In a clinical trial of a drug intended to help people stop smoking, 134 subjects were treated with the drug for 11 weeks, and 18 subjects experienced abdominal pain. If someone claims that more than 8% of the drug's users experience abdominalpain, that claim is supported with a hypothesis test conducted with a 0.05 significance level. Using 0.16 as an alternative value of p, the power of the test is 0.96. Interpret this value of the power of the test. The power of 0.96 shows that there is a ? % chance of rejecting the null or alternative hypothesis of p=?? when the true proportion is actually ? That is, if the proportion of users who experience abdominal pain is actually ? then there is a ? %chance of supporting the claim that the proportion of users who experience abdominal pain is less or greater than 0.08.
In a clinical trial of a drug intended to help people stop smoking, 134 subjects were treated with the drug for 11 weeks, and 18 subjects experienced abdominal pain. If someone claims that more than 8% of the drug's users experience abdominalpain, that claim is supported with a hypothesis test conducted with a 0.05 significance level. Using 0.16 as an alternative value of p, the power of the test is 0.96. Interpret this value of the power of the test.
The power of 0.96 shows that there is a ? % chance of rejecting the null or alternative hypothesis of p=?? when the true proportion is actually ? That is, if the proportion of users who experience abdominal pain is actually ? then there is a ? %chance of supporting the claim that the proportion of users who experience abdominal pain is less or greater than 0.08.
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