Question 1
Create a graphical display for the data given. You may choose any graphic type that you feel is appropriate. Write a few sentences explaining why you chose this type of display and a few sentences describing any interesting patterns in the data.
The table below shows the number of AIDS diagnoses for the United Kingdom by year.
![](data:image/png;base64, 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)
Question 2
Create a graphical display for the data given. You may choose any graphic type that you feel is appropriate. Write a few sentences explaining why you chose this type of display and a few sentences describing any interesting patterns in the data.
The table below shows statistics for AIDS. The first column shows the estimated number of people living with HIV/AIDS worldwide in various years. The second column shows the estimated number of new HIV infections worldwide in various years.