Question 1
As you move up an indifference curve, the absolute value of the slope
◦ increases.
◦ decreases.
◦ remains constant.
◦ initially increases and then decreases.
Question 2
Refer to the information provided in Figure 6.14 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARARUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAPmH9or9oXxT8KPjv4H8JReMvh/4J8KeItLvbuXWfGWnyv9lmtinyBxf26P5nmqAp2ldrHLZwOm+B3x7uPGcvjiTxJ4l8L3mmeG7CwvpL/StN1DTVjimgkme4l+2DZ5LoqvGYncBQ25jwa1PG/wP8Q+KP2ifA3xMsfF2nabYeGbK5sDok2iPcSXcVyU8/NwLpAhxGmwiM7SCTvB2jmPEPwmvfhX/wALz8czX1rrWg+ItAjgj8M6R4WE81rHaW0kUSJG9yY7keW7AxFEV+B8oyDDbjT87P8AN2/D0XexVOKlU956XS+TSv8Ac79/I0dR/bj+D+jqGvtX8Q2cZsl1IST+DNaRDaM6olyGNngws7ookztJYAHkV0niP9qH4c+ErLxhd6vq2pWNv4Qlt4dcZ9A1Amy84ExOQICWjYKT5i5QcZYZGfhP4XeC/HnxXnk+Hdr4i+FPiPRvFGiSWGo+KvA+sanr+oeHbeFRLbLILq4khtYnmCAWsXlq5D7Aoj3L9L+LP2PfG3jDTPirbX3xT0uab4iWunQ6jNL4UZltXtUCZt0F6AEcD7j78E53NyDtOPLt/Wv+XXu9ghZtc/8AWn+f5eaZ6VJ+118Jv7Ci1m18VNq2lus8putH0y8v0igilaGS4l8iF/Kt/MjdRO+2JtjbWIBqj8fv2jbX4W3XhfQ9Kmik1vxJHcXVvenTbrVYbSzgQNLc/ZbQGa5xvjASMqMMzs6KhJ5f4kfseSfETx1oHjO91DwVq+uWmhJomoWfirwPHq2l3Oxy6z29u10j2rgs4wJWBUgEcZPc/Ev4F6h4n8SeEvE/hTxDY+FPEfh/TrvSENxpLXlhNZ3KRiSI26TwlSrQxshWT5duCGB4zmnZ27v7tba6b6N9Ur9SVdS02/4a/wB2vdXS6HRaJ48vtd+EejeKPDa2XxBvNRsre4tZtM/4ltpeeYF/fYmeRoIhu3MpMkigEBXYbT5r4R/ahvdc/Zd0H4mXejWq+JfEMkttpWgW0zbJrpriWOGHe3JCpHvkfA+WOR9qgbR0vgX4KeJ/hVoNjoHhLx5Enh3TPD8eladpmtaKl2qXiybnvZZIpYZJNyll8lWRRnIPGK8+8N/sXXumfAvRPAeq+MrfU9X8NPcHw74gsbTUtKNkJy3nedFa6nG07FZJUB8xAFbBVvm3FXWE+Xd7el2n9+jXqttUOl9nn3/Dbf0T077+TPWf2b/iTqfxh+A/gbxrrMFpbarrulw31zDYoyQI7jJCBmZgPqxPvRVL9mL4JXf7PHwg0nwNd+If+En/ALNJWG/8m4hzHhQq+XNcz7MYPyxskYz8sa85K0la/umNLmUEp7nq1FFFQahRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/Z)
Refer to Figure 6.14. If the price of an ice cream cone is $2, Jason's income is
◦ $75.
◦ $250.
◦ $300.
◦ indeterminate because the price of ice cream sandwiches is not given.