Question 1
Refer to the information provided in Table 30.1 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
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)
Refer to Table 30.1. From 2014 to 2016 nominal wages
◦ rise.
◦ fall.
◦ stay the same.
◦ rise then fall.
Question 2
Refer to the information provided in Table 30.1 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 Table 30.1. From 2014 to 2016 the real wage
◦ rises.
◦ falls.
◦ stays the same.
◦ rises then falls.