7.E: Normal Distribution (Exercises) (2024)

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    You may want to use the "Calculate Area for a given X" and the "Calculate X for a given Area" calculators for some of these exercises.

    General Questions

    Q1

    If scores are normally distributed with a mean of \(35\) and a standard deviation of \(10\), what percent of the scores is: (relevant section)

    1. greater than \(34\)
    2. smaller than \(42\)
    3. between \(28\) and \(34\)

    Q2

    1. What are the mean and standard deviation of the standard normal distribution?
    2. What would be the mean and standard deviation of a distribution created by multiplying the standard normal distribution by \(8\) and then adding \(75\)? (relevant section & here)

    Q3

    The normal distribution is defined by two parameters. What are they? (relevant section)

    Q4

    1. What proportion of a normal distribution is within one standard deviation of the mean?
    2. What proportion is more than \(2.0\) standard deviations from the mean?
    3. What proportion is between \(1.25\) and \(2.1\) standard deviations above the mean? (relevant section)

    Q5

    A test is normally distributed with a mean of \(70\) and a standard deviation of \(8\).

    1. What score would be needed to be in the \(85^{th}\) percentile?
    2. What score would be needed to be in the \(22^{nd}\) percentile? (relevant section)

    Q6

    Assume a normal distribution with a mean of \(70\) and a standard deviation of \(12\). What limits would include the middle \(65\%\) of the cases? (relevant section)

    Q7

    A normal distribution has a mean of \(20\) and a standard deviation of \(4\). Find the \(Z\) scores for the following numbers: (relevant section)

    1. \(28\)
    2. \(18\)
    3. \(10\)
    4. \(23\)

    Q8

    Assume the speed of vehicles along a stretch of \(I-10\) has an approximately normal distribution with a mean of \(71\) mph and a standard deviation of \(8\) mph.

    1. The current speed limit is \(65\) mph. What is the proportion of vehicles less than or equal to the speed limit?
    2. What proportion of the vehicles would be going less than \(50\) mph?
    3. A new speed limit will be initiated such that approximately \(10\%\) of vehicles will be over the speed limit. What is the new speed limit based on this criterion?
    4. In what way do you think the actual distribution of speeds differs from a normal distribution? (relevant section)

    Q9

    A variable is normally distributed with a mean of \(120\) and a standard deviation of \(5\). One score is randomly sampled. What is the probability it is above \(127\)? (relevant section)

    Q10

    You want to use the normal distribution to approximate the binomial distribution. Explain what you need to do to find the probability of obtaining exactly \(7\) heads out of \(12\) flips. (relevant section)

    Q11

    A group of students at a school takes a history test. The distribution is normal with a mean of \(25\), and a standard deviation of \(4\).

    1. Everyone who scores in the top \(30\%\) of the distribution gets a certificate. What is the lowest score someone can get and still earn a certificate?
    2. The top \(5\%\) of the scores get to compete in a statewide history contest. What is the lowest score someone can get and still go onto compete with the rest of the state? (relevant section)

    Q12

    Use the normal distribution to approximate the binomial distribution and find the probability of getting \(15\) to \(18\) heads out of \(25\) flips. Compare this to what you get when you calculate the probability using the binomial distribution. Write your answers out to four decimal places. (relevant section & relevant section)

    Q13

    True/false: For any normal distribution, the mean, median, and mode will have the same value. (relevant section)

    Q14

    True/false: In a normal distribution, \(11.5\%\) of scores are greater than \(Z = 1.2\). (relevant section)

    Q15

    True/false: The percentile rank for the mean is \(50\%\) for any normal distribution. (relevant section)

    Q16

    True/false: The larger the \(\pi\), the better the normal distribution approximates the binomial distribution. (relevant section & relevant section)

    Q17

    True/false: A \(Z\)-score represents the number of standard deviations above or below the mean. (relevant section)

    Q18

    True/false: Abraham de Moivre, a consultant to gamblers, discovered the normal distribution when trying to approximate the binomial distribution to make his computations easier. (relevant section)

    Q19

    True/false: The standard deviation of the blue distribution shown below is about \(10\). (relevant section)

    Q20

    True/false: In the figure below, the red distribution has a larger standard deviation than the blue distribution. (relevant section)

    Q21

    True/false: The red distribution has more area underneath the curve than the blue distribution does. (relevant section)

    7.E: Normal Distribution (Exercises) (2)

    Questions from Case Studies

    The following question uses data from the Angry Moods (AM) case study.

    Q22

    For this problem, use the Anger Expression (AE) scores.

    1. Compute the mean and standard deviation.
    2. Then, compute what the \(25^{th}\), \(50^{th}\) and \(75^{th}\) percentiles would be if the distribution were normal.
    3. Compare the estimates to the actual \(25^{th}\), \(50^{th}\) and \(75^{th}\) percentiles. (relevant section)

    The following question uses data from the Physicians Reaction (PR) case study.

    Q23

    For this problem, use the time spent with the overweight patients.

    1. Compute the mean and standard deviation of this distribution.
    2. What is the probability that if you chose an overweight participant at random, the doctor would have spent \(31\) minutes or longer with this person?
    3. Now assume this distribution is normal (and has the same mean and standard deviation). Now what is the probability that if you chose an overweight participant at random, the doctor would have spent \(31\) minutes or longer with this person? (relevant section)

    The following questions are from ARTIST (reproduced with permission)
    7.E: Normal Distribution (Exercises) (3)
    Visit the site

    Q24

    A set of test scores are normally distributed. Their mean is \(100\) and standard deviation is \(20\). These scores are converted to standard normal \(z\) scores. What would be the mean and median of this distribution?

    1. \(0\)
    2. \(1\)
    3. \(50\)
    4. \(100\)

    Q25

    Suppose that weights of bags of potato chips coming from a factory follow a normal distribution with mean \(12.8\) ounces and standard deviation \(0.6\) ounces. If the manufacturer wants to keep the mean at \(12.8\) ounces but adjust the standard deviation so that only \(1\%\) of the bags weigh less than \(12\) ounces, how small does he/she need to make that standard deviation?

    Q26

    A student received a standardized (\(z\)) score on a test that was \(-0. 57\). What does this score tell about how this student scored in relation to the rest of the class? Sketch a graph of the normal curve and shade in the appropriate area.

    Q27

    Suppose you take \(50\) measurements on the speed of cars on Interstate \(5\), and that these measurements follow roughly a Normal distribution. Do you expect the standard deviation of these \(50\) measurements to be about \(1\) mph, \(5\) mph, \(10\) mph, or \(20\) mph? Explain.

    Q28

    Suppose that combined verbal and math SAT scores follow a normal distribution with mean \(896\) and standard deviation \(174\). Suppose further that Peter finds out that he scored in the top \(3\%\) of SAT scores. Determine how high Peter's score must have been.

    Q29

    Heights of adult women in the United States are normally distributed with a population mean of \(\mu =63.5\) inches and a population standard deviation of \(\sigma =2.5\). A medical researcher is planning to select a large random sample of adult women to participate in a future study. What is the standard value, or \(z\)-value, for an adult woman who has a height of \(68.5\) inches?

    Q30

    An automobile manufacturer introduces a new model that averages \(27\) miles per gallon in the city. A person who plans to purchase one of these new cars wrote the manufacturer for the details of the tests, and found out that the standard deviation is \(3\) miles per gallon. Assume that in-city mileage is approximately normally distributed.

    1. What is the probability that the person will purchase a car that averages less than \(20\) miles per gallon for in-city driving?
    2. What is the probability that the person will purchase a car that averages between \(25\) and \(29\) miles per gallon for in-city driving?

    Select Answers

    S1

    1. \(75.8\%\)

    S2

    1. Mean = \(75\)

    S4

    1. \(0.088\)

    S5

    1. \(78.3\)

    S7

    1. \(2.0\)

    S8

    1. \(0.227\)

    S11

    1. \(27.1\)

    S12

    \(0.2037\) (normal approximation)

    S22

    \(25^{th}\) percentile:

    1. \(28.27\)
    2. \(26.75\)

    S23

    1. \(0.053\)
    7.E: Normal Distribution (Exercises) (2024)

    FAQs

    What is a fun way to teach normal distribution? ›

    Normal Distributions - Activity Series

    Each student rolls a pair of dice and adds the total of each dice and records it 100 times. Then they plot the distribution and in most cases it comes out a bell curve. Its a fun and easy way to show the distribution . You could pair students up for less dice usage.

    Who invented the normal distribution? ›

    It is also called the "Gaussian curve" after the mathematician Karl Friedrich Gauss. As you will see in the section on the history of the normal distribution, although Gauss played an important role in its history, Abraham de Moivre first discovered the normal distribution.

    What is the history of the normal probability curve? ›

    The density function of a normal probability distribution is bell shaped and symmetric about the mean. The normal probability distribution was introduced by the French mathematician Abraham de Moivre in 1733. He used it to approximate probabilities associated with binomial random variables when n is large.

    What is normal distribution for dummies? ›

    Normal distribution, also known as the Gaussian distribution, is a probability distribution that is symmetric about the mean, showing that data near the mean are more frequent in occurrence than data far from the mean. The normal distribution appears as a "bell curve" when graphed.

    What are 2 examples of normal distribution? ›

    A normal distribution is a common probability distribution . It has a shape often referred to as a "bell curve." Many everyday data sets typically follow a normal distribution: for example, the heights of adult humans, the scores on a test given to a large class, errors in measurements.

    Why is normal distribution so famous? ›

    The normal distribution is an important probability distribution in math and statistics because many continuous data in nature and psychology display this bell-shaped curve when compiled and graphed.

    What is a normal distribution in layman's language? ›

    A normal distribution of data is one in which the majority of data points are relatively similar, meaning they occur within a small range of values with fewer outliers on the high and low ends of the data range.

    Why is normal distribution called Gaussian? ›

    The normal distribution is a probability distribution used in probability theory and statistics. It is also called Gaussian distribution because it was first discovered by Carl Friedrich Gauss.

    Who is the father of the normal curve? ›

    Origin of the Normal Curve – Abraham DeMoivre (1667- 1754)

    μ and σ are the mean and standard deviation of the curve. The person who first derived the formula, Abraham DeMoivre (1667- 1754), was solving a gambling problem whose solution depended on finding the sum of the terms of a binomial distribution.

    Which mathematician was the normal distribution named after? ›

    The term “Gaussian distribution” refers to the German mathematician Carl Friedrich Gauss, who first developed a two-parameter exponential function in 1809 in connection with studies of astronomical observation errors.

    What are the five properties of normal distribution? ›

    Properties of Normal Distribution are,
    • Normal Distribution Curve is symmetric about mean.
    • Normal Distribution is unimodal in nature, i.e., it has single peak value.
    • Normal Distribution Curve is always bell-shaped.
    • Mean, Mode, and Median for Normal Distribution is always same.
    • Normal Distribution follows Empirical Rule.
    Aug 2, 2024

    When not to use a normal distribution? ›

    In certain cases, normal distribution is not possible especially when large samples size is not possible. In other cases, the distribution can be skewed to the left or right depending on the parameter measure. This is also a type of non-normal data that follows Poisson's distribution independent of the sample size.

    What is the 99 rule for normal distribution? ›

    The empirical rule states that in a normal distribution, virtually all observed data will fall within three standard deviations of the mean. Under this rule, 68% of the data will fall within one standard deviation, 95% within two standard deviations, and 99.7% within three standard deviations from the mean.

    What is the symbol for the normal distribution? ›

    The Standard Normal Distribution

    A random variable that has a standard normal distribution is usually denoted with Z . That is Z∼N(0,1) Z ∼ N ( 0 , 1 ) .

    What is a fun fact about normal distribution? ›

    A normal distribution has some interesting properties: it has a bell shape, the mean and median are equal, and 68% of the data falls within 1 standard deviation.

    What is normal distribution for kids? ›

    A normal distribution is a bell-shaped frequency distribution curve. Most of the data values in a normal distribution tend to cluster around the mean. The further a data point is from the mean, the less likely it is to occur.

    What is an example of a normal distribution in education? ›

    If 100 five-year-olds take the test and the average score (mean) and most common score (mode) is 100, the sample has produced a bell curve (normal distribution) with 100 at the 50th percentile. This would be right at the top of the bell curve.

    What is normal distribution in simple word? ›

    The normal distribution is also known as a Gaussian distribution or probability bell curve. It is symmetric about the mean and indicates that values near the mean occur more frequently than the values that are farther away from the mean.

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