Practice
8.1 A Single Population Mean Using the Normal Distribution
Use the following information to answer the next five exercises: The standard deviation of the weights of elephants is known to be approximately 15 lb. We wish to construct a 95 percent confidence interval for the mean weight of newborn elephant calves. Fifty newborn elephants are weighed. The sample mean is 244 lb. The sample standard deviation is 11 lb.
Identify the following:
- = _____
- σ = _____
- n = _____
In words, define the random variables X and .
Which distribution should you use for this problem?
Construct a 95 percent confidence interval for the population mean weight of newborn elephants. State the confidence interval, sketch the graph, and calculate the error bound.
What will happen to the confidence interval obtained, if 500 newborn elephants are weighed instead of 50? Why?
Identify the following:
- = _____
- σ = _____
- n = _____
In words, define the random variables X and .
Which distribution should you use for this problem?
Construct a 90 percent confidence interval for the population mean time to complete the forms. State the confidence interval, sketch the graph, and calculate the error bound.
If the Census wants to increase its level of confidence and keep the error bound the same by taking another survey, what changes should it make?
If the Census did another survey, kept the error bound the same, and surveyed only 50 people instead of 200, what would happen to the level of confidence? Why?
Suppose the Census needed to be 98 percent confident of the population mean length of time. Would the Census have to survey more people? Why or why not?
Identify the following:
- = ______
- σ = ______
- n = ______
In words, define the random variable X.
In words, define the random variable .
Which distribution should you use for this problem?
Construct a 90 percent confidence interval for the population mean weight of the heads of lettuce. State the confidence interval, sketch the graph, and calculate the error bound.
Construct a 95 percent confidence interval for the population mean weight of the heads of lettuce. State the confidence interval, sketch the graph, and calculate the error bound.
In complete sentences, explain why the confidence interval in Exercise 8.17 is larger than in Exercise 8.18.
What would happen if 40 heads of lettuce were sampled instead of 20 and the error bound remained the same?
What would happen if 40 heads of lettuce were sampled instead of 20 and the confidence level remained the same?
= _____
n = _____
________ = 15
In words, define the random variable .
What is estimating?
Is known?
As a result of your answer to Exercise 8.26, state the exact distribution to use when calculating the confidence interval.
Construct a 95 percent confidence interval for the true mean age of winter Foothill College students by working out and then answering the next eight exercises.
How much area is in both tails (combined)? α =________
How much area is in each tail? =________
Identify the following specifications:
- lower limit
- upper limit
- error bound
The 95 percent confidence interval is __________________.
Fill in the blanks on the graph with the areas, upper and lower limits of the confidence interval, and the sample mean.
In one complete sentence, explain what the interval means.
Using the same mean, standard deviation, and level of confidence, suppose that n were 69 instead of 25. Would the error bound become larger or smaller? How do you know?
Using the same mean, standard deviation, and sample size, how would the error bound change if the confidence level were reduced to 90 percent? Why?
8.2 A Single Population Mean Using the Student's t-Distribution
Use the following information to answer the next five exercises: A hospital is trying to cut down on emergency room wait times. It is interested in the amount of time patients must wait before being called back to be examined. An investigation committee randomly surveyed 70 patients. The sample mean was 1.5 hr, with a sample standard deviation of 0.5 hr.
Identify the following:
- =_______
- =_______
- n =_______
- n – 1 =_______
Define the random variables X and in words.
Which distribution should you use for this problem?
Construct a 95 percent confidence interval for the population mean time spent waiting. State the confidence interval, sketch the graph, and calculate the error bound.
Explain in complete sentences what the confidence interval means.
Identify the following:
- =_______
- =_______
- n =_______
- n – 1 =_______
Define the random variable X in words.
Define the random variable in words.
Which distribution should you use for this problem?
Construct a 99 percent confidence interval for the population mean hours spent watching television per month. State the confidence interval, sketch the graph, and calculate the error bound.
Why would the error bound change if the confidence level were lowered to 95 percent?
X | Freq. |
---|---|
1 | 1 |
2 | 7 |
3 | 18 |
4 | 7 |
5 | 6 |
Calculate the following:
- =______
- =______
- n =______
Define the random variable in words.
What is estimating?
Is known?
As a result of your answer to Exercise 8.52, state the exact distribution to use when calculating the confidence interval.
How much area is in both tails (combined)?
How much area is in each tail?
Calculate the following:
- lower limit
- upper limit
- error bound
The 95 percent confidence interval is_____.
Fill in the blanks on the graph with the areas, the upper and lower limits of the confidence interval, and the sample mean.
In one complete sentence, explain what the interval means.
Using the same , , and level of confidence, suppose that n were 69 instead of 39. Would the error bound become larger or smaller? How do you know?
Using the same , , and n = 39, how would the error bound change if the confidence level were reduced to 90 percent? Why?
8.3 A Population Proportion
Use the following information to answer the next two exercises: Marketing companies are interested in knowing the population percentage of women who make the majority of household purchasing decisions.
When designing a study to determine this population proportion, what is the minimum number you would need to survey to be 90 percent confident that the population proportion is estimated to within 0.05?
If it were later determined that it was important to be more than 90 percent confident and a new survey were commissioned, how would it affect the minimum number you need to survey? Why?
Identify the following:
- x = ______
- n = ______
- p′ = ______
Define the random variables X and P′ in words.
Which distribution should you use for this problem?
Construct a 95 percent confidence interval for the population proportion of households where the women make the majority of the purchasing decisions. State the confidence interval, sketch the graph, and calculate the error bound.
List two difficulties the company might have in obtaining random results if this survey were done by email.
Use the following information to answer the next five exercises: Of 1,050 randomly selected adults, 360 identified themselves as manual laborers, 280 identified themselves as non-
manual wage earners, 250 identified themselves as mid-level managers, and 160 identified themselves as executives. In the survey, 82 percent of manual laborers preferred trucks, 62 percent of non-manual wage earners preferred trucks, 54 percent of mid-level managers preferred trucks, and 26 percent of executives preferred trucks.
We are interested in finding the 95 percent confidence interval for the percentage of executives who prefer trucks. Define random variables X and P′ in words.
Which distribution should you use for this problem?
Construct a 95 percent confidence interval. State the confidence interval, sketch the graph, and calculate the error bound.
Suppose we want to lower the sampling error. What is one way to accomplish that?
The sampling error given in the survey is ±2 percent. Explain what the ±2 percent means.
Define the random variable X in words.
Define the random variable P′ in words.
Which distribution should you use for this problem?
Construct a 90 percent confidence interval, and state the confidence interval and the error bound.
What would happen to the confidence interval if the level of confidence were 95 percent?
What is being counted?
In words, define the random variable X.
Calculate the following:
- x = _______
- n = _______
- p′ = _______
State the estimated distribution of X. X ~ ________
Define a new random variable P′. What is p′ estimating?
In words, define the random variable P′.
State the estimated distribution of P′. Construct a 92 percent confidence interval for the true proportion of girls in the ages 8 to 12 beginning ice-skating classes at the Ice Chalet.
How much area is in both tails (combined)?
How much area is in each tail?
Calculate the following:
- lower limit
- upper limit
- error bound
The 92 percent confidence interval is _______.
Fill in the blanks on the graph with the areas, upper and lower limits of the confidence interval, and the sample proportion.
In one complete sentence, explain what the interval means.
Using the same p′ and level of confidence, suppose that n were increased to 100. Would the error bound become larger or smaller? How do you know?
Using the same p′ and n = 80, how would the error bound change if the confidence level were increased to 98 percent? Why?
If you decreased the allowable error bound, why would the minimum sample size increase (keeping the same level of confidence)?