STAT 203 SAMPLE QUESTIONS
1. The National Survey of
Salaries and Wages in Public Schools shows that the mean salary of teachers is $40,133
and the standard deviation is about $8,000.
If you took a random sample of 64 teachers you expect their
total salary to be _______________________ ,give or take
____________________, or so.
Their mean salary is
expected to be ______________________________, give or take
____________________________, or so.
Find the probability that
the mean salary of these 64 teachers is over $42,000
______________.
Do you need to assume that
public school teacher salaries follow the normal curve to answer this last
question? __________
2. A brand of water-softener salt comes in packages marked “net
weight 40 lb.” The company that
makes the salt claims that the bags contain an average of 40 lb of salt
and that the standard deviation is 1.5 lb. Assume the weights follow the normal curve.
Obtain the probability that
the weight of one bag of water-softener salt will be 39 lb or less, if
the company’s claim is true ________________
Determine the probability that the mean weight of 10
randomly selected bags of water-softener salt will be 39 lb or less, if
the company’s claim is true.
______________
If you bought one bag
of water-softener salt and it weighed 39 lb, would you consider this
sufficient evidence that the company’s claim is incorrect?
___________
Explain your answer.
If you bought 10 bags
of water-softener salt and their mean weight was 39 lb, would you
consider this sufficient evidence that the company’s claim is incorrect?
____________
Explain your answer.
3. Playing hooky. A poll was taken of 1010
U.S. employees to find out what percentage call in sick when in fact they are
not. They were asked whether in the
last year they call in sick at least once a year when they simply need time to
relax. Of the 1010 U.S.
employees surveyed, 202 responded “yes.”
Find a 95% confidence
interval________________________________________________
Give a symbol for the
parameter being estimated____________
4. A Louis Harris Poll was taken
of 1250 U.S. adults about their views of banning handgun sales. Of those sampled, 650 favored a
ban. At the 5% significance
level, does the poll provide sufficient evidence to conclude that a majority of
the U.S. adults (i.e., more than 50%) favor banning handgun sales?
State the null hypothesis
__________________________________
State the alternative _______________________________
Do we need to assume normality of the population to
use this test? ________ Test statistic
____________________________________________
P-value (be as specific as possible) _______________________________________
Conclusion of test (circle one) Reject the Null
or Retain the Null
State your conclusion in context of the problem
5. Car sales. The World Almanac reports that in 1990 the type of
cars bought in the U.S. had the following frequencies.
|
Type
of car |
Small |
Midsize |
Large |
Luxury |
|
Percentage |
32.8% |
44.8% |
9.4% |
13.0% |
A sample of 500 car sales
last year showed the following data
|
Type
of car |
Small |
Midsize |
Large |
Luxury |
|
Number |
133 |
249 |
47 |
71 |
At the 5% level of
significance, perform a goodness-of-fit test to decide whether type-of-car
sales have changed since 1990.
State
the null hypothesis __________________________________ State the alternative
_______________________________
Do we need to assume normality of the population to
use this test? _______Degrees of
freedom ______ Test statistic ____________________________
P-value (be as specific as possible) ______________________________________
Conclusion of test (circle one) Reject the Null
or Retain the Null
Detailed conclusion (be specific in context of the
problem):
6. Smoking and low birthweight babies. In a study done in 1971 on smoking
among pregnant women and low birthweight, the following data was
collected.
|
|
Low birthweight |
Normal birthweight |
Total
|
|
Smokers |
185 |
1891 |
2076 |
|
Non-smokers |
134 |
2395 |
2529 |
|
TOTAL |
319 |
4286 |
4605 |
Perform a one-sided
chi-square test at the 1% level of significance to determine whether low
birthweights are associated with smoking.
State the null hypothesis
__________________________________
State the alternative _______________________________
Do we need to assume normality of the population to
use this test? _______Degrees of
freedom ______ Test statistic ____________________________
P-value (be as specific as possible) ______________________________________
Conclusion of test (circle one) Reject the Null
or Retain the Null
Detailed conclusion (be specific in context of the
problem):
7. TV viewing. Ten married couples are randomly selected. Their weekly viewing times, in hours, are as
follows
|
Couple |
1 |
2 |
3 |
4 |
5 |
6 |
7 |
8 |
9 |
10 |
Mean |
SD |
Husband
|
23 |
56 |
34 |
30 |
41 |
35 |
26 |
38 |
27 |
30 |
34.0 |
9.52 |
Wife
|
26 |
55 |
52 |
34 |
32 |
38 |
38 |
45 |
29 |
41 |
39.0 |
9.49 |
|
Difference |
+3 |
-1 |
+18 |
+4 |
-9 |
+3 |
+12 |
+7 |
+2 |
+11 |
50.0 |
7.51 |
At the 5% level of
significance, use the sign test to decide whether married men watch
less TV, on average, than their wives.
State the null hypothesis
__________________________________
State the alternative _______________________________
Do we need to assume normality of the population to
use this test? _______Test statistic
_____________________________________
P-value (be as specific as possible) ______________________________________
Conclusion of test (circle one) Reject the Null
or Retain the Null
Detailed conclusion (be specific in context of the
problem):
8. TV-viewing again. Repeat problem 9 but use the t test instead.
Ten married couples are
randomly selected. Their weekly viewing
times, in hours, are as follows
|
Couple |
1 |
2 |
3 |
4 |
5 |
6 |
7 |
8 |
9 |
10 |
Mean |
SD |
Husband
|
23 |
56 |
34 |
30 |
41 |
35 |
26 |
38 |
27 |
30 |
34.0 |
9.52 |
Wife
|
26 |
55 |
52 |
34 |
32 |
38 |
38 |
45 |
29 |
41 |
39.0 |
9.49 |
|
Difference |
+3 |
-1 |
+18 |
+4 |
-9 |
+3 |
+12 |
+7 |
+2 |
+11 |
50.0 |
7.51 |
At the 5% level of
significance, use the t test to decide whether married men watch less
TV, on average, than their wives.
State the null hypothesis __________________________________ State the alternative
_______________________________
Do we need to assume normality of the population to
use this test? ______Degrees of Freedom
_____Test statistic_______________________________
P-value (be as specific as possible) ______________________________________
Conclusion of test (circle one) Reject the Null
or Retain the Null
Detailed conclusion (be specific in context of the
problem):
9. It is known that 68% of the registered
voters in Fairfax County, Virginia are registered as Democrats. To test a new telephone sampling method, we
call 500 Fairfax County voters and ask their party. We do this 5 times. The
results are 59.2%, 58.9%,
60.5%, 58.4% and
61.3% Democratic. The sampling method appears to have
____ high bias and high chance error;
____ high bias and low chance error;
____ low bias and high chance error;
____ low bias and low chance error.
10. Using the same data, you compute a 95%
confidence interval and a 99% confidence interval.
____ The intervals have the same width;
____ the 99% confidence interval is wider;
____ the 95% confidence interval is wider;
____ you can't say unless you know the sample
size and standard deviation.
11. New laser instruments were used to measure
the speed of light; 225 measurements were taken. They averaged out to 299,775 km per sec, with a standard
deviation of 45 km/sec. Assume the
Gauss model with no bias. Fill in the
blanks in part [a] and answer the rest True of False.
a. The true speed of light is estimated as
________________; This estimate is likely to be off by _____________ or
so.
_______
b. 299,775 + 6
km/sec is a 95% confidence interval for the average of the 225 readings.
_______
c. 299,775 + 6
km/sec is a 95% confidence interval for the true speed of light.
_______
d. There is about a 95% probability
that the next reading will be in the range 299,775 + 6
km/sec.
_______
e. About 95% of the 225 readings were
in the range 299,775 + 6 km/sec.
_______
f. If another 225 readings are made,
there is about a 95% probability that
their average will be in the range 299,775
+ 6 km/sec.
12. Two drugs, zidovudine and
didanosine, were tested for the effectiveness in preventing progression of HIV
disease in children. In a double-blind
clinical trial, 276 children with HIV were given zidovudine, and 281 were given
didanosine. The following table shows
the survival data for the two groups.
|
|
Died |
Survived |
Row
Total |
|
Zidovudine |
15 |
259 |
274 |
|
Didanosine
|
5 |
274 |
279 |
|
Column
Total |
20 |
533 |
553 |
Use the binomial exact test at the α
= 10% level of significance to decide whether Didanosine is associated with
a lower death rate than Zidovudine.
Null Hypothesis
____________________________Alternative Hypothesis ____________________________
P-value (be as specific as
possible) __________________
Circle the correct
decision: Fail to reject the
Null Reject the Null Detailed conclusion:
13. The life of certain types of light bulbs
follow the normal curve with a mean life span of 1000 hours and a standard
deviation of 100 hours.
[a] Find the probability that one such
component last more than 875 hours. _________________________________
[b] Find the probability that four such
component all last more than 875 hours. ______________________________
[c] Find the probability that at least one of
four such components last more than 875 hours. _____________________
[d] Find the probability that four such
components have a mean life exceeding 875 hours. ______________________
14. Batteries are tested by keeping flashlights
on until the light deteriorates by 50%.
When 25 such batteries were tested, the results followed a normal curve
with a mean of 20 hours and a standard deviation of 3 hours.
[a] About 95% of the batteries lasted between
___________ and ________________ hours.
[b] A two-sided 95% confidence interval for the
mean life of batteries of this type is μ = _______________________________
[c] A one-sided 95% confidence interval for the
mean life of batteries of this type is μ < ______________________________
[d] Test the hypothesis that the mean life of
batteries of this type is at least 22 hours. Use α = .05.
15. Los Angeles has about four times as many registered voters as San
Diego. A simple random sample of
registered voters is taken in each city to estimate the percentage who will
vote for school bonds. Other things
being equal, a sample of 4,000 taken in Los Angeles will be about
______
[a] four times as accurate ______ [b]
twice as accurate
______ [c] as accurate
as a sample of 1,000 taken in San Diego.
Choose one option, and say
why.
16. To test a new drug, a group of 10 matched pairs of volunteers is
used. In each pair, one is treated with
the drug while the other is treated with a placebo as a control. At the end of the experiment, a physician
examines each pair and declares which of the two is healthier. Let
X be the number of pairs in
which the treated patient was declared healthier than the control. The null hypothesis is that the drug is
absolutely ineffective (neither good nor bad).
It has been decided to reject H0 whenever X > 8 and to retain H0
otherwise.
[a] Find a, the probability of falsely rejecting H0._____________
[b] Suppose that the drug is so effective that for each matched pair,
the probability is 90% that the treated patient will be declared
healthier. Find b,
the probability of falsely accepting H0.___________