Question 1
Refer to the information provided in Figure 27.2 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 Figure 27.2. Firms respond to an increase in government spending by mostly increasing output when the aggregate demand curve shifts from
◦
AD1 to
AD2.
◦
AD3 to
AD4.
◦
AD5 to
AD6.
◦
AD6 to
AD1.
Question 2
Refer to the information provided in Figure 27.2 below to answer the question(s) that follow.
![](data:image/png;base64, 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![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAQUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA+dv2t/jn4p+CGofDVtG17wf4d0bxJrn9jalqXi6yllhsVMTyi48xbuBQFETLtb7xZfmXHM/wR+PGq+Pvia3hq58YeDPFunjRJ9UhvvDej6jZ/awl4IFmheV5bd4R86N5c8jFwCPlzW98fPgf4i+LviT4datoni7TvDB8HayNbSK90R9Q+1TCNowhK3UOxNkkgIAJJKkMuMGeT4O6jpP7QL/ABQtdYsE0iLw/NozeHLbRW8+QPP9qeUXAuApkabnHlchiDyd1KPu2ctry+7l0/8AJtvx6WTV7+kbevNr/wCS/wBd8rUf21fhHpbQGTWtant7n7SbW8svCmr3NreLbhjO8E8Vq0cyRhWLPGzKApJOOa3oP2nfh5cpcPFqepyCDw/H4pIXw/qJL6Y+3bcRjyMyD51yqZZecqNrY+CPhbN411rxTomneHLr4XeJLHXbi40ltEs7/UP+El8NaddlxdTtpInkstJkjQlZfKjCh8RneXw31F4d/ZA8caC0Ez/FXTNQuI/Ah8BYn8KMsItlOYp1Rb0ESAYDZYhscBOABqapuXWzt68snb05uRXvbV9rrZqCnyt6X/DmSv8AdzfNLvY9D0T9sL4R+KfD6azoPit/EVpJL5McWi6Xe311IwhjmfZbwwtKwjSaMyEIREWCuVbiup1fxVq3jbwRomt/DbWtDistTVbsa7q9lJeWsVoYmfd5CzwOWLbFwXXbliwyu0+J63+xFN4g8EfCfS9S8Q+GNa1f4fWsunRNrfg2O90nUbVo1jCzWD3OVkURxsJEmU7gxxhsDsviz+z54s8cfBzQPAfhDxxonw1hs/LGof2R4RimsLyNRn7PHZSTlIoGblomMgZflbKls1VUU5KGqukvNd+nrb5a7mUb3jfTTX17f15O66eZaz8fP2gtb+BWh/EXwrpnw10fTbfTr++1u/8AE7Xz21zHDKVgmsUgYyBZ0RpFR9xw6AMxPPvfhXUPidq3wU0G61WDQdM+Jd/bW8l6i2czafYSSODIDCZxI/lRkgqJRudeCoPHK6P8BPG+o+CfDHh7x98UI/HC6Zr8WsX048NwaeuoW8GHtrIxQybERJljlLYYtsC4ArT+NPwp+JPxFj1u08KfFs+BNM1HTEsUt4/D8V3Jay+ZuluEm82N9zx/u8ZwvLDnBCqaN8uqb+7rq9O/Lp2utNRLVqW3/D2/C19ej110LH7PXxI8TfEXS/Fa+JotJuJdC1+60a31vQ43hs9VSLAaWOGSSRo9rFomHmON8b4bsCm/s7/Cjxz8IvD15pHjH4kW3j+1Xyo9Lis/C9poUOmwopBiSK2JVgcrjONu3A60VpPluuXsvyV36t6u2l9tATvd2tq/uvoetUUUVmMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP//Z)
Refer to Figure 27.2. In response to a decrease in net taxes, the Fed would increase the interest rate by the greatest amount when the aggregate demand curve shifts from
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AD1 to
AD2.
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AD3 to
AD4.
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AD5 to
AD6.
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AD6 to
AD1.