A gambler strongly believes that the die at the table he was playing all night is...

You wish to test the claim that a die is fair. You roll it 60 times...

You wish to test the claim that a die is fair. You roll it 60 times with the following results. Number 1 2 3 4 5 6 Frequency 13 17 15 6 4 5 Find the value of the chi-square test statistic.

Andre recenty found a die (the traditional, six-sided variety) at the park. He took it home...

Andre recenty found a die (the traditional, six-sided variety) at the park. He took it home and rolled it 100 times and recorded the results (found in the table below). Is this a 'fair die' or has it been tampered with? Test at the α=0.01 level of significance. Which would be correct hypotheses for this test?     H0: The die is a fair die; H1: The die has been tampered with H0: The die has been tampered with; H1: The...

A student rolled a supposedly fair die 60 times, resulting in the distribution of dots shown....

A student rolled a supposedly fair die 60 times, resulting in the distribution of dots shown. Research question: At α = .10, can you reject the hypothesis that the die is fair? Number of Dots 1 2 3 4 5 6 Total Frequency 9 16 11 12 6 6 60 Calculate the chi-square test statistic, degrees of freedom and the p-value. (Round your test statistic value to 2 decimal places and the p-value to 4 decimal places.)

A die is suspected of being biased. It is rolled 24 times with the following results:...

A die is suspected of being biased. It is rolled 24 times with the following results: Outcome 1 2 3 4 5 6 Total Outcome Probability 1/6 1/6 1/6 1/6 1/6 1/6 1 Expected Frequency A B C D E F 24 Observed Frequency 8 4 1 8 3 0 24 1) Conduct a significance test at a significant level of 5% to see if the die is biased. A die is not biased if the probability of each of...

A gambler complained about the dice. They seemed to be loaded! The dice were taken off...

A gambler complained about the dice. They seemed to be loaded! The dice were taken off the table and tested one at a time. One die was rolled 300 times and the following frequencies were recorded. Outcome   1   2   3   4   5   6 Observed frequency O   60   44   59   34   46   57 Do these data indicate that the die is unbalanced? Use a 1% level of significance. Hint: If the die is balanced, all outcomes should have the same expected...

The table below lists the number of games played in a yearly​ best-of-seven baseball championship​ series,...

The table below lists the number of games played in a yearly​ best-of-seven baseball championship​ series, along with the expected proportions for the number of games played with teams of equal abilities. Use a 0.05 significance level to test the claim that the actual numbers of games fit the distribution indicated by the expected proportions. Games Played 4 5 6 7 Actual contests 19 19 21 38 Expected proportion two sixteenths four sixteenths five sixteenths five sixteenths Determine the null...

You suspect that an unscrupulous employee at a casino has tampered with a die; that is,...

You suspect that an unscrupulous employee at a casino has tampered with a die; that is, he is using a loaded die. In order to test this claim, you roll the die 282 times and obtain the following frequencies: (You may find it useful to reference the appropriate table: chi-square table or F table)        Category   1   2   3   4   5   6 Frequency   64   57   46   38   38   39 Click here for the Excel Data File a. Choose the...

The table below lists the number of games played in a yearly​ best-of-seven baseball championship​ series,...

The table below lists the number of games played in a yearly​ best-of-seven baseball championship​ series, along with the expected proportions for the number of games played with teams of equal abilities. Use a 0.05 significance level to test the claim that the actual numbers of games fit the distribution indicated by the expected proportions. Games Played 4 5 6 7 Actual contests 17 19 23 36 Expected proportion 2/16 4/16 5/16 5/16 1). Determine the null and alternative hypotheses....

The table below lists the number of games played in a yearly best-of-seven baseball championship series,...

The table below lists the number of games played in a yearly best-of-seven baseball championship series, along with the expected proportions for the number of games played with teams of equal abilities. Use a 0.05 significance level to test the claim that the actual numbers of games fit the distribution indicated by the expected proportions. Games Played 4 5 6 7 Actual contests 17 18 24 38 Expected proportion 2/16 4/16 5/16 5/16 Determine the null and alternative hypotheses. Upper...

Matt thinks that he has a special relationship with the number 6. In particular, Matt thinks...

Matt thinks that he has a special relationship with the number 6. In particular, Matt thinks that he would roll a 6 with a fair 6-sided die more often than you'd expect by chance alone. Suppose ?p is the true proportion of the time Matt will roll a 6. (a) State the null and alternative hypotheses for testing Matt's claim. (Type the symbol "p" for the population proportion, whichever symbols you need of "<", ">", "=", "not =" and express...