EBook Problems Hypothesis Basics
Contents
EBook Problems Set - Fundamentals of Hypothesis Testing
Problem 1
Suppose you were hired to conduct a study to find out which of two brands of soda college students think taste better. In your study, students are given a blind taste test. They rate one brand and then rated the other, in random order. The ratings are given on a scale of 1 (awful) to 5 (delicious). Which type of test would be the best to compare these ratings?
- Choose one answer.
- (a) One-Sample t
- (b) Chi-Square
- (c) Paired Difference t
- (d) Two-Sample t
{{hidden|Answer|(c)}
Problem 2
USA Today's AD Track examined the effectiveness of the new ads involving the Pets.com Sock Puppet (which is now extinct). In particular, they conducted a nationwide poll of 428 adults who had seen the Pets.com ads and asked for their opinions. They found that 36% of the respondents said they liked the ads. Suppose you increased the sample size for this poll to 1000, but you had the same sample percentage who like the ads (36%). How would this change the p-value of the hypothesis test you want to conduct?
- Choose One Answer.
- (a) No way to tell
- (b) The new p-value would be the same as before
- (c) The new p-value would be smaller than before
- (d) The new p-value would be larger than before
Problem 3
A marketing director for a radio station collects a random sample of three hundred 18 to 25 year-olds and two hundred and fifty 25 to 40 year-olds. She records the percent of each group that had purchased music online in the last 30 days. She performs a hypothesis test, and the p-value of her test turns out to be 0.15. From this she should conclude:
- Choose one answer.
- (a) that about 15% more people purchased on-line music in the younger group than in the older group.
- (b) there is insufficient evidence to conclude that there is a difference in the proportion of on-line music purchases in the younger and older group.
- (c) the proportion of on-line music purchasers is the same in the under-25 year-old group as in the older group.
- (d) the probability of getting the same results again is 0.15.
Problem 4
If we want to estimate the mean difference in scores on a pre-test and post-test for a sample of students, how should we proceed?
- Choose one answer.
- (a) We should construct a confidence interval or conduct a hypothesis test
- (b) We should collect one sample, two samples, or conduct a paired data procedure
- (c) We should calculate a z or a t statistic
Problem 5
The paint used to make lines on roads must reflect enough light to be clearly visible at night. Let mu denote the true average reflectometer reading for a new type of paint under consideration. A test of the null hypothesis that mu = 20 versus the alternative hypothesis that mu > 20 will be based on a random sample of size n from a normal population distribution. In which of the following scenarios is there significant evidence that mu is larger than 20?
(i) n=15, t=3.2, alpha=0.05
(ii) n=9, t=1.8, alpha=0.01
(iii) n=24, t=-0.2, alpha=0.01
- Choose one answer.
- (a) (ii) and (iii)
- (b) (i)
- (c) (iii)
- (d) (ii)
Problem 6
The average length of time required to complete a certain aptitude test is claimed to be 80 minutes. A random sample of 25 students yielded an average of 86.5 minutes and a standard deviation of 15.4 minutes. If we assume normality of the population distribution, is there evidence to reject the claim? (Select all that applies).
- Choose at least one answer.
- (a) No, because the probability that the null is true is > 0.05
- (b) Yes, because the observed 86.5 did not happen by chance
- (c) Yes, because the t-test statistic is 2.11
- (d) Yes, because the observed 86.5 happened by chance
Problem 7
We observe the math self-esteem scores from a random sample of 25 female students. How should we determine the probable values of the population mean score for this group?
- Choose one answer.
- (a) Test the difference in means between two paired or dependent samples.
- (b) Test that a correlation coefficient is not equal to 0 (correlation analysis).
- (c) Test the difference between two means (independent samples).
- (d) Test for a difference in more than two means (one way ANOVA).
- (e) Construct a confidence interval.
- (f) Test one mean against a hypothesized constant.
- (g) Use a chi-squared test of association.
Problem 8
Food inspectors inspect samples of food products to see if they are safe. This can be thought of as a hypothesis test where H0: the food is safe, and H1: the food is not A. If you are a consumer, which type of error would be the worst one for the inspector to make, the type I or type II error?
- Choose one answer.
- (a) Type I
- (b) Type II
Problem 9
A college admissions officer is concerned that their admission criteria might not treat men and women with equal weight. To test this, the college took a random sample of male and female high school seniors from a very large local school district and determined the percent of males and females who would be eligible for admission at the college. Which of the following is a suitable null hypothesis for this test?
- Choose one answer.
- (a) p = 0.5
- (b) The proportion of all eligible men in the district will not equal the proportion of all eligible women in the district.
- (c) The proportion of all eligible men in the school district should be equal to the proportion of all eligible women in the school district.
- (d) The proportion of eligible men sampled should equal the propotion of eligible women sampled.
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- SOCR Home page: http://www.socr.ucla.edu
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