Respuesta :
A 98% confidence interval estimate of the mean wake time for a population with zopiclone treatments is,
From the standard normal table, the z-critical value at 98% confidence is 2.33
98%C.I. = µ ± z * σ / sqrt of n = 98.90 ± 2.33 * 42.30 / sqrt of 16 = 98.90 ± 24.64 = 74.26 to 125.54
A 98% confidence interval estimate of the mean wake time for a population with zopiclone treatments is 74.26 to 125.54.
The result does not suggest about the mean wake time of 102.80 minutes before the treatment due to the mean wake time of 102.80 minutes included in the 98% confidence interval which is between 74.26 and 125.54. Zopiclone does not appear effective.
A 98% confidence interval estimate of the mean wake time for a population with zopiclone treatments is 74.26 to 125.54.
What is a confidence interval?
In statistics, a confidence interval is a range to estimate for unknown terms. The most common level is the 95% confidence interval.
It can be calculated by
CI = Mean ± margin of error.
A 98% confidence interval estimate of the mean wake time for a population with zopiclone treatments will be
From the standard normal table, the z-critical value at 98% confidence is 2.33
98% C.I. = µ ± z x σ / √n
= 98.90 ± 2.33 x 42.30 / √16
= 98.90 ± 24.64
= 74.26 to 125.54
A 98% confidence interval estimate of the mean wake time for a population with zopiclone treatments is 74.26 to 125.54.
The result does not suggest the mean wake time of 102.80 minutes before the treatment included in the 98% confidence interval that's between 74.26 and 125.54.
Zopiclone does not appear effective.
Learn more about confidence intervals;
https://brainly.com/question/24131141
#SPJ3
