Question 8 (1 point) Calculate the lower confidence limit (LCL) of the mean for the following: I = 900, n = 64,0 =...
Calculate the lower confidence limit (LCL) and upper confidence limit (UCL) of the mean for each of the following a. x = 455, n = 348, ?-20, and ? = 0.05 b.x-85, n = 184, ?2 = 49, and ? = 0.01 ER Click the icon to view the standard normal table of the cumulative distribution function. a. LCL= | | (Round to two decimal places as needed.) UCL= ? (Round to two decimal places as needed.) b, LCL=? (Round...
Question 10 (1 point) For a random sample of 15 recent business school graduates beginning their first job, the mean starting salary was found to be $35,500, and the sample standard deviation was $7,500. Assuming the population is normally distributed, calculate the lower confidence limit (LCL) of the population mean with a -0.01. Your Answer:
Construct a 98% confidence interval to estimate the population mean with x̅ = 63 and σ= 13 for the following sample sizes. a)n=33 b) n = 44 c)n = 60 a) With 98% confidence, when n=33, the population mean is between the lower limit of _______ and the upper limit of _______
please help me with the lower confidence limit 6 7 8 9 10 Partially Correct Your answer is incorrect. Your lower confidence limit is not correct. The lifetime of a certain brand of battery is known to have a standard deviation of 19.8 hours. Suppose that a random sample of 100 such batteries has a mean lifetime of 33.3 hours. Based on this sample, find a 90% confidence interval for the true mean lifetime of all batteries of this brand....
If all I have is a mean concentration, how can I calculate the overall confidence limit, 95% confidence interval, or overall relative confidence limit? My mean concentration is 0.26 M.
Calculate the lower limit for the 90% confidence interval using the following information. za/2 = 1.645 O p = 0.02 P = 0.15 0 -0.2268 O 0.1829 0 -0.0299 O 0.1171 Question 7 1 pts Calculate the upper limit for the 99% confidence interval using the following information. 2a/2 = 2.576 0h = 0.005 P = 0.48 0 0.3254 O 0.4929 01.2965
Population Standard Deviation 6.0000 Sample Size Sample Mean GG.8000 Confidence intervall Confidence Caefficient Lower Limit Upper Limit Hypothesis Test Hypothesized Value Test Statistic P-value (Lower Tail) P-value (Upper Tail) P-value (Two Tail) 0.0004 Sample Size Sample Mean Sample Standard Deviation 5128000 4.89944 Confidence Interval Confidence Coefficient Lower Limit Upper Limit Hypothesis Test Hypothesized Value Test Statistic P-value (Lower Tail) P-value (Upper Tail) P-value (Two Tail 0.0018 Studies show that massage therapy has a variety of health benefits. Ten typical ane...
3 5 Incorrect Your answer is incorrect . Your lower confidence limit is not correct • Your upper confidence limit is not correct. The scores on an examination in psychology are approximately normally distributed with mean 500 and an unknown standard deviation. The following is a random sample of scores from this examination. 410, 438, 469, 501, 527, 539,586 Find a 90% confidence interval for the population standard deviation. Then complete the table below. Carry your intermediate computations to at...
Product filling weights are normally distributed with a mean of 365 grams and a standard deviation of 19 grams. a. Compute the chart upper control limit and lower control limit for this process if samples of size 10, 20 and 30 are used (to 2 decimals). Use Table 19.3. For samples of size 10 UCL =| LCL For a sample size of 20 UCL = LCL For a sample size of 30 UCL = LCL = b. What happens to...
Calculate an approximate 68% confidence interval for the population mean salaries of male employees, based on the following sample data: from a sample of 144 male employees, the sample mean salaries is $500. Assume the population standard deviation is $144. Assume the distribution of salaries is normally distributed. Enter your answer in the format (lower, upper) where the "lower" is the lower confidence limit and the "upper" is the upper confidence limit. Round each numerical input to the nearest integer.