3.If the null hypothesis is not rejected, what error are you at risk of having made?...

From the following MINITAB regression analysis, what can you conclude for the hypothesis test of Ho:...

From the following MINITAB regression analysis, what can you conclude for the hypothesis test of Ho: β1=0 versus Ha: β1≠ 0 using α=0.10? The regression equation is Test2 = 27.8 + 0.583 Test1    Predictor Coef SE Coef T P Constant 27.82 25.00 1.11 0.278 Test1 0.5825 0.3070 1.90 0.071    S = 22.9977 R-Sq = 14.1% R-Sq(adj) = 10.2% The null hypothesis would not be rejected and the conclusion would be that the x variable is of no use...

(1 point) Type I error is: A. Deciding the null hypothesis is true when it is...

(1 point) Type I error is: A. Deciding the null hypothesis is true when it is false B. Deciding the alternative hypothesis is true when it is false C. Deciding the null hypothesis is false when it is true D. Deciding the alternative hypothesis is true when it is true E. All of the above F. None of the above Type II error is: A. Deciding the null hypothesis is false when it is true B. Deciding the alternative hypothesis...

It has been speculated that there is a linear relationship between Oxygen and Hydrocarbon Levels. Specifically,...

It has been speculated that there is a linear relationship between Oxygen and Hydrocarbon Levels. Specifically, Oxygen purity is assumed to be dependent on Hydrocarbon levels. A linear regression is performed on the data in Minitab, and you get the following results: Regression Analysis: Purity-y versus Hydrocarbon level-X Predictor              Coef SE Coef      T      P Constant             74.283    1.593 46.62 0.000 Hydrocarbon level-X 14.947    1.317 11.35 0.000 S = 1.08653   R-Sq = 87.7%   R-Sq(adj) = 87.1% Analysis of Variance Source          DF      SS     ...

If you flip a fair coin, the probability that the result is heads will be 0.50....

If you flip a fair coin, the probability that the result is heads will be 0.50. A given coin is tested for fairness using a hypothesis test of H0:p=0.50H0:p=0.50 versus HA:p≠0.50HA:p≠0.50. The given coin is flipped 240 times, and comes up heads 143 times. Assume this can be treated as a Simple Random Sample. The test statistic for this sample is z= The P-value for this sample is If we change the significance level of a hypothesis test from 5%...

You are testing the null hypothesis that there is no linear relationship between two variables, X...

You are testing the null hypothesis that there is no linear relationship between two variables, X and Y. You are given the following regression results, where the sample size is 10., Coefficient Standart error Intercept -1.2 1 X 2 2 a) What is the value of the t test statistic? b) At the α = 0.05 level of significance, what are the critical values? c) Based on your answer to (a) and (b), what statistical decision should you make ?

The general manager of a chain of pharmaceutical stores reported the results of a regression analysis,...

The general manager of a chain of pharmaceutical stores reported the results of a regression analysis, designed to predict the annual sales for all the stores in the chain (Y) – measured in millions of dollars. One independent variable used to predict annual sales of stores is the size of the store (X) – measured in thousands of square feet. Data for 14 pharmaceutical stores were used to fit a linear model. The results of the simple linear regression are...

You flip a fair coin N=100 times. Approximate the probability that the proportion of heads among...

You flip a fair coin N=100 times. Approximate the probability that the proportion of heads among 100 coin tosses is at least 45%. Question 4. You conduct a two-sided hypothesis test (α=0.05): H0: µ=25. You collect data from a population of size N=100 and compute a test statistic z = - 1.5. The null hypothesis is actually false and µ=22. Determine which of the following statements are true. I) The two-sided p-value is 0.1336. II) You reject the null hypothesis...

You are testing the null hypothesis that there is no linear relationship between 2 variables, X...

You are testing the null hypothesis that there is no linear relationship between 2 variables, X and Y. From your sample of n= 18, you determine that b1=4.2 and Sb1=1.7. a. tstat=_____ b. At the a=0.05 level of significance what is the lower critical value? what is the upper critical value? c. Construct a 95% confidence interval estimate of the population slope, B1. The 95% confidence interval estimate of the population slope is ___<=B1<=___.

You estimate a simple linear regression model using a sample of 25 observations and obtain the...

You estimate a simple linear regression model using a sample of 25 observations and obtain the following results (estimated standard errors in parentheses below coefficient estimates): y = 97.25 + 19.74 *x (3.86) (3.42) You want to test the following hypothesis: H0: beta2 = 1, H1: beta2 >12. If you choose to reject the null hypothesis based on these results, what is the probability you have committed a Type I error? a.)between .01 and .02 b.)between .02 and .05 c.)less...

You are testing the null hypothesis that there is no linear relationship between two​ variables, X...

You are testing the null hypothesis that there is no linear relationship between two​ variables, X and Y. From your sample of n =18, you determine that b1=5.1 and Sb1 =1.1 a. What is the value of tSTAT​? b. At the α=0.05 level of​ significance, what are the critical​ values? c. Based on your answers to​ (a) and​ (b), what statistical decision should you​ make? d. Construct a​ 95% confidence interval estimate of the population​ slope, β1. I would greatly...