A consumer agency claims that the average fuel mileage of Sedan A exceeds that of Sedan...

A consumer agency claims that the average fuel mileage of Sedan A exceeds that of Sedan...

A consumer agency claims that the average fuel mileage of Sedan A exceeds that of Sedan B. To test this claim, a random sample of 14 Sedan A vehicles were tested and the sample mean fuel mileage was found to be 25.30 miles per gallon with a known population standard deviation of 1.45 miles per gallon. A random sample of 17 Sedan B vehicles also were tested and the sample mean fuel mileage was found to be 24.10 miles per...

A car company claims that the mean gas mileage for its luxury sedan is at least...

A car company claims that the mean gas mileage for its luxury sedan is at least 24 miles per gallon. A random sample of 7 cars has a mean gas mileage of 23 miles per gallon and a standard deviation of 2.4 miles per gallon. At α=0.05, can you support the company’s claim assuming the population is normally distributed? Yes, since the test statistic is not in the rejection region defined by the critical value, the null is not rejected....

A car company says that the mean gas mileage for its luxury sedan is at least...

A car company says that the mean gas mileage for its luxury sedan is at least 21 miles per gallon​ (mpg). You believe the claim is incorrect and find that a random sample of 7 cars has a mean gas mileage of 19 mpg and a standard deviation of 3 mpg. At alpha equals 0.025​, test the​ company's claim. Assume the population is normally distributed. Which sampling distribution should be used and why? State the appropriate hypothesis to test. What...

A car company claims that its cars achieve an average gas mileage of at least 26...

A car company claims that its cars achieve an average gas mileage of at least 26 miles per gallon. A random sample of eight cars form this company have an average gas mileage of 25.2 miles per gallon and a standard deviation of 1 mile per gallon. At α=0.06, can the company’s claim be supported, assuming this is a normally distributed data set? a) No, since the test statistic of -2.26 is in the rejection region defined by the critical...

A car salesperson claims that the mean gas mileage for its luxury sedan is at least...

A car salesperson claims that the mean gas mileage for its luxury sedan is at least 25 miles per gallon​ (mpg). A random sample of 30 cars has a mean gas mileage of 24 mpg and a (sample) standard deviation of 3.5 mpg.             a)    State the null and alternative hypotheses.              b)    Determine the P-Value             c)     State the outcome of the test at α = 0.05  

An oil additive for automobiles claims that it increases fuel mileage by at least a mean...

An oil additive for automobiles claims that it increases fuel mileage by at least a mean of 2.3 mpgwith a standard deviation of .5 mpg. A group of AP Statistics students decide to test this claim. They randomly select 49 people to test the oil additive and found that drivers using the additive increased their fuel mileage by a mean of 2.1 mpg, with a standard deviation of .5. Is this sufficient evidence to reject the null hypothesis in favor...

5. A consumer watchdog group tests the gas mileage for a specific model of car using...

5. A consumer watchdog group tests the gas mileage for a specific model of car using a (random) sample of 14 cars.          This sample has a mean gas mileage of 27.6 mpg and a standard deviation of 3.2 mpg. (a) Find a 99% confidence interval for the mean gas mileage of all cars of this model.                                  [8 pts] (b) Complete each step below to perform a (traditional) hypothesis test to test the claim in bold made by...

A credit reporting agency claims that the mean credit card debt in a town is greater...

A credit reporting agency claims that the mean credit card debt in a town is greater than $3500. A random sample of the credit card debt of 20 residents in that town has a mean credit card debt of $3619 and a standard deviation of $391. At α=0.10, can the credit agency’s claim be supported? Yes, since p-value of 0.19 is greater than 0.10, fail to reject the null. Claim is null, so is supported No, since p-value of 0.09...

5. A manufacturer claims that the mean tensile strength of thread A exceeds the average tensile...

5. A manufacturer claims that the mean tensile strength of thread A exceeds the average tensile strength of thread B. To test his claim, 16 sample pieces of each type of thread are tested under similar conditions. Type A thread had a sample average tensile strength of 185 kilograms with a standard deviation of 6 kilograms, while type B thread had a sample average tensile strength of 178 kilograms with a standard of 9 kilograms. Assume that both populations are...

Problem An automobile maker claims that its newest Raptor V5s (a sports car) have a mean...

Problem An automobile maker claims that its newest Raptor V5s (a sports car) have a mean fuel efficiency of 48.5 miles per gallon on highways. A consumer advocate suspects, however, that the actual mean fuel efficiency of the Raptor V5s on highways is less than 48.5 miles per gallon. To test this hypothesis, the consumer advocate obtains a random sample of 35 Raptor V5s, measures their fuel efficiencies on highways, and calculates the sample mean fuel efficiency to be 46.2...