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Deck 6: Normal Probability Distributions
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Assume that the weight loss for the first month of a diet program varies between 6 pounds and 12 pounds, and is spread evenly over the range of possibilities, so that there is a uniform
Distribution. Find the probability that the given range of pounds lost is between 8 pounds
And 11 pounds.
Distribution. Find the probability that the given range of pounds lost is between 8 pounds
And 11 pounds.
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Using the following uniform density curve, answer the question. 
What is the probability that the random variable has a value greater than 5? A )0 . 3 2 5 B )0 . 2 5 0
C) 0.375
D) 0.500
What is the probability that the random variable has a value greater than 5? A )0 . 3 2 5 B )0 . 2 5 0C) 0.375
D) 0.500
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Find the indicated z score. The graph depicts the standard normal distribution with mean 0 and standard deviation 1. Shaded area is 0.4483. 
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Find the area of the shaded region. The graph depicts the standard normal distribution wit? mean 0 and standard deviation 1. 
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A normal quartile plot is given below for a sample of scores on an aptitude test. Use the
plot to assess the normality of scores on this test. Explain your reasoning.
plot to assess the normality of scores on this test. Explain your reasoning.
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A) 0.1922
B) 0.1660
C) 0.8340
D) 0.1685
Question
A normal quartile plot is given below for the weekly incomes (in dollars)of a sample of
engineers in one town. Describe what each x value represents and what each y value
represents. Use the plot to assess the normality of the incomes of engineers in this town.
Explain your reasoning.
engineers in one town. Describe what each x value represents and what each y value
represents. Use the plot to assess the normality of the incomes of engineers in this town.
Explain your reasoning.
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Deck 6: Normal Probability Distributions
1
For the binomial distribution with n = 24 and p = 0.6, state whether or not it is suitable to use the normal distribution as an approximation.
A) Normal approximation is suitable.
B) Normal approximation is not suitable.
A) Normal approximation is suitable.
B) Normal approximation is not suitable.
A
2
The heights of adult females are normally distributed. If you were to construct a histogram o? 40 randomly selected women, what shape would the histogram of those heights have and what
Pattern would you expect in a normal quantile plot of these data?
A) The histogram would be approximately bell-shaped, and the normal quantile plot would have data points have follow a straight-line pattern.
B) The histogram would by approximately bell-shaped, and the normal quantile plot would have data points that would be bell-shaped.
C) The histogram would by non-symmetric, and the normal quantile plot would have data points that would be non-linear.
D) The histogram would by approximately bell-shaped, and the normal quantile plot would have data points that would be non-linear.
Pattern would you expect in a normal quantile plot of these data?
A) The histogram would be approximately bell-shaped, and the normal quantile plot would have data points have follow a straight-line pattern.
B) The histogram would by approximately bell-shaped, and the normal quantile plot would have data points that would be bell-shaped.
C) The histogram would by non-symmetric, and the normal quantile plot would have data points that would be non-linear.
D) The histogram would by approximately bell-shaped, and the normal quantile plot would have data points that would be non-linear.
A
3
A bank's loan officer rates applicants for credit. The ratings are normally distributed with a mean of 200 and a standard deviation of 50. Find P60, the score which separates the lower
60% from the top 40%.
A) 187.5
B) 212.5
C) 207.8
D) 211.3
60% from the top 40%.
A) 187.5
B) 212.5
C) 207.8
D) 211.3
B
4
For women aged 18-24, systolic blood pressures are normally distributed with a mean of 114.8 mm Hg and a standard deviation of 13.1 mm Hg. If 23 women aged 18-24 are randomly
Selected, find the probability that their mean systolic blood pressure is between 119 and 122
Mm Hg.
A) 0.9341
B) 0.3343
C) 0.0577
D) 0.0833
Selected, find the probability that their mean systolic blood pressure is between 119 and 122
Mm Hg.
A) 0.9341
B) 0.3343
C) 0.0577
D) 0.0833
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5
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6
Estimate the indicated probability by using the normal distribution as an approximation to the binomial distribution. Estimate P(6)for n = 18 and p = 0.3.
A) 0.1239
B) 0.1015
C) 0.8513
D) 0.1958
A) 0.1239
B) 0.1015
C) 0.8513
D) 0.1958
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7
The lengths of human pregnancies are normally distributed with a mean of 268 days and a standard deviation of 15 days. What is the probability that a pregnancy last at least 300 days?
A) 0.0166
B) 0.4834
C) 0.0179
D) 0.9834
A) 0.0166
B) 0.4834
C) 0.0179
D) 0.9834
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8
Assume that the weight loss for the first month of a diet program varies between 6 pounds and 12 pounds, and is spread evenly over the range of possibilities, so that there is a uniform
Distribution. Find the probability that the given range of pounds lost is between 8 pounds
And 11 pounds.
Distribution. Find the probability that the given range of pounds lost is between 8 pounds
And 11 pounds.
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9
A study of the amount of time it takes a mechanic to rebuild the transmission for a 2010 Chevrolet Colorado shows that the mean is 8.4 hours and the standard deviation is 1.8 hours.
If 40 mechanics are randomly selected, find the probability that their mean rebuild time is less
Than 8.9 hours.
A) 0.9589
B) 0.4276
C) 0.9608
D) 0.9756
If 40 mechanics are randomly selected, find the probability that their mean rebuild time is less
Than 8.9 hours.
A) 0.9589
B) 0.4276
C) 0.9608
D) 0.9756
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10
The continuity correction is used to compensate for the fact that a ___________distribution is used to approximate a ____________ distribution.
A) discrete; continuous
B) continuous; discrete
C) discrete; uniform
D) binomial; uniform
A) discrete; continuous
B) continuous; discrete
C) discrete; uniform
D) binomial; uniform
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11
If a histogram of a sample of men's ages is skewed, what do you expect to see in the normal quantile plot?
A) Points are following a straight-line pattern.
B) Points are not following a straight-line pattern.
A) Points are following a straight-line pattern.
B) Points are not following a straight-line pattern.
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12
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13
Estimate the probability of getting exactly 43 boys in 90 births. Estimate the indicated probability by using the normal distribution as an approximation to the binomial distribution.
A) 0.0764
B) 0.0729
C) 0.0159
D) 0.1628
A) 0.0764
B) 0.0729
C) 0.0159
D) 0.1628
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14
The given values are discrete. Use the continuity correction and describe the region of the normal distribution that corresponds to the indicated probability.
The probability of exactly 44 green marbles
A) The area between 43.5 and 45.5
B) The area between 43.5 and 44
C) The area between 43.5 and 44.5
D) The area between 44 and 44.5
The probability of exactly 44 green marbles
A) The area between 43.5 and 45.5
B) The area between 43.5 and 44
C) The area between 43.5 and 44.5
D) The area between 44 and 44.5
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15
Find the probability that in 200 tosses of a fair die, we will obtain at most 30 fives. Use the normal distribution to approximate the desired probability.
A) 0.1871
B) 0.2946
C) 0.4936
D) 0.3229
A) 0.1871
B) 0.2946
C) 0.4936
D) 0.3229
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16
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17
Using the following uniform density curve, answer the question. What is the probability that the random variable has a value greater than 5? A )0 . 3 2 5 B )0 . 2 5 0
C) 0.375
D) 0.500
What is the probability that the random variable has a value greater than 5? A )0 . 3 2 5 B )0 . 2 5 0C) 0.375
D) 0.500
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18
The probability that a radish seed will germinate is 0.7. Estimate the probability that of 140 randomly selected seeds, exactly 100 will germinate.
A) 0.0679
B) 0.9331
C) 0.0669
D) 0.0769
A) 0.0679
B) 0.9331
C) 0.0669
D) 0.0769
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19
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20
A bank's loan officer rates applicants for credit. The ratings are normally distributed with a mean of 200 and a standard deviation of 50. If an applicant is randomly selected, find the
Probability of a rating that is between 200 and 275.
A) 0.4332
B) 0.9332
C) 0.0668
D) 0.5
Probability of a rating that is between 200 and 275.
A) 0.4332
B) 0.9332
C) 0.0668
D) 0.5
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21
A baseball player has a batting average of 0.346, so the probability of a hit is 0.346. Assume that his hitting attempts are independent of each other. Assume that the batter gets up to bat 4
Times in each game. Estimate the probability that in 50 consecutive games, there are at least
45 games in which the batter gets at least one hit. (Hint: first find the probability that in one
Game the batter gets at least one hit)
A) 0.0918
B) 0.0446
C) 0.0643
D) 0.8171
Times in each game. Estimate the probability that in 50 consecutive games, there are at least
45 games in which the batter gets at least one hit. (Hint: first find the probability that in one
Game the batter gets at least one hit)
A) 0.0918
B) 0.0446
C) 0.0643
D) 0.8171
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22
Explain how a nonstandard normal distribution differs from the standard normal
distribution. Describe the process for finding probabilities for nonstandard normal
distributions.
distribution. Describe the process for finding probabilities for nonstandard normal
distributions.
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23
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24
Assume that the red blood cell counts of women are normally distributed with a mean of 4.577 million cells per microliter and a standard deviation of 0.382 million cells per
Microliter. Find the value closest to the probability that a randomly selected woman has a red
Blood cell count above the normal range of 4.2 to 5.4 million cells per microliter.
A) 0.1611
B) 0.0409
C) 0.0158
D) 0.9842
Microliter. Find the value closest to the probability that a randomly selected woman has a red
Blood cell count above the normal range of 4.2 to 5.4 million cells per microliter.
A) 0.1611
B) 0.0409
C) 0.0158
D) 0.9842
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25
Estimate the indicated probability by using the normal distribution as an approximation to the binomial distribution. Two percent of hair dryers produced in a certain plant are
Defective. Estimate the probability that of 10,000 randomly selected hair dryers, at least 219
Are defective.
A) 0.0823
B) 0.9066
C) 0.0869
D) 0.0934
Defective. Estimate the probability that of 10,000 randomly selected hair dryers, at least 219
Are defective.
A) 0.0823
B) 0.9066
C) 0.0869
D) 0.0934
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26
A coin is tossed 20 times. A person who claims to have extrasensory perception is asked to predict the outcome of each flip in advance. She predicts correctly on 14 tosses. What is the
Probability of being correct 14 or more times by guessing? Does this probability seem to
Verify her claim? Use the normal distribution to approximate the desired probability.
A) 0.4418, no
B) 0.4418, yes
C) 0.0582, no
D) 0.0582, yes
Probability of being correct 14 or more times by guessing? Does this probability seem to
Verify her claim? Use the normal distribution to approximate the desired probability.
A) 0.4418, no
B) 0.4418, yes
C) 0.0582, no
D) 0.0582, yes
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27
In one region, the September energy consumption levels for single -family homes are found to be normally distributed with a mean of 1050 kWh and a standard deviation of 218 kWh. For a
Randomly selected home, find the probability that the September energy consumption level is
Between 1100 kWh and 1225 kWh.
A) 0.3791
B) 0.2881
C) 0.1971
D) 0.0910
Randomly selected home, find the probability that the September energy consumption level is
Between 1100 kWh and 1225 kWh.
A) 0.3791
B) 0.2881
C) 0.1971
D) 0.0910
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28
Assume that the red blood cell counts of women are normally distributed with a mean of 4.577 million cells per microliter and a standard deviation of 0.382 million cells per
Microliter. Approximately what percentage of women have red blood cell counts in the
Normal range from 4.2 to 5.4 million cells per microliter?
A) 82.31%
B) 17.69%
C) 4.09%
D) 16.11%
Microliter. Approximately what percentage of women have red blood cell counts in the
Normal range from 4.2 to 5.4 million cells per microliter?
A) 82.31%
B) 17.69%
C) 4.09%
D) 16.11%
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29
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30
Find the indicated z score. The graph depicts the standard normal distribution with mean 0 and standard deviation 1. Shaded area is 0.4483.
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31
Find the area of the shaded region. The graph depicts the standard normal distribution wit? mean 0 and standard deviation 1.
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32
Assume that the red blood cell counts of women are normally distributed with a mean of 4.577 million cells per microliter and a standard deviation of 0.382 million cells per
Microliter. Find the 80th percentile for the red blood cell counts of women.
A) 4.655 million cells per microliter
B) 4.898 million cells per microliter
C) 4.565 million cells per microliter
C) 4.878 million cells per microliter
Microliter. Find the 80th percentile for the red blood cell counts of women.
A) 4.655 million cells per microliter
B) 4.898 million cells per microliter
C) 4.565 million cells per microliter
C) 4.878 million cells per microliter
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33
Which of the following is a biased estimator?
A) proportion
B) variance
C) mean
D) standard deviation
A) proportion
B) variance
C) mean
D) standard deviation
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34
An unbiased estimator is a statistic that targets the value of the of the population parameter such that the sampling distribution of the statistic has a __________equal to the _________ of
The corresponding parameter.
A) mean; mean
B) standard deviation; standard deviation
C) mean; standard deviation
D) range; range/4
The corresponding parameter.
A) mean; mean
B) standard deviation; standard deviation
C) mean; standard deviation
D) range; range/4
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35
The given values are discrete. Use the continuity correction and describe the region of the normal distribution that corresponds to the indicated probability.
The probability of no more than 35 defective CDs
A) The area to the left of 35
B) The area to the left of 35.5
C) The area to the right of 35.5
D) The area to the left of 34.5
The probability of no more than 35 defective CDs
A) The area to the left of 35
B) The area to the left of 35.5
C) The area to the right of 35.5
D) The area to the left of 34.5
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36
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37
The weights of college football players are normally distributed with a mean of 200 pounds and a standard deviation of 50 pounds. If a college football player is randomly selected, find
The probability that he weighs between 170 and 220 pounds.
A) 0.1554
B) 0.3811
C) 0.2257
D) 0.0703
The probability that he weighs between 170 and 220 pounds.
A) 0.1554
B) 0.3811
C) 0.2257
D) 0.0703
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38
A normal quartile plot is given below for a sample of scores on an aptitude test. Use the
plot to assess the normality of scores on this test. Explain your reasoning.
plot to assess the normality of scores on this test. Explain your reasoning.
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39
The Precision Scientific Instrument Company manufactures thermometers that are supposed to give readings of 0°C at the freezing point of water. Tests on a large sample of these
Thermometers reveal that at the freezing point of water, some give readings below 0°C
(denoted by negative numbers)and some give readings above 0°C (denoted by positive
Numbers). Assume that the mean reading is 0°C and the standard deviation of the readings is
1)00°C. Also assume that the frequency distribution of errors closely resembles the normal
Distribution. A thermometer is randomly selected and tested. A quality control analyst wants
To examine thermometers that give readings in the bottom 4%. Find the temperature reading
That separates the bottom 4% from the others.
A) −°1.75
B) −°1.63
C) −°1.48
D) −°1.89
Thermometers reveal that at the freezing point of water, some give readings below 0°C
(denoted by negative numbers)and some give readings above 0°C (denoted by positive
Numbers). Assume that the mean reading is 0°C and the standard deviation of the readings is
1)00°C. Also assume that the frequency distribution of errors closely resembles the normal
Distribution. A thermometer is randomly selected and tested. A quality control analyst wants
To examine thermometers that give readings in the bottom 4%. Find the temperature reading
That separates the bottom 4% from the others.
A) −°1.75
B) −°1.63
C) −°1.48
D) −°1.89
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40
A) 0.1922
B) 0.1660
C) 0.8340
D) 0.1685
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41
A normal quartile plot is given below for the weekly incomes (in dollars)of a sample of
engineers in one town. Describe what each x value represents and what each y value
represents. Use the plot to assess the normality of the incomes of engineers in this town.
Explain your reasoning.
engineers in one town. Describe what each x value represents and what each y value
represents. Use the plot to assess the normality of the incomes of engineers in this town.
Explain your reasoning.
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42
SAT verbal scores are normally distributed with a mean of 430 and a standard deviation of
120 (based on data from the College Board ATP). (a)If a single student is randomly selected,
find the probability that the sample mean is above 500. (b)If a sample of 35 students are
selected randomly, find the probability that the sample mean is above 500. These two
problems appear to be very similar. Which problem requires the application of the central
limit theorem, and in what way does the solution process differ between the two problems?
120 (based on data from the College Board ATP). (a)If a single student is randomly selected,
find the probability that the sample mean is above 500. (b)If a sample of 35 students are
selected randomly, find the probability that the sample mean is above 500. These two
problems appear to be very similar. Which problem requires the application of the central
limit theorem, and in what way does the solution process differ between the two problems?
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43
Describe what an unbiased estimator is and give an example of an unbiased estimator and a
biased estimator.
biased estimator.
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44
Identify three important criteria to determine if the use of a normal distribution is justified?
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45
Heights of adult females are normally distributed. Samples of height of adult females, each of
size n = 3, are randomly collected and the sample means are found. Is it correct to conclude
that the sample means cannot be treated as a normal distribution because the sample size is so
small? Explain.
size n = 3, are randomly collected and the sample means are found. Is it correct to conclude
that the sample means cannot be treated as a normal distribution because the sample size is so
small? Explain.
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46
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47
Three randomly selected households are surveyed as a pilot project for a larger survey to
be conducted later. The numbers of people in the households are 5, 7, and 9. Consider the
values of 5, 7, and 9 to be a population. Assume that samples of size n = 2 are randomly
selected with replacement from the population of 5, 7, and 9. The nine different samples are
as follows: (5, 5), (5, 7), (5, 9), (7, 5), (7, 7), (7, 9), (9, 5), (9, 7), and (9, 9). (i)Find the mean
of each of the nine samples, then summarize the sampling distribution of the means in the
format of a table representing the probability distribution. (ii)Compare the population mean
to the mean of the sample means. (iii)Do the sample means target the value of the
population mean? In general, do means make good estimators of population means? Why or
why not?
be conducted later. The numbers of people in the households are 5, 7, and 9. Consider the
values of 5, 7, and 9 to be a population. Assume that samples of size n = 2 are randomly
selected with replacement from the population of 5, 7, and 9. The nine different samples are
as follows: (5, 5), (5, 7), (5, 9), (7, 5), (7, 7), (7, 9), (9, 5), (9, 7), and (9, 9). (i)Find the mean
of each of the nine samples, then summarize the sampling distribution of the means in the
format of a table representing the probability distribution. (ii)Compare the population mean
to the mean of the sample means. (iii)Do the sample means target the value of the
population mean? In general, do means make good estimators of population means? Why or
why not?
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48
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49
Three randomly selected households are surveyed as a pilot project for a larger survey to
be conducted later. The numbers of people in the households are 2, 3, and 8. Consider the
values of 2, 3, and 8 to be a population. Assume that samples of size n = 2 are randomly
selected with replacement from the population of 2, 3, and 8. The nine different samples are
as follows:
(2, 2), (2, 3), (2, 8), (3, 2), (3, 3), (3, 8), (8, 2), (8, 3), and (8, 8).
(i)Find the range of each of the nine samples, then summarize the sampling distribution of the
ranges in the format of a table representing the probability distribution. (ii)Compare the
population range to the mean of the sample ranges. (iii)Do the sample ranges target the value
of the population range? In general, do ranges make good estimators of population ranges?
Why or why not?
be conducted later. The numbers of people in the households are 2, 3, and 8. Consider the
values of 2, 3, and 8 to be a population. Assume that samples of size n = 2 are randomly
selected with replacement from the population of 2, 3, and 8. The nine different samples are
as follows:
(2, 2), (2, 3), (2, 8), (3, 2), (3, 3), (3, 8), (8, 2), (8, 3), and (8, 8).
(i)Find the range of each of the nine samples, then summarize the sampling distribution of the
ranges in the format of a table representing the probability distribution. (ii)Compare the
population range to the mean of the sample ranges. (iii)Do the sample ranges target the value
of the population range? In general, do ranges make good estimators of population ranges?
Why or why not?
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50
After constructing a new manufacturing machine, five prototype integrated circuit chips are
produced and it is found that two are defective and three are acceptable. Assume that two of
the chips are randomly selected with replacement from this population. After identifying the
25 possible samples, find the proportion of defects in each of them, using a table to describe
the sampling distribution of the proportions of the defects.
produced and it is found that two are defective and three are acceptable. Assume that two of
the chips are randomly selected with replacement from this population. After identifying the
25 possible samples, find the proportion of defects in each of them, using a table to describe
the sampling distribution of the proportions of the defects.
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51
State the central limit theorem. Describe the sampling distribution for a population that is
uniform and for a population that is normal.
uniform and for a population that is normal.
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52
Lengths of pregnancies are normally distributed with a mean of 268 days and a standard
deviation of 15 days. (a)Find the probability of a pregnancy lasting more than 250 days.
(b)Find the probability of a pregnancy lasting more than 280 days. Draw the diagram for
each and discuss the part of the solution that would be different for finding the requested
probabilities.
deviation of 15 days. (a)Find the probability of a pregnancy lasting more than 250 days.
(b)Find the probability of a pregnancy lasting more than 280 days. Draw the diagram for
each and discuss the part of the solution that would be different for finding the requested
probabilities.
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53
In a recent year, the U.S. Mint in Denver manufactured 270 million quarters. Assume that on
each day of production, a sample of 50 quarters is randomly selected and the mean weight is
obtained. Given that the population of quarters has a mean weight of 5.67 g, what do you
know about the mean of the sample means? What do you know about the shape of the
distribution of the sample means?
each day of production, a sample of 50 quarters is randomly selected and the mean weight is
obtained. Given that the population of quarters has a mean weight of 5.67 g, what do you
know about the mean of the sample means? What do you know about the shape of the
distribution of the sample means?
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54
Define the central limit theorem and its relationship to the sampling distribution of sample
means. Define how you can approximate a normal distribution from an original population
that is not normally distributed
means. Define how you can approximate a normal distribution from an original population
that is not normally distributed
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55
The number of books sold over the course of the four-day book fair were 194, 197, 247, and
76. Assume that samples of size 2 are randomly selected with replacement from this
population of four values. List the different possible samples, and find the mean of each of
them.
76. Assume that samples of size 2 are randomly selected with replacement from this
population of four values. List the different possible samples, and find the mean of each of
them.
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56
Unlock Deck
Unlock for access to all 58 flashcards in this deck.
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57
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58
Define a density curve and describe the two properties that it must satisfy. Show a density
curve for a uniform distribution. Make sure that your graph satisfies both properties.
curve for a uniform distribution. Make sure that your graph satisfies both properties.
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