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Chapter 8: Q 8.50 (page 331)

A confidence interval for a population mean has a margin of error of $0.047$
a. Determine the length of the confidence interval.
b. If the sample mean is $0.205$ , obtain the confidence interval.
c. Construct a graph that illustrates your results.

Short Answer

Expert verified

a. The length of the confidence interval is $0.094$ .

b. The confidence interval is $(0.158, 0.252)$ .

c.

Step by step solution

01

Given Information

It is given that confidence interval for a population mean has a margin of error of $0.047$ .

Sample mean is $0.205$ .

02

a. Determination of length of confidence

Margin error $E = 0.047$

Length of confidence is calculated as $L = 2 E$

$= 2 脳 0.047$

$= 0.094$

Hence, length of confidence is $0.094$ .

03

b. Determination of confidence interval

Sample Mean $= 0.205$

Confidence interval = Point estimate+ Margin of error

$= 0.205 卤 0.047$

$= 0.205 - 0.047, 0.205 + 0.047$

$= 0.158, 0.252$

Hence, the confidence interval is $(0.158, 0.252)$ .

04

c. Graph of Confidence Interval

The graph is as below:

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Most popular questions from this chapter

Bottlenose Dolphins. The webpage "Bottlenose Dolphin" produced by the National Geographic Society provides information about the bottlenose dolphin. A random sample of $50$ adult bottlenose dolphins have a mean length of $12.04 ft$ with a standard deviation of $1.03 ft$ Find and interpret a $90 %$ confidence interval for the mean length of all adult bottlenose dolphins.

Assume that the population standard deviation is known and decide weather use of the z-interval procedure to obtain a confidence interval for the population mean is reasonable. Explain your answers.

The sample data contain no outliers, the variable under consideration is roughly normally distributed, and the sample size is $20$ .

Explain the effect on the margin of error and hence the effect on the accuracy of estimating a population mean by a sample mean.

Increasing the confidence level while keeping same sample size.

Medical Marijuana. An issue with legalization of medical marijuana is "diversion," the process in which medical marijuana prescribed for one person is given, traded, or sold to someone who is not registered for medical marijuana use. Researchers S. Sautel et al. study the issue of diversion in the article "Medical Marijuana Use Among Adolescents in Substance Abuse Treatment" . The mean number of days that $120$ adolescents in substance abuse treatment used medical marijuana in the last six months was $102.72$ . Assume the population standard deviation is $32$ days.

a. Find a $95 %$ confidence interval for the mean number of days, $渭$ , of diverted medical marijuana use in the last 6 months of all adolescents in substance abuse treatment.

b. Repeat part (a) at a $90 %$ confidence level.

c. Draw a graph similar to Fig. $8.6$ on page $326$ to display both confidence intervals.

d. Which confidence interval yields a more accurate estimate of $渭$ ? Explain your answer.

Explain the effect on the margin of error and hence the effect on the accuracy of estimating a population mean by a sample mean.

Increasing the sample size while keeping the same confidence level.

See all solutions

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