Question 1
Use the information provided in Table 7.2 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
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/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCABVAUgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD6T+NP7OWheFNf0FvDXw5+CFlo2s6za6NDb6r8NY724iMqMWmaWO6gU4ZGAjCDjB39h0knwp+AHgV9M0Lxt8Mfh3deJnCi8utC+HoawgDyFYpZ2WGZbJHxx9olAyr4dgpNer/GH4c+IfiE3hRtC8Q6ZoB0TWItXk/tHSJL/wC0NGCEQbLmHYPmbJ+bPGMYOeH+IH7Ken+MvjHN48WDwVqRvYrSK9s/GPg6PWpEMBID2lx58T27MhAIPmLlVYKDnMQ5lpLZy+6Nl/7df/hrBU1d49Ir5yu/05f+HucX8RfAfwCs9F8V2HhD4VfD6XxVpdldzW93e/Dr7Vo5uLZHeW3a6jhjgaQeW6tGs4dWVsrlStQ+GLT9lbW/Dc+oTfCrwf51jpC6xeeR8N3MctuCqyT2h+xn7XCrsMvAZFAKknBBr0gfA/xvpnhPxb4Q0fx5o0PhXV479bCLUfDUtzfWDXbs8m6dL2NJlVpZtoMSt8y5Ztp3QeK/2f8Axbr1loxsvG+j2Gp23hG88J3txL4clminS48jM8UYvVMTL5A+VnkB3Hms26l5OK6aX72lp9/Knr/wL91uN9NXf0vD79OZrbzRxujaX+yTr/2n7F8NvBTiK1W9haX4feUt/C0ixI9kXtAL0NI6Iv2fzNzSIBksuaV34F+AviaLQbzwX8LPhvLAviS30TXNO1nwDHbX9uJRwhhmjhktpMMjgyxsGUjAwwau18Zfs0+I/Fd74B1SLx1Y6ZrfhXSvsX2qHQnaO4nSa3milWM3XyJvtVV4izl0d1DxsQ62NR/Z98XX8z60vjfRYfF99rlhq+p6gPDUhtJo7NdsFtDb/bd8S4yWZ5pSS7kbQVC7NNtNO3vL/wAB5l/7be6t6a6HPebhLSzs7evLt8pdfw6mEvgj9lg+MLfw0/wy8CwahdTS21rc3HgaOKwup4wxkhhvWthbyyrskzGkjMDG4IyjYwlh/ZLe+vbVPhLoEjWlhLqskyfCq5aB7OMEm5jmFh5csRCna6MyvxsLZGe8PwE1TTFt7bUvEUPiHwLoOqT+ItL8PLox/tFrjMsiQS3RmZJYleZyirAj/LEC5Ctv8a/Zc1nw74I1zT00nxh4T8ReG59Akm1xVku5rrwnbxqskdtdXM95JBbRh3kQwLBaAlCwiURsq5pys7tXSv1000v897XSS1avps1bXfb89fwtbbfbQ9R8L/DD9mnxlf6HaaT8IPCU0mt6V/bVjJN8PRBFJabgodpZLRUjYkriNyrkMp24YE9r/wAMnfBD/ojfw/8A/CXsf/jVXPgJ4HtfBPglYbG9kv8ATJppTpZkj2fZ9NErm0gXgZREfKkjOG5z1r0mtfl/X+dt/MlX73/rf57ry0ep4L8Sv2XvhXpHw/8AEN/4b+EHwyi1yzspbm0Oo+DrS4t2dFLbXRfKJDYI4dcZzzjB8/0X9nXwx4g+CfgfxHD8OPgtaeIdYFhdXsj/AA2iltPJujGBHHCLpXV081fnMjBth+Rd3y/WGqadFrGmXlhPu8i6heCTYcHaylTg+uDXlPgD4ReN/DGneHfD2teO9L1rwhoCQR2dtaeHpLPUJlt8C3Fxc/a3jcLtQtsgj3soI2jKlwdnK/Xlt8ubm++69bBK7Ubed/na33a/eeaaTYfsla3rsGkWvwv8JfbZdR/shjP8N3hht70uUW2nmeyEcErEDakrKzBkKgh1JxJrT9nyy8W6Bodz8AfCMzaxr99oscuneAprhoBbxFt8qHTFKsWCgrkqEbzRI6AkeoL+z/4sm8G6npV3420ebVZvF8Pi2zvo/DsqQwOl2lz5EkP20mQFk27hIhAPQkcmm/AbxrY+MoPEL+OtCnlt/E1xrsMB8LyBVt7i3NvNbZ+3E79u0rMMYbdlGVtozpOTs5pLTX19za3m5/Jel1VvdqntfT09787R89fuzNE+F37NPiLxjN4ZsPhD4Rm1GLzsTv8AD4R2MpiYLKsV41oLeVlY4KpIxBDDGVOKDeC/2WE8WReHW+F/glNQuJJYLWVvAaCzvJ4gxkgt7s2vkTzLskBijkZ8xuNuVYDs/h58A7/wb8S77xVca5pUUEzXL/2d4Y0eXR4715Xz52oIt1JDdzqoAE3kxvnJzghRSt/2etehmstOk8ZWN34S0bV5te0TTrnRGa7t7xmlkiW4uftIWaCOSZ2CJFE5CRgy/KxdLnaXR9f+B8vx6rcvdv8AD+vw8t7M8/8Agh8Pfgf8T/hrqnju/wDg54FstHDS3MFvcfDpNNktbVE3bWe4jxcnAJM0QVOduMqSafgf9nTSfiToeleNdO+EnwR0Pw5qsUd/Y+Gr/wACxXF7LZuoaPzb9JFjikkQhiFtpBFu2/vduT738GPhlqPw4+FVh4L8QaxYeJls4ntVurPTXsUkgP8AC8bTzEty2WDAEEfKMc8r4L+Cnj74YaXF4X8JfEjTofAtqwj0+y1nw0bzU9OttoH2eG7S6ijYJ83ltLbyFQQHMoXm6afMlJ9I/f1vp6W0776XTu199/0t269unmcX4i8M/ss+E9X1HTdY+EHh3TrmyjnlYz/C+YRXCwrvl+zS/YdlyVQM5ELOdis2NqsRQi079lTVtM1GfRfhX4Kv7iHSpdYs0n+H7wxalbooJktZPsLG6Qbk3NbLMVDA7TwDB4//AGdm+HV/rHxW1zxtoJ/sNdWvZdRvtAVNQurO4hnQWtzqEl0WYxiVEi2iOJQoXySdpXqfhT8ONd+IXwi8L65feO9A1+/TwwbDw/qGl6KyWNqtxbxxySzILt2uZQE25SWJOW+QHkYSlUcZqHxJL73zf5K3ne+mpTcVOKa0bevkuX/N/hpujmR4d/Z7t/H/AIe8KXXwE8KS3Gq+HG8QG80nwE99bx48vEaOlhh1Id/nOwgqilA0irUXifwV8B9X8AeJNX8EfCTwDBrPh+S2e90/xR8NzZTLFI46288NvKA6hwkuCmVbhtpWu91H9nnxnd6NoMFr8R7PTNUs/Ck/ha91Wz0GSKaZW2GK4t2W8DWzqYkLAM+7nb5Z2led0r9kHXvDugePrHQvFnhTQJvF9vZJONK8FfZrW1mgdy0scKXgLl1fkyu77wWLsuEXpnazUd9bf+BO179OW36rc548/Lru7fL3Vf8A8mv+d9j0n/hk74If9Eb+H/8A4S9j/wDGqP8Ahk74If8ARG/h/wD+EvY//Gq9NsEuo7G2S9mhuL1Y1E81vEYo3kwNzKhZiqk5IUsxA4yetWKHozVHx38T/hd8O/hT8VbKbUfgp8Kbz4UfYRNq95F4Ot01DRizFEupH+ZJbYOuJMRo0asGJZVYjV1D4T/BjwT4z8RzeK/hp8MD4LjOmxaYdM+HSS3EUl2zov2iaPzVZCyAB/KjUb1y3c+9yeDtcufibc65cavpM/hifS/7ObRX0mQ3JO4sWa5NwUKklhs8joQN3r5zB+yumk+BvGfhTSfFM1rpOpvaNoMVzZicaHHbS+fFB99TPCsxbCkoyxkRhvlDDH31DTdX/N6flZ9vSzc1eXuvTT/0nf7911/E53xP4T/ZV8GjxM2tfC/wZp8fhqa1h1aWX4fjy7X7RnyZCwtCGhO1szKTGuDuYVh+f+yCskkcvwy8LWskEscV0l38MpoWshJsEUtyHsQbeF942TS7Y2w21jsbHV+JP2bPiB4nXxrLd/ErQmvfFUGmx3T/APCJS+TbNZys6eSgvwwRg2Cru7bsnfghV3vEXwG8VeKpvieL/wAa6WLTxlo9vpsMNvoMqmwliRlExJvGEoJkclAEJAQbvlJbWHxWlt/V/wDgevlqm2o6LX+rfpc8h+H+j/s/W8NxpXxB+GHw2t9et/EF5oT6lpfw88nSBIl00Vukty0UsNtLIvlHy5ZwxMi4yHXPcaR4F/Zf12x1q7svhJ4Tlh0m1N9Lu+HRR7m2Gf39orWYa8jOOHtxIpyuCdy52J/2adb8T+Hdc8IeMfGGmaz4E1y8n1HUdL07QXs7qeeWXznT7Q91KqweYSwQR78BQZSAd0fwd/Zfufg34b1nT9Jl8AWuqXGl/wBm2WvaT4DTTr04GA980V0BddFYqghBYE8ZwI5pOLutbaebt/n1uXUs5tw2b27K/wDl/TM7wV4E/ZY+IPhi/wDEei/DbwBJoVlbpdzahe+C4LOHyHTzFmVp7dA8ZUH51yuVYZypA4zxwP2Y9B8EeJ9U0v4N+FZ9a0Y20cuj33w2e3vYzczCGGc2klok7w7yfnRdrbGUNur3TRfg1et+z9b/AAz8ReIkv5YdJTSBrWj2JsXVI0CQyrE8s2JFCoSdxUsCdoB2jivGP7N3jTx9Y399rXj7QZPF9xb2enxanb+FZY7SG0t7pbsr9nN8XMskyJufzgu1FCxg5YqrGT5owenf79vw32312Jhe13v/AF69PW7Vna9zzH40fC34d/D74aeAvEVp4E+Cmgpqmo2lhq+r+LvhulnawpMpJn+zyzwyW20qf3czsfmCllIyd+y8C/s9eB/h74e13x74E+FmrRa5ctDput+Ffh5mwvg2WgCIsdwUeRQAoMjCRsCMsWAr2n4sfDXxT8QdE8IppXijSdE1vQ9Vt9Wmu7vQ5Ly2upYo3XaIVu4mjUs+7/WsQABk9axte+EHjrxHovhOC78beHk1HRfECa5LLb+FpI7aVEyEgihF9ui+85LvJISzZwBxVXkpS00cl/4D7t//AG5rRej0QNrTT7L/APAvea+/3V1+WrPONDsf2SfEWs6fpdn8MfCK3l7e/wBmqt38OHtkgvMsBa3Dy2arbTttJWKYo7BkIUh1JSztP2R73UmsU+Gfg+KSPUTpFzNcfDlobezvN4QQXM72Yjt3ZmXaJWTfvQrkMpPdP8BfF02l+JIJfG+kPd6h4ttfFeny/wDCPTeVZtDLE/kSRm9JlVhAg3K0eCXODkAcf8KLIfHPWfiZbW3jnQtW8AJ4xle60XTLNZb4yQmBlV7xblkELvCTtEAcjIEg7F7uMVo7Xa/8A6+spLZ7JrzmbaTcVpey/wDJ/TpFPpu0ZeleBvgR4as9fTxt8JPAF1f2Gs3lnBF4Z+HP2uZ7WLy2ErW0EVxKFQSory8JuK/d3Ba2bPwv+ylqerQ6dp3wy8E6tPPobeJIJNM8ArdwT6eOs0c0Vo0bnPyhFYuWIULkgVvaZ8APiH4f8eaz4v0r4kaFDqt/d3TJb3XhSaW0S1nMTGJ0XUFZ5FaCMrKHUDdKCjBl2SJ8HPC+jan8OPB2ja9jXfDMc7XqDy3urrTLhXNytwigbI551jO4BRuU7ehFRDnVOHM1zWV/W3462b+aV9GP7Un0u7el9PTTReqbtqjAfwj+yxGuis3wp8IhNWghuo5P+FdnZaxTHEUl432PFkr87Tc+WDtYjhTieLwL+yzJq+paefhj4GgNhFPNJe3HgaOKwlEP+uEF29sIJ2TkMkTuylXBAKtjX+IH7Ken+MvjHN48WDwVqRvYrSK9s/GPg6PWpEMBID2lx58T27MhAIPmLlVYKDnOF4S/YxtfBE/iBdMT4eTw3sd8llqGpfD6GfVovtDM3l3V2LlRdRAOyMpiRnTAL5yxq8mtu/4fD9/4BZrrfb8d/uO9+B/hn4QR3mpaz8Ofh9png/U4B9gu5l8GSeH73Y2yTYVmtoZWjbCN0KkqO68FavwS+Etz8JtI1G1utXgvmvJ1kjsNKtp7LSdPjVQqxWdnLcT/AGZOMlEfZk5CqOKKsFfqUv8Ahmnwj/0F/iB/4cfxD/8AJ1H/AAzT4R/6C/xA/wDDj+If/k6vVaKBnlX/AAzT4R/6C/xA/wDDj+If/k6j/hmnwj/0F/iB/wCHH8Q//J1eq0UAeVf8M0+ER/zGPiB/4cfxD/8AJ1cD8M/Avgb4lat4osIZfiTpkmjXMSxNdfEnXyL+0lTdBeRAX+fKk2yBc9fLP0HsHxcsvFuqeBb+w8F2+mT6zeYt2bVdRlsY44G4lZZYoJmEm3IX5eCd2flwfLdI/Z71f4Y/GXwl4l+H9vH/AGH/AGa2keJE8R+MdUv53tdytClslyk4HkMHZMPEG8x1IG7cEm+bXbb57/8AAvtq+qQ2vd09f0/4PfRdGzsP+GafCP8A0F/iB/4cfxD/APJ1H/DNPhH/AKC/xA/8OP4h/wDk6vVaKYjyr/hmnwj/ANBf4gf+HH8Q/wDydR/wzT4R/wCgv8QP/Dj+If8A5Or1WigDyr/hmnwj/wBBf4gf+HH8Q/8AydR/wzT4R/6C/wAQP/Dj+If/AJOr1WigDyr/AIZp8I/9Bf4gf+HH8Q//ACdR/wAM0+Ef+gv8QP8Aw4/iH/5Or1WigDyr/hmnwj/0F/iB/wCHH8Q//J1H/DNPhH/oL/ED/wAOP4h/+Tq9VooA+afjN8ONB+FWh6ZqlpZ/EHXbWfU7Kxu5W+Kmv2yWqXF1DbB/+P12d906kIFwQj5dPl3WfGPws8O6d4hi8LeFz458ReLZLX7e9pd/FTxFZWlpbbmVZbicXUrIHZHRFSN2ZlPAVXde6/aN8HeLvH3gGDRPB9lol3eNqun30za3qc1lGiWt3DdYUxW05ZnMITkKAG3ZONp84+L/AOzRqnxI8aanr9x4T8E+I5fEOh22mXDeIr65ZvD1zF5w+1WIW3bz2H2hiCDayZiXEi7zstWcV3vr6WVvLe/5XWhp7tkuv/BW/wAr7etu/oUX7NXhQxIZNW8fJIQNyp8SPETAHuAftwyPfAp//DNPhH/oL/ED/wAOP4h/+Tq9J0exk0zSbKzlupb6W3gSJ7qc5kmKqAXb3OMn61cqXvoZRu0rnlX/AAzT4R/6C/xA/wDDj+If/k6j/hmnwj/0F/iB/wCHH8Q//J1eq0UhnlX/AAzT4R/6C/xA/wDDj+If/k6j/hmnwj/0F/iB/wCHH8Q//J1eq0UAeVf8M0+Ef+gv8QP/AA4/iH/5Oo/4Zp8I/wDQX+IH/hx/EP8A8nV6rRQB5V/wzT4R/wCgv8QP/Dj+If8A5Oo/4Zp8I/8AQX+IH/hx/EP/AMnV6rRQB5V/wzT4R/6C/wAQP/Dj+If/AJOo/wCGafCP/QX+IH/hx/EP/wAnV6rRQB5V/wAM0+Ef+gv8QP8Aw4/iH/5Opsn7NvhCKNnbV/iCQoJIX4i+IifwAvua9XqvqNvJeafcwQ3DWs0sTIk6DLRsQQGA9QefwqZNqLcdxrfU+QfglB4d+Mer6f5dp4wg0DVbCa/sr/TPjF4hv7i1EcioYdQg+0ILWYksAqvKN0Uq7srz7j/wzT4R/wCgv8QP/Dj+If8A5Ork/g78BNX8GeOdN12+8P8AhLwxcafYS2d9qnhm6mmvPFMjiMC4v90EOGBjaTDtcvvlOJRhzL9A1o7JJL+v6XkvNXFe7btb+v67nlX/AAzT4R/6C/xA/wDDj+If/k6j/hmnwj/0F/iB/wCHH8Q//J1eq0VIHlX/AAzT4R/6C/xA/wDDj+If/k6j/hmnwj/0F/iB/wCHH8Q//J1eq0UAeVf8M0+Ef+gv8QP/AA4/iH/5Oo/4Zp8I/wDQX+IH/hx/EP8A8nV6rRQBxXgr4Q6F4A1WXUNMv/FF1cSwm3ZNb8WarqsIUsrEiK7uZUVsqPnChgMgHDEErtaKACiiigAooooAwfHfiweBPB2seIn0u91mLTLZ7uSy04wi4kRBl9nnSRpkKCeXHTjJwDxnw4+PEXj/AMUQaBeeC/E3g7ULrSBrlkNeFkyXlrvRGZGtbmcKymWPKPtb5xwecdL8W7LUdT+FnjCy0jTpNW1S60i7t7WxhkjjeeV4WVEDSMqLkkcswA9a8O+APw28UeG/iLo+pReEPEfg7Rbfw+dP1qTxnrlvrN5qFwGjNutrKLq7lhgiIuGKebFGTKCIicsIhzSquL+G36Sv+S/LrdOduSPLvr+cbfg5f0j6doooqxBRRRQAUUUUAFFFFABRRRQBxPxR+K2n/Ciw0y81HS9W1KC+v7aw36ZbCRLczTxwJJK7sqKvmTRjG4uckqrBWxS+I3xkh+GV2smo+FfEV54fiMIv/EdlDbtZacJJAgaVXmWZ1XcCzQxSBRksRg4w/wBqLTvEeu/DWDS/DPhPUvFmoS6zpd08GnXFnD5MVtfQXMjMbmeEHKwsqhSTuK5AGWFD4l+JfGOt67pulH4T+K9X8IrFBfXn9n3ei7rucFZFtZBPqEZWONgPM2hhIRtDeWG8y0o2T63/AAsvw3176GjScfOz/r16W+fdnt1FMicyRI7I0TMASj4yp9DgkZ+hNPqDMKKKKACiiigAooooAKKKKACiiigArkfit8SrL4R+BdV8Vahpmq6tZ6dBJcy22j2wmmMcaNI7fMyooVEY7ndRwACWZQeurzf9o7Tta134FeOtF8PaDeeI9Z1jRrvS7WxspreJjJPC8SuzTyxoEUsC3zZwDgMeKPU1pKLmlPYtePPiy/gnQ7fV7bwZ4l8VWRtGv7ltDitibOBV3FnE08XmHGf3cPmSHHC8jPY6LrFn4i0ew1XTp1utPvoI7q2nUECSJ1DIwzzggg8+teLeM/Enju78F+GtCs/hd4uksb+x8vXDp99oy3lrGBsNspk1BEDyAZMsbPtQ/LhzmP2Tw3L53h/Tn/sebw+DbpjSrjyfMtBtGIm8l3jyvT5GZeOCRVtJc1u+n9dtrfPo0Y62i+61/C363+XnfSoooqBhRRRQAUUUUAFFFFABRRRQAUUUUAUdb1zTvDWkXmq6vf2ulaXZxNPc3t7MsMMEajLO7sQFUDkknArj/Bvxw8KeO9Vh07TTrlrcXEZktm1rw5qOlxXQA3EQy3VvGkzbcttRmO1WbG0EjF/aX8F6/wCNfh1aJ4asY9Y1PSta07Wf7GmeNE1KO2uUle2zIVQFgpxuZV3BckDNangX44aV8QL2wsrLw54z029ni82ePXfCt/psdmNm4rJPPEkLsGwmInkJJyuUBYELyb8vyte/puvl5oHpt/Wu39d/JnolFFFABRRRQAUUUUAFFFFABRRRQBU1fVrLQNKvdT1K6hsdOsoXubm6uHCRwxIpZ3ZjwFABJJ6AVy/gH4v+F/iXeahZ6Hc3631gkcs9lquk3em3Aik3eXKsV1FG7xsUYCRQVJUgHIpvxq0y61r4R+MNPstHj8QXN3pdxAulyjK3IZCpTAdCSQTgBlJOBuHWvK/2ZfDtxoXifWRp2p+NfE3hVdLtbaHWfiJpMtlqkU8bOPssTTwW80kCxlXJaIje5IldmcIR1k12X+e43ZRv/XT/AILfb8vomiiigQUUUUAFFFFABRRRQAUUUUAFFFFABXOeNvH+kfD+whu9WGoyiaTy4rfSdKutSuXOMkiC1jkkKgdW24GRkjIro68/+MXxPk+GmiWr2mj6xq2o6hN9ngbTdCv9UiteMtNOtnFI4RR0XALnCgqNzqmVFczsR6r+0D4F0nwvoPiD+1rjU9N123a704aLpl3qVxcQKFMkogtopJQib0DsUAQsobBIFdn4e8Q6b4s0LT9a0a+h1LSdQgS5tby2cNHNGwyrKe4INfPWg63pXwx1nwh4hsPDfi/UvCR0C90v7ZD4U1Fr9b5rqOeQzWItxcRCdhK/mGNYsqBkApn1j4C+GL7wd8HfCWkanAbTUILFGntW25gZyXMR28ZTdtOMj5ep609bXt3+Vm1bzurPpZdNUzPW9v6eifys7rrsd9RRRQUFFFFABRRRQAUUUUAFFFFABRRRQBgeNPH/AIX+G+kpqni3xJpHhfTHlEC3utX0VnC0hBIQPIygsQrEDOcA+lVvA/xS8GfE6G7m8HeLtC8WQ2jKlzJoepw3qwswJUOYmbaTg4z1wa4r9qrxJpPhP4N3Wo61qVrpVgmraQHubyVYo1/4mNt1YnAAAJJPAAJPAJrk9I8TeGPiz+094Y8T/Du8sPEdjpGh39n4h8TaHMk9m6ytAbWya4QlJnDLJL5YLGMAEhfMXIrvZX/TS/8AW2/fR1JWipf1/X+X3fRNFFFBIUUUUAFFFFABRRRQAUUUUAFY+neMNB1fXtT0Ow1vTr3WtLCG/wBNt7uOS5tA4yhljBLJuHI3AZ7VzPx91TxBonwS8c33hRZW8RwaPdPYeQjNIs3lnayBVYlh1ACtyBweledfsu+Om1WW78M6Rr3g7xn4Q07ToLm21vwVBKkFtcySSGW1uJGnnWa4PyzNIGSQl2aSNd6lnFXb/r+v662THor/ANdP8/lvte30HRRRSAKKKKACiiigAooooAKKKKACiiigArC8Y+O/DXw70j+1vFfiLSvDGl+YsP27Wb2K0g3nO1d8jKuTg4Gc8Gt2vOfjP8YfB3wZ0zT9T8Tanoun6jdSta6Smr38FkJZWA3fvpSBHGBgu/OABgMxVWTLjHmdjtZPEekxeH2159Usk0NbX7c2ptcILYW+zf5xlzt8vb827OMc5xV6KVJ4kkjdZI3AZXQ5DA9CD3FfEvx48T+GPBH7GjaPov2Txn8P5tD1KCTX9C1fS10sagyyGKFTNeRlo1nd2SKESsPJjQBiMH6w+Eviq08b/DHwvrtiAtpfafDLGBcQXGBtAx5kEkkbcjqjsPetnFcjku9rf1/XUh6KN93f8Lf5nW0UUVkAUUUUAFFFFABRRRQB+Vf/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAH/AA/O/wCqJ/8Al1//AHFR/wAPzv8Aqif/AJdf/wBxUUUAH/D87/qif/l1/wD3FR/w/O/6on/5df8A9xUUUAe//sU/8FIf+Gwfinqvg3/hXf8AwiX2HRZdX+2/239t37J4IvL2fZ48Z8/O7cfu4xzkFFFAH//Z)
Refer to Table 7.2. Which technology is the least labor intensive?
◦ A
◦ B
◦ C
◦ D
Question 2
Refer to the information provided in Figure 7.2 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 7.2. The marginal product of the second worker is ________ lawns mowed.
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