The following two images tell the whole story. The Google Trends chart for term "Unemployment Benefits" and the actual rate of unemployment have a similar nature. It should be noted that the search graph varies more than the actual unemployment rate but follows the same pattern.
Source: http://www.macrotrends.org/1339/unemployment-rate-last-ten-years![](data:image/png;base64,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)
Source: http://www.macrotrends.org/1339/unemployment-rate-last-ten-years