8.1 A single population mean using the normal distribution (Page 5/20)

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Try it

Refer back to the pizza-delivery Try It exercise. The population standard deviation is six minutes and the sample mean deliver time is 36 minutes. Use a sample size of 20. Find a 95% confidence interval estimate for the true mean pizza delivery time.

(33.37, 38.63)

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Suppose we change the original problem in [link] to see what happens to the error bound if the sample size is changed.

Leave everything the same except the sample size. Use the original 90% confidence level. What happens to the error bound and the confidence interval if we increase the sample size and use n = 100 instead of n = 36? What happens if we decrease the sample size to n = 25 instead of n = 36?

$\bar{x}$ = 68
EBM = $(z_{\frac{α}{2}}) (\frac{σ}{\sqrt{n}})$
σ = 3; The confidence level is 90% ( CL =0.90); $z_{\frac{α}{2}}$ = z _0.05 = 1.645.

Solution b

If we decrease the sample size n to 25, we increase the error bound.

When n = 25: EBM = $(z_{\frac{α}{2}}) (\frac{σ}{\sqrt{n}})$ = (1.645) $(\frac{3}{\sqrt{25}})$ = 0.987.

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Summary: effect of changing the sample size

Increasing the sample size causes the error bound to decrease, making the confidence interval narrower.
Decreasing the sample size causes the error bound to increase, making the confidence interval wider.

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Try it

Refer back to the pizza-delivery Try It exercise. The mean delivery time is 36 minutes and the population standard deviation is six minutes. Assume the sample size is changed to 50 restaurants with the same sample mean. Find a 90% confidence interval estimate for the population mean delivery time.

(34.6041, 37.3958)

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Working backwards to find the error bound or sample mean

When we calculate a confidence interval, we find the sample mean, calculate the error bound, and use them to calculate the confidence interval. However, sometimes when we read statistical studies, the study may state the confidence interval only. If we know the confidence interval, we can work backwards to find both the error bound and the sample mean.

Finding the Error Bound

From the upper value for the interval, subtract the sample mean,
OR, from the upper value for the interval, subtract the lower value. Then divide the difference by two.

Finding the Sample Mean

Subtract the error bound from the upper value of the confidence interval,
OR, average the upper and lower endpoints of the confidence interval.

Notice that there are two methods to perform each calculation. You can choose the method that is easier to use with the information you know.

Suppose we know that a confidence interval is (67.18, 68.82) and we want to find the error bound. We may know that the sample mean is 68, or perhaps our source only gave the confidence interval and did not tell us the value of the sample mean.

Calculate the error bound:

If we know that the sample mean is 68: EBM = 68.82 – 68 = 0.82.
If we don't know the sample mean: EBM = $\frac{(68.82 - 67.18)}{2}$ = 0.82.

Calculate the sample mean:

If we know the error bound: $\bar{x}$ = 68.82 – 0.82 = 68
If we don't know the error bound: $\bar{x}$ = $\frac{(67.18 + 68.82)}{2}$ = 68.

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Try it

Suppose we know that a confidence interval is (42.12, 47.88). Find the error bound and the sample mean.

Sample mean is 45, error bound is 2.88

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Calculating the sample size n

If researchers desire a specific margin of error, then they can use the error bound formula to calculate the required sample size.

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Source: OpenStax, Introductory statistics. OpenStax CNX. May 06, 2016 Download for free at http://legacy.cnx.org/content/col11562/1.18

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