Suppose you ran 50 separate simulations. Each of these simulations represent a week (7 days) of...

Suppose you ran 50 separate simulations. Each of these simulations represent a week (7 days) of...

Suppose you ran 50 separate simulations. Each of these simulations represent a week (7 days) of working with a molding machine. During each simulation, the average number of the machine's failures per day was recorded. You observed that the mean of all of your sample means follows a normal distribution with a standard deviation of 25 that is, ~N(M, 25). Later you decided to run a hypothesis testing on the population mean with the assumptions below and an alpha =...

Using information given in the table below and applying nearest neighbor algorithm, calculate the shortest path...

Using information given in the table below and applying nearest neighbor algorithm, calculate the shortest path that starts from Home, visiting all the locations - Post Office, Dry Cleaning, Bank and Grocery Store - in any order and goes back to Home. Distance between points Home Bank Post Office Dry Cleaning Grocery Store Home NA 8 18 32 24 Bank 8 NA 5 21 13 Post Office 18 5 NA 34 13 Dry Cleaning 32 21 34 NA 13 Grocery...

For a random sample of 50 measurements of the breaking strength of Brand A cotton threads,...

For a random sample of 50 measurements of the breaking strength of Brand A cotton threads, sample mean ¯x1 = 210 grams, sample standard deviation s1 = 8 grams. For Brand B, from a random sample of 50, sample mean ¯x2 = 200 grams and sample standard deviation s2 = 25 grams. Assume that population distributions are approximately normal with unequal variances. Answer the following questions 1 through 3. 1. What is the (estimated) standard error of difference between two...

(Hypothesis Testing Questions) You perform the Hypothesis test, and you find the following information. What would...

(Hypothesis Testing Questions) You perform the Hypothesis test, and you find the following information. What would be your conclusion and why? A coffee shop relocates to Italy and wants to make sure that all lattes are consistent. They believe that each latte has an average of 4 oz of espresso. If this is not the case, they must increase or decrease the amount. A random sample of 25 lattes shows a mean of 4.6 oz of espresso and a standard...

You are testing the null hypothesis that the average money that BC student has in his...

You are testing the null hypothesis that the average money that BC student has in his or her pocket is $20 against the alternative that it’s greater than that. You are testing at a 5 percent significance level. We know the population variance is 81 dollars squared. You take a random sample of 100 students. i. Calculate the power of this test if the true mean is $23. Represent it graphically. For parts, ii, iii, iv and v, please take...

1.) One tailed test or two tailed test? You are performing a hypothesis test for the...

1.) One tailed test or two tailed test? You are performing a hypothesis test for the mean sample weight of your fellow Intro to Statistics students. For your null hypothesis , the hypothesized mean weight for the entire campus student body is 165. You have no reason to know for your alternative hypothesis whether the actual mean weight for the entire student campus body is more or less than 165. So you decide to make your alternative hypothesis as not...

7. You wish to test the following at a significance level of α=0.05α=0.05.       H0:p=0.85H0:p=0.85       H1:p>0.85H1:p>0.85 You...

7. You wish to test the following at a significance level of α=0.05α=0.05.       H0:p=0.85H0:p=0.85       H1:p>0.85H1:p>0.85 You obtain a sample of size n=250n=250 in which there are 225 successful observations. For this test, we use the normal distribution as an approximation for the binomial distribution. For this sample... The test statistic (zz) for the data =  (Please show your answer to three decimal places.) The p-value for the sample =  (Please show your answer to four decimal places.) The p-value is... greater than...

T F 1. A p-value of .008 in hypothesis testing means there is only a .8%...

T F 1. A p-value of .008 in hypothesis testing means there is only a .8% chance we could get such sample statistics from the population if the null hypothesis is as stated. Such an event is considered unlikely and we would reject the null hypothesis. T F 2. As a general rule in hypothesis testing, it is always safer to set up your alternate hypothesis with a greater-than or less-than orientation. _____3. If the level of significance is .02...

Would Not Approve of Driving Drunk Would Not Care or Would Approve of Driving Drunk n1=40...

Would Not Approve of Driving Drunk Would Not Care or Would Approve of Driving Drunk n1=40 n2=25 X¯1=2.1 X¯2=8.2 s1=1.8 s2=1.9 John Worrall and colleagues (2014) found that the fear of losing the good opinion of one’s family and peers kept people from driving home drunk. Let’s say we have two independent random samples of people: those who think that their peers would disapprove of them from driving drunk, and those who think that their peers would either not care...

Imagine that you are Director of Admissions at a prestigious university like CSUB. You have a...

Imagine that you are Director of Admissions at a prestigious university like CSUB. You have a pile of 20,000 applications in front of you and your office in the Administration Building is overflowing. You need a quick way to compare a lot of data for students in order to decide who to admit to CSUB. You turn all of the scores into z-scores (high school GPA, ACT and/or SAT score). Based on their z-scores of high school GPA, rank the...