# Question: H0 100 H1 100

H0: µ = 100

H1: µ ≠ 100

σ = 10, n = 100, x̄ = 100, α = .05

Calculate the value of the test statistic, set up the rejection region, determine the p-value, interpret the result, and draw the sampling distribution.

H1: µ ≠ 100

σ = 10, n = 100, x̄ = 100, α = .05

Calculate the value of the test statistic, set up the rejection region, determine the p-value, interpret the result, and draw the sampling distribution.

## Answer to relevant Questions

H0: µ = 70H1: µ > 70σ = 20, n = 100, x̄ = 80, α = .01Calculate the value of the test statistic, set up the rejection region, determine the p-value, interpret the result, and draw the sampling distribution.Find the probability of a Type II error for the following test of hypothesis, given that µ = 1,050.H0: µ = 1,000H1: µ > 1,000α = .01, σ = 50, n = 25a. Determine β for the following test of hypothesis, given that µ = 310:H0: µ = 300H1: µ > 300The statistics practitioner knows that the population standard deviation is 50, the significance level is 5%, and the sample ...a. A statistics practitioner formulated the following hypotheses.H0: µ = 200H1: µ < 200And learned that x̄ = 190, n = 9, and σ = 50Compute the p-value of the test.b. Repeat part (a) with σ = 30.c. Repeat part (a) with ...For the SSA example, create a table that shows the effect on the test statistic and the p-value of decreasing the value of the sample mean. Use x̄ = 22.0, 21.8, 21.6, 21.4, 21.2, 21.0, 20.8, 20.6, and 20.4.Post your question