Textbook Question
Finding Area In Exercises 23–36, find the indicated area under the standard normal curve. If convenient, use technology to find the area.
Between z= -1.55 and z= 1.55
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Ch. 5 - Normal Probability Distributions
Larson8th EditionElementary Statistics: Picturing the WorldISBN: 9780137493470
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Table of contents
- Ch. 1 - Introduction to Statistics87
- Ch. 2 - Descriptive Statistics176
- Ch. 3 - Probability184
- Ch. 4 - Discrete Probability Distributions102
- Ch. 5 - Normal Probability Distributions183
- Ch. 6 - Confidence Intervals154
- Ch. 7 - Hypothesis Testing with One Sample165
- Ch. 8 - Hypothesis Testing with Two Samples134
- Ch. 9 - Correlation and Regression87
- Ch. 10 - Chi-Square Tests and the F-Distribution87
Larson8th EditionElementary Statistics: Picturing the WorldISBN: 9780137493470Not the one you use?Change textbook
Chapter 5, Problem 5.5.1
In Exercises 1–4, the sample size n, probability of success p, and probability of failure q are given for a binomial experiment. Determine whether you can use a normal distribution to approximate the distribution of x.
n=24, p=0.85, q=0.15
Verified step by step guidance1
Step 1: Recall the rule for using a normal distribution to approximate a binomial distribution. The approximation is valid if both np ≥ 5 and nq ≥ 5, where n is the sample size, p is the probability of success, and q is the probability of failure.
Step 2: Calculate np using the formula np = n × p. Substitute n = 24 and p = 0.85 into the formula to compute np.
Step 3: Calculate nq using the formula nq = n × q. Substitute n = 24 and q = 0.15 into the formula to compute nq.
Step 4: Check whether both np ≥ 5 and nq ≥ 5. If both conditions are satisfied, then the normal distribution can be used to approximate the binomial distribution.
Step 5: Conclude whether the normal approximation is valid based on the results of the calculations in Steps 2 and 3.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Binomial Distribution
A binomial distribution models the number of successes in a fixed number of independent Bernoulli trials, each with the same probability of success. It is characterized by two parameters: the number of trials (n) and the probability of success (p). In this case, with n=24 and p=0.85, we can analyze the likelihood of achieving a certain number of successes in these trials.
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Mean & Standard Deviation of Binomial Distribution
Normal Approximation
The normal approximation to the binomial distribution is applicable when certain conditions are met, specifically when both np and nq are greater than or equal to 5. This allows us to use the normal distribution to estimate probabilities for binomial experiments, simplifying calculations. In this scenario, we need to check if np (24*0.85) and nq (24*0.15) meet this criterion.
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Conditions for Normal Approximation
To use the normal distribution as an approximation for a binomial distribution, the sample size must be sufficiently large, ensuring that the distribution is not overly skewed. The rule of thumb is that both np and nq should be at least 5. This ensures that the binomial distribution is approximately symmetric and bell-shaped, making the normal approximation valid.
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Related Practice
Textbook Question
Finding Probability In Exercises 41–46, find the probability of z occurring in the shaded region of the standard normal distribution. If convenient, use technology to find the probability.
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Textbook Question
Explain how to transform a given x-value of a normally distributed variable x into a z-score.
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Textbook Question
In Exercises 1–4, a population has a mean mu and a standard deviation sigma. Find the mean and standard deviation of the sampling distribution of sample means with sample size n.
Mu = 790, sigma =48, n = 250
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Textbook Question
Finding Area
In Exercises 23–36, find the indicated area under the standard normal curve. If convenient, use technology to find the area.
To the left of z=0.33
90
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Textbook Question
Interpreting the Central Limit Theorem In Exercises 19–26, find the mean and standard deviation of the indicated sampling distribution of sample means. Then sketch a graph of the sampling distribution.
SAT Italian Subject Test The scores on the SAT Italian Subject Test for the 2018–2020 graduating classes are normally distributed, with a mean of 628 and a standard deviation of 110. Random samples of size 25 are drawn from this population, and the mean of each sample is determined.
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