Question 1
Which of the following arguments is
not offered to explain the existence of "sticky" wages?
◦ the social contract explanation
◦ the relative-wage explanation
◦ the fact that labor contracts don't exist
◦ the explicit contract explanation
Question 2
Refer to the information provided in Figure 28.4 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 28.4. Suppose there is a decrease in the fertility rate and this causes some men and women to place a lower value on their time spent in nonmarket activities. This will cause
◦ the labor supply curve to shift to the left of
S.
◦ the labor supply curve to shift to the right of
S.
◦ the labor demand curve to shift from
D to
D'.
◦ the labor demand curve to shift from
D' to
D.