Answer to Question #343929 in Statistics and Probability for yow

Question #343929

The average weight of 25 chocolate bars selected from a normally distributed population is 200 g with a standard deviation of 10 g. Find the interval estimate using 98% confidence level.

Expert's answer

The critical value for "\\alpha = 0.02" is "z_c = z_{1-\\alpha\/2} = 2.3263."

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}})"

"=(200-2.3263\\times\\dfrac{10}{\\sqrt{25}}, 200+2.3263\\times\\dfrac{10}{\\sqrt{25}})"

"=(195.3474, 204.6526)"

Therefore, based on the data provided, the 98% confidence interval for the population mean is "195.3474 < \\mu < 204.6526," which indicates that we are 98% confident that the true population mean "\\mu" is contained by the interval "(195.3474, 204.6526)."

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Answer to Question #343929 in Statistics and Probability for yow

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