A health foods store owner is thinking about carrying some new products and is interested in her customer's opinions. The shop owner decides to randomly sample 202 customers and ask them whether they have (a) heard about the health benefits of coconut milk and (b) whether they have heard of the health benefits of Quinoa flour. She also asked each respondent how often they typically make purchases during a month. The table below shows the results from the study. Assume all conditions for testing have been met.
![](data:image/png;base64, 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)
Test the hypothesis that how the respondents answered the questions is associated with number of monthly purchases, using a significance level of 0.05. Choose the correct decision regarding the null hypothesis and conclusion. Refer to the computer output below.
![](data:image/png;base64, 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)
▸ Fail to reject the null hypothesis; how the respondents answered the questions and number of monthly purchases are associated.
▸ Reject the null hypothesis; how the respondents answered the questions and number of monthly purchases are not associated.
▸ Reject the null hypothesis; how the respondents answered the questions and number of monthly purchases are associated.
▸ Fail to reject the null hypothesis; how the respondents answered the questions and number of monthly purchases are not associated.