Math  /  Data & Statistics

QuestionMatch each Test Situation with the correct Critical Value. For a two-sided test, find only the positive value. Test Situation Critical Value - \vee One sample, n=45,Ha:p<p0\mathrm{n}=45, H_{a}: p<p_{0}, and α=0.01\alpha=0.01 a. 2.434 -\vee One sample, n=61,Ha:p>p0\mathrm{n}=61, H_{a}: p>p_{0}, and α=0.05\alpha=0.05 b. 3.291 -\vee One sample, σ\sigma is known, n=175,Ha:μμ0\mathrm{n}=175, H_{a}: \mu \neq \mu_{0}, and α=0.05\alpha=0.05 c. 1.645 -\vee One sample, σ\sigma is unknown, n=57,Ha:μ<μ0\mathrm{n}=57, H_{a}: \mu<\mu_{0}, and α=0.05\alpha=0.05 d. 1.960 -\vee One sample, σ\sigma is unknown, n=37,Ha:μ>μ0\mathrm{n}=37, H_{a}: \mu>\mu_{0}, and α=0.01\alpha=0.01 e. -1.673 -\vee One sample, n=35,Ha:pp0\mathrm{n}=35, H_{a}: p \neq p_{0}, and α=0.001\alpha=0.001 f. 2.013 -\checkmark One sample, σ\sigma is unknown, n=47,Ha:μμ0\mathrm{n}=47, H_{a}: \mu \neq \mu_{0}, and α=0.05\alpha=0.05 g. -2.326
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a. n=37,Ha:μ>μ0,α=0.01\mathrm{n} = 37, H_{a}: \mu > \mu_{0}, \alpha = 0.01 - **2.434** b. n=35,Ha:pp0,α=0.001\mathrm{n} = 35, H_{a}: p \neq p_{0}, \alpha = 0.001 - **3.291** c. n=61,Ha:p>p0,α=0.05\mathrm{n} = 61, H_{a}: p > p_{0}, \alpha = 0.05 - **1.645** d. n=175,Ha:μμ0,α=0.05\mathrm{n} = 175, H_{a}: \mu \neq \mu_{0}, \alpha = 0.05 - **1.960** e. n=57,Ha:μ<μ0,α=0.05\mathrm{n} = 57, H_{a}: \mu < \mu_{0}, \alpha = 0.05 - **-1.673** f. n=47,Ha:μμ0,α=0.05\mathrm{n} = 47, H_{a}: \mu \neq \mu_{0}, \alpha = 0.05 - **2.013** g. n=45,Ha:p<p0,α=0.01\mathrm{n} = 45, H_{a}: p < p_{0}, \alpha = 0.01 - **-2.326**

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