Question 1
Refer to the information provided in Table 33.6 below to answer the question(s) that follow.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAH8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACiiigAooooAKKKKAPmLxT8Rfjdovx88H/DtPEXgCGPxNp+p6nHdN4VvpjZJatFtiP/ABM084sJRl8R4Kn5eePUNc+Nmh+D9R0Xwnr+sx2njTUlgsUuLfRr2fS11CVD5cTTKpjjLsCywyTK5Urz8wJyvGPwS8QeJf2ifBfxLtPFemWNh4bsbnTxos2iSTS3EdyUM5+0C6QK2Ik2HyiF+bIfIx5t8XP2J9V+KPxPufF//Cd6dG8euafruljV/DjajeaWbUJmzhuTdp5dpI6tI0UaIS7ZLHBDKCvGMJaJvV9Ur/8AyP5agvinJ/8Abva9l09b/fvY2f2fP2udM+Kvgvwtp+vavp+mfEjXl1CG3it9Ju00yW4t5pU2RyOxjaRURJGgFx5mGzwCDWp8Iv2oLTVfgZ4R8XePpooPEGtvfINO8NaTeXck/wBmuZYnkhtIRPPsVUQu3zKhcZYZFZPwk/ZCv/h9o/hzTda8X6f4jtfCWoXur+HFt9BNj5F7c+fmW7IuXNyEE7hQpi4J3FjtK8uP2CZ5vBPw80rUfFHhnxBqfgy61F4Dr3g1b7S762vHMrxT2Ul0TvSQ5SVJkIHBB5Jl83Ty/q3l18ur2NPdu101t/X3fO+259Dav42HiL4WjxX4N8Q6FaWN1aJfwa9rcbyWEFrw8k8iB4mIWMMdpePBHzMuDXjHw/8A2hvE/j74F634wbxp8NtEj0XxBe6bP4wuIpZdFuLWF9kUyQ/bFaNpGaNQHuD13LvDoD7CvgfX9C+GmkeH/CGq+HfCeraesKrLZ+Hf+JVtU/vI0sVuFaONucKs+VyPmPOeO8O/AjxT4CTWdV8KeMtHsPF3iTV21jxFeah4de50+8kMCxBIbVLuJ4FXy1YEzuxJfeXyMOW80tun3qz+6/bro9LZJu0L7319LO6++3fytrfG0D9qkWP7IWj/ABj8T2lhLfXlnGVs9KuNtrdXUk/kQqjkuYkdyhO7c0YYghmUg9p8AfihL8T9F1ua78QadrGpabqBs7qzs/D19okumv5aP5E0F65mZsOCJSkYYEYQYNecN+xjNb+CL7wfp/j66svDkrLq1taLpUJa310agL7+0A4Kkx7wI/swwoQcNu+avUvhF8Jrr4e3/i3XNZ1mHXvE/im/S+1K6srI2VopjiWGJIYGllZFCIM7pXJYscgYUXfmbk1a99O2qsttervppbZ3RPvaL+no/wDgfO+6sz0eiiikWFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/2Q==)
![](data:image/png;base64, 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)
Refer to Table 33.6. If the exchange rate is $1 = 3 euros, then
◦ the United States will import both peas and carrots.
◦ France will import both peas and carrots.
◦ the United States will import carrots and France will import peas.
◦ the United States will import peas and France will import carrots.
Question 2
Refer to the information provided in Table 33.6 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 33.6. If the exchange rate is $1 = 2 euros, then
◦ the United States will import both peas and carrots.
◦ France will import both peas and carrots.
◦ the United States will import peas and France will import carrots.
◦ France will import peas.