1) Calculate a 95 percent confidence interval for μ1 − μ2. Can we be 95 percent confident that μ1 − μ2 is greater than 20? By evaluating the 95% confidence interval decide whether μ1 Is greater than μ2?
1) Calculate a 95 percent confidence interval for μ1 − μ2. Can we be 95 percent...
a) State the null and alternative hypotheses. Which of the following is correct? A. H0: μ1=μ2; Ha: μ1<μ2 This is the correct answer. B. H0: μ1=μ2; Ha: μ1≠μ2 C. H0: μ1=μ2; Ha: μ1>μ2 (b) Identify the P-value and state the researcher's conclusion if the level of significance was α=_____ What is the P-value? P-value=____ State the researcher's conclusion. Which of the following is correct? A. Fail to reject H0,there is sufficient evidence to conclude that the mean step pulse of...
Give a 95% confidence interval, for μ1−μ2μ1-μ2 given the following information. n1=45n1=45, ¯x1=2.67x¯1=2.67, s1=0.69s1=0.69 n2=20n2=20, ¯x2=2.8x¯2=2.8, s2=0.61s2=0.61 <μ1−μ2
a) Use the t-distribution to find a confidence interval for a difference in means μ1-μ2 given the relevant sample results. Give the best estimate for μ1-μ2, the margin of error, and the confidence interval. Assume the results come from random samples from populations that are approximately normally distributed. A 90% confidence interval for μ1-μ2 using the sample results x¯1=8.8, s1=2.7, n1=50 and x¯2=13.3, s2=6.0, n2=50 Enter the exact answer for the best estimate and round your answers for the margin...
Question 6 are Consider a sannple 2,Z2, . .. , arn from M2(μ Σ). The sample mean and sample covariance , and S11 $12 821 S22 CE respectively (a) Find a 95% confidence interval of μ1-μ2. (b) Assume s12 > 0, and someone ignores this positive correlation and takes the wrong sample covariance 811 0 0 822 ill this person derive a wider or narrower 95% confidence interval of μ-μ2 than the correct one? Explain. Question 6 are Consider a...
The confidence interval for the difference in population means, μ1 - μ2 is based on the same approach used in the case of one sample: Point Estimate ± Standard Error. Group of answer choices True False
Use a t-distribution to find a confidence interval for the difference in means μd=μ1-μ2 using the relevant sample results from paired data. Assume the results come from random samples from populations that are approximately normally distributed, and that differences are computed using d=x1-x2 . A 95% confidence interval for μd using the paired difference sample results x¯d=3.1, sd=2.4, nd=30. Give the best estimate for μd, the margin of error, and the confidence interval. Enter the exact answer for the best...
The manager of a large supermarket wants to use a 95 percent confidence interval to estimate the true proportion of the market's customers who buy cookies from the market. After collecting data from a random sample of customers, he calculates the confidence interval to be (0.236,0.282)(0.236,0.282). Which one of the following statements is true? Select one: A. The confidence interval provides convincing evidence that more than 25 percent of the market's customers buy cookies from the market. B. There is...
We are interested in estimating the difference between means in two groups of individuals, μ1−μ2. We initially guess that the standard deviation for group1 and group2 will be 15 and 5 respectively. Assume that we will be able to recruit twice as many individuals in group1 as in group2, i.e., n1=2n2. Given this, what is the total number of individuals (n1+n2) required to estimate μ1−μ2 to within 0.1 units with 95% confidence? A. 160,000 B. 14,000 C. 270,000 D. 190,000
one can calculate the 95% confidence interval for the mean with the population standard deviation knowing this gives us an upper and lower confidence limit what happens if we decide to calculate the 99% confidence interval describe how the increase in the confidence level has changed the width of the confidence interval the same for the confidence interval set at 80% including example with actual numeric value for the intervals and you're supposed to help with your explanations
The mean and the standard deviation of the sample of 100 bank customer waiting times are x¯x¯ = 5.14 and s = 2.321. Calculate a t-based 95 percent confidence interval for µ, the mean of all possible bank customer waiting times using the new system. Are we 95 percent confident that µ is less than 6 minutes?. Assume normality. (Choose the nearest degree of freedom for the given sample size. Round your answers to 3 decimal places.) The t-based 95 percent confidence interval is [, ]. (Click to select)YesNo , interval is (Click to select)lessmore than...