T confidence interval ( 95% )
how can I construct 2 samples ( STEM and NON-STEM ) confidence interval for the population mean?
T confidence interval ( 95% ) how can I construct 2 samples ( STEM and NON-STEM ) confidence interval for the population mean? Hours studied: Stem vs Non-Stem Stem Non-Stem 4 2 0 5-9 10-14 15-19 20-...
And construct a 95% confidence interval for the population mean
for sample B
8.2.13-1 95% confidence interval for the population mean for each of the samples below plain why these Assuming that the population is normally distributed, construct a two samples produce differen t confidence intervals even though they have the same mean and range Full dataset SampleA: 1 1 4 4 5 5 8 8 Sample B: 1 2 3 45 6 7 8 Construct a 95% confidence interval...
Confidence Interval Given. Assume I created a 95% confidence interval for the mean hours studied for a test based on a random sample of 64 students. The lower bound of this interval was 4 and the upper bound was 14. Assume that when I created this interval I knew the population standard deviation. Using this information, (a) Calculate the width of the interval. (b) Calculate the margin of error for the interval. (c) Calculate the center of the interval. (d)...
ThefollowingarethelosingscoresinsevenrandomlychosenSuperBowl football games: 10, 16, 20, 17, 31, 19, 14 Construct a 95 percent confidence interval estimate of the average losing score in a Super Bowl game.
1. construct a 95% confidence interval where standard deviation is 15 and mean is 99.133 2. construct a 95% confidence interval where standard deviation is 15 and mean is 99 3. construct a 95% confidence interval where standard deviation is 15 and mean is 98.625 i want to add that the population mean is 100 question 1- sample size is 8 question 2- sample size is 20 question 3- sample size is 30
Assuming that the population is normally distributed, construct a 95% confidence interval for the population mean, based on the following sample size of .n=7. 1, 2, 3, 4, 5, 6, and 15 <-----this is the data In the given data, replace the value 15 with 7 and recalculate the confidence interval. Using these results, describe the effect of an outlier (that is, an extreme value) on the confidence interval, in general. Find a 95% confidence interval for the population mean,...
10. Properties of a confidence interval Suppose the mean of a population is 22. A researcher (who does not know that p Then she constructs a 95% confidence interval of the population mean. 22) selects a random sample of size n from this population. The true population mean and the researcher's 95% confidence interval of the population mean are shown in the following graph. Use the graph to answer the questions that follow Sample Mean 95% Confidence interval of the...
Construct 95% confidence interval for the following gas levels 20, 170, 25, 15, 4, 12.5, 20, 15, 20 Check asumptions to find the best way to construct the confidence interval. Determine if the population mean of the gas level is less than 80 *Please note that this questions must be solved in R, and explanations would be greatly appreciated :) *
a. a 95% confidence interval for the population mean Age; b. a 99% confidence interval for the population mean Income; c. a 90% confidence interval for the population proportion of Males. use ms excel file Product Age Gender Education Marital Status Usage Fitness Income Miles TM195 18 Male 14 Single 3 4 29562 112 TM195 23 Male 16 Partnered 4 3 39795 94 TM195 24 Female 16 Single 4 3 46617 75 TM195 26 Male 16 Partnered 2 2 53439...
11. Construct the indicated confidence interval for the
difference between population proportions. Assume
that the samples are independent and that they have been randomly
selected.
A marketing survey involves product recognition in New York and
California. Of 558 New Yorkers surveyed, 193 knew the product while
196 out of 614 Californians knew the product. Construct a 99%
confidence interval for the difference between the two population
proportions.
12. Construct the indicated confidence interval for the
difference between population proportions. Assume...
Assuming that the population is normally distributed, construct a 95% confidence interval for the population mean, based on the following sample size of n = 5. 1, 2, 3, 4, and 30 In the given data, replace the value 30 with 5 and recalculate the confidence interval. Using these results, describe the effect of an outlier (that is, an extreme value) on the confidence interval, in general. Find a 95% confidence interval for the population mean, using the formula or...