Question 1
Refer to the information provided in Figure 6.8 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAJcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACiiigAooooAKKKKACiiigAr52/a3+Ofin4Iah8NW0bXvB/h3RvEmuf2NqWpeLrKWWGxUxPKLjzFu4FAURMu1vvFl+Zcc/RNeN/Hz4H+Ivi74k+HWraJ4u07wwfB2sjW0ivdEfUPtUwjaMISt1DsTZJICACSSpDLjBLXlH1V/S+v4EyvyS5d7O3rbT8TB+CPx41Xx98TW8NXPjDwZ4t08aJPqkN94b0fUbP7WEvBAs0LyvLbvCPnRvLnkYuAR8ua0NR/bV+EeltAZNa1qe3uftJtbyy8Kavc2t4tuGM7wTxWrRzJGFYs8bMoCkk45rVk+Duo6T+0C/xQtdYsE0iLw/NozeHLbRW8+QPP9qeUXAuApkabnHlchiDyd1fCPwtm8a614p0TTvDl18LvEljrtxcaS2iWd/qH/CS+GtOuy4up20kTyWWkyRoSsvlRhQ+IzvL4aVzSiox+LX7+Z8t/VWu9l1tsb8sE5Sb93T7uVOX3O9u/wCJ97wftO/Dy5S4eLU9TkEHh+PxSQvh/USX0x9u24jHkZkHzrlUyy85UbWxm6J+2F8I/FPh9NZ0HxW/iK0kl8mOLRdLvb66kYQxzPst4YWlYRpNGZCEIiLBXKtxXnnh39kDxxoLQTP8VdM1C4j8CHwFifwoywi2U5inVFvQRIBgNliGxwE4ANb/AGIpvEHgj4T6XqXiHwxrWr/D61l06Jtb8Gx3uk6jatGsYWawe5ysiiONhIkyncGOMNgaSSXNyv0/8Clr52io6aayb6cpmrWV/wCvdj/7dzL0S2vc9D+LP7S+heB/ht4X8S6FLHr7+L7u3stAMUM0qTtKpfzDHEjTPsjV28lEMjsojADNkW/BvxbvfEXwE1Pxro13afEjV7O2vnhg0XSLnSPtdzAZF+y/ZbiSWaGQOmwhyWzyF5Aqv4t/Z/k1zwb8PrPRtS0fwn4i8E38Wp6Xc6Tohj0pZVikilj+wLOCIHSaQbFmDLkEPwc82v7Keqr4EuPCCfEO5ttE1pdXn8SwW2kwg6leX2W82JnZzbxxOSVizJuUBXZuWOcl8SXnZ9dlb8b66O9umqmLacOZJrS/43/T5X67n7LP7SE/x01TXrT/AISTwr4vsrGxsr1dS8N202nvbyzeZvtJ7SeaWUNH5anzcqDv27VZGFFdX8LPgde+D/iDrnjvxLrWla34r1TTbXR3m0PRP7JtRbQFmQtEZ52eUlyC5kwFRFVVCnJWsraW/r7xL+vuV/xv/wADZeuUUUVBQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//Z)
Refer to Figure 6.8. The marginal utility of the fourth movie rental is
◦ 0.
◦ 3.
◦ 25.
◦ 28.
Question 2
Refer to the information provided in Figure 6.8 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 6.8. The ________ movie rental has a marginal utility of zero.
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