Assume the following values of s have been obtained for different Null Hypothesis Populations. Calculate the...

Test the indicated claim about the means of two populations. Assume that the two samples are...

Test the indicated claim about the means of two populations. Assume that the two samples are independent simple random samples selected from normally distributed populations. Do not assume the population standard deviations are equal. Suppose you are interested if a name brand candle is made from the same wax as the generic store brand candle. You decide that they smell the same, so the only question left is if they last as long as a generic brand candle (of the...

We have a left tail one sample test for the population mean. Assume the null hypothesis...

We have a left tail one sample test for the population mean. Assume the null hypothesis is true. Use 4% for the significance level. The sample size is 27, the sample mean is 32.8, the sample standard deviation is 4.1, and the null mean is 35. The test result is (a) a correct decision (b) a Type I error (c) a Type II error 3. The test statistic value for the previous problem is

Assume that both samples are independent simple random samples from populations having normal distributions. 4) A...

Assume that both samples are independent simple random samples from populations having normal distributions. 4) A researcher obtained independent random samples of men from two different towns. She recorded the weights of the men. The results are summarized below: Town A Town B n1= 41 n 2 = 21 x1 = 165.1 lb x2 = 159.5 lb s1 = 34.4 lb s2 = 28.6 lb Use a 0.05 significance level to test the claim that there is more variance in...

Please show all work with explanations. Assume that you have a box with an equal number...

Please show all work with explanations. Assume that you have a box with an equal number of $4, $6, $8 chips. a. Find the population mean and the standard deviation. b. Taking samples of size n = 2, find the mean of the sample means and the standard deviation of the sample means. c. Explain the relationships between the different means and the different standard deviations. d. Above what value is the top 15.87% of the sample means? e. Between...

1) The value of the z-score that is obtained for a hypothesis test is influenced by...

1) The value of the z-score that is obtained for a hypothesis test is influenced by several factors. Some factors influence the size of the numerator of the z-score and other factors influence the size of the standard error in the denominator. For each of the following, indicate whether the factor influences the numerator or denominator of the z-score and determine whether the effect would be to increase the value of z (farther from zero) or decrease the value of...

When σ (population standard deviation) is unknown [Critical Value Approach] The value of the test statistic...

When σ (population standard deviation) is unknown [Critical Value Approach] The value of the test statistic t for the sample mean is computed as follows:       t =   with degrees of freedom d.f. = n – 1 where n is the sample size, µ is the mean of the null hypothesis, H0, and s is the standard deviation of the sample.       t is in the rejection zone: Reject the null hypothesis, H0       t is not in the rejection...

(a) standard error        (b) F-ratio                   (c) assumption      (d) degrees of freedom (e) null...

(a) standard error        (b) F-ratio                   (c) assumption      (d) degrees of freedom (e) null hypothesis      (f) control group         (g) experiment      (h) alternative hypothesis       (i) power                     (j) normal distribution (k) randomness     (l) directional test (m) effect size             (n) single-blind           (o) double-blind   (p) sampling distribution (q) Type I error           (r) Type II error          (s) Cohen’s d      (t) central limit theorem 1) The probability to reject the null hypothesis (when it is indeed false) refers to (   type I...

A marine biologist claims that the mean length of mature female pink seaperch is different in...

A marine biologist claims that the mean length of mature female pink seaperch is different in fall and winter. A sample of 18 mature female pink seaperch collected in fall has a mean length of 110 millimeters and a standard deviation of 10 millimeters. A sample of 8 mature female pink seaperch collected in winter has a mean length of 96 millimeters and a standard deviation of 14 millimeters. At alpha=0.20 can you support the marine​ biologist's claim? Assume the...

1) A friend has performed a significance test of the null hypothesis that two means are...

1) A friend has performed a significance test of the null hypothesis that two means are equal. His report states that the null hypothesis is rejected in favor of the alternative that the first mean is larger than the second. In a presentation on his work, he notes that the first sample mean was larger than the second mean and this is why he chose this particular one-sided alternative. Suppose he reported t = 1.90 with a P-value of 0.04....

Identify the correct null hypothesis: Is the proportion of babies born male different from 50%?  In a...

Identify the correct null hypothesis: Is the proportion of babies born male different from 50%?  In a sample of 200 babies, 96 were male. Test the claim using a 1% significance level. H0: p = 0.50 H0: µ = 100 H0: p = 0.48 H0: µ = 96 Which of the following is not an option for an alternative hypothesis? Ha = k Ha > k Ha < k Ha ≠ k Find the number of successes x suggested by the...