If you sample standard deviation s = 2, the sample size = 35, and your confidence level is 95% this is how you can have R calculate a Confidence Interval for \(\sigma\).
conf_sig(s = 2, size = 35, conf = .95)## [1] 1.617744 2.6204045
X^(2)0.95= 10.117, X^(2)0.05= 30.144
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X^(2)0.99= 9.542, X^(2)0.01= 40.289
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(1.612,4.278) We can be 95% confident that the population standard deviation of the prices of 4GB flash memory cards at online retailers is between 1.612 and 4.278 dollars.
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(849.7,1655.3) We can be 90% confident that the population standard deviation of repair costs of a low-impact bumper crash on a mini- or micro-car is between 849.7 and 1655.3 dollars.
Questions
A)
If your Confidence Interval contains the “status quo” value the data does not indicate your new process is different from the “status quo”.
In truth it is possible your new process is different from the “status quo” thus in this scenario you potentially made what type of error? Type 2
B)
If your Confidence Interval does not contain the “status quo” value the data does indicate your new process is different then the “status quo”.
In truth it is possible your new process is not different then the “status quo” thus in this scenario you potentially made what type of error? Type 1