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Introductory Statistics

Barbara Illowsky, Susan Dean

$Math Studyset 91影视 Explanations$ Math

OER 2018 Edition 路 902 pages

ISBN: 9781938168208

Chapter 8: Q. 31 (page 478)

The mean age for all Foothill College students for a recent Fall term was $33.2$ . The population standard deviation has been pretty consistent at $15$ . Suppose that twenty-five Winter students were randomly selected. The mean age for the sample was $30.4$ . We are interested in the true mean age for Winter Foothill College students. Let $X =$ the age of a Winter Foothill College student.
Construct a $95 %$ Confidence Interval for the true mean age of Winter Foothill College students.
How much area is in each tail? $\frac{伪}{2} =______$ ?

Short Answer

Expert verified

The area covered by each tail is $\frac{a}{2} = 0.025$ .

Step by step solution

01

Given Information

The mean age for all Foothill College students for a recent Fall term was $33.2$ . The population standard deviation has been pretty consistent at $15$ . The mean age for the sample was $30.4$ .

02

Calculation

The average of a set of data is called the mean. The $95 %$ confidence interval is a set of numbers that you may be $95 %$ positive includes the population's true mean.

The area covered in by each tail is given by $\frac{a}{2}$ .

The area by both tails is $伪 = 0.05$ .

$伪 / 2 = \frac{0.05}{2}$

$= 0.025$

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Most popular questions from this chapter

The mean age for all Foothill College students for a recent Fall term was $33.2$ . The population standard deviation has been pretty consistent at $15$ . Suppose that twenty-five Winter students were randomly selected. The mean age for the sample was $30.4$ . We are interested in the true mean age for Winter Foothill College students. Let $X =$ the age of a Winter Foothill College student.

role="math" localid="1648388299408" $\overset{炉}{x} =_____$

Of 1,050 randomly selected adults, 360 identified themselves as manual laborers, 280 identified themselves as non-manual wage earners, 250 identified themselves as midlevel managers, and 160 identified themselves as executives. In the survey, 82% of manual laborers preferred trucks, 62% of non-manual wage earners preferred trucks, 54% of mid-level managers preferred trucks, and 26% of executives preferred trucks.

Suppose we want to lower the sampling error. What is one way to accomplish that?

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Define the random variable P鈥� in words.

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a. What is the probability distribution for X?

b. Using the formulas, calculate the (i) mean and (ii) standard deviation of X.

c. Use your calculator to find the probability that DeAndre scored with 60 of these shots.

d. Find the probability that DeAndre scored with more than 50 of these shots

When designing a study to determine this population proportion, what is the minimum number you would need to survey to be $90 %$ confident that the population proportion is estimated to within $0.05$ ?

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