Final answer:
To calculate confidence intervals for glass sheet thickness, we employ formulas using the z-score appropriate for the desired confidence level, the provided sample standard deviation, and the sample size. Adjustments to sample size can refine the precision of this estimate within a desired margin of error.
Step-by-step explanation:
Calculating Confidence Intervals for Glass Sheet Thickness
To answer the student's question: a) To find the 98% confidence interval for the population mean thickness of glass sheets, we can use the formula mean ± (z*standard deviation/√n), where z is the z-score corresponding to a 98% confidence level (approximately 2.326), standard deviation is given as 0.10 mm, and n is the sample size of 87. b) The level of confidence for the interval (4.185, 4.215) can be found using the z-score table and the standard deviation, and then checking which confidence level corresponds to the calculated z-score. c) To determine the number of glass sheets needed to obtain a 98% confidence interval within ±0.015 mm, we can use the formula n = (z*σ/E)^2, where σ is the standard deviation, E is the margin of error (0.015), and z is the z-score for a 98% confidence level. d) A 90% confidence upper bound can be found using a one-tailed z-test, where z is the z-score corresponding to 90% confidence (approximately 1.645).
The confidence interval estimates the true population mean (µ) of a statistic and is influenced by the confidence level, sample size, and sample standard deviation.