Question 1
Use the periodic table below to answer the following questions.
![](data:image/png;base64, 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)
Which is the correct formula of the binary fluoride of element B?
◦ BF
5◦ BF
6◦ BF
2◦ BF
3Question 2
Use the periodic table below to answer the following questions.
![](data:image/png;base64, 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)
In which pair are both formulas of binary fluorides of element C correct?
◦ CF
2 and CF
6◦ CF
2 and CF
3◦ CF
5 and CF
6◦ CF
3 and CF
5