Refer to the information provided in Figure 5.4 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Figure 5.4. Along the given demand curve, which of the following is
true?
◦ Demand is less elastic along the segment
AB than the segment
EF.
◦ Demand is less elastic along the segment
EF than the segment
AB.
◦ Since the demand curve is linear, the price elasticity of demand between each of the points is the same.
◦ All of these are true.