Question 1
Use the figure below to answer the following question(s).![](data:image/png;base64, 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)
Which of the following is a bridge of the graph?
◦ AD
◦ BF
◦ BC
◦ FF
◦ none of these
Question 2
Use the figure below to answer the following question(s).![](data:image/png;base64, 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)
Which of the following statements is true?
◦ The graph has two components.
◦ The graph is connected.
◦ The graph has 16 components.
◦ All of these are true.
◦ None of these are true.