In a poll to estimate presidential popularity, each person in a random sample of

Question

In a poll to estimate presidential popularity, each person in a random sample of 1,350 voters was asked to agree with one of the following statements:

A total of 525 respondents selected the first statement, indicating they thought the president was doing a good job.

Construct a 90% confidence interval for the proportion of respondents who feel the president is doing a good job. (Use Student's t Distribution Table.) (Round your answers to 3 decimal places.)

Based on your interval in part (a), is it reasonable to conclude that a majority of the population believes the president is doing a good job?

In a poll to estimate presidential popularity, each person in a random sample of 1,350 voters was asked to agree with one of the following statements:

Explanation / Answer

a)

Note that              
              
p^ = point estimate of the population proportion = x / n =    0.388888889          
              
Also, we get the standard error of p, sp:              
              
sp = sqrt[p^ (1 - p^) / n] =    0.013268016          
              
Now, for the critical z,              
alpha/2 =   0.05          
Thus, z(alpha/2) =    1.644853627          
Thus,              
              
lower bound = p^ - z(alpha/2) * sp =   0.367064945          
upper bound = p^ + z(alpha/2) * sp =    0.410712832          
              
Thus, the confidence interval is              
              
(   0.367064945   ,   0.410712832   ) [ANSWER]
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B)

NO. Actually, the whole confidence interval is under 0.50.

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