the following is not a characteristic of the normal distribution?

The value of the mean is always greater than the value of the standard deviation

The curve is symmetric about the mean

The two tails of the curve extend indefinitely

The total area under the curve is 1.0

Chapter 06, Testbank, Question 010

The total area under a normal distribution curve to the left of the mean is always:

greater than .5

equal to zero

equal to 1

equal to 0.5

Chapter 06, Testbank, Question 015

For the standard normal distribution, the mean is:

1 and the standard deviation is 1

0.5 and the standard deviation is 0.5

1 and the standard deviation is zero

zero and the standard deviation is 1

Chapter 06, Testbank, Question 020

For the standard normal distribution, the area between z = 0 and z = 2.94, rounded to four decimal places, is:

the tolerance is +/-2%

Chapter 06, Testbank, Question 023

For the standard normal distribution, the area to the right of z = -2.12, rounded to four decimal places, is:

the tolerance is +/-2%

Chapter 06, Testbank, Question 026

For the standard normal distribution, the area between z = 0.24 and z = 1.03, rounded to four decimal places, is:

the tolerance is +/-2%

Chapter 06, Testbank, Question 033-035

The GMAT scores of all examinees who took that test this year produce a distribution that is approximately normal with a mean of 420 and a standard deviation of 34.

The probability that the score of a randomly selected examinee is between 400 and 480, rounded to four decimal places, is:

The probability that the score of a randomly selected examinee is less than 370, rounded to four decimal places, is:

The probability that the score of a randomly selected examinee is more than 530, rounded to four decimal places, is:

QNT 275 Week 5 Business Decision Making Project Part 3

Prepare an 11- to 15-slide Microsoft® PowerPoint® presentation for the senior management team based on the business problem or opportunity you described in Weeks 3 and 4.

Include on the slides what you would want the audience to see (include appropriate visual aids/layout). In the Speaker Notes section, include what you would say as you present each slide. If any source material is quoted or paraphrased in the presentation, use APA citations and references.

Draw on material you developed in the Week 3 and 4 assignments.

Include the following in your presentation:

Introduction slide
Agenda slide
Describe the organization, with a brief description
Explain the business problem or opportunity
Analyze why the business problem is important
Identify what variable would be best to measure for this problem and explain why
Apply data analysis techniques to this problem (tell which techniques should be used: descriptive stats, inferential stats, probability, time series) and explain why
Apply a possible solution to the problem/opportunity, with rationale
Evaluate how data could be used to measure the implementation of such a solution
Conclusion
References slide (if any source material is quoted or paraphrased throughout the presentation)
Format your assignment consistent with APA guidelines.

Click the Assignment Files tab to submit your assignment.

QNT 275 Week 5 Quiz

Chapter 08, Section 8.2, Problem 010

Correct.

Find z for a 90% confidence level.

z=

the tolerance is +/-2%

Chapter 08, Section 8.2, Problem 011

For a data set obtained from a sample, n=80 and x¯=46.55. It is known that σ=3.9.

What is the point estimate of μ?

The point estimate is .

Make a 97% confidence interval for μ.

( , )

What is the margin of error of estimate for part b?

E=

Chapter 08, Section 8.2, Problem 017a

Correct.

Determine the sample size for the estimate of μ for the following.

E=2.4, σ=12.35, confidence level=99%.

n=

the tolerance is +/-2%

Chapter 08, Section 8.3, Problem 034b

Correct.

For the following, find the area in the appropriate tail of the t distribution.

t=1.711 and n=25.

Area in the

tail is

the tolerance is +/-2%

Chapter 09, Section 9.1, Problem 004a

Correct.

Which of the following is a left-tailed test?

H0: μ=101, H1: μ<101

H0: μ=48, H1: μ≠48

H0: μ=73, H1: μ73

Chapter 09, Section 9.1, Problem 007

Correct.

Write the null and alternative hypotheses for the following example. Determine if the example is a case of a two-tailed, a left-tailed, or a right-tailed test.

To test if the mean length of experience of airport security guards is different from 3 years.

≠H0: μ≠3 years, H1: μ=3 years, right-tailed test

H0: μ=3 years, ≠H1: μ≠3 years, two-tailed test

H0: μ=3 years, H1: μ<3 years, left-tailed test

H0: μ=3 years, H1: μ3 years, right-tailed test

≤H0: μ≤3 years, H1: μ3 years, two-tailed test

Chapter 09, Section 9.2, Problem 014c

Correct.

Consider H0: μ=38 versus H1: μ38. A random sample of 35 observations taken from this population produced a sample mean of 40.26. The population is normally distributed with σ=7.2.

p=

the tolerance is +/-2%

Chapter 09, Section 9.2, Problem 020a

Correct.

A random sample of 125 observations produced a sample mean of 31. Find the critical and observed values of z for the following test of hypothesis using α=0.01. The population standard deviation is known to be 5 and the population distribution is normal.

H0: μ=28 versus H1: μ≠28.

zcritical left =

zcritical right =

zobserved =

Chapter 09, Section 9.2, Problem 025b

Correct.

The manufacturer of a certain brand of auto batteries claims that the mean life of these batteries is 45 months. A consumer protection agency that wants to check this claim took a random sample of 24 such batteries and found that the mean life for this sample is 43.05 months. The lives of all such batteries have a normal distribution with the population standard deviation of 4.5 months.

Test the hypothesis H0: μ=45 months versus H1: μ<45 months using the critical-value approach and α=0.1.

H0 is

Chapter 01, Section 1.3, Video Quiz 2

Please view the following video before answering this question. Soda with Callouts

The number of sodas is what type of data?

Discrete.

Continuous.

QNT 275 Week 5 Final Exam

Chapter 01, Testbank, Question 012

A quantitative variable is the only type of variable that can:

have no intermediate values

assume numeric values for which arithmetic operations make sense

be graphed

be used to prepare tables

Chapter 01, Testbank, Question 015

A qualitative variable is the only type of variable that:

can assume numerical values

cannot be graphed

can assume an uncountable set of values

cannot be measured numerically

Chapter 02, Testbank, Question 067-072

Correct.

The following table gives the cumulative frequency distribution of the commuting time (in minutes) from home to work for a sample of 400 persons selected from a city.

Time (minutes) f

0 to less than 10 66

0 to less than 20 148

0 to less than 30 220

0 to less than 40 294

0 to less than 50 356

0 to less than 60 400

The sample size is:

The percentage of persons who commute for less than 30 minutes, rounded to two decimal places, is:

%

The cumulative relative frequency of the fourth class, rounded to four decimal places, is:

The percentage of persons who commute for 40 or more minutes, rounded to two decimal places, is:

%

The percentage of persons who commute for less than 50 minutes, rounded to two decimal places, is:

%

The number of persons who commute for 20 or more minutes is:

Chapter 03, Testbank, Question 027-029

The temperatures (in degrees Fahrenheit) observed during seven days of summer in Los Angeles are:

78,99,68,91,97,75,85

The range of these temperatures is:

The variance of these temperatures, rounded to three decimals, is:

The standard deviation, rounded to three decimals, of these temperatures is:

Chapter 04, Testbank, Question 021-026

The following table gives the two-way classification of 500 students based on sex and whether or not they suffer from math anxiety.

Suffer From Math Anxiety

Sex Yes No

Male 151 89

Female 184 76

If you randomly select one student from these 500 students, the probability that this selected student is a female is: (round your answer to three decimal places, so 0.0857 would be 0.086)

If you randomly select one student from these 500 students, the probability that this selected student suffers from math anxiety is: (round your answer to three decimal places, so 0.0857 would be 0.086)

If you randomly select one student from these 500 students, the probability that this selected student suffers from math anxiety, given that he is a male is: (round your answer to three decimal places, so 0.0857 would be 0.086)

If you randomly select one student from these 500 students, the probability that this selected student is a female, given that she does not suffer from math anxiety is: (round your answer to three decimal places, so 0.0857 would be 0.086)

Which of the following pairs of events are mutually exclusive?

Male and no

No and yes

Male and yes

Female and yes

Female and male

Female and no

Are the events “Has math anxiety” and “Person is female” independent or dependent? Detail the calculations you performed to determine this.

Chapter 05, Testbank, Question 009

For the probability distribution of a discrete random variable x, the sum of the probabilities of all values of x must be:

equal to 1

equal to zero

in the range zero to 1

equal to 0.5

Chapter 05, Testbank, Question 034-035

The following table lists the probability distribution of a discrete random variable x:

x 2 3 4 5 6 7 8

P(x) 0.15 0.3 0.24 0.13 0.1 0.06 0.02

The mean of the random variable x is:

The standard deviation of the random variable x, rounded to three decimal places, is:

Chapter 06, Testbank, Question 036-038

The daily sales at a convenience store produce a distribution that is approximately normal with a mean of 1270 and a standard deviation of 136.

The probability that the sales on a given day at this store are more than

1,405, rounded to four decimal places, is:

The probability that the sales on a given day at this store are less than

1,305, rounded to four decimal places, is:

The probability that the sales on a given day at this store are between

1,200 and 1,300, rounded to four decimal places, is:

Chapter 08, Testbank, Question 010

The width of a confidence interval depends on the size of the:

population mean

margin of error

sample mean

none of these

Chapter 08, Testbank, Question 014

A sample of size 67 from a population having standard deviation

= 41 produced a mean of 248.00. The 95% confidence interval for the population mean (rounded to two decimal places) is:

The lower limit is

The upper limit is

Chapter 09, Testbank, Question 001

The null hypothesis is a claim about a:

population parameter, where the claim is assumed to be true until it is declared false

population parameter, where the claim is assumed to be false until it is declared true

statistic, where the claim is assumed to be false until it is declared true

statistic, where the claim is assumed to be true until it is declared false

Chapter 09, Testbank, Question 002

The alternative hypothesis is a claim about a:

statistic, where the claim is assumed to be true if the null hypothesis is declared false

population parameter, where the claim is assumed to be true if the null hypothesis is declared false

statistic, where the claim is assumed to be false until it is declared true

population parameter, where the claim is assumed to be true until it is declared false

Chapter 09, Testbank, Question 003

In a one-tailed hypothesis test, a critical point is a point that divides the area under the sampling distribution of a:

statistic into one rejection region and one nonrejection region

population parameter into one rejection region and one nonrejection region

statistic into one rejection region and two nonrejection regions

population parameter into two rejection regions and one nonrejection region

Chapter 09, Testbank, Question 004

In a two-tailed hypothesis test, the two critical points are the points that divide the area under the sampling distribution of a:

statistic into two rejection regions and one nonrejection region

statistic into one rejection region and two nonrejection regions

population parameter into two rejection regions and one nonrejection region

population parameter into one rejection region and one nonrejection region

Chapter 09, Testbank, Question 005

In a hypothesis test, a Type I error occurs when:

a true null hypothesis is rejected

a false null hypothesis is rejected

a false null hypothesis is not rejected

a true null hypothesis is not rejected

Chapter 09, Testbank, Question 006

In a hypothesis test, a Type II error occurs when:

a false null hypothesis is not rejected

a true null hypothesis is rejected

a true null hypothesis is not rejected

a false null hypothesis is rejected

Chapter 09, Testbank, Question 007