SOLUTION: In a test of hypotheses H0: µ = 212 versus H1: µ > 212, the rejection region is the interval [1.895, ∞), the value of the sample mean computed from a sample of size 10 is 225

Algebra.Com
Question 929509: In a test of hypotheses H0: µ = 212 versus H1: µ > 212, the rejection region is the interval [1.895, ∞), the value of the sample mean computed from a sample of size 10 is 225, and the value of the test statistic is t = 2.44. The correct decision and justification are:





A Do not reject because 2.44 is greater than 1.895

B Reject because 225 is larger than 212

C Reject because 2.44 falls in the rejection region

D Do not reject because 2.44 falls in the acceptance region

E Do not reject because the sample size of 10 is too small
Answer by ewatrrr(24785)   (Show Source): You can put this solution on YOUR website!
2.44 > 1.895
C. Reject because 2.44 falls in the rejection region [1.895, ∞)
RELATED QUESTIONS

In a test of hypotheses of the form H0: µ = 0 versus H1: µ > 0 using α = .01, when... (answered by ewatrrr)
In a test of hypotheses H0: µ = 342 versus H1: µ > 342, the rejection region is the... (answered by ewatrrr)
In a test of hypotheses of the form H0: µ = 100 versus H1: µ < 100 a sample size of 250... (answered by stanbon)
In a test of hypotheses of the form H0: µ = 100 versus H1: µ < 100 a sample size of 250... (answered by robertb)
Since an instant replay system for tennis was introduced at a major tournament, men... (answered by Boreal)
Determine whether the outcome is a Type I error, a Type II error, or a correct decision. (answered by Boreal)
Consider the hypothesis test given by H0:p 0.5 H1:p 0.5 In a random sample of 225... (answered by stanbon)
In a test of hypotheses of the form H0: µ = 100 versus H1: µ < 100 a sample size of 250... (answered by robertb)
8. In order to test H0: μ = 40 versus H1: μ > 40, a random sample of size n =... (answered by stanbon)