Elasticity and Market Power

Consider the following graph. ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAApUAAAI4CAYAAAA70xKXAABTyUlEQVR4nO3de3TU9b3v/1cgIZAZCEnIjQoJCVFuiSENgty0wt52yxa2tWoPdv04da+yVu1lbbt6O+d3PLY/z9m7F5fuX23t7+hp3exVOCJai27sdhcsJhBAKIQE8ZIrSMkNEhJmQm4kvz+G75BkZpJJvjPzncvzsZZL8v1O5vsRIXnl8/m835+4oaEh3ZAr6Z8lbREAAAAwttOSfijp95IUdyNUFks6KCnZmjEBAAAgQn1F0r8YobJRUo6lwwEAAECkWjBF0t+JQAkAAIDJ+4cpci19AwAAAJNVPMXqEQAAACDyESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYFrUhMra+gZtfvjL+slzz1s9FAAAgJgTb/UARnt971vasXP3iGu3Fy7T17c/pqzMjJCNo7OzU719fZqVnKyEhISQPRcAAISfOElT4uKsHkZYC7tQ6c3p6jP66XPP69kfP+3zNQvzFujNV38buGeePq1Lly7pjtVrlJo2J2DvCwAAIs+UuDhNjydUjiVsQ+WaO1fq+098U7X1Dfr2D55UbX2DmltaVVffoJ8897y+vv0xVVZ/oMNHjunr2x+T3WbTT557XgvzFrjD5+hZz22PPqIHt9wvh9OpX774Gx0+ckySK5A+uOVvtebOlZb8twIAAES6sN9T6XQ6vV7fsXO3OxTabTaP+96W0R2ObknST5593h1GjdnNX774Gzl8PAsAAABjC9uZysNHjmnzjdAoufZVZmVmqK6+wX3txeefde+zPDzstZL0zv4/Sbo5O9nc0ipJam5p1enqM7LbbLp34z2SpDV33uEOqcY1AAAA+C9sQ+Vw9268R9sefWTEtazMjDELdxwOp/tzjddLripxSXI4ndr88JdHfg4zlQAAAJMStqHS2FM5WXa7TQ6n0z376HA6dbrqjPLzFrju22x69sdPu8Nmc0trSKvLAQAAoknYhkqz1qxaqdf3vqVfvvgb/fLF30iSHtxyv9bcuVK3Fy7T6eoz2v7Nb4/4nF0v/y+v+zMBAAAwtrAv1JmsbY8+MmJ/pN1m08K8XEnS00/+wGPv5Jo7VxIoAQAAJiluaGjoh5Kesnog4aasrIw+lQAAQJLRpzJq5+IC4T1+dwAAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESoBAABgGqESAAAAphEqAQAAYBqhEgAAAKYRKgEAAGAaoRIAAACmESp96O/vlyT19vZaPBIAAIDwR6gcpbOzU//+7/+uzs5OSdLpP5/QyePH3CETAAAAngiVw/T396usrEzd3d0jrrc2N+ujD6otGhUAAED4I1QOc+7cOZ8zkn/59FNmKwEAAHwgVA4zXmi82tUZopEAAABEFkLlBMyYkWT1EAAAAMISoXKYnJwcn/dS0+ZoRhKhEgAAwBtC5TBJSUn67Gc/63F95qxkFRYvt2BEAAAAkSHe6gGEm5ycHKWnp6u8vFxOp1N5Cwt06+IlkqS6mhpVVZ7UtGnTtHrdeqWkplk8WgAAgPDATKUXSUlJmjFjhiRpTkaGJKmivEy1n3wsp8OhjvZ27dv7e1WdOmnlMAEAAMIGodJPLc1N6u526s6165UwbZokqa62xuJRAQAAhAdCpZ+KikvkdDgkSX/9N/cpJTVVRcUlFo8KAAAgPBAq/ZRfUCCb3a6qypNKSU3Tpi0PKL+gwOphAQAAhAVC5QQUFZcoMyvb672K8jLt2/uGOtovh3hUAAAA1iNUTkB+QYFWr1vv8z4FPAAAIFYRKgNk9br1ylvoWg6ngAcAAMQa+lROUkV5mTKzskfsqzRmMX0tkQMAAEQrQuUktTQ3qaW5yaNYZ6zlcQAAgGjF8vckrV63Xk6HQ3U1Yy91U8ADAABiAaFykjKzsrVoyVJVVY5flEMBDwAAiHaEShNKV67SAw89MuZrKOABAACxgD2VIUABDwAAiHaEyhChgAcAAEQzlr8DpKK8TBXlZRN6PQU8AAAgWhAqA6SluUn1tTUTCpYU8AAAgGhBqAwQY3nb32BJAQ8AAIgm7KkMEKPF0Kfnz/ldkEMBDwAAiBaEygAqXblKpStXTehzKOABAADRgFAZZirKy9TS3KSi4hKPIyABAADCFXsqw5DT4dCRQ2V6Y8/ucY+BBAAACAeEyiCpq6nRG3t2T7iye3gBj9PhUEtzUzCGBwAAEFAsfwdJVeVJOR0OVVWe0rycHKWkpvn9ucP3WbLnEgAARAJmKoNkeBicSO/K4Z9PoAQAAJGCUBkkRoshm92uRUuWBeQ9OYUHAACEK5a/g2gyLYbGY5zCU1S8XEXLSwL63gAAAJPFTGUE4RQeAAAQrpipjDCcwgMAAMIRoTJE6mpqVFV5UvkLC0wvW1PAAwAAwg3L3yEyvMVQoAttKsrLJlVhDgAAECiEyhAx22JoPPW1NQRLAABgGZa/Q8RoMfTp+XMBazFkMAJr/Y3iHZbHAQBAqBEqQygYLYYMBEkAAGAlQmUUIVgCAACrsKfSInU1NXpjz27V1QSv3yQFPAAAIFQIlRb56OyZG9XgJ4P6HAp4AABAKBAqLXLXhr9SwrRpcjocQZutNE7gIVgCAIBgI1RaxG63u/dABnO2cvjRjgAAAMFCoY6F5s3P0aIlS9XX1xfU51DAAwAAgo1QabFgtRgai7EUTtgEAACBwvJ3jGKfJQAACCRmKsNIRXmZMrOylV8Q3D2QnMADAAACjVAZRlqam9TS3BT0UCkRJAEAQGCx/B1GiopLgtpiaLTV69YTLgEAQEAQKsNIfkGBbHZ70Bui+1JXU6N9e9+Qw+Gw5PkAACByESrDTFFxiTKzsi15dlXlSXW0t2vf3jf06flzlowBAABEJkJlmMkvKLBsSTr/RpP0/r4+vXdgv04cO2rJOAAAQOShUAduRctLNC8nRxXlZerr61NKaprVQwIAABGCUBnGQtViaLiU1DRt2vJAyJ4HAACiA8vfYaylucmyop3R6mpolg4AAHwjVIax1evWh7TF0FiqKk9yCg8AAPCJUBnGMrOytWjJ0rCYrTSKeAiWAADAG/ZUhrnSlatUunKV1cMYUcQDAAAwGqESfqOIBwAA+MLyN0yhgAcAAEjMVEaUivIy2e12FS0vsXooblWVJ+W8cawj54gDABC7mKmMIK4WQ6fU0X7Z6qG4UcADAAAkQmVEMWYCwym8FS0v0aYtf6eU1FSrhwIAACzE8ncEMVoM9fX1WT2UESjgAQAAhMoIEw7thfxRV1OjluYm9lkCABAjCJUICgp4AACILeypRFBQwAMAQGxhpjKC1dXUqKrypPIXFoRVmyGJE3gAAIg1hMoIZiwxV1We0rycHKWkplk9pBEo4AEAIHaw/B3Bhu9VjJQZQU7gAQAgOjFTGcGMFkOfnj+nRUuWWT0cv1DAAwBAdCJURrjSlasips2Q5Crgqao8pfraGkkESwAAogWhEiFFAQ8AANGJUImQo4AHAIDoQ6iMIm/s2S2nw6Gi4uVh12LIH8bsJUviAABEHqq/o0hRsStIVlWeUkf7ZYtHMzEV5WWqr62hWToAABGKUBlF8gsKZLPbJUVOiyFDZla2e+wESwAAIg+hMsoUFZfIZrdHTIshQ35BgR546BHduXa9O1wCAIDIwZ7KKJNfUKD8ggKrhzFpkT5+AABiFTOVCHucwgMAQPhjpjKK1dXUqKrypIqKSyJ69o9TeAAACH/MVEYxI4xVVZ60eiim5C90BWIKeAAACF+EyihmtBhyOhyqq6mxeDSTV7S8RJu2/J1SUlOtHgoAAPCBUBnFhrcYivTZSuMUHpa/AQAIT4TKKGe0GDJmLaMJBTwAAIQPCnWiXDS36KGABwCA8MFMJSIWBTwAAIQPZipjSLS0GDIULS/RvJwcAiVgQlvngD4436u2zusBfV9b4hTlZiZoyfzEgL4vgPBFqIwhH509424xFA2hUrpZwANgYpw9g3rmd5d19nxvUJ+TnjxV2zbM1opbZwT1OQCsx/J3DLlrw18pYdq0iG8xBMAcZ8+gfrSrLeiBUpLaOq/rmd9d1vFPrgX9WQCsRaiMIXa73V3QEukthsZSUV6mfXvfUEf7ZauHAoSlt084dK61P6TP3HHgSkifByD0CJUxZt78HC1aslSZWdlWDyVo7Ha7OtrbtW/v71V1KnrDMzBZ71U7Q/7Mts7rIZkZBWAd9lTGoNKVq6weQlANL+Bx3Gg5BOCmQBfl+OuD870U7gBRjFCJqEQBDwAAocXyd4yrKC9jiRgAAJjGTGWMa2luUr3DoXk5OUpJTbN6OEFVUV6mluamqOnTCSB0LnZVB+2905LylBhvC9r7A6FCqIxxq9et1x//8LYqysuifrnYbrer3uHQkUNlUdUEHkDwVDXt1YkLu9R3PXjFTdOm2lSUvUWlt2wN2jOAUCBUxrjMrGwtWrJUfX19Vg8l6IYX8MTCfy8Ac05c2KUTF3YF/Tl91506cWGXrva26HP5TwT9eUCwECoR9dXgw1HAA8AfV3tbQhIoh/u47YBuS9+oubMKQ/pcIFAIlQAArV2SpO8/mC5JcvQM6j/97FP3vZe+8Rllpbi+Xfzk9TYdOtstSfp8iV33lszUwuxpkqTKhh7tONCh2qbIXwn4uO2ARc/dT6hExKL6GxCn8ADD2adPUfGC6ZKkrJR4d6Acbu2SJH19U5o7UEpS8YLpevrLmV5fH2kudlVZ8tyrvS2WPBcIBEIlRojlFkOcwgO4ZiklucOiES5Hu33BDElSc8eA7n/6nL76i7/I0TMo+/QpWrs4KTSDBRBWCJUYoaW5SVWVp2Juxm71uvXKW+iqBK+rrbF4NIB1mjsG5OgZ1O15rtCYn53ovj6cfbrr24cRQofft82YGoqhAggzkb9GgYCKpRZDo61et16SovpcdMAfzR0DI2YqjaA5nuH7MAHEHmYqMYLRYijaG6H7snrdenpXIubVNvXJPn2KPl9iV1ZKvCobeqweEoAIwEwlPMRSi6HxVJSXqaP9slavWx+zQRuxp66pV5Krstv4eHhBDgB4w0wlMA4KeBBrjJlJI0iO3k8JAN4wUwmMwdhnWV9bo7raGhUtL7F4REDwNXcMqLljQFkp8XL0DKqyoUfb/Pi8//PdebJPn6LXKrq040BH0Mdptb9f8bKSp2dJkvbX/FxVzX8YcX/FLQ9pxbyHNT3eLkn65FK59tf8XD0DjpCPFQgFQiXGVFFeJulmuIpFFPAgFlU29OjzKXafjcyNwh2jCtz4d6xInp7lDpSSlHgjOBrWLXhMK255aMS1W+esU/L0LO089a2QjBEItdj6KoAJa2luUn1tjTtcxioKeBBrXPsqpdP117zeP93gup6VEq+3nsxxz1JK0uGzztAM0kI5s5dLknvWMSdl+Yj7t85ZJ8k1O/ls+d9of83PJUmZ9gLNnz3ytUC0IFRiTMOXf2M9WA7HCTyIdsY+Sl8zlYfOduuX+y6PuF/b1OdxLVolDlvSlqQMe4HX+509zZKkFket+970UbOaQLRg+RtjMloMfXr+HMu/oxgFPEXFy9lriYh36Gy3Dp095/64sqFH9z998+Mn/neTx+f8+0mH/v1kbO4PNGYmW6/WqHP2ciVPz1KmvUAtDu+HJ7Q4avRs+d+EcohAyDFTiXGVrlylBx56hOXfYTiBB4htxszkuSun1NnjCtyZ9oVWDgmwHKESmCQjWBYVM0sJxJJMe4Gmx9vVM+BQZ0+zznWckiRlzOQHb8Q2lr8BE4JdFX/02Ps68O5BVZ/5wH0tb0GuNt+/SatW3hHUZwPh5mC1U7kZ05SbmWDpOIwZyenxdn173R88rgOxilCJCXljz245HQ72EfoQyBN4dr3yqt58a5/H9fqGRtlsNlPvDUSaHfuv6O0TDiUlTtFTW9MtDZa+ZiSTp/ved55pL9Cjy10V4P/24T+6C3yAaMLyNybEWOqtqjxF5bMPgTiBp/rMB+5AmbcgVz9/7hm9snOHXtm5Q1u/9LAKly0N1HCBkLElTvxbjrNnUC/sa9fbJ1wFQd29ro+dN/pkWsGYkSxv+I2eLf8bPVv+N+oZcGh6vN3dLqj3Rqsho5fl8J6WQLQiVGJC8gsKZLO72mHQYshToAp4hi93/6cvPayMjHT3x5vv3zT5AQKScjKsmeVbMj9xQq939gzqR7va9F5194jr51r7dfZ8byCHNiHGjOTwNkFGiDQCpzETeeucdfr2uj/obxf/V0muFkPMUiJasfyNCSsqLlFV5UktWrLM6qGEpUCcwNPQ0Oj+deGypTrw7kG99OuX3dcyMtL18+eemfT7I7bdt8KuX+0L7TGKORkJE1qybmzp1wv72nWutX/E9aTEKXp8U4pW3Doj0EP0y/zZy919Jo2qb8nVMih5epYybyyNlzf8Rj39V0cc03j+yimVN7zs+aZAlCBUYsLyCwpoLzSOWD7WEuHv7kKbzp7v9ZgBDBZXEEz1+/WNLf360a42dfeOXOIOh/2U56+c8tpv8t8+/EePa8cv7NHxC3tCMSwgLBAqgRCoq6lRVeVJTZs2za8inuHL3fUNjdpwz93acM/deunXL+vAuweDPFrEgsc3pSo9OV5vH3d4hLdAKi2Yof+8MVnpyf59uzlY7fQ6i5qTkaDvPpjm9/sACD3+dsIUIywVFZcwezmGluYmOR0OOSW/TuExlrwl6X//+mX93//le1R8I+AeWjtLD62dpcaW/hHB8mC1c8KzmMaytG36za36E91DuedQl1471OVxfcn8RH3nC2kj3htA+InaUHm6+oyefPrHHtdvL1ymp5/8gQUjik5VlSfldDhUVXmSUDmG1evWKzMrWyfeP6r+vj7V1daMGSpXrbxDq1Ye19Fj76u+oVF/v/3xEI4WsWb0crIRBv0NloFYln5hX7vX591VmDShpXMA1uHHPphitBhyOhyqq+G4wrHkFxTor//mPqWkpvp1Cs8/fOvr2jqq8ltytRjaeM/ngjVMQJJrefyuwqRxX2c2UDp7BvW937R4DZTbNswmUAIRJGpnKofb9ugjenDL/X6/vru7W06nU5JU89GHKli0WKlpc4I1vIiWX1DAbOUEpKSmadOWB9wf9/f3q/aTj3S1s0vxCfHKzMrWZ+bNd9/ffP8mWgjBMkag8zVjaTZQjlXhvW1jsu4utG7Lx7SpdsueDUSqmAiVE9HW1qajR4+qv9/1Ra6jvV3vVxxWTl6eFi8ttHh04cloMcQZ2BPT1dWp9ysOa6D/5jfU1uZmtV++pEJ+LxEmfAXLQATKcK3wlqS5swrV2HE05M+dmZgZ8mcCgRIToXLHzt3asXO3pPFnLf/85z+7A+Vw5+rr9Zl58zVrVnLQxhmpaDE0OR+dOTMiUBr+8umnSk2bM2LGErDS6GBpNvhFQoX3gtRVOnFhl/quO0P63NvSN4b0eUAgWf83N4y0tbWpu9v3xvS2j6o1O9Pcec6Aof3yJZ/3WpqbCJUIK0awPP5Jj6lAaZzhPVq4VXjPTMzUmtyv6k91/xyyZ5beslVzZ7EihsgVE6FyonsqfYk795GmftQagBFFr5qhGaoctKl4ilMFcdesHk54S/F9fvdA/0AIBwL45/FNqdIkt/g6ewa148CViKrwvi19o6ZNtavi3Iu62hu8r/0zEzO0Ome7FqSuCtozgFCIiVDpr9mzZ495P3HVX6uf2aMxndqzW06HQ6eS5ir3oUesHk5Ym7H/j7p2zfvMeEZWVohHAwSPcYb36IIcSfraphRLC3LGsyB1lRakrtLV3pYRwfKSs14V516a8Pvdlr5hxBL3tKk2zbHlBWSsgNUIlcMkJCRo8eLF+vDDDz3uzZyVzHKkH4qKS3TkUJm7xRB7LX1btGyZTh1/3+N6fEKCPjNvvirKy9TRftmvE3iAcNXY0q9nfndJbZ3XR1y3+gzviZqZmDmiiGburEIlxtsmtDx+W/oGfS7/iSCMDggP4bF5JYwsXrxYixcvVlxcnPvaZ+bN0x2r11g4qsiRX1Agm93ViqOq8qTFowlvmVnZWr7iDs2YcbMXYEZWltasv1sJCa79ah3t7dq39/eqOsXvJSLP8U+u6Ue72rwGyqe2pkdMoPTltvSN+lz+P/j5WgIlol/c0NDQDyU9ZfVAwk1ZWZkuXbqkO1avoUflBHF048Ql/Os/6vpdD2gwZ/GI6xXlZaqvrZHNbtcDbCdABBmrwvuprelhU5ATCB+37R9zxpJAGR2mxMVpenz0/LkNgvdY/kbA0WIocFavWy/JNasJRIqxjlzctmF2VAVK6WYbIG/BkkCJWEKoBMKcESyBcOfsGdQzv7uss+d7Pe7dV2rXto2zQz+oEPEWLAmUiDWESgRdRXmZ7Ha7ipZzSkwgVJSXSSJsIry0dQ7oZ69fjsgK70AZHiwJlIhFhEoEXUtzk+odDs3LyaGKOUDqa2skESwRHsY6cvG7D6ZpyfxEi0YWerelb+RUHMSs6NrYgrBkBB9jhg3mrF63XnkLC1RfW8PvKSx3sNqp77/c4hEojYKcWAqUgdA74NTV3harhwFMCjOVCLrMrGwtWrJUfX19Vg8lajBDiXAQKUcuRoqqpr06cWGXZiZm6KGi560eDjBhhEqEROnK4Bw/VtW0VzMTM2PyeDOCJazi7BnUC/s6dKLG8yjWcD1yMZy5Tud5URe7zkiSLnc3qKppr4qyt1g8MmBiCJWIWFd7W9zHpOWmrNLn8p9QYnz0FwP4YpzAc9eGv5L9RgN6INDGOnJx24bZum8Ff/b81Tvg1IkLO1Xd/KbHvRMXdmlB6qoRp/gA4Y61CUSsP9U95/51Y8dR7Tz1mBraj1o4Iuu5TuB5Q5+eP2f1UBCFGlv69Y1fNXsEyqTEKfrOF9IIlBPwcdt+7Tz1mNdAKbnaEU2byu8nIgszlQi5QLQYamg/6l4qMvRdd+qdT/5HzM5aGsvh9bU1eu/Afi1asjRo2w4Qew5WO7Vjf6dHQU568lR95wtzlJuZYNHIIsvope7R5s5aptU52zXHlhfikQHmESoRcoFoMbQgdZU2L/kn/anuOV3tbR1xz5i1/Fz+EzG319IIli3NTbRvQsDsOdSl1w51eVyPxiMXg6V3wKmKcy/q47YDXu9Pm2rTmtyv0o4IEY1QiZBbvW69/viHt1VRXqZNWx6Y9PvMnVWoLxY+73VPUizPWlLAg0Bx9gxqx4ErPo9cpCDHP0ZVd991p9f7hVmbVXrLozH1dQrRiVCJkAtki6HEeJvW5G7XgtQ7mbUcA6fwYKLGOiGHghz/XOyq1uHGF3W5u8HrfZa6EW0IlbBEoPf6MWs5Pk7hgb/GOiHn8U0pWnHrDItGFhmu9rbocONLauzwXjjIUjeiFaESUYNZS9+GF/EM/xgY7WC1U7/a1+FxnYKc8fUOOFXdvFdVTXtZ6kZMIlQi6jBr6R1BEuPxdUIOBTnja2g/qopzL3r8MGuYO2uZPpf/BH0nEdUIlbBcIFoMjcaspXcES3jDCTmTN16LoJmJGVqdsz2mvs4gdhEqYblAtBjyhVnLsVHAg8aWfr2wr52CnAnyp0VQUfYWFWZticmvLYhNrGXAckagMQJOoBmzlpuX/JNmJmZ43I/103jqa2uC9nuP8Hb2fK/XIxeTEqfoqa3pBEofTlzYpZ2nHvMZKG9L36CHin6u0lu2EigRU5iphOUC2WJoLMxaeqKAJ3b5KsjJyUjQ45tSKcjxYrx9k2lJC7Qmd7vmzioM8ciA8ECoRFgI1XGC7LX0RJCMPS/sa/fa0HzJ/ER95wtpFOSMcrGrWicu7PS5b5IWQYALoRIxiVnLkQiWscHZM+h1uVuiIMebq70tOnFhl89lbkkqvWUr+yaBGwiViFnMWvpWV1OjluYmwmYUaWzp1zO/u6S2zuse9762KUV3FxKKDEa/yRMXdvl8TW7KKq3J/SotgoBhCJUIO2/s2a3MrOyQBRp/Zy1j6RtIVeVJOR2ufoUEy8h3sNqpHfs7vZ6Q89TWdPZPDjPeOd1zZy1T6S2Psm8S8IJQibBTVFyiI4dC2+rGn1nLi13VKr1lq4qyt4RkTFbKX1igqspTFPBEgT2HuvTaoS6P6zkZCfrug2lKT+bbgDR+Ec7MxAyV3rKVfZPAGPhqgrCTX1CgqsqTlgSa8WYtK869pMaOI0E/GeOlX7+sA+8elCS9snOH+/q3nviOWlvblJGRrp8/90zQnl+0vETzcnJoNRTBxmtovm3DbApy5F8RDv0mAf8QKhGWiopLVFV5UplZ2SF/9nizlhe7zmhP1beiftYyJTVNm7Y8YPUwMAljNTT/4tpZemjtLAtGFV6u9rbocONLauzw3Z/2tvQNWp2znTAJ+IlQibCUX1Cg/IICS8dgzFp627A/fNZydc52zbHlWTTK0KKAJ/wd/+SaXtjX4XX/5OObUrTi1hkWjSw8+FPRHWt7qIFAIVQCY0iMt6n0lq3KTVmlP9U9p8vdDSPuX+w6o9eqXbOWpbdstWiUoUMBT3h7+7hDOw5c8bhOQ/ObFd1VTXspwgGChFCJsFdXU6OqypMqKi6xbPZyji1PDxU9rxMXdnltM3Liwi41tB8JymkaX3p0W0DfzwwKeMKTs2dQOw5coaG5F/6ESYpwgMAgVCLsGbNjVZUnLV8SN2YtK8696LGx/3J3g948+19UmLVZpbc8GpX7sCjgCT9tnQP62euXve6fvK/Urm0bZ4d+UGHi47b9Otz4ks8wyUk4QGARKhH2jBZDTodDdTU1lgfLObY8bV7yY5/97Kqb31Rjx1GtztkekKbp3qq/rUQBT/g4e75XP3v9stf9k9s2JsdsQ/OP2/brxIVdPtsDUdENBAehEmHPaDEULrOVhqLsLVqQ6tprOXrW8mpva0wd9VhXU6OPzp7RXRv+Sna73erhxARf+yfTk6fqO1+YE5P7J8cLkxLHKgLBRKhERDBaDBUVl1g9lBFmJmZq85If+1xmM456jPb2Q0bo37f3Da1et17z5udYPaSoxf5JT/6EydvSN6j0lq1UdANBRKhERAiHFkNjuS19o3JTXH0tR/e9i4X2Q0YBT39fn947sF+LlixV6crYOi89FNg/OdLFrmodbnzRoyvDcIRJIHTihoaGfijpKasHEmjNLa3a/s1ve1y/vXCZnn7yB+N+fllZmS5duqQ7Vq9RatqcYAwRUepiV7XXpukGb8tvCf/6j7p+1wMazFkcqmEGXEf7ZVWUl6mvr8/SSv1oxf7Jm8Y7BUdytQeK1h/iYI0pcXGaHh9bqwAT9B4zlT709fVJki61tmrmrGQlJMTe/qRwFQ4thsYyVtN0STcaL+93F/K0X76kKzMyNPVShzLSuzUjKcmCUZtHAU/wsH/Sxd8wSa9JwBoxMVO57dFH9OCW+/36vO7ubh05ckSdnZ3ua/EJCVq8dJk+M29+UMaKiXljz245HQ7Z7HY98NAjVg9nTJec9V6bpkvSlKFpmu/8onRt5AxTYfHyqPqzxik8kzfW+d2xtH/y47b9+rhtP2ESlmKmclzMVI524sSJEYFSkgb6+/XhB2eUmjYnYmeRokm4tRgai9E03Vv7oVTHnVKP55JldeUpzUhKipptF5zCMzljnd8dK/sn/SnAIUwC4SMmQuWOnbu1Y+duSWPPWnZ2durSpUte7w3096uluUm5eflBGyf8E64thsZSlL1Ft6VvHFHIY++51efr//Lp+agJlZzCM3Fjnd8dC/snCZNAZIqJUOkvYx+lL0MH9ihx59kQjQZj+awtSydn5ajk04+V+PQ+q4fjl0RJWyRdSJmp/1jm/YQPg8PROeb9SMIpPBOz51CXXjvU5XE9FvZPEiaByBYTodLfPZU229g//cdteEi9zFSGhfk3/pGkXisHMgnpkh6V9M7bv9fQ9Tivr/m0p0IJF5qipkkzRTzjc/YM6pnfXdbZ855/oqN5/6Q/Z3NLhEkgEsREqPRXUlKS5syZ43UJPD4hIaqKJ2C9/PxFqv3kY6/3umac0YkLR/Rx236V3rI1Ks8mpoDnpsaWfj3zu0tq67zuce+La2fpobWzLBhVcF3tbdHHbQcIk0AUiYlQOXxP5Xh9Ku+8804dOXJkRLCcMSNJy++4g7ZCYcpoMZS/sEBFy8PrxJ2xLLxtkfoH+nWuvt59bTCuT+32IxqYelWS67jHP9X9841wGV3fWCngcTlY7dSv9nV4XE9KnKLHN6Voxa0zLBhV8FztbbnRVuvAmK+7LX2DbkvfGFV/5oFoFxOhciISEhK0fv16vfvuu7py5YoWLV1GcU6Ya2luulG0c0rzcnKUkppm9ZD8tnhpoXIX5Kv/9y/p+u1rVWv/RM2tf5FGTVhd7DqjN8/+l6g6HSTWC3jGOm4xJyNBj29Kjar9k/70mJQ4AQeIZFEbKrMyM/Tmq7+d9OfHx7t+a2YlJwdqSAgSI4zU19aoorws4vbuzUhK0qwBp67bk5SS859U9JnNqjj3oteZnI/bDujjtgNeT+WJNLFcwDPWcYt3FSZp24bZUbN/8uO2/apq2jvmUYrTptq0IHUVYRKIcFEbKhFbommWKzHeps/lP6Hb0jf6nNk5cWGXqpr2qih7i0pv2WrBKAMjFgt4fLULkqRtG2brvhV2C0YVWEbxzcdt+8es5J421aai7C0R/wMSABdCJaJGNAVLyXXc4+YlP/bZZqXvutN95GM0FfNEcwGPr3ZBSYlT9N0H07RkfqIFowqcS876G2Fy7P2SMxMzourPLAAXQiUQ5m5L36jclDt9tl0xinlOXNjlPk88kkVjAc9Y7YJyMhL01Nb0iF7u9ucYRclVyX1b+kbCJBClCJVABEiMt7n3UZ64sFPVzW96vOZqb6ve+eR/RHwLlmgr4Gls6dePdrV5Xe6O5OMWjZZA4y1xS1RyA7GCUImoVFFeJrvdHlEthvyRGG/TmtztKsre4rMti1EpHqnhMpoKeN4+7tCOA1c8rkdyu6CLXdWqatrrPm7UF2O/5G3pGyi+AWIEoRJRqaW5SfUOR8S1GPLXzMTMcYt5IjlcRnoBj7NnUC/s69CJmmse9yKxXVDvgFMft+1XdfPecWcl05IWqCh7i3JT7qT4BogxhEpEpdXr1uuPf3g7IlsMTYRRzDNWD8BIDpfDRUoBT2NLv17Y1x4V7YIa2o/q47b9485KSixxAyBUIkplZmVr0ZKl6uvrs3ooITGRcBmplbeRUMBzsNqpHfs7I7pd0NXeFvfy9nizkjMTM24U3rDEDYBQiShWujKyq6Anw59wObxavDBri25L3xgRy5ThXMAz1uk46clT9Z0vzAnr5e7eAacaO46M26TckJuySrelb4z4TgMAAotQCUQhf8NlxbmXdOLCLt2WvkFF2VvCerYpXAt4xlruLi2Yocc3pYTtcndD+1E1dhwZt6+kxKwkgPERKoEo5k+47LvuVHXzm6puflO5KatUlL0lbPfFhVsBz1jL3V9cO0sPrZ1lwajGdrGrWh+37VdD+1GPnqfeMCsJwF+ESsSEaG0x5K/h4dLVqNr7zFRjx1E1dhzVzMSMiFoaD7WxlrvD8XScS856d8HNePskJfH/H8CkECoRE6K9xZC/5s4q1NxZhSq9ZatOXNjlc7bKWBqvOPdS2Ff11tXUqKrypKZNm6bV69YH/f/vWMvdS+Yn6jtfSAuL5e6LXdVqaD/id5CcNtXm/n89x5YXghECiDaESsSEWGkx5C+jz+XqHOeNs5p9n4riOjXlgHv2akHqqrDcU9fR3q59e3+vouLlQZuRDvflbmOPpL9L25KrFVBuyp0sbwMwjVCJmBBrLYb8ZRz/WHrL1nHPbx4+e2mc4RwODa7zCwqUX1DgnrF03Gg7FEjhutx9tbflxozkUb96SRpyU1ZpQeqqsPj/ByB6ECoRM2KxxdBEuCp7N7r7FH7cdsDnbNfFrjM3wuc/h01AMcJloIXbcrexrH2xq9qv9j+GcPn/BCB6ESoBjDAzMVNrcrdrTe72cWcvpZvFPUbAnDurMGyXyCfq7eMO7TnUZely9yVnvS52VetiV/WEZiMlgiSA0CJUAvBp+OxlQ/vRcc9+NgJmxbmXlJa04EbAvNOyIp+K8jJ1tF+ecAHPWGd3B3u5e3iIvNhV7ffeSMlVbGOEyLmzCgmSAEKKUImY9Mae3cpfWBCzLYYmamZipoqyt6goe4vf7WkudzfocneDqpvflCTNnbVMc2cVuSvQQ8Fut6u+tmZCBTyNLf165neX1NZ53eNeoJe7ewecutxthMiqMWeEfQmH8A4AEqESMaqouERHDpXFfIuhyZhjy9Mcm2t5fCL9D2/uw3QxQmZaUl7QZtWGn8LjTwHPnkNdeu1Ql9d7Zs/uHh4gLznrdbm73q9WP6NNm2pzbzGYO6swKrYZAIgOURsqT1ef0ZNP/9jj+r0b79G9Gz+nhXkLLBgVwkV+QYGqKk/SYsik0QGzseOoGtqP+FVAMjpkzkzM0MzEDHfQnJmYEZB+if6cwuPsGdQzv7uss+d7Pe5N9OxuIzxe7W3R1d5WXeyq0iVnw4SWsUczAnhuyip6SAIIW1EbKn15Z/+7emf/u3r6yR/o9sJlXl9TW1ur9vZ2SdL7FYf1mXnztGhpoRIS/PumgshQVFyiluYmS8dwrbtbjQ11cszM1VDdp/rMFJs+M2++pWOaLFfAzFPpLVvdrW6Mdjf+BKqrva03QtjIJeC0pAVKjLdp7qwiTZtq0xxbnvvfk9Hf369z9XVqv3xZknRNydp5PFmd1+I8Xuvr7O6LXdWSXPsf+647b/zbManl69Fc/20LQr5VAADMihsaGvqhpKesHkigDZ+p3PboI3pwy/06fOSYfvLc85KkrMwMvfj8sx6f9+GHH+rDDz/0uD5zVrLW3HV3UMeM2NLV1an3Kw5roH9kq5qMrCyVrFhp0aiCw0zxyXiM0On6dZ4S428uUY8On9cHBlV3+qJ6HCP7lbb3zNAfGm9T3/WpkqTEhAGtuf2ccuaVq++6a9ncCL2Blpa0QHNsee5tAMxEAuFpSlycpsdbf1pWGHsvpmYq19y5UmuOvq/DR46puaVVtfUNI5bB+/v7vQZKSbra1am/fHo+YmeREH4+OnPGI1BKUmtzc9T9WTNmMYuyt0iSe0/hzf2F/vdbHG345443Uzjn6l2y99zqcT11+jUtT7+oY83zZLdf0OJFOzRk/1SNHZMelldpSQs0MzFTc2yuAOkKwVRoA4gOMRUqJWlhXq4OHzkmSXI6R86WXLlyZczP7T36H0r4U+BnKmC9mqEZqhy0qXiKUwVxnm1kgqE9ZanPe23Hy5T7p/MhGYcVsm/8s2zYR39J6lRbYre64nt0abpTbYlO9U3xrMA2Y3r/XJ/3smxXdcst72pB7r8pPt7z5JyJGL5k79ormskyNoCoF3Oh0oyhnEW6nrnG6mEgCE5V/FnOnl6dmpauvNWfDc1Dqz7xeatvdoaufzZE4wgTWTf+Ga538JouDVzU1esdujrQrksDF9U7eM318fWJTSMODCRpqH+mNGXI63379E4VzHvVr/cyioqmTbWP2ONpBEgAiEUxFypr6xvdv84fVQGenp6upKQkdXd7n6VIX1SowVnJwRweLFLUF68jh8rk7OlVTV98UI77G21GzQVdu+b9z1pGbr4Gc/KDPoZwlyApWyXKHuM1RtHM6F9LUu+AQ5e76/Vpc56Ontqoadmfav7MK17fJ35mp0pv2Tri2vA9mWaKgwAgFsRUqHxn/7vupe/bC5fJbvPcy1RUVKSjRz2PQsvJy9MsAmXUMloMOR0OVVWeDEmoXLRsmU4df9/j+owZSVG1nzLYhi8rj15idvYM6rVDXSo74Sq2OdWaraykq5o2deSyenxCgu4oeUhnTp+e1Ak8AAApJsqYduzcrc0Pf1m/fPE3kiS7zaavb3/M62vnzp2rz3/+80pMdB3BlpKaquUr7tDipeyHinZFxSWy2e0qKg7NKTuZWdlavuIOzRz2w0pGVpbuWL2G9lUB0NjSr++/3KK3T9xset7ek6Q/NN6qK/03z+xOTZujO1avcf/Q2NHern17f6+qUydDPmYAiGQxNVMpudoL3bvxHq+zlIakpCTNnDlTvb29Kli0WKlpc0I4Qlglv6AgJDOUw2VmZSszK1sJ//qPun7XAxrMWRzS50ersU7GWbUsQ/evXajkY3slSQOrb+6TXr1uvSSpvrZGdbU1HOMJABMQtaHy9sJlevPV31o9DAAh1NY5oJ+9flnnWj1bNSUlTtHjm1K04tYZY76HESwzs8bayQkAGC1qQyVgRl1NjaoqT6qouCTks5eYnLePO7TnUJe6ewc97i2Zn6jvfCHN42QcX4xgCQDwH6ES8CLURTuYvLHO7U5KnKKH1s7SfSvsXj7TfxXlZWppbuKHDAAYQ0wU6gATZRTrOB0O1dXUWDwa+HL8k2v6xq+avQbKnIwEPbU13XSgNDgdDh05VKY39uzmzwQAeEGoBLzILyiQze4KI1WVVAGHG2fPoH72+mU987vLXpe7v7h2ln76WKZyMwNTRb963XrlLXTNUDodDrU0NwXkfQEgmrD8DfhQVFzi3leJ8HH8k2t6YV+H1zCZnjxV3/nCnICFyeGG77NkzyUAeCJUAj5Y0WIIvjl7BvXCvg6dqPF+Nvt9pXZ9ce0sv4txJoMwCQC+ESoBhL3xZicf35SqJfMTLRiZq4iHU3gAgFAZsRpbXH34grHMB09Gi6H8hQU0xA6hcJid9IdxCk9R8XL+fACIWYTKCNTY0q8f7WqTJH33wTTLZmhiyc0WQ6c0LyeHGakQGGt2MilxStj82ecUHgBwofo7whiBsrt3UN29g/rRrjYdrHZaPayoN3wvXUV5mYUjiX7jVXaXFszQL76WFRaB0mBUh1PUBSCWMVMZYd6rdnp8o/3Vvg5J0t2Fvs8zhzmZWdlatGSpPj1/TouWLLN6OFFrvNlJf45ZtApFPABiHaEywmzbOFvO3kG9V9094jrBMvhKV65S6cpVVg8jKrV1Duhf9nf63DtZWjBDj29KsXzv5ERQwAMg1hAqI9Djm1IliWCJqDDWmd1WV3abRQEPgFhCqIxQxjdaI0gafrWvQ909QwE7mg4IlsaWfu04cMXrEYtS+FR2TxYFPABiDaEyghkzkqOD5Y4DV9TY2uee0URwVJSXyW63ExYmYc+hLr12qMvrvUifnRzOCJaZWdkWjwQAgo9QGeF8BUtjaZxgGTwtzU2qdzhoMTQBZ8/36oV97WrrvO71/hfXztJ9pfaInZ30hgIeALEier5yx7C7C2362qYUj+vvVXfrhX3tFowoNhhhgRZD43M1MW/Xj3a1eQ2UORkJ+slXMvVQBC93+6uivEz79r6hjvbLVg8FAAKKmcooYcxY7tjfOaLg4b3qbrV1Xtd3vpAW9d+sQ81oM9TX12f1UMLawWqnx59LQ1LiFN23wq6H1s6yYGTWoYAHQDQiVEaRuwttys2Y5m6Objh7vlc/2tWmp7amEywDjBZDvo1XiLNkfqIe35Si9OTY+jJEAQ+AaBVbX81jQG5mgp7amu4RLM+1uk7i+e6DaTH3TRyh5ewZ1GuHuvT2CYfX++HexDwUKOABEI2YtopCRrBMShz5v/dca7++95tWNbb0WzQyRLuD1U5941fNPgPlfaV2/eJrWTEdKA2r161XfkGB1cMAgIAhVEap3MwE/eJrWcrJSBhx3TgvnGAZeBXlZao6ddLqYVjCOJP+Vz6OWMzJcP2gs23jbLZg+EABD4BIx1f3KGabPkVPbU33Giy//3KLDlY7LRpZdGppblJV5amYCgXOnkHt2H9F33+5xeveyaTEKdq2YbZ++lhmVPSdDDajgCdWfzgBENkIlVHOCJZ3FSZ53PvVvg69fdz7MiUmLtZaDL193DHmUvddhUn6xdeyON3JT6vXrVfeQtdyeF1tjcWjAYCJo2IjBtimT/F5Xjin7wROrLQYOnu+V/+y/4rOtXrfQpGTkaD/vHE2M5OTQAEPgEhGqIwhj29KVXpyvMfxePSyDJxobjHU1jmgf9nfqRM117zeT0qcoofWzmJm0iRO4AEQqQiVMeahtbOUnjzV41hHo5fl45tSlZuZ4OOzEYvGaxEkuZa6t22gCCcY6mpqVFV5UplZ2QROAGGNUBmDfDVJH97LkqVLSNKeQ116+7jDa0W35Gpgvm3DbH4QCaKW5iY5HQ7V39hnSbAEEK6YVohRRi9LXy2HKOAx7409uyO2itfVb7JJrx3q8hoo05On6jtfSNNTW9MJlEG2et163bl2vRKmTVN9bU3MFIIBiDzMVMaw4afvjC66MAp4WNKcvKLiEh05VKZ5OTlKSU2zejh+Ga8IJ1bP6rZafkGBUtNSCZQAwhqhMsbZpk/RTx/L1Av72j0qw9+r7lZjSz9HO05SfkGBqipPqqK8TJu2PGD1cMZ09nyv9hzq8nlOt8S+SaulpKaF/Z8jALGNpABJrsrwJfMTPQp4jKMdY/2s5skqKi5RS3OT1cPwqa1zQC/s6xgzTJYWzNB/3pjMDxZhyJi5ZJ8lgHDAdwm4+Srg6e4d1DO/u6z7Su3atnG2dQOMQPkFBWF5vnNb54D2HOrymJ0ebsn8RD20dhZFW2GOAh4A4YJQiRGMM8O97bN8+4RDH5zvZTk8gvkTJtOTp2rbhtnMTEcAI0gSLAGEA5IBPBj7LHfsv+LRm5Dl8MmrKC/TtGnTLGmQ7m+Y/OLaWbq70BbCkcEsgiSAcEGohE/bbhy198K+Dq/L4aUFM/T4phQKN/xk9BvMzM7WvPk5IXnm2fO9OljtJExGOYIlgHBAGsCYVtw6Qz99LMOjn6Uknai5pm/8qnnMIg/cVFRcIsk1Y+lwBLcPqHFC0o92tfkMlOnJU/W1TSn6xdeyCZRRpqK8jPZDAEKOUIlxpSfH66ePZeq+Us8znY1m6S/sa5ezx/upK3DJLyiQzW5Xf1+f3jvwx6A842C10x0mfYV9wmRsoFE6gFBj+Rt+27bRVbzxwr52tXVeH3HvvepuHf+kh72W4ygqLlFV5UktWrIsYO/p7BnUe9XdevvEVY//L8OxzB07KOABYAVCJSZkyfxE/eQrmXphX4dO1Fwbcc/Ya7lkfqIe35RChbgXgWwx1NY5oLePO3Swutvn2dwSYTJWESQBhBrf9TFhtulT9N0H03T8k2seRTySaz/fN37VrC+unaX7Su0U8gTY8U+u6WB1t0eoH23J/ETdVZhEmIxhBEsAoUSoxKStuHWGfjE/Ua8d6vJoPSTJdf24Q9s2JhNsvKirqVFV5UkVFZdo0Tiv9XeJW3KdgLNphZ2m5fDACTwAginqQ+Xp6jP69/1/0uEjx9zX7t14j+7d+DktzFtg4ciig236FPdey3/Zf8WjYXp376B+ta9Drx3qYgl2lKrKk3I6HK49lj5ec/yTazpec23MlkCSlJQ4RStuna6H1s5i2wHGxD5LAMES1d993tn/rn754m+8Xt/26CNjfu71667ZoK7OTqWmzQnK+KLJkvmJ+uljmXr7uEN7DnV5LIm3dV4nXI5SVFyiI4fK1HPtmk7Hpyrb0a0USY0t/Xqv2qnjNdfGnZVMT56q+0pn6q7CJLYZYFwU8AAIpqgNlQ6nUzt27pYkZWVm6HtPfFML8xaotr5BdfUNstu8h5r+/n6dOHFCHR0dkqSPPjijc/X1Wn7HHZo1Kzlk449U962w667CJO04cMXr7Brh8qb8ggJ9+EG14qdO1XlJ5+svaKCuSe99mqvzV2eP+bmlBTN0d2ESlfaYMIIkgGCJGxoa+qGkp6weSKAdPnJMP3nueUnStkcf0YNb7vfr844cOaKmpiaP6/EJCbprw18pIcGzCTi8a+sc0Av7OsZsjp6UOEX3rbDr7sKkmFu2PV11Vk3narze2/NJoRz900ZcS0+eqrsKbTH5exUM8e+9IUkauOsBi0cCIBJMiYvT9HhWhMbwXtR+Z2pubXX/2t+9k93d3V4DpSQN9PfrL5+eV25efkDGFwvSk+P11NZ0nT3fqz2HuryGy+7eQb12qEuvHeqKidm3xpZ+Ha+5puOfXNPa1HpNm+r9dUvTWnSseZ4kz1nJl379sg68e1CS9MrOHZKkA+8e1Eu/flmStPn+Tdr6pYeD+x+CqFJXU6OPzp7RXRv+Sna75yEHAOCPqA2Vk+F0Ose8P3RgjxJ3ng3RaKLH8hv/nInL0/+ZukEfxHkP+SdqrulEzTUlqUerBs/q/sHDWjDkPeRHCqem69iUJToTl6fquDy1xc1237sn3fd+ybmzerRt6Wy/9kq2trZp1yuvSpIyMtIJlJgwo2hs3943tHrd+pCdTQ8gusREqKytb9DtheOfYDJt2rQx78dteEi9zFROWoGk/y7XsvieQ10+K5q7NV3vTinRu1NK3FXNKwpmaMn8xLAvRnH2DOrs+V6dPd+rD873elTD+2tpXrIKi/2bMXrp1y+7fyD6h299Y1LPQ2zLX1igqspTN44Q3a9FS5aqdOUqq4cFIMJEbahcs2qlu1Dnnf1/0u2Fy9zL4K/vfcvrHsvk5GTNmTNHly5d8rgXn5CgzKzs4A46RqQnx+vxTanatmG23j7h0HvVTp9Vzt29rv6MRgDNyUjQ0vmJWnLjHytDprNnUOda+9XY0q/G1j6dPd87brX2cLVX0rRw9mWv92Ylz/brPd58a5+qz3wgSdr6pYeVtyDX7+cDhqLlJZqXk6OK8jL19fUpJTXN6iEBiEBRW6gjucKjESxHe/PV33q93tnZqSNHjqi7++YsWnxCghYvXabPzJsflHHC/36Mo6UnT1V6cryWzE9UevJUZSTHKycjIaBhs7GlX929g2ps6Zezd/BGeByYUIAcrrRghpbOT1RJ3lTVnTmmq12dI+47nU5NnzFDm7Z4LyAZvqfSZrPJ6XQqIyNdP3/umUmNJ1ZRqANgIijUGVf0FupI0oNb7pfdZtM7+/+k2voG9/V7N97j83OSk5P1+c9/Xv/xH/8hh8Oh+QsWaEHeQs1ISgrFkGPWiltnaMWtM7Rtw+wbhSw94x5DKLlaFLV1XvdaBGQETslVZZ6bOXbl/uigOFbV+kQMn10dXYSUddfdamlukrN8n4ZyFunSQJyu9fRo0ZLxt2tIN/cBt7a26cC7B7XhnrsDMmbAUFdTo5bmJloRARhXVIdKyTg9x3eI9GX69OlyOBzKyp5LoAwh2/QpurvQprsLbe79icdrrk14aVm6GTgN/oTUQJjoEn1mVrYSrrXqeuYa5ecsntCztn7pYe19a5+cTqf2vvVvhEoEnFHEI9HjEsDYoj5UInLZpk9xz2BKrpnED24UwTS29E+6CCaQcjISlJuZoNyMacrNTAj5edub798kSdr1yqtqbW3Tm2/tc18DAsEo4uEUHgDjIVQiYqQnx+vuwvgRp/AYAdPY62gUzwT2ua5ldOPfuRkJrn+Ps5weKhvuuXvYbOU+bbjnbtl8nBgFTNTwIh4AGAuhEhHNWGL2ZvieSCN4jsUo9Bn+3laqq6lRVeVJ5S8sUNHyEp+vs9ls2nL/Ju165VU5nU7teuVVffXvvxLCkSLapaSm+SwcAwADoRJRa3gotDogToaxl62q8pTm5eS427x89e+/4hEaN9+/iWVvhBQFPABGozYeCFPDv1mz9IhwU1V5UvW1NfzZBOBGqATCVGZWthYtWSqb3e53iyEgVPIXFkgSwRKAG8vfQBgrXbmK4/IQlijgATAaoRIAMCkU8AAYjuVvAEDA1NWwHA7EKmYqgQhSUV4mu90+ZoshwEqcwAPELmYqgQjS0tykqspT6mi/bPVQAK8o4AFiF6ESiCDGzA/frBGuipaXaNOWv1NKaqrVQwEQYix/AxHEaDPU19dn9VAAnyjgAWIToRKIMLQYQiTiBB4g+hEqAQBBRwEPEP3YUwkACDoKeIDoR6gEItgbe3ar6tRJq4cBjIsCHiD6sfwNRLCi4hIdOVSmeTk5SklNs3o4wJgo4AGiGzOVQATLLyiQzW5nORERq66mRvv2viHHjf2WACIXM5VAhCsqLlFLc1PQnxN35ZLiOtuC9v6DOYuD9t4IX0YBz769b2j1uvWaNz/H6iEBmCRCJRDh8gsKlF9QELwH9HQr/j9+q6mnDwXvGZKGkudo4N5HNXjbZ4P6HISX/IUFqqo8pf6+Pr13YL8WLVlK2ywgQrH8DcC3nm5N+9d/DHqglKS4zktKePX/1ZSP/xz0ZyF8DC/gsdnt7A0GIhgzlUAUqSgvU2ZWdsBmLuOPvaO4lvMBeS9/Jex9Sb3fY7YyllDAA0QHZiqBKNLS3KSqysC1GJpyujxg7+W33m5mKyHJVcRDERoQOQiVQBQpKi6R0+FQXU1NQN4vrvNSQN5noqY0h3Z2FOGpqvIkzdKBCEKoBKKI0WIokLOVgFU4hQeILOypBKJMqFoMAcFWtLxE83JyCJRAhCBUAlEm6C2GgBCiiAeIHCx/AwAAwDRCJRDF6mpq9Mae3QEr3AHCQUV5mfbtfUMd7ZetHgqAYQiVQBQzjsCjcAfRxG63q6O9Xfv2/l5Vp/izDYQL9lQCUayouERHDpW52wwFYq9l3NKVmvLIt1wfXHPq+j9td9+b+sRzUkqGJGlw98819MExTXnkW4pbunLEewxdbNDQiXc1dOJd0+NB7BlewONwOKweDoAbmKkEopjRYkhScGYrZ9gUl7/M9euUDHegHE/c3AWasvnvPcIm4C+jgGf1uvVWDwXADYRKIMoVFZfIZrerqLgksG98zen699wFknQzXPowdLFB1//7o7r+3BNSR6tfnwMAiBwsfwNRLlgthoY6WhWnDMXlLdNQ+VuKuxEu1dE69oxlR6uGrjkVlyJphi3g40LsqigvU0f7Za1et14pqWlWDweIOcxUApi0oY5Wd5iMy1/mDoxjmmFTnBEmx3stMAEU8ADWYqYSiCF1NTWqqjyp/IUFKloegOXwiw3S3AWKK71HSslwFd4YM5ajxM1doKn/z84R14Y+OGZ+DMANFPAA1iJUAjHkZouhU5qXk2N6iXDoYoPiJFeoND72ESpHG3zz1xqqO2Pq+cBonMADWIflbyCGDK+UDcR5ykYoHLGf0tdrbxTquF/DfkoAiCqESiCGZGZla9GSpbLZ7Vq0JACV1x2tN0PiNadfM4+DN3pT0k4IocIJPEBoECqBGFO6cpUeeOiRgFWEG0Fy6GKDf59w43Vxcxf4vVQOmEEBDxAahEoAphhhcqjev/2RQ3VnbvapZLYSIVC0vESbtvydUlJTKeABgohQCcAcY/nb35lKSUNnXFXfccsIlQgNTuABgo/qbyCGTabF0NAHx1wFN8bHdWdGfDz4//23Ea8f3P1zj/cY/OMr0h9fmeSoAQDhiFAJxLBAtxgCIonxQ9W0adM4hQcIAJa/gRgW6BZDQCRpaW6S0+GgiAcIEEIlEMMC3mIIiCCr163XnWvXK2HaNElSXW2NxSMCIhvL30CMK125SqUrV1k9DMAS+QUFSk1LVUV5GT9YASYRKgEAMY2jHYHAYPkbgE9DmfMtee5g7iJLngsYOIUHmDhmKgG4jW4xdH3lvYp/86WQjmEoeY4GcxaH9JmAN0YBT1Hxcr9bbk1U9ZkP9D//6ace1zfcc7c23PM55S3IDcpzgWBgphKAm1ENW1V5Sh3tl3X99nW6fvva0A0gMUn9D/9D6J4H+LB63XrlLXQdZWpFAc+Bdw/qv/63p1R95oOQPxuYLEIlALfh30iNFkMDm7fr+voHpMSkoD57MGeR+v6v/6qhLGuW3IHRjL8PRcXBmaUcbeuXHtYrO3foH771dfe1l379ckieDQQCy98ARvB2jN3AXQ9o4K4HFNd8XnG9Tvf1KafLNfX0oYk9IDFJ/Vu+Kk2/GVIHM3NGfAyECyuOdVy18g6tWnlcR4+9r9bWNtU3NLIMjohAqATgwdc30qGs+Roa9rGx99HvYJmYxGwkIlpFeZk62i8H/QSevAW5OnrsfUmS0+kc59VAeGD5G4ApA5u3+7fvkkCJKMEJPIB3hEoApo0bLAmUiBKhKuCpb2h0/5qlb0QKlr8BjOmNPbvdLYbGMrB5uyQvS+EESkQZY3tIZlZ2UN7/wLsH3UvfhcuWymazBeU5QKARKgGMqai4REcOlWleTs64e8g8giWBElEqGAU8u155VbteedX9sc1m01f//isBfw4QLCx/AxhTfkGBbHa7u8XQeNxL4QRKxJBAn8Cz9UsP6+fP/UwZGekBeT8gFJipBDCuouIStTQ3+f36gc3bNbA5iAMCwtBkTuApXLZUr+zcEeSRAaHBTCWAceUXFFjSrw+IFFafwAOEA2YqAQAIgGAX8ADhjlAJYEIqysuUmZWt/IICq4cChB1m9BHLWP4GMCEtzU2qqqTpM+CPivIyvbFnt+pqWBJH9CNUApiQouISOR0OvkkCfnI6HDpyiHCJ6EeoBDAhRoshZiuB8Q0v4HE6HBPqogBEGvZUApiwibYYAmLZ8H2W7LlENCNUApiw/IICCnWACSBMIhaw/A0AgAUCfQoPYDVCJQBTKsrLKD4AJsk4hafqFHuUEfkIlQBMocUQMDmcwoNoQ6gEYMrqdetpMQRMkhEsi4r9OyscCGeESgCmZGZla9GSpcxWApO0et16Ct8QFaj+BmBa6cpVKl25yuphAFGhorxMHe2XtXrdeqWkplk9HMBvzFQCABBmKOBBJCJUAgAQRijgQaRi+RtAQNXV1Kiq8qTyFxaoaDnFB8BkGM3SM7OyLR4J4D9CJYCAqqo8KafDoarKU5qXk8OeMGCSOIUHkYblbwABNfwbYUV5mYUjAaJLRXkZf6cQ1giVAALKaDFks9u1aMkyq4cDRJX62hqCJcIWy98AAo4WQ0DgGasA9TeKd1geR7ghVAIW6urqVO3HH6lj9iLN+OScMnrilJOXr4SEBKuHFhDXurtV+8lHar90WZKUOidNC29dpBlJSdaPyeFaqEmtPGn5mAB/eQuStR9/pJbmZl271q3UtDTl5uUrNW2OBaNDrCNUAhZpv3xJ71ccdn0QN1X9Pb3q+uRjtTQ3647VayI+WF7r7tbhsoMa6O93X/vLp91qaW7WmvV3WxLivI/pU0vHBEzU8GD5fsVhtV++5P64tblZrc3NKixers/Mm2/F8BDD2FMJWOTDM2e8Xr/a1am/fHo+xKMJvNpPPhoR3gwD/f2q/eQjC0YUnmMCJquluWlEoBzuww+8f30BgiluaGjoh5Kesnog4eatt95Sv5dvPgAAIPakps3R3Xexj3UM7zFT6UNycrLVQwAAAGFiSpzVIwh/7Kn0Yf16fhpBcB04cECdnZ1e7xUVFWnhwoUhHlFg/fnPf9a5c+e83svJydFnP/vZEI8oPMcETNbFixd19OhRr/cSEhJ0//33h3hEiHXMVAIWKSoq8no9OTlZOTk5IR5N4C1evNhrsVFCQoIWL15swYjCc0zAZM2dO1dz5niv8vb19QUIJvZUAhbq7OzU2bNndenSJSUlJWnu3LlauHBhxFd+G7q7u/Xhhx+qra1NkpSenq7FixcrycIq63AcE2DGhx9+qIsXL6q7u1tz5szRwoULlZ6ebvWwEHveI1QCAADALAp1AAAAYB6hEgAAxITX976lzQ9/Wa/vfcvqoUQlqr8BAEBAOJxO7di5W+/sf9d97fbCZfr8xs9pzZ0rQzqW2voGna4+owe3jF0F//ret3R74TItzFsQopFFL0IlAAAwzeF06ts/eFLNLa0jrp+uPqPT1Wf0tN2m2wuXhWw8L7z4GzW3tI4IlQ9uuX/Ex4ePHNOOnbu17VERKgOAQh3AQq/vfUs7du52f/zglvu17dFHLBxR9Nv+zW97fNPLyszQg1v+VvduvMeiUQGRz/h6lpWZoe898U0tzFsgh9Opnzz7vE5Xn9HCvAV69sdP6/CRY/rJc89rzZ0r9f0nvilJ+slzz+vwkWP6/hPf1Jo7V6q2vkE7du7W6WrXcZNZmRnatvUR92znt3/wpBxOp7ZtfUS/fPE3cjidWpi3QN974pvKyszQL1/8zYjZUrvNpl0v/y/t2Llbr+99Sw9uuV9r7rxDP33u+RFfD7Y9+oje2f8nNbe06uvbH3N/TTC+bjz95A9CGowjDIU6gJUqqz6Q5PqCJ0mHjx6zcjgxq7ml1eObEICJMb6e3bvxc+5ZP7vNpq9vf0ySazna4XT69V7G7KbB+Ds6nHHNeM/a+gb3x/78XT585H2PHzCN8UtSZfUH7rE0t7QqKzODQDkOQiVgEYfT6f6iafz03dzSqtr6BiuHFTNuL1ymN1/9rfsbniS/v+EB8OS88fcnKyNjxHW73eb+tbcQ542xavPmq7/Vm6/+VlmZGXI4nR5fH9fcuVJvvvpb9wpPS2ure1ZScoXaN1/9rfvj4bY9+oh7Kdx41oNb7te9G++R3WbT6SrX1+dDR96XdDNswjdCJWCRw0duzkquvfMO96+H/3QOAJHCdmPFpbl1ZHB0OG7+sJaVOTJwenuNJL2z/10dPvK+Nj/8ZW1++Ms+w2hx4VJJcs8gjn6fybDbbLq9aJl7xvN09RnZbTa2x/iBUAlYxFhasdtcm9eN2crDN34qRnCdrj6jzQ9/2b2ktubOleNWiQLwrbjIFfDe2f8n94yiw+l0/x1bmLfAvdVHkupuvKa5pdX9a2nkMrYxy+grjAbL52/MShr7K28vWjZi7PCO6m/AAg6n0z1TeXuR6yfshXm5OnzkmGrrG1Rb30AlYojV8fsOmHLvxnvcIezbP3jS476xRJ15IyA2t7Rq88NflqQRgc1YRh9+f7Kh0uF0ut/D2xK4YcfO3dqxc7d72f32wmXKysxwh+O1q+7w+bm4iZlKwALDl74PHzmmzQ9/eUQVOEvgwWfsqXz2x09Lcn0De33vv1k8KiBy2W02Pfvjpz2Wie02m77/xDfdS9QL8xaM6HJxe+Eyj4+Hv4dr7+PfTngsw99z9CypYXhRkSRlZaaPuOe6lhHyHpuRipZCgAWM9hm+GK03EHhGa5DbC5fp6Sd/oNr6BvesinENQGA8+fSPdbr6zIj2QZHC6AgxvKAHY3qP5W8gxBxOp7uqcHR4NMImS+DBZ+ypHG54wRQA877/7W/q2z940tWbUoqIYDn8h/6szAwKdCaAUAmE2OmqM+7WNaN7nhn7KiW5mwUj+Gh+DgSH3WbTi88/a/UwJmVh3gI9vv0xCnQmgOVvAAAAmMWJOgAAADCPUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADCNUAkAAADTCJUAAAAwjVAJAAAA0wiVAAAAMI1QCQAAANMIlQAAADBtiqRKqwcBAACAiFYZNzQ0JEmNknKsHQsAAAAi1AJj+fvvJHVaOBAAAABEpq9IajRCZaWkYkl7rRoNAAAAIsppSQ9I+hdJ+v8BnCupzzOfdjEAAAAASUVORK5CYII= "") Which points _best describe_ the profit-maximizing quantity and price for this monopoly?

Correct. A is the profit-maximizing quantity and F is the profit-maximizing price for the monopolist.

Incorrect. Although A is the profit-maximizing quantity, C is not the profit-maximizing price for the monopolist. Recall that a monopolist gets to charge the market price for the good.

Incorrect. A quantity of B and price of D doesn't maximize the monopoly's profit.

A,F

A,C

B,D

Elasticity and Market Power

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