Question 1
Answer the following question(s) about the diagram shown below.
![](data:image/png;base64, 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)
In this diagram of a cell membrane, the object labeled (C) is a ________.
◦ glycerophospholipid
◦ mitochondrion
◦ protein
◦ steroid
◦ carbohydrate side chain
Question 2
Answer the following question(s) about the diagram shown below.
![](data:image/png;base64, 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)
In this diagram of a cell membrane, the object labeled (B) is a ________.
◦ phospholipid bilayer
◦ membrane protein
◦ steroid
◦ carbohydrate side chain
◦ hydrophobic region