A toy company makes football player cards. It claims that 30% of the cards are mid-fielders,...

Acme Toy Company prints baseball cards. The company claims that 30% of the cards are rookies,...

Acme Toy Company prints baseball cards. The company claims that 30% of the cards are rookies, 60% are veterans, and 10% are All-Stars. Suppose a random sample has the following cards. Test Acme's claim that the distribution is a good fit with the prints of baseball cards at an α=0.05α=0.05 level of significance. Category Observed Frequency Expected Frequency Rookies 30 ? Veterans 100 ? All-Stars 20 ? Complete the table by calculating the expected frequencies. What is the chi-square test...

Acme Toy Company prints baseball cards. The company claims that 30% of the cards are rookies,...

Acme Toy Company prints baseball cards. The company claims that 30% of the cards are rookies, 60% are veterans, and 10% are All-Stars. Suppose a random sample has the following cards. Test Acme's claim that the distribution is a good fit with the prints of baseball cards at an α=0.05α=0.05 level of significance. Category Observed Frequency Expected Frequency Rookies 25 ?????? Veterans 110 ?????? All-Stars 15 ?????? 1) Complete the table by calculating the expected frequencies. 2) What is the...

The Toylot company makes an electric train with a motor that it claims will draw an...

The Toylot company makes an electric train with a motor that it claims will draw an average of only 0.8 ampere (A) under a normal load. A sample of nine motors was tested, and it was found that the mean current was x = 1.32 A, with a sample standard deviation of s = 0.44 A. Do the data indicate that the Toylot claim of 0.8 A is too low? (Use a 1% level of significance.) What are we testing...

The Toylot company makes an electric train with a motor that it claims will draw an...

The Toylot company makes an electric train with a motor that it claims will draw an average of no more than 0.8 amps under a normal load. A sample of nine motors were tested, and it was found that the mean current was x = 1.32 amps, with a sample standard deviation of s = 0.41 amps. Perform a statistical test of the Toylot claim. (Use a 1% level of significance.) A. What are we testing in this problem? Option...

The Toylot company makes an electric train with a motor that it claims will draw an...

The Toylot company makes an electric train with a motor that it claims will draw an average of no more than 0.8 amps under a normal load. A sample of nine motors were tested, and it was found that the mean current was x = 1.32 amps, with a sample standard deviation of s = 0.43 amps. Perform a statistical test of the Toylot claim. (Use a 1% level of significance.) a.) What are we testing in this problem? -single...

The Toylot company makes an electric train with a motor that it claims will draw an...

The Toylot company makes an electric train with a motor that it claims will draw an average of no more than 0.8 amps under a normal load. A sample of nine motors were tested, and it was found that the mean current was x = 1.30 amps, with a sample standard deviation of s = 0.43 amps. Perform a statistical test of the Toylot claim. (Use a 1% level of significance.) What are we testing in this problem? single proportionsingle...

The Toylot company makes an electric train with a motor that it claims will draw an...

The Toylot company makes an electric train with a motor that it claims will draw an average of only 0.8 ampere (A) under a normal load. A sample of nine motors was tested, and it was found that the mean current was x = 1.40 A, with a sample standard deviation of s = 0.46 A. Do the data indicate that the Toylot claim of 0.8 A is too low? (Use a 1% level of significance.) What are we testing...

A credit card company claims that the mean credit card debt for individuals is greater than...

A credit card company claims that the mean credit card debt for individuals is greater than $4,900. You want to test this claim. You find that a random sample of 38 cardholders has a mean credit card balance of $5,194 and a standard deviation of $550. At α=0.05​, can you support the​ claim? Write the claim mathematically and identify H0 and Ha. Find the critical​ value(s) and identify the rejection​ region(s). Find the standardized test statistic t. Decide whether to...

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....

5. A researcher claims that 75% percent of Americans think they are unlikely to contract the...

5. A researcher claims that 75% percent of Americans think they are unlikely to contract the Zika virus. In a random sample of 230 Americans, 215 think they are unlikely to contract the Zika virus. At α = 0.05, is there enough evidence to reject the researcher’s claim? (a) identify the claim and state H0 and H1 (b) find the critical value (c) find the test statistic (d) decide whether to reject or fail to reject the null hypothesis (e)...