Since the confidence interval contains 3, we will not reject Ho.
Hence,
Option B is correct.
Based on a sample of data, a researcher forms a confidence interval for the population mean...
1. True or False? 2. True or False? To compute a t statistic, you must use the sample variance (or standard deviation) to compute the estimated standard error for the sample mean. True False The 95% confidence interval for the difference between two treatment means extends from-2.50 to +5.50. Based on this information, you can conclude that there is no significant difference between the treatments at the .05 level of significance True O False To compute a t statistic, you...
A 95% confidence interval for a population mean was calculated. The sample mean was found to be 34.5 and the MOE was found to be 4.06 giving us a confidence interval of 34.5±4.06 or equivalently written as 30.44 to 38.56. (a) For the hypotheses H0:?=30 Ha:??30, would you reject the null hypothesis at the 5% level of significance (i.e. ? = 0.5)? (Type: YES or NO or CANNOT TELL): (b) For the hypotheses H0:?=41 Ha:??41, would you reject the null...
Suppose that based on two independent samples, the 95% confidence interval for the difference between two population proportions, p1−p2 is (-0.29, -0.01). If a test of hypotheses H0: p1−p2 = 0 versus Ha: p1−p2 ≠ 0 was conducted at 0.05 level of significance based on these samples, the decision would be to .. retain the null hypothesis? reject the null hypothesis?
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...
Let X ∼ Bin(124, p) with observed x = 78. Then, the 95% confidence interval for p is . To make the length of the 95% confidence interval for p not greater than 0.05, we need the sample size n to be at least . Based on the data, if we want to test H0 : p ≤ 0.6 against Ha : p > 0.6, we conclude at significance level α = 0.05. Let F ∼ F4,7. Assume c1 satisfies...
Consider a z confidence interval for the population mean. If the confidence level decreases but everything else stays the same then we can expect the size of the interval to: A test was conducted to determine if HO: Mu = 52.7 should be rejected in favor of Ha: Mu > 52.7 where mu refers to the population mean. A sample was selected and the resulting test statistic was found to be 2.15. What is the p-value for the sample statistic?...
Confidence interval for the population mean: Use of the t distribu... A researcher collected sample data for 10 women ages 18 to 24. The sample had a mean serum cholesterol level (measured in mg/100 mL) of 192.4, with a standard deviation of 5.2. Assuming that serum cholesterol levels for women ages 18 to 24 are normally distributed, find a 99% confidence interval for the mean serum cholesterol level of all women in this age group. Then complete the table below....
Construct a confidence interval of the population proportion at the given level of confidence. x= 45, n 150, 95% confidence The lower bound is The upper bound is (Round to three decimal places as needed.) A researcher wishes to estimate the proportion of adults who have high-speed Internet access. What size sample should be obtained if she wishes the estimate to be within 0.04 with 95% confidence if (a) she uses a previous estimate of 0.32? (b) she does not...
Based on sample data, the 90% confidence interval limits for the population mean are LCL = 170.86 and UCL = 195.42. If the 10% level of significance were used in testing the hypotheses H0: μ = 201 vs. H1: μࣔ 201, the null hypothesis: Group of answer choices would be rejected. would be accepted. would fail to be rejected. would become H0: μࣔ 201
7. A researcher collected data from a normally distributed population with o-28 and an unknown population mean. The researcher used a sample the size of n=49 and got a mean of M=65. Construct a 95% confidence interval based on the researcher's data. What can you conclude about the population's mean based on this interval?