2 small assignments - due tomorrow

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Assignment-12questions-05.02.18.docx

Simply answer each question on this, same sheet and explain how you came to that answer.

 

We will be focusing our attention on one important distribution -- the normal distribution.   In particular, we will look at the standard normal curve.  For every normal curve, we can transform its values to the standard normal curve using the formula Z = (X - Xbar)/S, where Z is the standard score, X is our value to be transformed, Xbar is the mean of the normal distribution, and S is the standard deviation.

 

1. Drinking survey. One reason that Normal distributions are important is that they describe the results of phenomena that have a random element, such as how an opinion poll would vary if the poll were repeated many times, or for data on samples of average behavior, such as drinking.   A report by the National Study on Drug Use and Health finds that on average females consumed an average of 2.4 drinks per day in the past 30 days.  And let’s assume that the data follow the Normal distribution with standard deviation 1.1 drinks per day.   Use this fact and the 68-95-99.7 rule to answer the following two questions (in other words, you should not need to do any calculations to get the answers.)

In repeated samples, what percent of samples would give a result above 2.4 drinks per day for females (In English: if I knew the population mean was 2.4 and I randomly sampled the average, what percent of my samples would produce a value above 2.4)?  Picture the normal curve and the area above the mean.

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 100%

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 50%

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. -50%

D. 25%

Explanation for the answer:

1b. For the drinking data above, in large number of samples, if I have a mean of 2.4 and a standard deviation of 1.1, what range of number of drinks per day captures 68.27% of sample?

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 0.2 to 4.6 drinks

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 2.4 drinks

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. 1.3 to 3.5 drinks

D. 95%

Explanation for the answer:

2. For the following four questions, find some proportions (or areas under the curve). You need to become familiar with standardizing survey results by transforming them into Z (and later t) scores. Then, you have to find the probability of being to the left, right or between Z scores. The sign < means all the values (or area under the curve) to the left of the Z score.  The sign > means all the values to the right of the Z score.   For example, in standard z-score world, the probability that Z<0 = .50, or 50%.   The probability that 0<Z<1 = .3413, or 34.13%.   Try this on your own!  Remember the Rule of Thumb that anything beyond 2 standard deviations (Z>2, or Z<-2) is a pretty unusual event, so there is not much in that area of the curve. Using either Excel's =normsdist() function, or your book, or your z-score calculator from this week's forum or software (or drawing a picture often helps), find the proportion of observations from a standard Normal distribution (bell curve) for each of the following events, i.e., what proportion of the curve is in that area: a.Probability that Z < 1.96

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. -.233

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. .975

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. .025

D. 50%

Explanation for the answer:

2b. Probability that Z <  -1.96 (negative 1.96)

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. .975

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. .025

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. .5

D. .95

Explanation for the answer:

2c. Probability that Z > 1.28 (or Z< -1.28)

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. .05

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. .5

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. .90

D. 0.1003

Explanation for the answer:

2d. Probability that -1.96 > Z > 1.96 (this is the probability that the value is less than negative 1.96 AND greater than  1.96).   This is the value in the two tails.

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. .8747

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. .1003

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. .05

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176D. 1.0

Explanation for the answer:

The Online police department was asked by the mayor’s office to estimate the cost of crime to citizens of Online. The police began their study with the crime of identity theft, taking a random sample of files (there is too much crime to calculate the statistics for all the crimes committed).   They found the average dollar loss in an identity theft was $7000, with a standard deviation of $2000, and that the dollar loss was normally distributed. (Use this information for the following 4 questions.  Again, calculate a z-score, and then use a table or app to figure out the percentage.  Some apps will do it all for you if you enter the mean and standard deviation.)  In this sample, taken from Home Depot this week:

 

What proportion of identity thefts had dollar losses above $9000?

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 0.60

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 0.1587

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. .0228

D. 5000

Explanation for the answer:

 

If you have a normal distribution with mean=7000 and standard deviation =2000, what percentage of identity thefts have dollar losses between $2000 and $4000?

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 0.9394

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 0.1359

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. 0.0606

D. 0.2528

Explanation for the answer:

c. If you have a normal distribution with mean=7000 and standard deviation =2000, what is the probability that any one identity theft had a dollar loss below $5000?

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 0.6808

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 0.15865

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. .841345

D. .025

Explanation for the answer:

3e. If you have a normal distribution with mean=6000 and standard deviation =2000, what proportion of thefts are above $12000?

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 0.95

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 0.0250

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. 0.00135

D. .5

Explanation for the answer:

4.    In an “Excite Poll” October 14, 2002, a self-response poll of internet users, the question was:

 

It is now possible for school students to log on to Internet sites and download homework. Everything from book reports to doctoral dissertations can be downloaded free or for a fee. Do you believe giving a student who is caught plagiarizing an “F” for their assignment is the right punishment?

 

In all, 14,793 people clicked “Yes,” 1778 clicked “No, it is too harsh,” 2566 clicked “No, it is not harsh enough,” and 988 clicked “don’t know” or “don’t care.”

 

a)    What is the sample size for this poll?

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176A. 1778

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176B. 2566

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176C. 4344

https://ilearn.marist.edu/samigo-app/images/radiounchecked.gif?sakai.tool.placement.id=49d73299-ab66-4b9b-85c9-43ee746ab176D. 20125

E. 14793

Explanation for the answer:

4b.

 Th The "Excite Poll" internet write in poll described above has a much larger sample than standard sample surveys. Can we trust the result to give good information about any clearly defined population. Why or why not?   Would a random sample of 50 provide better or worse data?

Answer :