Question

A student running for a position in student government believes that 55% of the student body will vote for her. However, she is worried about low voter turnout. Complete parts a through d below. a. Assuming she truly has 55% support in the entire student body, find the mean and standard deviation of the sampling distribution for the proportion of votes she will receive if only n = 200 students show up for voting. mean = , standard deviation = (Round to three decimal places as needed.) b. Is it reasonable to assume a normal shape for this sampling distribution? Explain. Since there are expected votes for the student and expected votes not for the student, it reasonable to assume a normal shape. (Type integers or decimals. Do not round.) c. How likely is it that she will not get the majority of the vote, that is, a sample proportion of 50% or lower from the 200 votes cast? The probability is . (Round to four decimal places as needed.) d. If instead n = 1000 students show up for voting, how likely is it then that she will not win the majority? The probability is . (Round to four decimal places as needed.)

          A student running for a position in student government believes that 55% of the student body will vote for her. However, she is worried about low voter turnout. Complete parts a through d below.

a. Assuming she truly has 55% support in the entire student body, find the mean and standard deviation of the sampling distribution for the proportion of votes she will receive if only n = 200 students show up for voting.

mean = , standard deviation = 
(Round to three decimal places as needed.)

b. Is it reasonable to assume a normal shape for this sampling distribution? Explain.

Since there are expected votes for the student and expected votes not for the student, it reasonable to assume a normal shape.
(Type integers or decimals. Do not round.)

c. How likely is it that she will not get the majority of the vote, that is, a sample proportion of 50% or lower from the 200 votes cast?

The probability is .
(Round to four decimal places as needed.)

d. If instead n = 1000 students show up for voting, how likely is it then that she will not win the majority?

The probability is .
(Round to four decimal places as needed.)

A student running for a position in student government believes that 55% of the student body will vote for her. However, she is worried about low voter turnout. Complete parts a through d below.

a. Assuming she truly has 55% support in the entire student body, find the mean and standard deviation of the sampling distribution for the proportion of votes she will receive if only n = 200 students show up for voting.

mean = , standard deviation =
(Round to three decimal places as needed.)

b. Is it reasonable to assume a normal shape for this sampling distribution? Explain.

Since there are expected votes for the student and expected votes not for the student, it reasonable to assume a normal shape.
(Type integers or decimals. Do not round.)

c. How likely is it that she will not get the majority of the vote, that is, a sample proportion of 50% or lower from the 200 votes cast?

The probability is .
(Round to four decimal places as needed.)

d. If instead n = 1000 students show up for voting, how likely is it then that she will not win the majority?

The probability is .
(Round to four decimal places as needed.)

Added by Claudia L.

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