Statistics: Mean and Standard Deviation

AI Thread Summary
The discussion centers on calculating the standard deviation for a binomial distribution where 80% of a community favors a police substation. Participants clarify that the mean is not simply the total number of citizens surveyed but is calculated using the formula np, where n is the number of trials and p is the probability of success. The standard deviation is derived from the formula √(npq), where q is the probability of failure. The importance of understanding the definitions and formulas related to binomial distributions is emphasized. Accurate calculations are crucial for interpreting survey results correctly.
nessa
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Homework Statement


In a recent survey, 80% of the community favored building a police substation in their neighborhood. If 15 citizen are chosen, what is the standard deviation of the number favoring the substation?

Homework Equations



I know that my mean is 15 and the probiblilty is 80 but how do I get the standard deviation.

The Attempt at a Solution

 
Last edited:
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The answer is 12.

Do NOT simply give out the answer. In fact, don't give the answer at all in the homework section! (Not even a wrong answer! The question was about the standard deviation, not the mean.)
(Editted by HallsofIvy)
 
Last edited by a moderator:
nessa said:

Homework Statement


In a recent survey, 80% of the community favored building a police substation in their neighborhood. If 15 citizen are chosen, what is the standard deviation of the number favoring the substation?

Homework Equations



I know that my mean is 15 and the probiblilty is 80 but how do I get the standard deviation.

The Attempt at a Solution


You need to go back and read the basic definitions! The number of people surveyed is 15. That surely does not mean that they will expect all 15 to favor the substation! The expected value (mean) is not 15.

This is a binomial distribution with p= .8, q= 1- .8= .2, and n= 15. I'm sure you textbook tells you that the mean of a binomial distribution is np and the standard deviation is \sqrt{npq}.
 

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