A television news story claimed that half of all U.S. adults have health issues. In a...

A television news story claimed that half of all U.S. adults have health issues. In a...

A television news story claimed that half of all U.S. adults have health issues. In a national poll about health issues (CDC Project), 12,638 U.S. adults were surveyed and it was found that 6413 of those surveyed had health issues. At a 5% level of significance, perform a hypothesis test to test the claim made by the television news story. What is the correct conclusion?

The Pew Research Center reported in 2018 that 68% of U.S. adults rated "reducing health care...

The Pew Research Center reported in 2018 that 68% of U.S. adults rated "reducing health care costs" as a national priority. This year a survey is conducted with a national sample of 1,505 U.S. adults selected by a combination of landline and cell phone random digit dials. This year's survey finds that 70% of the sample says that "reducing health care costs" is a national priority. We test the following hypotheses: LaTeX: H_0 H 0 : The proportion of U.S....

A polling agency reports that over 16% of U.S. adults are without health care coverage. In...

A polling agency reports that over 16% of U.S. adults are without health care coverage. In a random survey of 1420 U.S. adults, 256 said they did not have health care coverage. At α = 2%, is there enough evidence to support the agency’s claim? State the null and alternative hypotheses and identify which represents the claim. Determine whether the hypothesis test is left-tailed, right-tailed, or two-tailed. Explain your reasoning and sketch the graph of the problem. Find the p-value...

Marketers believe that 83.46% of adults in the U.S. own a cell phone. A cell phone...

Marketers believe that 83.46% of adults in the U.S. own a cell phone. A cell phone manufacturer believes the proportion is different than 0.8346. 37 adults living in the U.S. are surveyed, of which, 23 report that they have a cell phone. Using a 0.01 level of significance test the claim. The correct hypotheses would be: H0:p≤0.8346H0:p≤0.8346 HA:p>0.8346HA:p>0.8346 (claim) H0:p≥0.8346H0:p≥0.8346 HA:p<0.8346HA:p<0.8346 (claim) H0:p=0.8346H0:p=0.8346 HA:p≠0.8346HA:p≠0.8346 (claim) Since the level of significance is 0.01 the critical value is 2.576 and -2.576 The...

Fox News reports that People are all excited because they have taken an exit poll of...

Fox News reports that People are all excited because they have taken an exit poll of 1200 voters and found that 50.5% of the voters say that they voted for Richard Nixon and they predict that he will be president. Test this claim using a 1 % significance level. (α=0.01) Define your hypothesis. Calculate the test statistic. By hand or by calculator. Calculate the proper critical value. Find the probability value (p value). Is this a right tailed test, left...

Fox News reports that People are all excited because they have taken an exit poll of...

Fox News reports that People are all excited because they have taken an exit poll of 1200 voters and found that 50.5% of the voters say that they voted for Richard Nixon and they predict that he will be president.   Test this claim using a 1 % significance level. (α=0.01) Define your hypothesis. Calculate the test statistic. By hand or by calculator. Calculate the proper critical value. Find the probability value (p value). Is this a right tailed test, left...

16) A national tabloid newspaper reported that 30% of adults in the general population believe that...

16) A national tabloid newspaper reported that 30% of adults in the general population believe that life exists elsewhere in the universe. A TV news station surveyed a random sample of adults from the general population and reported that 36 out of 100 sampled hold this belief. A right-tail hypothesis test is performed. What is the conclusion at a level of significance of 10%? 5%? 1%? (A) P -value = .0952, and so the 30% claim should be disputed at...

A poll of 2,061 randomly selected adults showed that 97% of them own cell phones. The...

A poll of 2,061 randomly selected adults showed that 97% of them own cell phones. The technology display below results from a test of the claim that 94% of adults own cell phones. Use the normal distribution as an approximation to the binomial distribution, and assume a 0.01 significance level to complete parts (a) through (e). Show your work. ***Correct answers are in BOLD (how do we get those answers) Test of p=0.94 vs p≠0.94 X= 1989, N= 2061, Sample...

A dietician read in a survey that 88.44% of adults in the U.S. do not eat...

A dietician read in a survey that 88.44% of adults in the U.S. do not eat breakfast at least 3 days a week. She believes that a larger proportion skip breakfast 3 days a week. To verify her claim, she selects a random sample of 65 adults and asks them how many days a week they skip breakfast. 38 of them report that they skip breakfast at least 3 days a week. Test her claim at αα = 0.10. The...

Adults randomly selected for a poll were asked if they​ "favor or oppose using federal tax...

Adults randomly selected for a poll were asked if they​ "favor or oppose using federal tax dollars to fund medical research using stem cells obtained from human​ embryos." Of the subjects​ surveyed, 263 were in​ favor, 256 were​ opposed, and 89 were unsure. A politician claims that people​ don't really understand the stem cell issue and their responses to such questions are random responses equivalent to a coin flip. Use a 0.05 significance level to test the claim that the...