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The Practice of Statistics for AP Examination

Daren Starnes, Josh Tabor

$Math Studyset 魅影直播 Explanations$ Math

6th Edition 路 837 pages

ISBN: 9781319113339

Chapter 8: Q. R8.1 (page 547)

It鈥檚 critical Find the appropriate critical value for constructing a confidence interval in each of the following settings.
a. Estimating a population proportion p at a 94% confidence level based on an SRS of size 125
b. Estimating a population mean 渭 at a 99% confidence level based on an SRS of size 58

Short Answer

Expert verified

Part a) The critical value is $1.88$

Part b) The critical value is $2.665$

Step by step solution

01

Part a) Step 1: Given information

Confidence level $= 94 %$

Sample size (n) $= 125$

02

Part a) Step 2: Calculation

Level of significance $(伪) = 1 - 0.94 = 0.06$

Using the standard normal, the critical value is set at $6 %$

level of significance can be calculated as:

$z_{\frac{伪}{2}} = z_{\frac{0.06}{2}} = 1.88$

Therefore, the critical value is $1.88$

03

Part b) Step 1: Given information

Confidence level $= 99 %$

Sample size (n) $= 58$

04

Part b) Step 2: Calculation

Level of significance $(伪) = 1 - 0.99 = 0.01$

When the sample standard deviation is known, the $t$ -critical value must be calculated.

The degree of freedom can be calculated as:

$d f = n - 1 = 58 - 1 = 57$

The critical value at the $1 %$ level of significance is calculated as follows:

$t_{\frac{伪}{2}, d f} = t_{\frac{0.01}{2}, 57} = 2.665$

Therefore, the critical value is $2.665$

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Most popular questions from this chapter

Explaining confidence A $95 %$ confidence interval for the mean body mass index (BMI) of young American women is $26.8 卤 0.6$ . Discuss whether each of the following explanations is correct, based on that information.

a. We are confident that $95 %$ of all young women have BMI between $26.2$ and $27.4$ .

b. We are $95 %$ confident that future samples of young women will have mean BMI

between $26.2$ and $27.4$ .

c. Any value from $26.2 to 27.4$ is believable as the true mean BMI of young American women.

d. If we take many samples, the population mean BMI will be between $26.2$ and $27.4$ in about $95 %$ of those samples.

e. The mean BMI of young American women cannot be $28$ .

Weeds among the corn Velvetleaf is a particularly annoying weed in cornfields. It produces lots of seeds, and the seeds wait in the soil for years until conditions are right for sprouting. How many seeds do velvetleaf plants produce? The histogram shows the counts from a random sample of $28$ plants that came up in a cornfield

when no herbicide was used. Determine if the Normal/Large Sample condition is met in this context.

School vouchers A small pilot study estimated that $44 %$ of all American

adults agree that parents should be given vouchers that are good for education at any public or private school of their choice.

a. How large a random sample is required to obtain a margin of error of at most $0.03$ with $99 %$ confidence? Answer this question using the pilot study鈥檚 result as the guessed value for $\hat{p}$

b. Answer the question in part (a) again, but this time use the conservative guess $\hat{p} = 0.5$ . By how much do the two sample sizes differ?

Selling online According to a recent Pew Research Center report, many

American adults have made money by selling something online. In a random sample of $4579$ American adults, $914$ reported that they earned money by selling something online in the previous year. Assume the conditions for inference are met.

Determine the critical value $z *$ for a $98 %$ confidence interval for a proportion.

b. Construct a $98 %$ confidence interval for the proportion of all American adults who

would report having earned money by selling something online in the previous year.

c. Interpret the interval from part (b).

Explaining confidence The admissions director for a university found that $(107.8, 116.2)$ is a $95 %$ confidence interval for the mean IQ score of all freshmen. Discuss whether each of the following explanations is correct, based on that information.

a. There is a $95 %$ probability that the interval from role="math" localid="1654200953396" $107.8 to 116.2$ contains $渭$ .

b. There is a $95 %$ chance that the interval $(107.8, 116.2)$ contains $\overset{炉}{x}$ .

c. This interval was constructed using a method that produces intervals that capture the true mean in $95 %$ of all possible samples.

d. If we take many samples, about $95 %$ of them will contain the interval $(107.8, 116.2)$ .

e. The probability that the interval $(107.8, 116.2)$ captures $渭$ is either $0$ or $1$ , but we don鈥檛 know which.

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