Question 1
Refer to the information provided in Table 23.6 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 23.6. If the interest rate dropped from 15% to 6%, planned investment would ________ by $________ billion.
◦ increase; 90
◦ increase; 270
◦ decrease; 90
◦ decrease; 270
Question 2
Keynes used the phrase
animal spirits to describe the feelings of entrepreneurs, and he argued that these feelings affect investment decisions.
◦ true
◦ false