Intro to Stats, Test 3 Review

Sinn, Fall 2005                                                 Name ______________________________

 

Section A:  Which Test to Run?

For each of the following research scenarios, select the appropriate statistical test.

 

1.      Researchers are wondering if hypertension and smoking are related.  They divide their 500 participants into 3 groups: non-smokers, moderate smokers and heavy smokers.  They measure the blood pressure of the participants in each category.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

2.      The following data represents the running time of recent movies from two top motion-picture companies.  Test the hypothesis that company 2’s movies have on average a longer running time.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

3.      A college infirmary conducted an experiment to determine the degree of relief  provided for each of three cold remedies: NyQuil, Robitussin and Triaminic.  They had 30 students with colds.  Ten students tried each remedy and reported the level of relief they experienced on a scale of 1 – 10 with 10 being perfect relief and 1 being no relief.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

4.      Joe wants to see if high school GPA is related to college GPA.  He asks 50 NGCSU upperclassmen to report both on a survey.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

5.      A large automobile manufacturer is deciding between two brands of tires to purchase for its newly designed SUV.  They test 50 sets of each type by putting sets of tires on the SUV’s and driving them until the tires are worn out.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

6.      To determine if a new serum will arrest leukemia, 9 mice with advanced leukemia are selected, 5 of which receive the serum, 4 of which do not.  Survival times (in months) are recorded.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

7.      A manufacturer of rice cereal (baby food) claims the average fat content does not exceed 1.5 milligrams per serving.  A consumer group purchases 40 jars of the food and tests the average fat content.  They are concerned that the food has a higher fat content than advertised.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

8.      Joe and Moe are two Marine Corps drill instructors at Quantico, VA.  Joe doesn’t think Moe works his Officer Candidate School (OCS) classes hard enough.  Moe gives all 25 of his OCS candidates a physical fitness when they arrive.  The same test is repeated after 4 weeks of Moe’s gentle persuasions. 

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

9.      Jack Erwin, professional fisherman extraordinaire, catches a large trout and nearly has the doggone thing reeled in.  He caught a 26” trout earlier that day that weighed in at a hefty 7.5 lbs, and this one looks even bigger.  But then, doggone it, his 15 lb. test fishing line breaks, and he suffers the agony of watching one get away.  He purchases 10 more packages of fishing line to test his hypothesis that the mean breaking strength of the fishing line is less than the advertised 15 lbs. of force.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

10.  Researchers were trying to determine if the material in a college physics course was better understood by students when the course had an accompanying lab section.  Of the 28 participants, 11 were randomly selected for the lab course and 17 for the course without a lab.  The exact same end-of-course test was administered to all 28.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

11.  Joe and Moe, over beers in the NCO, decide to estimate the fitness levels of incoming OCS candidates.  They give 100 future Marine Corps officers a physical fitness test and estimate with a 95% level of confidence.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

12.  Researchers in Boulder, CO, believe that running increases the percent resting heart rate (RMR) in older women.  The average RMR of 30 elderly women runners was higher than the average RMR of 30 sedentary elderly women.

 

 Linear Regression      Confidence Interval      t-Test      t-Test (Dep. Samples)      t-Test (Ind. Samples)      ANOVA

 

Section B:  Symbolic Hypotheses, Error Rates and Choosing α

For each of the following research scenarios, (a) set up the null and alternate hypotheses in correct mathematical symbols, (b) describe both Type I and II errors in words and (c) choose an appropriate level for α.

 

13.  Environmental engineering students at Georgia Tech have found a new way to cure concrete.  The old method (developed in Athens, Georgia) generated concrete with an average strength of 5000 kg/cm².  They cure and test 42 samples.  Statistically test the hypothesis that the new curing method generates stronger cement.

 

 

 

 

 

 

 

 

14.  Pharmaceutical researchers are testing allergy medications.  Their new drug SuperCureAll has some rather nasty side effects.  They compare 31 adults with allergies who take SuperCureAll to 22 adults with allergies who take a placebo.  The allergy sufferers rate their levels of relief from 1 – 10, 10 being complete relief.  The placebo group average is 3.9.

 

 

 

 

 

 

15.  Psychological researchers in Northern Georgia are studying the paranormal, wondering if the high proportion of religious individuals will mean the residents are more likely to have psychic abilities.  They administer a test of psychic ability to 12,304 adult residents of outlying rural communities and compare the results to the national population whose average score on the test is 21 (out of 112).

 

 

 

 

 

 

16.  A consumer advocacy group is testing the shock absorbency of an infant car seat they believe may be defective.  They purchase 12 of the seats whose mean absorbency is rated at 1000 lbs.

 

 

 

 

 

 

 

Section C:  Hypothesis Testing

Conduct all relevant hypothesis testing steps for each of the following scenarios.

 

17.  Dr. Olsen is concerned about her pH meter.  She finds a neutral substance which should give meter readings of 7.0 on the pH scale.  She conducts 10 sample measurements (data given below) of the substance on her balky meter.  At the α = .1 level, test her hypothesis that the meter is faulty.  Assume normality.

 

 

 

 

 

 

 

 

18.  You are a consultant for a manufacturer who asks you to compare the abrasive wear for two types of lamination.  For Laminate X, 12 pieces of material are tested and earn an average rating of 85 on a scale of 0 - 100 where 100 indicates “no visible wear” and 0 indicates “completely destroyed” (s.d. = 4).  For Laminate Z, 10 pieces are tested and average an 81 (s.d. = 5).  Given that the two laminates cost roughly the same to produce, test the hypothesis that X is significantly better than Z at an appropriate level.  Assume normality.

 

 

 

 

 

 

 

 

 

 

 

19.  Researchers are wondering if hypnosis will influence mathematics test anxiety.  They give 9 students a mathematics test un-hypnotized.  Three weeks later, the participants take the same test after being hypnotized by a trained professional (do NOT try this at home!).  Their scores are given below.  Test their hypothesis about hypnosis at the α = .05 level assuming normality.

 

 

 

 

 

 

 

 

 

 

 

20.  The following data represents the running time of recent movies from two top motion-picture companies.  Test the hypothesis that Company 2’s movies have on average a longer running time at the α = .025 level.  Assume normality.