It is desired to test : μ = 40 against : μ < 40 using α = .10. The population in question is

uniformly distributed with a standard deviation of 10. A random sample of 36 will be drawn from this population. If μ is really equal to 35, what is the probability that the hypothesis test would lead the investigator to commit a Type II error?

A) .0427 B) .9573 C) .0854 D) .4573

It is desired to test Ho: )1 = 40 against Ha: p < 40 using a = .10. The population in question is uniformly distributed with a standard deviation of 10. A random sample of 36 will be drawnfrom this population. If p is really equal to 35, what is the probability that the hypothesis test would lead the investigator to commit a Type II error?A) .0427 B) .9573 C) .0854 D) .4573 It is desired to test “0: ,u = 12 against Ha: ,u at 12 using a = 0.05. The population in question is uniformly distributed with a standard deviation of2.0. A random sample of 100 will be drawnfrom this population. lf,u is really equal to 11.9, what is the value of 6 associated with this test? A) .0395 B) .4210 C) .0791 D) .9209