2. A fast-food chain claims that their “HUGE” size drink contains 36.3counces on average. A customer...

A fast-food chain claims that their “HUGE” size drink contains 36.3counces on average. A customer wants...

A fast-food chain claims that their “HUGE” size drink contains 36.3counces on average. A customer wants to test that the “HUGE” size drink contains less amount of drink. A random sample of 50 “HUGE” size cups is taken. The average weight of the drink from the sample is 35.8 ounces with a standard deviation of 0.78 ounces. Conduct the hypothesis test at 10% significance level.

A fast food chain claims that the average fat content in one of their burgers is...

A fast food chain claims that the average fat content in one of their burgers is 270 grams. A consumer group test 15 samples and finds that the content is 330 grams with a standard deviation of 45 grams. Test the manufacturer’s claim at (a) L/S 0.05 HW 11-1 (b) L/S 0.01 HW 11-2 A fast food chain claims that the average fat content in one of their burgers is less than 270 grams. A consumer group test 15 samples...

The manager of a frozen yogurt store claims that a medium-size serving contains an average of...

The manager of a frozen yogurt store claims that a medium-size serving contains an average of more than 4 ounces of yogurt. From a random sample of 14 servings, she obtains a mean of 4.31 ounces and a standard deviation of 0.52 ounce. Test, with α = .05, the manager’s claim. Assume that the distribution of weight per serving is normal.

A fast food outlet claims that the mean waiting time in line is less than 3.5...

A fast food outlet claims that the mean waiting time in line is less than 3.5 minutes. A random sample of 60 customers has a mean of 3.6 minutes with a population standard deviation of 0.6 minute. Using a significance level of 0.05, test the fast food outlet's claim

To encourage efficiency at a drive through window, a fast food restaurant chain specifies, as a...

To encourage efficiency at a drive through window, a fast food restaurant chain specifies, as a guideline, that at least half of all drive through orders should be taken, prepared, and delivered in 3 minutes or less. Subsequently, a random sample of 64 drive through orders was taken and it was found that 24 of them were taken, prepared and delivered in 3 minutes or less. The remaining orders from the sample took longer than 3 minutes. The fast food...

A fast-food chain claims one large order of its fries weighs 170 grams. Joe thinks he...

A fast-food chain claims one large order of its fries weighs 170 grams. Joe thinks he is getting less than what the restaurant advertises. He weighs the next 12 random orders of fries before he eats them and finds the sample mean is 165.9 grams and the standard deviation is 11.98 grams. What conclusion can be drawn at α = 0.10? There is not sufficient evidence to prove the fast-food chain advertisement is true. There is sufficient evidence to prove...

It is believed that the average customer spends 6 dollars for lunch at metro fast food...

It is believed that the average customer spends 6 dollars for lunch at metro fast food restaurants A sample of the amount that fifteen customers spent at area fast food restaurants can be found below: 9.45 6.3 6.5 8.1 7.83 6.52 6.5 8.9 10.5 8.3 10.6 11.8 9.1 8.2 6.3 Test the claim at the .05 level of significance. a. State the null and research hypotheses b. What is the critical value of t? c. Calculate the test statistic. d....

A machine in the lodge at a ski resort dispenses a hot chocolate drink. The average...

A machine in the lodge at a ski resort dispenses a hot chocolate drink. The average cup of hot chocolate is supposed to contain µ = 7.75 ounces. A random sample of 16 cups of hot chocolate from the machine had a mean content x = 7.62 ounces with standard deviation s = 0.3 ounces. Use 0.05 level of significance and test whether the mean amount of liquid is less than 7.75 ounces.

A fast-food chain claims one small order of its tater tots weighs 90 grams. Ava thinks...

A fast-food chain claims one small order of its tater tots weighs 90 grams. Ava thinks she is getting less than what the restaurant advertises. She weighs the next 14 random orders of tater tots before she eats them and finds the sample mean is 89.3 grams and the standard deviation is 3.71 grams. What conclusion can be drawn at α = 0.05? There is not sufficient evidence to prove the fast-food chain advertisement is true. There is sufficient evidence...

A vending machine is designed to discharge at least 275mL of drink per cup on average....

A vending machine is designed to discharge at least 275mL of drink per cup on average. A number of customers complain that this is not the case and they are getting less than this amount. In response to the complaints, a random sample of 30 cups is taken in order to conduct an appropriate hypothesis test for the population mean, using a 5% level of significance. (Note: Assume that the population standard deviation is 14mL.) Calculate the probability of Type...