Questions: In a 2017 survey of pharmacists, interviewees viewed direct-to-consumer advertising X, and industry-funded drug information Y X= positively, Y= positively X= positively, Y= negatively X= negatively, Y= positively X= negatively, Y= negatively

Solution Steps

To solve this problem, we need to analyze the given data and determine the relationship between the variables \(X\) and \(Y\). We will count the occurrences of each combination of \(X\) and \(Y\) responses.

From the survey data, we have the following counts for the combinations of responses regarding direct-to-consumer advertising \(X\) and industry-funded drug information \(Y\):

• \(X = \text{positively}, Y = \text{positively}\): \(1\)
• \(X = \text{positively}, Y = \text{negatively}\): \(1\)
• \(X = \text{negatively}, Y = \text{positively}\): \(1\)
• \(X = \text{negatively}, Y = \text{negatively}\): \(1\)

We can represent the counts as follows:

• \(N_{PP} = 1\) (where \(PP\) stands for positively-positively)
• \(N_{PN} = 1\) (where \(PN\) stands for positively-negatively)
• \(N_{NP} = 1\) (where \(NP\) stands for negatively-positively)
• \(N_{NN} = 1\) (where \(NN\) stands for negatively-negatively)

The survey results indicate that each combination of responses occurred exactly once. This suggests a balanced view among the pharmacists surveyed regarding both \(X\) and \(Y\).

Final Answer