Textbook Question
Standard Normal Distribution. In Exercises 13–16, find the indicated z score. The graph depicts the standard normal distribution of bone density scores with mean 0 and standard deviation 1.
Ch. 6 - Normal Probability Distributions
Triola14th EditionElementary StatisticsISBN: 9780137366446
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Table of contents
- Ch. 1 - Introduction to Statistics88
- Ch. 2 - Exploring Data with Tables and Graphs70
- Ch. 3 - Describing, Exploring, and Comparing Data66
- Ch. 4 - Probability112
- Ch. 5 - Discrete Probability Distributions109
- Ch. 6 - Normal Probability Distributions122
- Ch. 7 - Estimating Parameters and Determining Sample Sizes107
- Ch. 8 - Hypothesis Testing75
- Ch. 9 - Inferences from Two Samples94
- Ch. 10 - Correlation and Regression80
- Ch. 11 - Goodness-of-Fit and Contingency Tables29
- Ch. 12 - Analysis of Variance42
Chapter 6, Problem 6.CR.3a
Foot Lengths of Women Assume that foot lengths of adult females are normally distributed with a mean of 246.3 mm and a standard deviation of 12.4 mm (based on Data Set 3 “ANSUR II 2012” in Appendix B).
a. Find the probability that a randomly selected adult female has a foot length less than 221.5 mm.
Verified step by step guidance1
Step 1: Identify the given parameters of the normal distribution. The mean (μ) is 246.3 mm, and the standard deviation (σ) is 12.4 mm. The problem asks for the probability that a randomly selected adult female has a foot length less than 221.5 mm.
Step 2: Standardize the value 221.5 mm to a z-score using the z-score formula: z = (X - μ) / σ. Here, X is the value of interest (221.5 mm), μ is the mean (246.3 mm), and σ is the standard deviation (12.4 mm). Substitute the values into the formula.
Step 3: Once the z-score is calculated, use a standard normal distribution table (z-table) or a statistical software to find the cumulative probability corresponding to the calculated z-score. This cumulative probability represents the probability that a randomly selected adult female has a foot length less than 221.5 mm.
Step 4: Interpret the cumulative probability obtained from the z-table or software. This value is the probability that a randomly selected adult female has a foot length less than 221.5 mm.
Step 5: If required, express the probability as a percentage by multiplying the cumulative probability by 100. This step is optional and depends on how the final answer needs to be presented.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Normal Distribution
Normal 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. It is characterized by its bell-shaped curve, defined by its mean and standard deviation. In this context, the foot lengths of adult females follow a normal distribution, which allows us to use statistical methods to find probabilities related to specific values.
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Finding Standard Normal Probabilities using z-Table
Z-Score
A Z-score is a statistical measurement that describes a value's relationship to the mean of a group of values. It is calculated by subtracting the mean from the value and then dividing by the standard deviation. In this question, calculating the Z-score for a foot length of 221.5 mm will help determine how many standard deviations this value is from the mean, which is essential for finding the corresponding probability in the normal distribution.
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Probability
Probability is a measure of the likelihood that an event will occur, expressed as a number between 0 and 1. In the context of this question, we are interested in finding the probability that a randomly selected adult female has a foot length less than 221.5 mm. This involves using the Z-score to reference standard normal distribution tables or software to find the cumulative probability associated with that Z-score.
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Related Practice
Textbook Question
Basis for the Range Rule of Thumb and the Empirical Rule. In Exercises 45–48, find the indicated area under the curve of the standard normal distribution; then convert it to a percentage and fill in the blank. The results form the basis for the range rule of thumb and the empirical rule introduced in Section 3-2.
About __ % of the area is between z = -3.5 and z = 3.5 (or within 3.5 standard deviation of the mean).
Textbook Question
In Exercises 1 and 2, use the following wait times (minutes) at 10:00 AM for the Tower of Terror ride at Disney World (from Data Set 33 “Disney World Wait Times” in Appendix B).
35 35 20 50 95 75 45 50 30 35 30 30
h. Are the wait times discrete data or continuous data?
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Textbook Question
Normal Distribution Using a larger data set than the one given for the preceding exercises, assume that cell phone radiation amounts are normally distributed with a mean of 1.17 W/kg and a standard deviation of 0.29 W/kg.
a. Find the probability that a randomly selected cell phone has a radiation amount that exceeds the U.S. standard of 1.6 W/kg or less.
Textbook Question
Foot Lengths of Women Assume that foot lengths of adult females are normally distributed with a mean of 246.3 mm and a standard deviation of 12.4 mm (based on Data Set 3 “ANSUR II 2012” in Appendix B).
c. Find P95.
Textbook Question
In Exercises 1 and 2, use the following wait times (minutes) at 10:00 AM for the Tower of Terror ride at Disney World (from Data Set 33 “Disney World Wait Times” in Appendix B).
35 35 20 50 95 75 45 50 30 35 30 30
b. Find the median.
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