Question

In: Statistics and Probability

To test H0 : σ=2.9 versus H1 : σ≠2.9, a random sample of size n=21 is...

To test H0 : σ=2.9 versus H1 : σ≠2.9, a random sample of size n=21 is obtained from a population that is known to be normally distributed.

(a) If the sample standard deviation is determined to be s=2.6, compute the test statistic.

χ^2_0=____

(Round to three decimal places as needed.)

(b) If the researcher decides to test this hypothesis at the α=0.05 level of significance, determine the critical values.The critical values are

χ^2_0.025=____ and χ^2_0.975=____.

(Round to three decimal places as needed.)

(d) Will the researcher reject the null hypothesis? Why? Choose the correct answer below.

A. Yes, because the test statistic is not in the critical region.

B. Yes, because the test statistic is in the critical region.

C. No, because the test statistic is not in the critical region.

D. No, because the test statistic is in the critical region.

Solutions

Expert Solution

Sample standard deviation=2.6

Population standard deviation=2.9

Sample size=21
Degree of freedom =n-1=   20
Chi square test statistic formula is

= 16.076

(b) and

bu using Excel command =CHIINV(1-(0.05/2),20) and =CHIINV((0.05/2),20)

(c)

(d) C. No, because the test statistic is not in the critical region.

orchestra answered 1 year ago

Next > < Previous

Related Solutions

To test H0 : σ=2.9 versus H1 : σ≠2.9, a random sample of size n=21 is...

To test H0 : σ=2.9 versus H1 : σ≠2.9, a random sample of size n=21 is obtained from a population that is known to be normally distributed. (a) If the sample standard deviation is determined to be s=2.6, compute the test statistic. χ^2_0=____ (Round to three decimal places as needed.) (b) If the researcher decides to test this hypothesis at the α=0.05 level of significance, determine the critical values.The critical values are χ^2_0.025=____ and χ^2_0.975=____. (Round to three decimal places...

o test H0:σ=1.2 versus H1: σ≠1.2, a random sample of size n=22 is obtained from a...

o test H0:σ=1.2 versus H1: σ≠1.2, a random sample of size n=22 is obtained from a population that is known to be normally distributed. (a) If the sample standard deviation is determined to be s=0.8, compute the test statistic. (b) If the researcher decides to test this hypothesis at the α=0.10 level of significance, determine the critical values. (c) Will the researcher reject the null hypothesis? Why? that's all the question stated

To test H0: mu=60 versus H1: mu<60, a random sample size n=25 is obtained from a...

To test H0: mu=60 versus H1: mu<60, a random sample size n=25 is obtained from a population that is known to be normally distributed. Complete parts a through d below. a) if x bar= 57.4 and s= 14.1, compute the test statistic. b)If the researcher decides to test this hypothesis at the confidence variable= .1 level of significance, determine the critical value(s). c)draw the t-distribution that depicts the critical region. d)will the researcher reject the null hypothesis?

To test H0: p = 0.65 versus H1: p> 0.65, a simple random sample of n...

To test H0: p = 0.65 versus H1: p> 0.65, a simple random sample of n = 100 individuals is obtained and x = 69 successes are observed. (a) What does it mean to make a Type II error for this test? (b) If the researcher decides to test this hypothesis at the alpha = 0.01 level of significance, compute the probability of making a Type II error if the true population proportion is 0.70. What is the power of...

Consider H0 : μ = 72 versus H1 : μ > 72 ∶ A random sample...

Consider H0 : μ = 72 versus H1 : μ > 72 ∶ A random sample of 16 observations taken from this population produced a sample mean of 75.2. The population is normally distributed with σ = 6. a. Calculate the p-value. b. Considering the p-value of part a, would you reject the null hypothesis if the test were made at a significance level of .01? c. Find the critical value and compare it with the test statistic. What would...

A test is made of H0: μ = 62 versus H1: μ > 62. A sample...

A test is made of H0: μ = 62 versus H1: μ > 62. A sample of size n = 79 is drawn, and 17) x = 68. The population standard deviation is σ = 23. Compute the value of the test statistic z and determine if H0 is rejected at the α = 0.01 level. A)0.26, H0 not rejected B) 0.26, H0 rejected C) 2.32, H0 not rejected D) 2.32, H0 rejected

1. To test H0: o=40 versus H1: o< 40, a random sample of sizen=29 is obtained...

1. To test H0: o=40 versus H1: o< 40, a random sample of sizen=29 is obtained from a population that is known to be normally distributed. a. If the sample standard deviation is determined to be s=36.2, compute the test statistic. b. If the researcher decides to test this hypothesis at the a= 0.10 level of significance, use technology to determine the P-value. c. Will the researcher reject the null hypothesis? 2.To test H0: o=4.9 versus H1: o ≠ 4.9, a...

Determine the uniformly most powerful test of H0:θ≤1 versus H1:θ >1 for a random sample of...

Determine the uniformly most powerful test of H0:θ≤1 versus H1:θ >1 for a random sample of 25 from N(0,θ), at the significance level α=.05.

Consider the following hypothesis test. H0:  = 20 H1:  ≠ 20 The sample size...

Consider the following hypothesis test. H0:  = 20 H1:  ≠ 20 The sample size is 200 and the standard deviation of the population is 10. Use a  = 0.05. What is the probability of making the Type II error if the real value of the population is: a. μ = 18.0 b. μ = 22.5 c. μ = 21.0

A simple random sample of size n=49 is obtained from a population with µ=83 and σ=21....

A simple random sample of size n=49 is obtained from a population with µ=83 and σ=21. Describe the sampling distribution of x̄, is this distribution approximately normal. (enter Yes or No) What is P(x̄>88.1)=

Subjects

Question

To test H0 : σ=2.9 versus H1 : σ≠2.9​, a random sample of size n=21 is...

Solutions

Expert Solution

Related Solutions

To test H0 : σ=2.9 versus H1 : σ≠2.9, a random sample of size n=21 is...