H0: µ ≥ 20 versus H1: µ < 20, α = 0.05, sample mean = 19,...

H0: µ ≥ 205 versus H1:µ < 205, x= 198, σ= 15, n= 20, α= 0.05...

H0: µ ≥ 205 versus H1:µ < 205, x= 198, σ= 15, n= 20, α= 0.05 test statistic___________        p-value___________      Decision (circle one)        Reject the H0       Fail to reject the H0 H0: µ = 26 versus H1: µ<> 26,x= 22, s= 10, n= 30, α= 0.01 test statistic___________        p-value___________      Decision (circle one)        Reject the H0       Fail to reject the H0 H0: µ ≥ 155 versus H1:µ < 155, x= 145, σ= 19, n= 25, α= 0.01 test statistic___________        p-value___________      Decision (circle one)        Reject the H0       Fail to reject the H0

Suppose that we wish to test H0: µ = 20 versus H1: µ ≠ 20, where...

Suppose that we wish to test H0: µ = 20 versus H1: µ ≠ 20, where σ is known to equal 7. Also, suppose that a sample of n = 49 measurements randomly selected from the population has a mean of 18. Calculate the value of the test statistic Z. By comparing Z with a critical value, test H0 versus H1 at α = 0.05. Calculate the p-value for testing H0 versus H1. Use the p-value to test H0 versus...

1. In order to test H0: µ=40 versus H1: µ > 40, a random sample of...

1. In order to test H0: µ=40 versus H1: µ > 40, a random sample of size n=25 is obtained from a population that is known to be normally distributed with sigma=6. . The researcher decides to test this hypothesis at the α =0.1 level of significance, determine the critical value. b. The sample mean is determined to be x-bar=42.3, compute the test statistic z=??? c. Draw a normal curve that depicts the critical region and declare if the null...

A test of H0: µ = 7 versus H1: µ ≠ 7 does not reject the...

A test of H0: µ = 7 versus H1: µ ≠ 7 does not reject the null hypothesis at the 5% level. If calculated using the same sample data, which of the following is a possible 95% confidence interval for the population mean? a. 9.2 ± 3.4 b. 8.4 ± 1.1 c. There is not enough information to determine anything about a 95% confidence interval. d. 6.2 ± 0.5

To test H0: σ=70 versus H1: σ<70​, a random sample of size n equals 25 is...

To test H0: σ=70 versus H1: σ<70​, a random sample of size n equals 25 is obtained from a population that is known to be normally distributed. ​(a) If the sample standard deviation is determined to be s equals = 46.5​, compute the test statistic. ​(b) If the researcher decides to test this hypothesis at α=0.05 level of​ significance, use technology to determine the​ P-value. ​(c) Will the researcher reject the null​ hypothesis? What is the P-Value?

. Consider the following hypothesis test: H0 : µ ≥ 20 H1 : µ < 20...

. Consider the following hypothesis test: H0 : µ ≥ 20 H1 : µ < 20 A sample of 40 observations has a sample mean of 19.4. The population standard deviation is known to equal 2. (a) Test this hypothesis using the critical value approach, with significance level α = 0.01. (b) Suppose we repeat the test with a new significance level α ∗ > 0.01. For each of the following quantities, comment on whether it will change, and if...

Consider the following hypothesis test: H0:u equal to 25 H1: u> 25 α=0.05, σ= 2.4,n=30 what...

Consider the following hypothesis test: H0:u equal to 25 H1: u> 25 α=0.05, σ= 2.4,n=30 what would be the cutoff value for y mean for the rejection of h0? If the true value is u=25.75, then what is the power of the test?

7. Suppose you are testing H0 : µ = 10 vs H1 : µ 6= 10....

7. Suppose you are testing H0 : µ = 10 vs H1 : µ 6= 10. The sample is small (n = 5) and the data come from a normal population. The variance, σ 2 , is unknown. (a) Find the critical value(s) corresponding to α = 0.10. (b) You find that t = −1.78. Based on your critical value, what decision do you make regarding the null hypothesis (i.e. do you Reject H0 or Do Not Reject H0)?

n=49, ? ̅ =8.5, µ=9.2, σ=2.6, α=.01, H0: μ = 9.2, H1: μ ≠ 9.2. Determine...

n=49, ? ̅ =8.5, µ=9.2, σ=2.6, α=.01, H0: μ = 9.2, H1: μ ≠ 9.2. Determine z-score __________ Determine p= ____________ Reject or fail to reject H0 __________

n=90, Y =18.8, S =15.3, α =0.05⇒tn−1,α/2 = t89,.025 =1.987 H0 : µ =21.7 versus HA...

n=90, Y =18.8, S =15.3, α =0.05⇒tn−1,α/2 = t89,.025 =1.987 H0 : µ =21.7 versus HA : µ6=21.7 Rejection Region:|t|> t89,.025 =1.987 t =Y−µ0 S/sqrt(n) =18.8−21.7 15.3/p90 = −2.9 1.6128 =−1.798⇒|t|=1.798 < t89,.025 =1.987 Cannot reject H0 at 5% level. There is not sufficient evidence to support the average number of Type 2 fibers is different from 21.7. what is the p-value?