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33 votes
33 votes
Weights of women in one age group are normally distributed with a standard deviation σ of 23 lb. A researcher wishes to estimate the mean weight of all women in this age group. Find how large a sample must be drawn in order to be 90 percent confident that the sample mean will not differ from the population mean by more than 2.4 lb.

User DaedalusAlpha
by
3.3k points

1 Answer

26 votes
26 votes

The confidence interval is given by


\begin{gathered} \bar{x}\pm z*\frac{\sigma}{\sqrt[]{n}} \\ \text{ Where} \\ \bar{x}=\text{ the sample mean} \\ z=\text{ the z-score} \\ \sigma=\text{ the standard deviation} \\ n=\text{ the sample size} \end{gathered}

We will now find the alpha level, α.


\alpha=(1-0.9)/(2)=(0.1)/(2)=0.05

The z-score for a 90% confidence interval is 1.645.

The question gives the margin of error as 2.4 lb.

Therefore,


2.4=z*\frac{\sigma}{\sqrt[]{n}}

Substituting the values, we get


2.4=1.645*\frac{23}{\sqrt[]{n}}

Making n the subject of formula:


\begin{gathered} \sqrt[]{n}=(1.645*23)/(2.4) \\ \sqrt[]{n}=(37.835)/(2.4)=15.685 \\ \therefore \\ n=15.685^2 \\ n=246 \end{gathered}

The sample size is 246.

User Carlon
by
2.9k points
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