Math  /  Data & Statistics

Question```latex A climatologist claims that the precipitation in Seattle, Washington, was greater than in Birmingham, Alabama, in a recent year. The daily precipitation amounts (in inches) for 30 days in a recent year in Seattle and a recent year in Birmingham are given in the accompanying table. Assume the population standard deviation is 0.248 inch for Seattle and 0.519 inch for Birmingham. At α=0.05\alpha=0.05, can you support the climatologist's claim? Complete parts (a) through (e).
\begin{tabular}{|lllllllllllll|} \hline Seattle: & 0.003 & 0.002 & 0.054 & 0.010 & 0.211 & 0.001 & 0.003 & 0.518 & 0.003 & 0.014 \\ & 0.000 & 0.193 & 0.004 & 0.184 & 0.017 & 0.018 & 0.127 & 0.000 & 0.032 & 0.002 \\ & 0.037 & 0.003 & 0.412 & 0.227 & 0.003 & 0.804 & 0.150 & 0.002 & 0.003 & 0.790 \\ Birmingham: & 0.001 & 0.957 & 0.836 & 0.000 & 0.099 & 0.003 & 0.003 & 0.204 & 0.004 & 0.541 \\ & 0.967 & 0.001 & 0.351 & 0.020 & 0.043 & 0.697 & 0.003 & 0.004 & 0.000 & 0.000 \\ & 0.030 & 0.009 & 0.152 & 0.273 & 0.004 & 0.002 & 0.933 & 0.003 & 0.892 & 0.008 \\ \hline \end{tabular}
Click the icon to view the precipitation data.
A. The critical values are z0=±z_{0}= \pm \square
B. The critical value is z0=1.65z_{0}=1.65
What is the rejection region? Select the correct choice below and fill in the answer box(es) within your choice. (Round to two decimal places as needed.)
A. z<z< \square or z>z> \square
B. z<z< \square
C. z>z> \square
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Studdy Solution

STEP 1

1. We are conducting a hypothesis test to compare the mean daily precipitation between Seattle and Birmingham.
2. The population standard deviations are known: σSeattle=0.248 \sigma_{\text{Seattle}} = 0.248 and σBirmingham=0.519 \sigma_{\text{Birmingham}} = 0.519 .
3. The significance level is α=0.05 \alpha = 0.05 .
4. The sample size for both Seattle and Birmingham is 30 days.

STEP 2

1. State the null and alternative hypotheses.
2. Determine the critical value and rejection region.
3. Calculate the test statistic.
4. Make a decision to reject or not reject the null hypothesis.
5. Interpret the results.

STEP 3

State the null and alternative hypotheses:
- Null hypothesis (H0 H_0 ): The mean precipitation in Seattle is less than or equal to that in Birmingham. - Alternative hypothesis (Ha H_a ): The mean precipitation in Seattle is greater than that in Birmingham.
H0:μSeattleμBirmingham H_0: \mu_{\text{Seattle}} \leq \mu_{\text{Birmingham}} Ha:μSeattle>μBirmingham H_a: \mu_{\text{Seattle}} > \mu_{\text{Birmingham}}

STEP 4

Determine the critical value for a one-tailed test at α=0.05 \alpha = 0.05 .
- Since the test is one-tailed, we use the critical value z0=1.65 z_0 = 1.65 .
The rejection region is:
z>1.65 z > 1.65

STEP 5

Calculate the test statistic using the formula for the difference of means with known population standard deviations:
z=(xˉSeattlexˉBirmingham)σSeattle2n+σBirmingham2n z = \frac{(\bar{x}_{\text{Seattle}} - \bar{x}_{\text{Birmingham}})}{\sqrt{\frac{\sigma_{\text{Seattle}}^2}{n} + \frac{\sigma_{\text{Birmingham}}^2}{n}}}
Where: - xˉSeattle \bar{x}_{\text{Seattle}} is the sample mean for Seattle. - xˉBirmingham \bar{x}_{\text{Birmingham}} is the sample mean for Birmingham. - n=30 n = 30 .
Calculate the sample means and substitute the values to find z z .

STEP 6

Calculate the sample means:
xˉSeattle=Seattle data30 \bar{x}_{\text{Seattle}} = \frac{\sum \text{Seattle data}}{30} xˉBirmingham=Birmingham data30 \bar{x}_{\text{Birmingham}} = \frac{\sum \text{Birmingham data}}{30}
Substitute these means into the test statistic formula and calculate z z .

STEP 7

Compare the calculated z z value to the critical value 1.65 1.65 .
- If z>1.65 z > 1.65 , reject the null hypothesis. - Otherwise, do not reject the null hypothesis.

STEP 8

Interpret the results:
- If the null hypothesis is rejected, conclude that there is sufficient evidence to support the climatologist's claim that precipitation in Seattle was greater than in Birmingham. - If the null hypothesis is not rejected, conclude that there is not enough evidence to support the claim.

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