Answer to Question #346760 in Statistics and Probability for Bethsheba Kiap

Question #346760

A random sample is drawn from a normally distributed population of known standard deviation 5. Construct a 99.8% confidence interval for the population mean based on the information given (not all of the information given need be used).

a. n = 16, 𝑥̅= 98, 𝑠 = 5.6

b. n = 9, 𝑥̅= 98, 𝑠 = 5.6

Expert's answer

1. The critical value for "\\alpha = 0.002" "z_c = z_{1-\\alpha\/2} = 3.0902"

The corresponding confidence interval is computed as shown below:

"CI=(\\bar{X}-z_c\\times\\dfrac{\\sigma}{\\sqrt{n}}, \\bar{X}+z_c\\times\\dfrac{\\sigma}{\\sqrt{n}})""=(98-3.0902\\times\\dfrac{5}{\\sqrt{16}},""98+3.0902\\times\\dfrac{5}{\\sqrt{16}})""=(94.137,101.863)"

Therefore, based on the data provided, the 95 confidence interval for the population mean is "94.137 < \\mu <101.863," which indicates that we are 99.8% confident that the true population mean "\\mu" is contained by the interval "(94.137,101.863)."

2. The critical value for "\\alpha = 0.002" "z_c = z_{1-\\alpha\/2} = 3.0902"

The corresponding confidence interval is computed as shown below:

"CI=(\\bar{X}-z_c\\times\\dfrac{\\sigma}{\\sqrt{n}}, \\bar{X}+z_c\\times\\dfrac{\\sigma}{\\sqrt{n}})""=(98-3.0902\\times\\dfrac{5}{\\sqrt{9}},""98+3.0902\\times\\dfrac{5}{\\sqrt{9}})""=(92.850,103.150)"

Therefore, based on the data provided, the 95 confidence interval for the population mean is "92.850 < \\mu <103.150," which indicates that we are 99.8% confident that the true population mean "\\mu" is contained by the interval "(92.85,103.150)."

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Answer to Question #346760 in Statistics and Probability for Bethsheba Kiap

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