Determine if the conditions required for the normal approximation to the binomial are met. If so,...

Q1 The restaurant manager is testing the bartender's ability to pour 45 mL of spirits correctly...

Q1 The restaurant manager is testing the bartender's ability to pour 45 mL of spirits correctly into a mixed drink. The manager has the bartender pour water into 12 shot glasses to test their ability to pour the correct amount of spirits: 48 45 44 43 46 47 42 46 47 45 47 49 Note: The data appears to be approximately normally distributed. Test the bartender's ability to pour 45 mL at the 5% level of significance. T-Distribution Table a....

In a sample of 80 borrowers who borrowed less than $1,000 from an online instant lender,...

In a sample of 80 borrowers who borrowed less than $1,000 from an online instant lender, 22 repaid late while in a sample of 120 who borrowed over $1,000, 43 repaid late. Is there enough evidence to conclude that those who borrow less than $1,000 are less like likely to repay late? Test at  α =0.025. α =0.025. Standard Normal Distribution Table a. Calculate the test statistic. Let p1p1 be the proportion for borrowers who borrowed less than $1,000 and p2p2...

In a sample of 80 borrowers who borrowed less than $1,000 from an online instant lender,...

In a sample of 80 borrowers who borrowed less than $1,000 from an online instant lender, 20 repaid late while in a sample of 120 who borrowed over $1,000, 44 repaid late. Is there enough evidence to conclude that those who borrow less than $1,000 are less like likely to repay late? Test at  α =0.025. α =0.025. Standard Normal Distribution Table a. Calculate the test statistic. Let p1p1 be the proportion for borrowers who borrowed less than $1,000 and p2p2...

An office administrator for a physician is piloting a new "no-show" fee to attempt to deter...

An office administrator for a physician is piloting a new "no-show" fee to attempt to deter some of the numerous patients each month that do not show up for their scheduled appointments. However, the administrator wants the majority of patients to feel that the fee is both reasonable and fair. She administers a survey to 38 randomly selected patients about the new fee, out of which 27 respond saying they believe the new fee is both reasonable and fair. Test...

An office administrator for a physician is piloting a new "no-show" fee to attempt to deter...

An office administrator for a physician is piloting a new "no-show" fee to attempt to deter some of the numerous patients each month that do not show up for their scheduled appointments. However, the administrator wants the majority of patients to feel that the fee is both reasonable and fair. She administers a survey to 36 randomly selected patients about the new fee, out of which 25 respond saying they believe the new fee is both reasonable and fair. Test...

A random sample of 140 observations is selected from a binomial population with unknown probability of...

A random sample of 140 observations is selected from a binomial population with unknown probability of success p. The computed value of p^ is 0.71. (1) Test H0:p≤0.65 against Ha:p>0.65. Use α=0.01. test statistic z= critical z score The decision is A. There is sufficient evidence to reject the null hypothesis. B. There is not sufficient evidence to reject the null hypothesis. (2) Test H0:p≥0.5 against Ha:p<0.5. Use α=0.01. test statistic z= critical z score The decision is A. There...

Calculate the​ p-value for the following conditions and determine whether or not to reject the null...

Calculate the​ p-value for the following conditions and determine whether or not to reject the null hypothesis. ​a)​ one-tail test, zx =1.70, and α =0.10 ​b)​ one-tail test, z = negative −2.45​ and α = 0.02 ​c)​ two-tail test, zx = 2.4​0, and α= .10 ​d)​ two-tail test, zx = −1.24​, and α = 0.05

Conduct the stated hypothesis test for  μ 1− μ 2. μ 1− μ 2. Assume that the...

Conduct the stated hypothesis test for  μ 1− μ 2. μ 1− μ 2. Assume that the samples are independent and randomly selected from normal populations with equal population variances ( σ 12= σ 22)( σ 12= σ 22). H0 :  μ 1− μ 2=0H0 :  μ 1− μ 2=0 H1 :  μ 1− μ 2 < 0H1 :  μ 1− μ 2 < 0 α =0.025 α =0.025 n1=27n1=27 x̄ 1=8.76 x̄ 1=8.76 s1=1.26s1=1.26 n2=25n2=25 x̄ 2=9.44 x̄ 2=9.44 s2=1.29 a. Calculate the test...

The one-sample z-test for proportions determines the p-value using the “normal approximation method”. This method approximates...

The one-sample z-test for proportions determines the p-value using the “normal approximation method”. This method approximates the exact p-value that would have been found if the binomial formula were used. But, the “normal approximation method” only works well when the sample size is “large enough”. a. If the hypothesis test is done by hand, why do you think we use the “normal approximation method” for large sample sizes instead of using the binomial formula to find p-values? b Why do...

A used car dealer says that the mean price of a three-year-old sport utility vehicles (in...

A used car dealer says that the mean price of a three-year-old sport utility vehicles (in good condition) is $20,000. You suspect that the claim is incorrect and find that a random sample of 22 similar vehicles has a mean price of $20,640 and a standard deviation of $1990. Is there enough evidence to reject the claim at α=0.05? (a) Write the claim mathematically. Identify H and H . (b) Determine whether the hypothesis test is one-tailed or two-tailed and...