FiltersDone

Question type

Essay

Multiple Choice

Short Answer

True False

Matching

Exam 9: Large-Sample Tests of Hypotheses

Show Answer

Share

---

All types

Filters

Study FlashcardsPractice ExamLearn

Question 21

True/False

Review LaterAdd Note

Review Later

Decision makers have most control over Type I error than Type II error.

A) True
B) False

Correct Answer

verified

Show Answer

Question 22

Multiple Choice

Review LaterAdd Note

Review Later

When testing , the observed value of the z-score was found to be -2.15. The p-value for this test would be:

A) .0158
B) .0316
C) .1582
D) .9842
E) .9684

F) None of the above
G) B) and D)

Correct Answer

verified

Show Answer

Question 23

Multiple Choice

Review LaterAdd Note

If we do not reject the null hypothesis, we conclude that:

In a two-tailed test, if the p-value is less than the probability of committing a Type I error, then:

The manufacturer of a particular battery pack for laptop computers claims its battery pack can function for 8 hours, on the average, before having to be recharged. A random sample of 36 battery packs was selected and tested. The mean functioning time before having to be recharged was 7.2 hours with a standard deviation of 1.9 hours. A competitor claims that the manufacturer's claim is too high. Perform the appropriate test of hypothesis to determine whether the competitor is correct. Test using = 0.05. Test statistic = ______________ Critical Value(s) = ______________ Conclusion: ______________ Interpretation: __________________________________________ Find the p-value for this test. p-value = ______________

A union composed of several thousand employees is preparing to vote on a new contract. A random sample of 500 employees yielded 320 who planned to vote yes. It is believed that the new contract will receive more than 60% yes votes. Can we infer at the 5% significance level that the new contract will receive more than 60% yes votes? Test statistic = ______________ p-value = ______________ Conclusion: ______________ Interpretation: __________________________________________

The erroneous acceptance of a null hypothesis that is in fact false can have consequences such as:

Which of the following p-values will lead us to reject the null hypothesis if the level of significance 0.05?

A peony plant with red petals was crossed with another plant having streaky petals. A geneticist states that 80% of the offspring resulting from this cross will have red flowers. To test this claim, 120 seeds from this cross were collected and germinated and 84 plants had red petals. Calculate the test statistic and its observed significance level (p-value). Use the p-value to evaluate the statistical significance of the results at the 1% level. p-value = ______________ Conclusion: ______________ Interpretation: __________________________________________

In a hypothesis test involving the population proportion, which of the following would be an acceptable formulation?

When formulating a hypothesis test, which of the following statements is true?

Suppose in testing a hypothesis about a proportion, the p-value is computed to be 0.038. The null hypothesis should be rejected if the chosen level of significance is 0.05.

An alternative hypothesis that holds for deviations from the null hypothesis in one direction only is a one-sided hypothesis.

The rejection region for testing at the 0.05 level of significance is:

When testing vs. , an increase in the sample size will result in a decrease in the probability of committing a Type I error.

In testing , the test statistic value z is found to be 1.69. What is the p-value of the test?

An airline company would like to know if the average number of passengers on a flight in November is less than the average number of passengers on a flight in December. The results of random sampling are printed below. Test the appropriate hypotheses using = 0.01. Test statistic = ______________ Critical Value(s) = ______________ Conclusion: ______________ Interpretation: __________________________________________

When the necessary conditions are met, a two-tailed test is being conducted to test the difference between two population proportions. The two sample proportions are and , and the standard error of the sampling distribution of is 0.0085. The calculated value of the test statistic will be z = 3.41.

A sample of size 80 is to be used to test the hypotheses H₀: = 29 versus H_a: 29 where, is the true average age of a man when he gets married. What is the appropriate rejection region associated with each of the following significance levels. = 0.01 Critical Value(s) = ______________ = 0.005 Critical Value(s) = ______________ = 0.05 Critical Value(s) = ______________ = 0.1 Critical Value(s) = ______________

In testing a hypothesis about a population proportion p, the z test statistic measures how close the computed sample proportion has come to the hypothesized population parameter.