A popular theory is that presidential candidates have an advantage if they are taller than their main opponents. Listed are heights (in centimeters) of randomly selected presidents along with the heights of their main opponents. Complete parts (a) and (b) below. Height (cm) of President 176 173 183 177 202 164 Height (cm) of Main Opponent 170 172 181 171 195 169 a. Use the sample data with a 0.01 significance level to test the claim that for the population of heights for presidents and their main opponents, the differences have a mean greater than 0 cm. In this example, μd is the mean value of the differences d for the population of all pairs of data, where each individual difference d is defined as the president's height minus their main opponent's height. What are the null and alternative hypotheses for the hypothesis test? H0: μd ________ ( A. =, B. ≠, C. <, D. > ) _______ cm H1: μd _______ ( A. =, B. ≠, C. <, D. > ) ________ cm (Type integers or decimals. Do not round.) Identify the test statistic. t= ___________ (Round to two decimal places as needed.) Identify the P-value. P-value= ____________ (Round to three decimal places as needed.) What is the conclusion based on the hypothesis test? Since the P-value is ____________( A. less than or equal to, B. greater than ) the significance level, __________( A. Fail to reject, B. Reject ) the null hypothesis. There ___________ ( A. is not, B. is ) sufficient evidence to support the claim that presidents tend to be taller than their opponents. b. Construct the confidence interval that could be used for the hypothesis test described in part (a). What feature of the confidence interval leads to the same conclusion reached in part (a)? The confidence interval is __________ cm < μd < ____________ cm. (Round to one decimal place as needed.) What feature of the confidence interval leads to the same conclusion reached in part (a)? Since the confidence interval contains ___________ ( A. zero, B. only negative numbers, C. only positive numbers ) , _____________( A. Fail to reject, B. Reject ) the null hypothesis.
Section 9.3
Question #4
A popular theory is that presidential candidates have an advantage if they are taller than their main opponents. Listed are heights (in centimeters) of randomly selected presidents along with the heights of their main opponents. Complete parts (a) and (b) below.
|
Height (cm) of President
|
176
|
173
|
183
|
177
|
202
|
164
|
|
|---|---|---|---|---|---|---|---|
|
Height (cm) of Main Opponent
|
170
|
172
|
181
|
171
|
195
|
169
|
a. Use the sample data with a 0.01 significance level to test the claim that for the population of heights for presidents and their main opponents, the differences have a mean greater than 0 cm.
In this example, μd is the
H0: μd ________ ( A. =, B. ≠, C. <, D. > ) _______ cm
H1: μd _______ ( A. =, B. ≠, C. <, D. > ) ________ cm
(Type integers or decimals. Do not round.)
Identify the test statistic.
t= ___________ (Round to two decimal places as needed.)
Identify the P-value.
P-value= ____________ (Round to three decimal places as needed.)
What is the conclusion based on the hypothesis test?
Since the P-value is ____________( A. less than or equal to, B. greater than ) the significance level, __________( A. Fail to reject, B. Reject ) the null hypothesis. There ___________ ( A. is not, B. is ) sufficient evidence to support the claim that presidents tend to be taller than their opponents.
b. Construct the confidence interval that could be used for the hypothesis test described in part (a). What feature of the confidence interval leads to the same conclusion reached in part (a)?
The confidence interval is __________ cm < μd < ____________ cm.
(Round to one decimal place as needed.)
What feature of the confidence interval leads to the same conclusion reached in part (a)?
Since the confidence interval contains ___________ ( A. zero, B. only negative numbers, C. only positive numbers ) , _____________( A. Fail to reject, B. Reject ) the null hypothesis.
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