Refer to the information provided in Figure 3.16 below to answer the question(s) that follow.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCACnALADASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD2P9i79p34k/Gr47+KdP8AFGvaNbxxRMupeBrq0aw1HQp48qFgV3LzorArK2OC8Z+XO2uc/bd/bHT4Sftq/BHQLfUvK0fw7N9s8SKsoWMJfD7PiX3igLzAHA/eoc9Cva/B39lj4mQ/tVWfj34i6pompDwhDHDZ+IrWxf7frwfT5bRRI7ECMIspeTG4NIAQFBOO0+N/7DPwT+JfxS0XxN4m8GSatrniPV2i1S8k1rUFNwiafcMi7VnCoFMEQAQLgIAOMigD6qoqjpunw6Tp9tZWyMttbRJDEryM7BFAABZiSxwBySSe5q9QAUUVj6/LqttbQXGlQw3bQy77izkGJLmHawKROWVUkyVYF8q20odm/wAxADYorO0rVrbW9PivbKTzoJMgZUqysCVZWVgGV1YFWVgCpBBAIIrRoAKKKKACiiigAooooAKKKKACiiuc0bWrzxFeLd2Pkp4eVSI7mRC0l+T/AMtIiGAWIdnIbzMkqFQI8gB+c3xs8OaJNf8AxQ+LPijwfZ/Gz4LeNXhNr8QvDd3EdZ8KRQubY/ZFlUkLFMrHdEdjbQXypZR996B8RvAmh+KbH4XweNNLuvGOn2caDRrjUYn1JkSJWDSRghi5jxIeASp3Y2nNecyfsKfCeaaS3ks9dfwq92b9vBh8QXv9gm4MvnGQ2Xm+X/rPm2Y2dtuOK47wx8MfFd3+1/N4o1P4a6lo3hHTtYvbjR7u1v8AT0szNNYNBc6vdBLp7iaefy4reOHykWOJw7YcMAAfXFFFFABXI+Nf+Rm8Af8AYbl/9Nt7XXVyPjX/AJGbwB/2G5f/AE23tAHXUUVj6/LqttbQXGlQw3bQy77izkGJLmHawKROWVUkyVYF8q20odm/zEANiis7StWttb0+K9spPOgkyBlSrKwJVlZWAZXVgVZWAKkEEAgitGgDmdW0q70zUJda0WLzriTBvdNDBFvQAAGUkhVnVQArEgOAEcgBHi1dK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0a5nVtKu9M1CXWtFi864kwb3TQwRb0AABlJIVZ1UAKxIDgBHIAR4gDpqKztK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0aACiiigAooooAKKK4/8A5KH/ANil/wCnf/7l/wDR3/XH/XgB/wAlD/7FL/07/wD3L/6O/wCuP+v7CiigAoornNG1q88RXi3dj5KeHlUiO5kQtJfk/wDLSIhgFiHZyG8zJKhUCPIAfCP7SErw/Er4n+OvFuja38TfgxeWUOnWHiPwF4h8648F3EELR3aNZpMgLeePNeTpGAAxbJQfb3wykstM8DeEdFj8Sy+JLuPRLV49R1GUm91GJIo0N3IrHeWclWZj/E/PJrx3UP2EfBV0uuaZaeKvHGjeDNdup7zU/Buma15WlXUkzbpcjyzMiucZRJVUgYxgsDozeH7Lw3+1t4SutI8AX9lZQ+EtQ0S98T2eloLZ2km057OGSdTvZY0s7hRuGEMigH5mIAPoSuR8a/8AIzeAP+w3L/6bb2uurkfGv/IzeAP+w3L/AOm29oA66iiigDmdW0q70zUJda0WLzriTBvdNDBFvQAAGUkhVnVQArEgOAEcgBHi1dK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0a5nVtKu9M1CXWtFi864kwb3TQwRb0AABlJIVZ1UAKxIDgBHIAR4gDpqKztK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0aAOZ1bSrvTNQl1rRYvOuJMG900MEW9AAAZSSFWdVACsSA4ARyAEeLV0rVrbW9PivbKTzoJMgZUqysCVZWVgGV1YFWVgCpBBAIIrRrmdW0q70zUJda0WLzriTBvdNDBFvQAAGUkhVnVQArEgOAEcgBHiAOmorO0rVrbW9PivbKTzoJMgZUqysCVZWVgGV1YFWVgCpBBAIIr86vif8JpPit+2P8AHLW9N+BujfGBNGtNJ0zZqfiOLTES7+xLKzBfLYyuVMUeWdAvlkEnPyAH6TUVy/w58B6P8MfBOk+F9AsBpmj6dEY7aySZpVgUsW2K7fMygsQCecAZqv8A8lD/AOxS/wDTv/8Acv8A6O/64/68AP8Akof/AGKX/p3/APuX/wBHf9cf9f2FFFABRRXH/wDJQ/8AsUv/AE7/AP3L/wCjv+uP+vAD/kof/Ypf+nf/AO5f/R3/AFx/1/YUUUAFFFFABXI+Nf8AkZvAH/Ybl/8ATbe111cj41/5GbwB/wBhuX/023tAHXUUUUAFFFFAHM6tpV3pmoS61osXnXEmDe6aGCLegAAMpJCrOqgBWJAcAI5ACPFq6Vq1trenxXtlJ50EmQMqVZWBKsrKwDK6sCrKwBUgggEEVo1zOraVd6ZqEutaLF51xJg3umhgi3oAADKSQqzqoAViQHACOQAjxAHTUVnaVq1trenxXtlJ50EmQMqVZWBKsrKwDK6sCrKwBUgggEEVo0Aczq2lXemahLrWixedcSYN7poYIt6AAAykkKs6qAFYkBwAjkAI8XzzP+yj8LJNf1XXbT4keN/DV3441Ca5uLWz8Z3On/b7kvseIwllZmQt5XlsCycIQCMV9WV+PX/BQ79lL4w/HD9oy78a+CfDV/4x8IazBbxaZcWQjVIfKijikzlgdjOC6ysAHVsqWRQxAP078G+FNOl8IaJ4Z0iFrf4d6NYwabZws5dtTghjWONSx5a2CqBk8z/9cv8AX+lVwfwQtb+w+Dngey1PUf7V1ex0WzstQvCzFpbuKFY5y24Bg3mo4YMAwIIIBBFd5QAUUVx//JQ/+xS/9O//ANy/+jv+uP8ArwA/5KH/ANil/wCnf/7l/wDR3/XH/X9hRRQAUUUUAFFFFABXI+Nf+Rm8Af8AYbl/9Nt7XXVyPjX/AJGbwB/2G5f/AE23tAHXUUUUAFFFFABXKfET4m+FvhJ4al1/xhrtn4f0lHEYuLyTHmSEErHGoy0jkKcIgLHBwDXV18b/ALVGr6X4f/bE/Z71f4gTw6X8ONPj1Wa31TUJVi0+DWPKBhNxIxCowVAYy+PmztJw2AD1bwP8evBHxK8a6zbfD/Vri88T6fBHdaz4Y1DTbrTLi5gIVUmWO7iiIlAKBZPuuNqSEDy3i9RXxx4fMemtJrNnbPqbmKzhuplglmkVgjRrG+G8xXIVkxuVvlIB4rh/hp8Uvhp8X/iB4g1LwVd23iPVdHs4dNvPEmnRNLaPGzvILWO7A8uVkPzsqsdvmqe5x+af/BQ79lL4w/HD9oy78a+CfDV/4x8IazBbxaZcWQjVIfKijikzlgdjOC6ysAHVsqWRQxAP1V/5KH/2KX/p3/8AuX/0d/1x/wBf2FcH8ELW/sPg54HstT1H+1dXsdFs7LULwsxaW7ihWOctuAYN5qOGDAMCCCAQRXeUAczq2lXemahLrWixedcSYN7poYIt6AAAykkKs6qAFYkBwAjkAI8Uq+OPD5j01pNZs7Z9TcxWcN1MsEs0isEaNY3w3mK5CsmNyt8pAPFdDX49f8FDv2UvjD8cP2jLvxr4J8NX/jHwhrMFvFplxZCNUh8qKOKTOWB2M4LrKwAdWypZFDEA/T3xb4ii1PwrrOvT2tze+DNLspr17a02edrixxs5RN7KvkELgbmUTkjJEPM3l3w8/bt8KePda8D2U/gnx34TsvGrmPQNY1/S4Es76TbuVFaGeRhuHIJUL6kCqnxe8Rav8Pf+Ce2qLPcXuv8AieLwXHoEtzYpO9xJqL262ckh2oZFdZmYncFIZSGKnOPnP4AeE4tU+NnwEn+HF3448b2fhvS3tfEl7470ucaTokC2oRIbN5oIvJuFP7tBCp3LtLMQJCQD9MKKKKACiiigAooooAK5Hxr/AMjN4A/7Dcv/AKbb2uurkfGv/IzeAP8AsNy/+m29oA66iiigAooooAKz9X0ew1+wksNTsrbULKTHmW13Essb4IYZVgQcEA/UCtCuP/5KH/2KX/p3/wDuX/0d/wBcf9eAUtJ0iw8S2UVhptjb6f4Fiz5dtaRLFHqmSWOFUAC1JJP/AE3JP/LL/X97RRQBzOraVd6ZqEutaLF51xJg3umhgi3oAADKSQqzqoAViQHACOQAjxSr448PmPTWk1mztn1NzFZw3UywSzSKwRo1jfDeYrkKyY3K3ykA8V0Nfj1/wUO/ZS+MPxw/aMu/Gvgnw1f+MfCGswW8WmXFkI1SHyoo4pM5YHYzgusrAB1bKlkUMQD9Vf8Akof/AGKX/p3/APuX/wBHf9cf9f2FcH8ELW/sPg54HstT1H+1dXsdFs7LULwsxaW7ihWOctuAYN5qOGDAMCCCAQRXeUAczq2lXemahLrWixedcSYN7poYIt6AAAykkKs6qAFYkBwAjkAI8WrpWrW2t6fFe2UnnQSZAypVlYEqysrAMrqwKsrAFSCCAQRWjXM6tpV3pmoS61osXnXEmDe6aGCLegAAMpJCrOqgBWJAcAI5ACPEAdNRWdpWrW2t6fFe2UnnQSZAypVlYEqysrAMrqwKsrAFSCCAQRWjQAUUUUAFFFFABXI+Nf8AkZvAH/Ybl/8ATbe111cj41/5GbwB/wBhuX/023tAHXUUUUAFFFcf/wAlD/7FL/07/wD3L/6O/wCuP+vAD/kof/Ypf+nf/wC5f/R3/XH/AF/YUUUAFFFcf/yUP/sUv/Tv/wDcv/o7/rj/AK8AP+Sh/wDYpf8Ap3/+5f8A0d/1x/1/zx8cP2utc8C/H3wr4f0HTY5vAemeINP0DxnrdwFEcNzqMb/Zoo3YgDyQEllbPyiWJSPm5+ptXa/TS71tKjtp9TWB2tY7yRo4Xm2nYJGVWZVLYyQpIGcA9K+GvE3/AAThHiD9m65s20rwzL+0HfXBvrrxvLqN2qfbHvjcSXCziLzCShIA8sYzjPG4gH2hq2lXemahLrWixedcSYN7poYIt6AAAykkKs6qAFYkBwAjkAI8WrpWrW2t6fFe2UnnQSZAypVlYEqysrAMrqwKsrAFSCCAQRT9MN42nWpv1hS/8pPPW2YtEJMDcEJAJXOcEgHHasfVtKu9M1CXWtFi864kwb3TQwRb0AABlJIVZ1UAKxIDgBHIAR4gDpqKztK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0aAOZ1bSrvTNQl1rRYvOuJMG900MEW9AAAZSSFWdVACsSA4ARyAEeLV0rVrbW9PivbKTzoJMgZUqysCVZWVgGV1YFWVgCpBBAIIrRrmdW0q70zUJda0WLzriTBvdNDBFvQAAGUkhVnVQArEgOAEcgBHiAOmorO0rVrbW9PivbKTzoJMgZUqysCVZWVgGV1YFWVgCpBBAIIrRoAKKKKACuR8a/8jN4A/wCw3L/6bb2uurkfGv8AyM3gD/sNy/8AptvaAOuoorH1/Q4/ENrBaXEjfYPN3XVqB8t3HtYeU/fYWKlh0YKVbKswIBj/APJQ/wDsUv8A07//AHL/AOjv+uP+v7CiigAoorj/APkof/Ypf+nf/wC5f/R3/XH/AF4Af8lD/wCxS/8ATv8A/cv/AKO/64/6/sKKKACiiigAooooA5nVtKu9M1CXWtFi864kwb3TQwRb0AABlJIVZ1UAKxIDgBHIAR4tXStWttb0+K9spPOgkyBlSrKwJVlZWAZXVgVZWAKkEEAgitGuZ1bSrvTNQl1rRYvOuJMG900MEW9AAAZSSFWdVACsSA4ARyAEeIA6ais7StWttb0+K9spPOgkyBlSrKwJVlZWAZXVgVZWAKkEEAgitGgDmdW0q70zUJda0WLzriTBvdNDBFvQAAGUkhVnVQArEgOAEcgBHi1dK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0axk0KO212TU7WZrZrlcXkCjMdyQoCSEdpFAC7x95cKwbbGUANmivjz4jfCnwd8bf+ChGm2HivwrpviTT/D/AMOJLuUX8cU0Rnnv2igSSNsltsYuXXIwpcMMHBND9lf4qeB/gvJ8XNBv/GtpoHwu0Xxm+jeFZfE2qJFHEywRG7s7aSWQ7oYpmO0AnCtuOMtgA+0q5Hxr/wAjN4A/7Dcv/ptva66uR8a/8jN4A/7Dcv8A6bb2gDrqKKKACiisfX9Dj8Q2sFpcSN9g83ddWoHy3ce1h5T99hYqWHRgpVsqzAgGP/yUP/sUv/Tv/wDcv/o7/rj/AK/sKKKACiiigAooooAKKKKACiiigDmdW0q70zUJda0WLzriTBvdNDBFvQAAGUkhVnVQArEgOAEcgBHi1dK1a21vT4r2yk86CTIGVKsrAlWVlYBldWBVlYAqQQQCCK0axk0KO212TU7WZrZrlcXkCjMdyQoCSEdpFAC7x95cKwbbGUAPA/GvxQ+Lup/tS6l8MPAl34MstHtPCEXiN9Q13Srm7liuXuZIEtXEV5Fw/l794X5V7Mcbu1/Zp+MWtfGDwjrv/CUaLb6B4u8Ma7deG9atbKRpLVrqARsZYGYBjE6Sxsu7kbsc4yfNz8LPjj4Z+O/xb8f+GdL+HN3L4qh03T9Fn1rV70SaZbWiyKTLFHZZl80ybzGsyBSqje+0GqGi/DTX/wBlXw34Bt4PHonvvEfj2S98YXj6fDGuu3N9ueVv3hcwKixD/VkEhMkjkUAen+Mv2R/hj4+8Wa94l1jStYk1jXrdLPVJrTxPqlol3bqAFheOG5RPLGPubducnGSTXk/7S3wEu/7C8F+B/hl8KJE8Jw2t/Y6pqPhhtNtrqz0+5RFubO2W6uYVEl3sVZZ2Vyq5YB3PH2BRQB87/FX4g/EPxL+0HY/Cb4farZeE2t/CsvinUvEF/pn28Mzzta2lqiF1CgyJLI5IJKoApXnNv4EfEjU/2pvgJ8M/iVZvZeHdYkkkvJYZbV7q28+NbmymVU8yNgpYyMvzkgAA7utN+LHwj+IMHxusfit8Lr3w/Prz+HJPC+oaP4ruLmGxkgE7XEFwjW6O3mxyswKsuGSRgGQ8nsP2bfgvbfs8fBDwl8PbW8/tBNEtmSW72FBPNJI80zhSSVBkkcgZOAQKAOg/svx3/wBDH4e/8J+f/wCTaP7L8d/9DH4e/wDCfn/+Ta6+igDkP7L8d/8AQx+Hv/Cfn/8Ak2j+y/Hf/Qx+Hv8Awn5//k2uvooA5D+y/Hf/AEMfh7/wn5//AJNqFPCfia7aSW+8c38EztxDpGn2kFui4AwqzRzvngkkyHk8ADArtaKAOQ/4QrWv+h/8Rf8AgPpv/wAiUf8ACFa1/wBD/wCIv/AfTf8A5Err6KAOQ/4QrWv+h/8AEX/gPpv/AMiUf8IVrX/Q/wDiL/wH03/5Err6KAOQ/wCEK1r/AKH/AMRf+A+m/wDyJR/whWtf9D/4i/8AAfTf/kSuvooA5D/hCta/6H/xF/4D6b/8iUf8IVrX/Q/+Iv8AwH03/wCRK6+igDkP+EK1r/of/EX/AID6b/8AIlH/AAhWtf8AQ/8AiL/wH03/AORK6+igDkP+EK1r/of/ABF/4D6b/wDIlePftTfs4J8Uvgx4wW9muvG3iOz0DUxoUOo6TpVxNHdPbNsWBzZh4md0iG6NlbKqQQQCPpCigD80v2Nv2Mf2qfhoLGbWvi5J8PtBi2j/AIRkyrrZCLkeX5TlreEEYG6JycehUV+ksCPDCqPI0zKAC743MfU4AGT7ACvmzVfin8R/jR8dPFngL4YazpPg7w54H8iLXPE+oaYdSnu76VN4tLeEyRoqomd8jEkNtAGM7uj/AGWvjF4k+I6ePfC3jU6dceL/AALrz6JeX+kQvDbX8Xlq8NyI3JMbsCwZASAykg4IAAPeKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAPh747+CPjH+y3rHxT+LHwmvPDes+G9bu7bxDrWia0jpeRSRIIpUhb7kkThjI2WjdQm1CT970b/gn7p+jaj8Arbx9ZareeItc8e6hda9rmsX9otrNPe+c0MkYjVmCRRGIoiKxXALKAGwCigD/9k=)
![](data:image/png;base64, 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)
Refer to Figure 3.16. When the economy moves from Point
A to Point
C, there has been
◦ a decrease in supply and a decrease in quantity demanded.
◦ a decrease in quantity supplied and a decrease in demand.
◦ a decrease in supply and an increase in quantity demanded.
◦ an increase in supply and a decrease in quantity demanded.