Setting a small significance level (i.e., alpha = 0.05) protects against committing a Type II error.
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Setting a small significance level (i.e., alpha = 0.05) protects against committing a Type II error....
Setting the alpha level at 0.001 instead of the usual 0.05 increases the likelihood of type II error type I error rejecting the null hypothesis having a small n
(3 points) When one changes the significance level of a hypothesis test from 0.10 to 0.05, which of the following will happen? Check all that apply. A. The chance of committing a Type I error changes from 0.10 to 0.05. B. The test becomes more stringent to reject the null hypothesis (i.e., it becomes harder to reject the null hypothesis). C. The chance that the null hypothesis is true changes from 0.10 to 0.05. D. It becomes easier to prove...
If alpha is set to .05, what will the level of Type II error be? 0.05 0.95 0 Cannot say Heteroscedasticity occurs when: there are larger values on X than Y. there is a linear relationship between X and Y. more error is accounted for than remains. variability in Y depends on the exact value of X. The variables that are measured throughout the experiment are called: Control Dependent variable Independent variable Responding variable
a. Explain a Type II error and power in context of choosing a smaller level of significance. b. Explain a Type II error and power in context of a greater difference between the null hypothesis claim and the true value of the population parameter.
You are __________ to commit a Type I error using the 0.05 level of significance than using the 0.01 level of significance. a. twice as likely b. less likely c. equally likely d. more likely
Suppose the null hypothesis is Ho : µ = 500 against Ha : > µ = 500 , and the significance level for this testing is 0.05. The population in question is normally distributed with standard deviation 100. A random sample of size n=25 will be used. If the true alternative mean is 550, then the probability of committing the type II error is ____.
A random sample of size 295 has x=104. The significance level ? is set at 0.05. The P-value for testing H0: ?=100 against Ha: ??100 is 0.057. Identify all the incorrect statements below regarding this P-value of 0.057. (Select all that apply.) The probability of Type I error equals 0.057. If H0 is true, the probability obtaining a sample mean that would show at least as much evidence against H0 as the observed sample mean is 0.057. The probability that...
5. We conduct a test of hypothesis using a significance level of 0.05. This implies (a) the test has a 5% chance of H, being true. (b) the test has a 95% chance of a type II error. (c) the test has a 5% chance of being true. (d) none of the above.
1. Regarding a two-tailed z-test with an alpha of 0.05, we would need a Zobt with an absolute value less than 1.96 in order to reject the null hypothesis. True or False? 2. What happens to the probability of committing a Type I error if the level of significance is changed from α = 0.05 to α = 0.01? A. It increases B. It decreases C. It stays the same D. Cannot determine 3. Given a Zobt of -1.99 ,...
Suppose a hypothesis test is conducted using a significance or alpha level of 0.05, and the null hypothesis is rejected. This means that? A we would also reject the null hypothesis if the significance level had been 0.10 instead of 0.05. B the p-value was greater than 0.05. C we would also reject the null hypothesis if the significance level had been 0.01 instead of 0.05. D All answer options are correct.