Political polls typically sample randomly from the U.S population to investigate the percentage of voters who favor some candidate or issue. The number of people polled is usually on the order of 1000. Suppose that one such poll asks voters how they feel about the President’s handling of the crisis in the financial markets. The results show that 575 out of the 1280 people polled say they either “approve” or “strongly approve” of the President’s handling of this matter. Based on the sample referenced above, find a 95% confidence interval estimate for the proportion of the entire voter population who “approve” or “strongly approve” of the President’s handling of the crisis in the financial markets.

Now, here’s an interesting twist. If the same sample proportion was found in a sample twice as large—that is, 1150 out of 2560—how would this affect the confidence interval?

Please keep in mind that my evaluation of your post will be based on the extent to which you participated and fostered a positive and effective learning environment–for yourself and others.  Participating and sharing are the keys.  Naturally, simply copying another person's post is prohibited. 

Instructions:

To make a post to this week's Discussion Forum, click on the Building a Confidence Interval Estimate link, then click Start a New Conversation.  In the title block of the dialog box that appears insert your first and last name; compose your post in the message box–do not make your post in an attachment; and then click Post Message.

Your initial post(6 points) should reflect your understanding of the question posed.  In addition to the computations you employed to arrive at your response, your post must contain comments regarding the rationale for the approach you utilized.  Simply listing an answer is of no real value in promoting a discussion.. You must also respond to at least 2 other students. Responses(2 points each) should be a minimum of 50 words and may include direct questions.