Refer to the information provided in Figure 26.8 below to answer the question(s) that follow.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCADGAOQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKAKepajb6Vp9zfXUqQWttG000rnCoijLE/hXwN/wTY/a3ufjr8VvjZo+qTkPqOrN4m0mGQ5ZLVttu0f0REtf++jX3L448Iad8QPCGt+GdWEzaVrFnLY3awTNE7QyKUdQ45GVJHFfPn7P37C3wm+BvxK1LxX4R0rULHV9OmksoJH1KaVDDJbxF0dC2G5cnn29KAPqOiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKwPDX/IT8Tf8AYSH/AKTQVv1geGv+Qn4m/wCwkP8A0mgoA36KKKACiiigAooooAKKKKACqOqajHpOnXN7KsjxW0TzOsSF3KqMnCjqfar1eWftPeN4vhz+zt8R/EMlwltJZaBeNbu7YzcGF1hX6s5QfjQB0Pwt+Jei/GHwNpni/wAPfam0XU0MtpJeWr27ypuwH2OAdpxwe4rzWH9s/wCHsvhq48RzQeJrTwzaXj6fda1N4evPslvMknlvvdUOFV/kL/dB71W+HHxe+HHwe+CHgjw/N400Br3TPDUKR2cGowvJJ9mst8rbUZjgLE7FulfLfgXRtQ0f4N/s7af8RvGtrefCbx1dOdT0O3jjsV+13Ky39utxcbmeaPzldHCmNcsmePlIB92+PfjH4U+GGo+E9P8AEGqx2d54o1FNK0uI/M00z/d6dEyUUv0BdB/EKreOvjZoXgbxLp3hx7XVNc8TX8D3sOj6HZtc3AtkYK079Fjj3ELl2GW4Ga+Nvi9a+NPjX8J/ir8XdMsvC8/heeyLeGNTvNZkhu9PsNNuPOSWGJbd4981xbtNzICQYUbbsru73xT4Y/aD8Z3HjXwp4+vPhF8QvC2h2MX9t3r2r2GpWF3bpeqj20r/AL2BGf7/AMmH3YZtvAB9SfDf4kaN8U/Dzazob3P2dLmaynhvLWW2uLe4hcpLDJG4DK6OCCK6+vH/ANljx5q3xN+CmheJ9b0yx03VNQkuWmfTYjFbXuyeRFu4lb5gkyqso3c4fv1rt/iT490v4XeBNd8Wa1N5Ol6RavdzFfvPtHCJ6uxwqjuWAoA57WPjx4W0X4z6B8MLi5lfxRrVpNdwrHHmGJUDOqSP/C7okzIvcQuePlzkeJv2g4tO8aa74X8P+DvEnjnUvD0UM2tHQ0tEisvOUvFGWubiLzJCnz7I93HXGQK+V/iDoPjH4e/Cbwf8X/FGv+GprqTxppHjK++y2cn2x2uHS3a2S484o8cNnM8YxH9yEt/eNaXjzxt4S1W58cfEzw/47u/gr8YbK4udPn8Ofbort9f+yFo7TztNcZm81AuwxLu2uMM1AH2r4D8aad8RPBWi+KNHMx0vWLSK9tTcRmKTy5FDLuQ/dPPSuirxnwx8QPHB1n4U2Wv6Xpelr4i0N59Xswkv2m1v44EleNOdoQFmXB3H5a9moAKKKKACiiigAooooAKK5n/hZfhD/oatE/8ABjD/APFVf0DxNpPim1mudH1K01S3hma3kms5llRZVxuTcOMjIoA16wPDX/IT8Tf9hIf+k0Fb9YHhr/kJ+Jv+wkP/AEmgoA36KKKACiiigAooooAKy9ehvrjRb2PTphb6iYX+zSt0WXHybuvy5xmtSigDL0DVode0iz1GFWiS4jEnlycOhPVG9GB4I9RVjUNMtNVtWtr21hu7d8ZinjDocf7JrndLZdA8U3mkt8llqO/ULPsBJu/0iP8A76Ky+/mv2WuuoA5+LwL4btwwj0DTItylG2WcYyp6j7vSn6p4d0M6Usd5pFlcWVkjPHA9qjpEMc7FIwK3az9d/wCQFqP/AF7yf+gmgCvY6XpU+hRW0OnWyaZNGGWz8hBFtPP3Ones/V/hn4R8QNZHVPCui6kbJdtq15p8Mv2ceibl+T8K1/D3/IA03/r1i/8AQBWjQBGkaxIqIAiAYCgcCoru7hsLWW5uJFhghUySSOcBFAySas1yXi1/7c1Gx8NxklLg/ab/AB2tUP3D/wBdH2pjunm+lAGh4Qnvb3w/bXeoqyXV0WuPKcbWhR2LJE3+0iFVPuDWm9lbvcLO8EbTIMCVkG4fjVqigDhfE3wxg8T+PfDfi2XXdYsrrw+Jfs1jayxLbSeYNsvmK0bF9y4H3uMfLg810eneJtK1XRl1ex1O0vNKKs630E6PCVGdzbwcYGD+VeLftTePdSs9P0P4feHrLV9U1jxSztfjQFR7y10eMot3Mm50Cu/mxwo24YM24fcr5+8C23h7Xfgr8V/2fNS1C++GQvPFb6P4YsdTt1NxbxXyC/trbykZ1KbvtCsN2CmRuBNAH2d4O+L3gb4hXs9l4X8YaF4iu4F3yW+majDcSIvTcQjE4967OvkXRPijcfDr4i29n8Z/BOjaP4n8LeF77U9J8T+Epi9jd6cjwR3EKW7Ykhfc0OIm3rn7rV9C+AfiRB45vtc019LvtC1vRJY4b7TNSaFpI/MiWSNwYXdGRlbqG6qw7UAdrRRRQAUUUUAfJX7R/h7wn8Ihodxpnh7wH4X0W2s7y+k/tTw9aNFqlxB5bpp4mfaIXlRp2VuWJTjO1gfWf2bdX0jW/A+pX3h6w0610GTWr0afc6RZpbWt9AJdqToifK3C7N68P5e4ferD/aJvfDiatoFhqureL4dVurS6+waV4Y059QS82vb7zNb+TLC+w7MNMAih35HUd58HZvFEvgDT28X6Xa6RqqF0S1tlRCsCsRD5iIWSOTZt3ojugbO1sUAd5WB4a/5Cfib/ALCQ/wDSaCt+sDw1/wAhPxN/2Eh/6TQUAb9FFFABRRRQAVh+ItZl0GOyuTGr2hu44bksfmRH+RXH0dkz/s7jW5VHVdOg1jTbuxuk823uYnhkTPVGGDQBeornfBmo3F5pklrfP5mp6dKbO7f/AJ6OFVlk/wCBoyPjtvx2roqAMDxXoj65pQW2kWHUraUXNjcP0jmXOM4/hYFkb1R2HepvDetp4h0uO8VGimBaOe3c/PBKrbXjb3UgjPQ9Rwa2a47Xkk8KarJ4ggDNp0wUarAv8KqMLcqPVF4f1RR/cAIB2NZ+u/8AIC1H/r3k/wDQTVuOZJ4lkjYOjDKsDwRVTXf+QFqP/XvJ/wCgmgCLRriO18N6fLM6xxLaxku5wB8gq9a3UV3EssEiyxN0dDuB/GvlXwjp1t8fv2jfGWi+LreLVfCXw50/SLXTfD12ge0nvrq2+0S3k0R4kdE2RpuyqfOQN3zV7Z8NPgt4Y+FGveKr/wAL2w0q28QTw3FzpFqBFZW80abC8MK8RlxtL4+8VBoA7LWNVt9E0+4vLt9kEKl2Kjc30UDkk9AByTWb4S0q6gjuNT1OMJq2osJJ4924W6D/AFcAPoi+nBdnb+KqNof+Ez1pL0c+H9Nmb7Nz8t5cD5TL7ohyE9Xy/wDChPZ0AFFFYXizW28P6JPcwRC5vGKw21uzbRNO7bY0z2y5GT2GT2oA5nQvB2iX3xX13xrDYSf23DbLoP29ruciSIETOixF/LCK7LyFzvWWsrxD+zL8OvFWu61rWo6Jcy6zq9zbXdzqCareRTpPbBlglhdJQYHRXcAxbOGI6GvQPDWjDw/o1tZeYZ5EBaadh800rEvI592dmb8a2KAPEPEH7LHhi78IeLrLSpb6PxNr+m/2e3iPXL+51W7jUNviTfPKzCFX2kxIVDfXmul+GPgfWNG8T+L/ABX4hksF1nxFJao9ppczz29tDbw+WiiR0QuzM0jn5FxuC87dxx/2lfizcfDDwXa2ujvIPFfiK6Gl6V5VlJePAzDMt2YYgzukEQeUqByVVf4q+evg3dFPhX8dPg9oHji90K7s9Re38M694l860uv+JrD5sIYzqkjStcm5G4LuJOVzxQB9vx3MUzyLHIrtGdrhT90+9WK+IvhJJ4F+Gnj/AML2njf4a/8ACkPHfhvSb++/tPTmhfS9ftIrYrdu93GMz7A3nlZsOjDOW+bd9V+CPiZoHxBm1G10mW8F1pwha5tNQsJ7OeNJQWicxzIjbXCthsY+Vh2NAHZUUUUAfPH7VGm+IDBpevaTa+Kb5dLs7x7SHwrPN5tvqn7p7Saa3iYG5h+SVGQh1xLym0lh3PwHv9b1Pwbd32t2l9pTXmrXl1Z6XqbBru0tpJS8cU3LbD8xYJn5FZE/hxXKan+z78CvB76VY6tpmlabcahOLTT49T1aRJbyY/8ALKLfLmR/YZNej/DHwP4V8CeH57DwdbQWmkTXk07x207TJ5+7ZL8xZucpgjsQ1AHZVgeGv+Qn4m/7CQ/9JoK36wPDX/IT8Tf9hIf+k0FAG/RRRQAVlS6xFDr9vpbowmuLeS4jk4wwRkVx9fnStWua8a2c0mnwahZxmW/0uYXsMSjLShQVljX3eNnUf7RU9qAOloqpYX1vqNjb3dtKk1tcRrLFKn3XRhlSPwq3QBx/iQ/8I1rcHiRTizKLaap7Q5Yxzf8AbJnbP+xI7H7grrwdwqKaCOeN45EEiOMMrDII9K5Xw3cv4a1IeG7pi1vtZ9Jnf+OFesBb+/H78sm0/MQ+ADsKKKKAOIhP/Cu7sQuVTwtM37mRjgac5PEZ/wCmTE/L/cPH3WGzp9d/5AWo/wDXvJ/6Camu7OG+t5be4iSaGRCjxyLuVgeoI7ivzj/4Kj/H7x9+zj4W8J+BvA+s3WkaZ4hFzO2pxsftdvDDsX7LFN12fvQc/fACjdigD6+1H9n3SvEHiCy8aaP4h8QeCfFFzpcFjfah4enhT7dAi/u1mjmjljcpuba+3eufvYq14O8AadoEGoeF/Dkt+9jNdm68QeIby6aa81K6ICunnE7jJhEV2XAjQBEw3+r/ADc/4JhftSfFLx78Xv8AhV3iDxbqOueHtSspbgT6hM9xd2XkrnEMzNuQOPl5zjgrtPNfrtp+nW2k2UNpaQpBbwrsSNBhVFAD7W1is4IoYI0ihjQIscY2qoHQAdhVivn7V/2gfGo+I3xH8P8Ah/wJo+p6Z4IW2a91S/8AExsfM862W5wqG1dQVRudzheR83p6b8IfiLa/Fz4ZeGfGlnY3Om2muWEV/FaXgHmxK652tj+fegDtK5CyH/CV+J2vjk6Xo8rw2uOk11gpLKPZFLRj3aX0U1N4n1K5urmLw/pcpj1G7XfNcpybK36NL6bz0Qdzk4Ko9bunafb6TYW1naxrDbW6LFHGOygYAoAuUUUjNtGaAPNdU8C6Xf8Ax00LxXc6jqs2tWGj3Vpa6erRNYwQySRebIV2bxI7LEN2/pER03Z5Xx9+yX4W+I3jvWPF2pazr8GsXz6fJA1rPAkdhcWLs9rPCvkn50Ly/wCsLqfNcFfu49I8FsNWe/8AEbAhdTdVtCR/y6R7hC30cs8o74lUfw11tAHh198C7nSn1Txdfajqfxa8Z2ukXdhpFn4mNpb2iLMPnhEcMMUa+btRHd1Ztgx04Mv7OHhLxL4eg1+98XeG20nxBqclvLe6pPqMNxLfyKhXYkcPyQQQjCRxhj8pbPzbmf2yigAooooA+eP2nPB0/jXV9G0fQH0e68YalpGp2Npp+twT+T9nb7O0lylzDFKbWSGRLdkcrhmYD720r2f7PNje2fgnUX1TULG+1651m/uNUTTopIra1uzMwlhjWX59qlfvkDfu34+euD+MnirWNT13RxoHh/x7ovjGObUrSxudDj0eVri1ieESu8V7cqjwyHynTGJRs/g+YN3H7Oum3mleBLmLUdI8Q6Xqr6lPNezeKGtjfX0z7Xe4f7MzQgNu2qI2KqqBe2KAPWKwPDX/ACE/E3/YSH/pNBW/WB4a/wCQn4m/7CQ/9JoKAN+iiigAooooA5DQJG8N6/c6DKcWlxvvNNPomf30P/AHbK/7DgD7hrr6xPE2inXNNCRS/Zb6CQXFpdAZ8mYfdPuDkqw7qzDvR4X11dc08vJH9lvoH+z3lqzbmgmH3k3dxyCp7qynvQBt1j6/ocXiGwa2kaSCRWWWG5hbbLDIPuujeo/I9DkEitiigDm/Dev3FxLNpWrRpDrVouZPKDLFcp2mj3dj3XLbD8pJ4Zukrn/E/htfEVvE0VzJp+oWr+baX0P34X+n8aHoyHhh+BHOWHxNa51K48OJaC98W22RLawSbLbaMfvfO+banzJlfmkXP3D1IB2+qapaaPZS3l9cR2trEMvLK21Vrwf9oH4BeHv2sPBv2HxppM1poWmmS60+Zf3OomXYRvBYfuY/9hgWfC7gm3Deu2HhV7i6h1HW7ldV1GI74VWLZbWresUWT83+2xZ+WwVB21r67/yAtR/695P/AEE0AfM37N/7Gngr9k7/AIqPwLpt5rt7qNmkN/PqsqSXwjPz/wCjuFRAM4ym0btq/NlcH6T0jXLLxBYLc2NwJoiSrHBVo3HVHU8ow7qcEVL4f/5AOm/9esf/AKAKy9Z8Ji6vW1LTbptJ1faFa7iTekwHRJo+ki/kw52suaAPhm48O6H46t/jdceK/h/8TtV8Q+JfEd5Lo+nWWm6raW80McMUNjNzstg37kPum+6OG+X5a+ufhzqXifwd8IfA+l+LjFqnxDk0yC3uLS2ZVWa6SJfNJK8BE/jcDH90Esin8UP23/j78TPEX7UvjSLVfEGqaPJ4d1abTtOs9Pu5YYbWKF9iSRAEY37RJu6nf9K/X79h7xRrfxL/AGbvBPjjxZLNe+KdWsSLq9uVAeVI5XijIAAADKgfjqXZu9AHs3hvQP7Dt5Xnl+2andOJry7K7fNkwBwP4UUcKvYDuck7tFFABXJeL5X1ia28N20hEl+pa8ePrDZg/P8AQv8A6te/LsPuGtnXdYt/D+mz31yGKptVI4huklcnaiIO7MxUAepql4W0a5sYp77USr6xfsJbkocrGP4IUP8AcQcf7R3vgFzQBuQxJBGkcahI1GAqjAAqWiigAooooAKKKKAPj/UfGGs/HD4peB9UfTPFXws8OSvfWnhvxppj6bNJq3mIrhHWaKYwQypbs6K6FZcR/dYJn6Q+Hng7UvBek3dpqXirVfGE9xdvcrqGsCFbhVYKojxCkcYC7f4EQc9M5J8X0z9mf4l2ngrw94fn+Nk32bRhZtbLD4ZtP3T2zI0W1yckDYo5+8M7vvGvY/hf4X8S+EtEvLTxX4qfxhqU17LcJqLWiWuISF2R+Wnyjbg9KAO1rA8Nf8hPxN/2Eh/6TQVv1geGv+Qn4m/7CQ/9JoKAN+iiigAooooAK5PxHp91YagmvaTEZb2NPKu7IDb9stxzgf8ATRMkoTxyyHG/ct2+8b6Jp1zJaPfxzXqfes7QNcTr/wBsowz/AKVVOt67qnGnaMLKI/8ALxq0gT/gSxJuZv8AdcxmgDW0bVrXXdOhvrOXzraYbg/T2ZSOzBgQVPIKkGsy88a2kd1LZ6fHNrWoRNse204K/lN6SOSEj+jsD6Zrk9V8Aajp2oHV5Lu4122mcvqWhW3+jW0ucZliiDfM/HzJK7hxu/ixXc+HLrTLnSLV9H8gadgrEtsAEXBwVAHTDZBHY0AZL6PqniBVbXL8afZE/wDIO0yVk3e0lx8rt64QR91beKuXnhDSr7SbextoI7CK1O+0lsAsT2r8/PFjhT8zexyQwIJFeKftmaTZeMtN+FPg+9tIb6HxB480yKaCeMPughEtzcD/AIFFC6H/AGXI/irJ1jw7ovwj/a0+FWk/D6wtvD9v4ls9WHiHRNIQQWklpBbq8Fy9unyI6z7EEgUEiVl5oA93sPEV1o1zFpviIJHLI4jttUQbLe7PYH/nlJ/sHhv4C3IW74313TvDvhLVtR1W/tdNsIbZ2kuryZYok+X+J24Fal9YW+pWktpdwR3VtMhSSCZQ6Op6hgeor8t/+Cy+i+LdB8MfDu2tL7ULj4fNdXbTRSOXSG82p5KO/Vhs83ZvyR+9+bG0AA/SP4ZePPDfj3wnZXvhrXtM8Q2kUKQyT6Zdx3CI4QZRihOD7VLrvixo7mbTtGWO71GEZuJ5WxbWK4zumf1xyIx8zcfcU7x+Nn/BIyz8Vap+0XqllpF5qNl4Zk0eb+3Xsn2IUyPJBb+By/AZcOBv2kcmv0s/aNuL6/i8O/BXwJaacdV8RJLe6naXF81oi6PC6fag0qI7qbh3WHfsJO+VuozQBzdl+zJ+zt+2HHa/Em709fHV213Nb3GuLdT2v22SBzEVljjZBsGz5OPubeSDz9B6d4JfwbYw2nhGaKw0y2jEUOh3OWtEVRhUiP34RhQoAyijoleE/sq3Wo+EPjh8a/A2safo+h3Mlzp/ii20jRb43NvALqDyZthaKI/ftlcjYMeb75b6qoA5WHxvBZyx2+uW8ug3RbYrXjD7PK3+xMPkOeyna/8AsCugu7yCxtZbm4lSC3iQu8rttVVHUk+lN1CS1gsLiS9eOOyRCZmmICBMfNuzxjFea2vgKPxQYr3TnuvD+gxsJrTSwn+j3Lghkkktn+VEDLlUQIT95uduADptHt5vE+pQ69fxSQ2kGf7Ms5k2sAwwZ3U9HYblVT8yIxzguyr2Fcr/AGp4j0nAvtJi1eIf8ttJkCOfdoZmG3/gMjn2qe28d6JPOlvJeGwunO1LbUY3tJHP+ysgUv8A8BzQB0dFIrbhmqOr6raaBpd7qWoXMdnYWcL3FzcTttSGJBudyewCgmgC/RXhXhX9qvRPF/wQ8b/Eiz0nUYLXwm1/9t0u+UW90Ut4/OU7W+4ZIWjkUN/fxT9L/aTntofCF94v8Dav4R0PxRLbW9jq811bXMMNxcKDBDcLG++IuWCA7WXcVDEZoA9yooooAKKKKACsDw1/yE/E3/YSH/pNBW/WB4a/5Cfib/sJD/0mgoA36KKKACs3VtDsNchSG/tI7yENv8qUbkJ916H8a0qKAKen6da6Tapa2VtFaWyfcigQIg+gFXKKKAEPSuT1TQbzSL6XVvD4Xz5G3XemytthvP8AaB/5Zzf7fRuj/wALJ1hOK5ufx1pPnNBYzPrFyrbGg0xDcFG9HZPlj/4Gy0Aflz/wUR/boOl/Gzw5pPgmDU7LxH4Fmed7y7dYore8mh2SJ5Ow7ysb7N5fZ8zbVP3z7j/wTf8A2gfBfxl0/wAYeJ9ZgnsfidYxQQa5ret6kbn7RaMT5Pku+BDFvVswoFXdg87q+e/26P8Agnh8TvGvxq1Tx94F0SPU7LxXeeadIkvoUvba58ndLu3MsZVvLdxtc46V7r/wTm/ZB1H9le41jXPifbW9h4s1xYbfT4xsmt7NBncn2hcos7s4XbkZA+UvlsAH263iTU9dUpoFgYoj/wAxLVInjiX3SH5ZJf8AxxT2c1m+Ivhto2r+H9VHiO2TxTLJbSK51iFJ4gME4SEjy0HToMnaNxYjNd6Mdqoa7/yAtR/695P/AEE0AcN4O+DfhHw54Y02Hwzodj4QcQpIsvh61iszuIVjuCLscHurqwPpVt7GTQNcj1jV/D9nq97FD9nTxBptkGvEh3btjx/NJtyf+WTPkknYtdb4e/5AGm/9esX/AKAK0D0oA5rQLHwxqWoXPiTRrbTJtQvF8m41W0ij86ULj5HkAycYX5T0xWjrGu2Xh+ya5vp/Jj3CNAAWeVz0REHLueyrkmuT8TR6Xq2tTQ6RZyXXiWIBJLzT5mtvs/cC4uE7fdPlHeT8p2Y5rI8L6N4n0/W9VvNSuLXxje2MyWiTyr9kmhQwQyP5KjMfLOf7hO1dzttXAB01pot74puYr7Xofs1nGyyWujswba45WS4I+V3B5CDKIefmYKy9lXL/APCf6Zb4TVPP8PzHhhqsfkoD6CbmFz7K5rpEkWRQyEMrDII70ASVXu7WC+t5ILiJZoXXa8TjcpHuKsU0ttGTQBl6R4f03QfNGm2UOnpJgtFbJsTPrsHGffvXh/7SB1P4meK/CPwk0qafTrPWnfVta1OXTZbq0+x2xDpaOflQ+fKArJvXMaSj+MZ9RX4weC3+Hk/jlfEtg/g+ESNLrSTBrZVSQxOd47B1K59qr+EPjj4C8f6qmmeHvFul6nqbwfaY7OOcLNLD/wA9UQ4Lp/tDigD4g+PA8SeAtQ/aL8JXZ1TxNceN9K0ORbzRPDt2kHnO/wBkvEVU8xdy2nlSth+cevFe6/FjU2/aK/4RP4ceCdG1ZvDUOs2Gpa/4hvtMuLGytLOzmSZbeFpkQyTSPFGiiIFQu4sRX1PRQB5f8G/F3iLX9X+JOm+Iruyv5/D/AIm/sy1msrZrVPIbTrG5VdjO5JDXLjdu5x0HQFRWv7O3hbTtS1m+s73xNZXOsXjahfNb+LNUiE85RI95C3AHCRxoPRUUDgCigD1WiiigArA8Nf8AIT8Tf9hIf+k0Fb9YHhr/AJCfib/sJD/0mgoA36KKKACiiigAqnf2kt3avDFdzWTuMCeBULp9N6sv5g1cooA5j/hANKuxnUxca438Q1OdriIn+95J/dqf91BXQwW8dtEkUUaxxoMKiDAA9KmooAoXulxahc2E8hYPZzm4j292Mbx8/g5qW8s4L+3lt7mBLi3lUpJFKgZHB6hgeoqlrGoS2WoaJFERsu7xoJMj+EQTPx+KLV66u4LC3ee4nS3gjXc8srhVUepJoA5gaBqfhobvD1wtxZL/AMwm/kbYo9IZOWj+hDrxhQlfn7/wUk/4KA+NvhD4msfhz4CifwzqktiLzVtQvraKaaNZCwSGLO+P7q7mcbvvADaVNff2q/E3TLGwmvLUNfWkQ3SX29LeyjUnAdrmUrGRnA+Quf8AZr4d/bP/AGQ9C/bH8QWXinw/8R/CGm+PLaz+yLpVvei5iu4I98mC6NvLruc7hF04P3d1AHJf8E3/APgoN45+JPjqb4cfEOSTxPLJYvcaTf2dmq3SvHtzA6xAIUK5IdsbdvJweP0UGm654oAbU530PT3/AOYfYS/6Q/8A11nH3f8Adj/77YV8X/sN/wDBOfVP2aNbb4gan4j0vXPFs1obe0s4oJPskMMigv8AvDtfzG4G7YQo3fK275ftb/hMX0v5Nd0u60nH3rtB9otD6t5icoPeVUoA3NM0y10eyis7K2itLaMYWKFAij8BTbHS4rC6v54yxe9mWaTJ43CNI+PwjWn6fqNpqtolzZXUN3bv9yWCRXQ/RhVPSNRlvtS1yCTbss7xYIwB/CbeGTn8XagDWZQwwQCK5yTwFo0cjSWVu+kyMdxbS5XtdzerLGVV/wDgQNdLVObULW3u4baS4iS5n3eVEzgPJjrgd8UAN02ylsLYRS30+oOCT59yE3/T5FUfpXhv7Uni3W7u00X4beE9Nv8AW9c8Us76jbaVcw29zBo0LILx0lldER381IVJYH96xXlK9ivPGnh7Tb5rO713Tba7RgrW093GjgnkfKTnuKgXwD4dPjT/AITFdJtT4mNp9h/tXZ+++zbt3lbv7m7nFAHwFq17c+Hvgz8f/hGPD0/g3+0fFWlW+k6DNLA7Wlprc0CPEhgd49m8XbBQflDfhXvf7X2v6Pp3iL4OaXYvGPEmk+J4PELrarunsNGtI5X1CZscpG0OYv8AbLhRk16x4r/Zs+F/jnX7zW/EHgfRtW1W8eKS4vLq2DyyPGNsRZv9gdPSrVh8BvAujaB4j0rR/DOnaHHr9pLZ6hcadbJFcTo6Mh3S4y3ynjOcUAVfhl8Ym8e65No2oaHP4e1U6TZ69b20twk3mWVy0ixklfuyK0TB05C5XDNmvT68n+FXwi1Xwd4ik13xDrlvreqJolj4etns7JrZBbWzSvvdS75kd5cnGFG0AV6xQAUUUUAFFFFABWB4a/5Cfib/ALCQ/wDSaCt+sDw1/wAhPxN/2Eh/6TQUAb9FFFABRRRQAUUUUAFNbO0469qdRQBx154a1zWZ7ObUdcWz+yymaFdKtQjo5R05eQuHG12H3F9eKv2vgbSLeZLme3fUbxDuS51GV7l0b1TeTs/4BiptdvJLXU/D0cchjS4vnikUfxr9mnfH/fSKfwrcoA8C/bmupYf2WvHGn2wV73W4rfQraNv45Lu5itl/9G5/CrPhj4c6rYzo3iHwN4F0nTtC09zo17oUktxdwz+S8LY328XljySy/KTndXbfFP4VeGPi7pVhpXij7U1tZX0WpQLZ6jNZOs8Lbo33QuhOxvmX0ZQeorDt/gv4U8NapceJor7WdT1m20+5trebWvEN5frCkgG/Yk0rojHao3KuccUAek+Hv+QBpv8A16xf+gCtAjNZPh+8t/7B039/H/x6x/xj+4K0Ptdv/wA94v8AvsUAYuoeC9H1C7e7azFrev8AfvLOR7aZ/wDekjZWYexNUbTwpq2jXF5LpmvmU3commTVbVZ/mCIg2mMxEfKi9d1dR9rt/wDnvF/32KxdD1VbjVPEKTXUbpBfJFEpYfIn2aB8f99Ox/4FQBrJK0Fks14Y4nVd0xDfInHPJ7V8AeOPidceJvG/hH48T2PiW1tdM8W2dlo0j6dcJp0fhu5LWcszSlfLL3JuFn3eiW6feWvuXxr4c0nx14V1Tw5qdzKmn6pbva3Bs7treUxuNrBXRgwyMjj1rl/FfwX8H+NvhPb/AA41Rrk+Fobe2tVt4L945WigKGIGVW3nBRP4ucUAeUfCvwF4Y+JPx9/aG8Sa54f0nWbNdV07w4j6hZxzLi10+J5h86n+K52t/uD0rk/2a/2hfDvw6+Hfim0um1XUfCWj61qt7pN1bL58Vh4dF88FvMXdlLQLJFcIgTe2yL7uAK9Ws/2Svh7Z2usWJ1HxLcabrN5LqGq2Evim9EN/PIFWV5lWUb9wABHQ45rL+Lnww8Wa1rnh3SPCnh7wfefDjR7OLy9FvtZm06J7pH/dedDDaSrNbwgIUh3oGdju+6tAH0aDkA0tVxd2+P8AXx/99il+12//AD3i/wC+xQBPRXhH7Rn7YngH9l7U/CcHjdtQitPEJuBDfafAtwlv5Xl7vMUHfg+av3FbpXYfCv8AaG+G3xvtRL4H8a6T4ibbva2trgLcoP8AbhbEif8AAlFAHo9FFFABRRRQAViXnhDQdSunubzRdPu7iT78s9oju3bkkVt0UAYH/CA+GP8AoXNJ/wDAGL/4mj/hAfDH/QuaT/4Axf8AxNb9FAGB/wAID4Y/6FzSf/AGL/4mj/hAfDH/AELmk/8AgDF/8TW/RQBgf8ID4Y/6FzSf/AGL/wCJo/4QHwx/0Lmk/wDgDF/8TW/RQBgf8ID4Y/6FzSf/AABi/wDiaP8AhAfDH/QuaT/4Axf/ABNb9QXEXnQSR72TcpG5Dhh9KAOS1b4a6DdX+jyQaBpKRQXTSzr9jjG9PJkTH3efndD+Fan/AAgPhf8A6FzSP/AGL/4mvlfwr8TPGOheHvF3wOnvtX134yxX9zaafq93I/zabclnttYeVRtSOGNlRgOTNFsX5nr3/wCEXjbwxqukWfhrSPGbeMNS0yzRp767k3XF4mdhuc7QsiM4b50ymeKAOtTwP4cjHyeH9LT/AHbKMf8AstV9S8EaJNp91HBounJM8bKjfZUGGxx2rpK+aPiJ8SLz9nz9oX+3fFeraxe/DzxbpP2TTbSNXnistYg+b7NHEi8vcxD92vLF4nA+/QB7npngjRINPto59E055kiRZG+yoctjntVr/hC/D/8A0AdM/wDAOP8A+JryH4Q+LG8O6pqMfj7xVJa+LvFN8t9a+Fby985NEt5d/wBms1YcCRlR2PPzPuVMqi17uOlAGL/whnh7/oB6Z/4Bx/8AxNZmmeAdJtr/AFeS40fTZIp7pZbdfsyHYnkxpj7vHzo5/wCBV51+1Vc+JfC3hPQ/HXh3UNUW08JarDqeuaTpkmG1LSww+0pt/iZE/eBe4Rl/irC074s2PjLx3Z/Em48YSeFvhNp8R0zS3vLz7Lb+J76ZuJkR/vwou4R7fmkck/cRdwB7t/whfh//AKAOmf8AgHH/APE0f8IX4f8A+gDpn/gHH/8AE1tUUAYv/CF+H/8AoA6Z/wCAcf8A8TR/whfh/wD6AOmf+Acf/wATW1RQBi/8IX4f/wCgDpn/AIBx/wDxNH/CF+H/APoA6Z/4Bx//ABNbVFAHy/8AtT/sIeEv2qNV8Gtq2pT+G9K0Frkz2+i2sUc1553lYHmsCE2+V/cb73au0+Cf7Hnwj/Z88qbwb4NsbPVo1IGs3ebm+ORg/vpMsmf7qbV9q9sooAKKKKACiiigAooooAKQHNeF/tb/ABLt/Avw5stH/ttPDl74t1GPQotU37GsoZMtc3Ib+EpAkpU/3yleU/AH9p+Dwv8ABa90CS5l8e+IPDPiePwXpckNwqyawk7/APEumeR+EDQkB3bPMEh+Y8EA+y6K+Zl/a31638eX/gO/+HSwePE1S20qx0uDXFlhuvOtpbo3Jm8ldkCQwuSdhfIxsrNT9srxOdXTQx8JLm58QS+Ibzwsllaa9C6fb4LZblQXdExC8Jd/M2/KE5XJ20AfVdFfL9t+25pjX3h+5fw6sfhzWNRuNOhmi1WObUQIElaa7+wojN9lRoXHmbwcbW2YIq7pX7VniG9vfBMtz8N/7P0Pxnpt3qujX0uvQ+YYobY3ISdCgSGR48MP3jIBnc420AfSdFfHWu/tt3et+CviJZ6RoVjF4n0vwhdeJNLvNK1oX1jPHH8krJceSgLwl0fCq6NkYeug8QfthXfgfw3enUPDNk2teHtGg1HXorzxBFbrG8qs8Ntbv5TG4uZETf5aqFG9F35NAHpWgfCnWdG+PPjL4j3+q2WqWWraNa6RZ6VDYtHNbRwPJJ/rTKVfe0z5+Veiehzxf7NvhXXLTxVcax4i8Ban4SuYtJXS9NtJZrMado9gkq+VYWqQzO7sQqvJM4XJRQAoVRXo/wARvjFafDr4e6d4mm0m+vbzVbizsdN0VQIrm5vLp0SGA7ztRtz/ADE/dAb0rzzX/wBqnVPA+tT6F4o8CnTfEcU+kv8AZrXVluLWaxvr+Ox+0xTeUpLRTSorxFF6qQ2DmgD6Lryf40/CbWfij4i+HF1aa1ZabpfhfxDD4gurS5sXme8eNHREVxKgTAlc8q3zBD/CQfMf2jv2l/EvhPRPizpHhjQTDq/hEaGU1Nr9F8yPUZGTeEKNtKMmzHOd+flxVy9/ap8bWNz48hf4OXcreBvKm1ryPEFs/wC4e2S43W/yfvpAhc7Ds+6vzZbAADx58N/FOoeNvGem2ehz3lp4m8TeHdbtdbEkf2ezhsntGuEky+8Mv2NyoVOTcD5vvbfpkdK+ebn9rW3b4c/Ezxnp/hp7+w8HpZ3UCLfKn9pWlxa292kyts/dny7j7hz933rX+G3xE8YeIv2hvij4b1LR0h8N6GLBLO5W+EhRniZwfL2A5kDZPPy7AOc0Ad/8U/DWp+N/hx4k8O6RqUGjalq1hNYx389u1wlv5iFGfYroSQpOPmHOPpXmPi/wVqnhv9lS38CaFYf8JlrGmaXaaEsWjiKFXeAIjHbNLhAAnQuSM1U8QQeJPiN8WPjDpug6y+jatofhODRtAnZysVrfXsc0z3RC98paDONy+Ucferzb9irWtL0n4j+MPDeq6Zr/AII8bma6abw5fXz3mnXiRvCHnhuWLCeaNjtZ9yvtmG8N8pAB9jWF095ZwzPby2ryIrmCXbvjyOjbSRkexNXCcV8t634o8V+Bv2p/iZL4T8JT+MfN8JaNqV1bTa39kijZJtRTbEHV/wB46ogCKqp8jFmBb5vKPj/8c7X4tfDXxtqehXniOysr3wBpPiOxRtRWK2j8zUNvEUa70mVkKOS5Uhdu3vQB99g5pa+PND8UXHhH4heJrc3etpZ3nxn+xM9nqKpGgk0S1m8uYSK7PAzbz5abcHbyoWu60f8Aaxm1TR/DPi258E3Nl8NfEmqRaZpviFr9HuMyy+TbTzWuz93DLJtUNvJG9CyjPAB9E0V81+Bf2s9V8WJ4S1LUfh1c6H4a8Ra5ceGYdT/tWK4lhv4Xnj+aFE/1LSW8iCTdnd/BjDHr/wBni+uLa7+JnhWWaS4t/DXiu5trN5XLslvcQwXyRbjzhPtZQeioB/DQB7LRRRQAUUUUAFFFFABRRRQBwGu/CtNf+Lnhfx1NrN7HPoFld2dvparEbVvtGzzJGym/f+7jAKsPlBH8TZ+d/wBsvwh4Y+Edv4j+NOv3Wv31tPJo9vc2GjzW8Eti9rcbre+tiY/nuImkfCytsYOytxgUUUAfM+n/ALQPhOTRtf8AiveyeMdT8O3HjGxFl4lkks4vFFjfxafPDI6xon2R4CBHEIm42STM2TtFe+fsceF4fjlo9t8SrHxDrNvpGn+Ob/X9JfUYrZtRv3ltFtp/7Q2p5edssyJ5O3CFO6iiigD1Tw5+ylpvwnPiG68P69dp4WmlutRk8MCzs4hcNIXke2kvBAZ2tmZj8hYkDjcV+Wvj74G+LvBv7WXjvwh8PNAvPGUOkad4Y1TS9Q03xLPavBpVhcW4timmywp5jypIqIsk/Pk7h1OKKKAPsK7/AGQH164W48RfEPWtYc+Fr/we0aWdpbxLYXSRqdiJF8sgaJH385IxjbxSt+x9Fb+M7fxbpnjvVLHxNNp9vp2pao+l6dPPdpBuEMqGS3IgmVGVN6Lgqi7lJG6iigD034k/CbTfil4Ht/DV/fX1vJaT297Y6tBIPtdreW0ivDcqzAqXV1VvmUq3zAjmvPtf/ZQtvG9r4ovfF3jHV9d8S6tZWljDrccFvbNpsVpci6g+zwomzd9oRZWL7txUDheKKKAKWqfsh/8ACTL49fxD8Qtd1W88Y22mW2pXC2tpD5b2U/nWzwqsWEA3EFTuzuJ615P4GsLz45fHn9ofwDbeN9d0W1t20yx12WKwsxLqcTWK28jJLtPkuxil5VMbX4VT0KKAPV/GP7HGn67ZeJ9F0bxnrXhTwv4o06107UNFsIbeVCba3W3hdJJEZk/dRxqwH3tg6V6L4Q+Ecng/4ia14s/4SfUb+fXrazg1GynhgEEs9vCIknG1AyMVDZUNt56UUUAcx4g+GkWofGDxXbXNxKmg+PPCyw3wtJ3huoJ7OTy1kjdehaK8AznIMK9d3Dfg1+z7deBfF+peJfE3ie98Waybm9Omy3AiRLeC5aFpHKRxRjzpPJi3HkDZ8uNzZKKANfxz8DLnxL48uvFuheM9V8I6jqWlJompCyggmW4to3leJl81G8qVDNLtcZ+/yprifFH7EnhjWtKvNMsPEGsaJo03haz8JrY2ot2WKztp/PRgXiLNIX3bmJ5zRRQBtP8AstQT65NqcvjLWJXn8Xw+M5Y2t7Xa10loLXy/9V/qmiRAR14zuqton7Jtppdp4c8PSeMNZvvh74e1GPVtK8LSpCqQyRSNLDG84TzZIYnZSiMf4FyWCgUUUAaGj/sx6doXgnwn4fh8Tas9p4c8Ty+KYpnjg8yed7iacxP8mPL33En3cNjb83FbP7PegTWeieKfEt3Kkl/4r8QXmrShCSI41ItrePJ7rBbRA/7W6iigD1iiiigAooooA//Z)
![](data:image/png;base64, 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)
Refer to Figure 26.8. This economy cannot continue to produce
Y
2 (or at Point D) because
◦ the price of raw material and wages will decrease shifting the aggregate supply curve to
AS2.
◦ the price of inputs will increase, shifting the aggregate supply curve to
AS1.
◦ the price of raw material will decrease, shifting the aggregate demand curve to
AD1.
◦ All of these.