Question 1
Refer to the information provided in Table 30.2 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 30.2. From 2016 to 2017 the real wage
◦ rises.
◦ falls.
◦ stays the same.
◦ rises then falls.
Question 2
Refer to the information provided in Table 30.2 below to answer the question(s) that follow.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAHwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACiiigAooooAKwPGtv4outFEXhC/wBI0zVmmTN3rdlLeQRxZ+c+THNCztjgfvFHOTnGDv1HcLK0EggdI5ipCPIhdVbHBKgjIz2yPqKT2Gj50/Zr+K/xN+J+max4l8W654Lt/Dmja5qujXttYaHdWcxS0kkjFwLiS+lRQWRWKNHwpPz8ZNX4mfti6TpX/CN3fhLU7dbOLxXpmh+JbTxHoN/Z3VvbXgZo5Ylm8llJVGKtskV+3TnX+Gv7NPifwL8HPiF4Hn+IqfbfE91qOoWmv6DpMum3Ol3N4zvI65u5SwR3BTDIQFwWJO4eTQ/8E69YsNbuNW0zx94X0e6mv9G1Rrax8DeXaG604yGNzF9uy/m+YzSlmLM5LBgMKKSvyJvbkv8Aeub9fXZaChZRm5bvmt+Kj+j+Wup6r4y/ajt7+38Eal8PdQsdQsL3xzZ+ENestZ0m7t721aZsOvlytDJbyqOf3kbAhhx6+ix/HvwNN45h8Ix6xK+rzXcmnxSrp9ybF7uNWaS2F75f2czqEbMXmbwVIK5GK818Tfsoajq8em32n+LtPsfEz+L7TxprepXOhyTw395bRpHFFFCt0nkQhUChS8jYHLlssW+AP2PbH4efGHV/GFq3g7VrLUNauNbRtY8GxTa5YyTAlo7fVFnUqgckrvidgpK571ML3tLv/wC2w28r833eY57e5vb/ANun+nKWf2qPjj4l+BUGmavp/iLwNZWlzc2trbeHvEKSLqGsO9wkc4t5vtMaQ7EkQ7jHKBks5Udee+Iv7UPi/QPE3ivUdEsdEfwZ4O8U6X4X1ayvreZtQvDciAy3MM6yqkQj+1RgRtFIX8tzuXcAPSvjJ8G/EfxjtNa8M33i3T7X4da7aJaajpB0PzdQVefMNveeeEjLfLy8EpUglSCRt4vXv2Pzf+J9fXTPFUWl+BPEGp6ZrOpeHX0tp7g3Vkkap5N0ZwI45PIt/MVonY7G2um7IlOS6db/AIx09LKXX7S0VtZndxaju1+jtbzvb7t3c6H9pD4i/EL4WeH7/wAU+Gm8NvpGmpaquj6tZTS3etXMs/l/ZreaO4QQOQ0aoWil3O/QBefabWSWW1heaLyJmQM8W4NsYjlcjrg8Zr5c8a/sw/HLxbrPhnVYv2j4LG+0O2eOKWTwBY3Ie4dm3XQSSYpHLsIjDIoKpuAP7x930zoFnfafoWnWup6h/a2pQW0cV1qHkrD9plVQHl8teE3MC20cDOBWqtyNdbv7v8uuvdK24N6rTp/S/wCG87t6F+iiipGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//Z)
![](data:image/png;base64, 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)
Refer to Table 30.2. From 2015 to 2016 the real wage
◦ rises.
◦ falls.
◦ stays the same.
◦ rises then falls.