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Assume that a sample is used to estimate a population proportion p. Find the margin of error E that corresponds to thegiven statistics and confidence level. Round the margin of error to four decimal places.1)99% confidence; n

User Alexander Bogushov
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1 Answer

23 votes
23 votes

Answer:


E = 0.0158

Explanation:

Given


n = 5900


x = 1770


CI = 99\%

Required

The margin of error (E)

First, calculate proportion p


p = x/n


p = 1770/5900


p = 0.3

Given that:


CI = 99\%

Calculate the alpha leve;


\alpha = 1 - CI


\alpha = 1- 0.99


\alpha= 0.01

Divide by 2


\alpha/2= 0.01/2

Subtract from 1


1 - \alpha/2= 1 - 0.01/2


1 - \alpha/2= 0.995

The corresponding z value is:


z =2.576

So, the margin of error is:


E = z * √(p * (1 - p)/n)

So, we have:


E = 2.576 * √(0.3 * (1 - 0.3)/5600)

Using a calculator, we have:


E = 0.01577471394

Approximate


E = 0.0158

User PJUK
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