Función Lineal (parte 1)
[color=#000000] Dentro [/color][color=#000000]de las funciones definidas por fórmulas, vamos a analizar una de [/color][color=#000000]ellas, que es muy importante por sus aplicaciones tanto en Física [/color][color=#000000]como en otras ciencias: [/color][color=#000000]la función lineal.[/color][color=#000000][color=#000000] V[/color][color=#000000]amos a [/color][color=#000000]analizar el recorrido de un auto [/color][color=#000000]que viaja a una velocidad constante de [b][size=150][math]80\frac{km}{h}[/math][/size][/b][/color][/color][br][img]data:image/png;base64,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[/img]
La representación gráfica de esta función la como resultado una línea recta, en este caso en particular, tiene un dominio restringido (parte en un t=0) por lo que Dom(f)=[ [math]0;+\infty[/math]).
Supongamos que otros dos autos parten del mismo lugar y al mismo tiempo pero con velocidades de [math]25\frac{km}{y}[/math] y [math]150\frac{km}{h}[/math] respectivamente. La representación gráfica de los tres autos en un mismo sistema de ejes cartesianos sería la siguiente:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAdgAAAH/CAYAAAD0cMwXAAAABHNCSVQICAgIfAhkiAAAIABJREFUeF7snQmYVMX19g8DzDAMgxMHBsEMDIKgCAIxSowkgBoXVBYVBSQCLgkgEUyigp+Gwb8LURPADYwaIIkkChqjoiZiFEWN0bgEIYIQWcI2iILD4sAAX73FVHv79jLdfXu5y3uep5+ZvvdW3apf3e7Tp+rUOQ0OKRGPSoMGDXTLnXRh586duo4jjjgiJQpeL79kyRLd7z59+gSy/07Hj/ycfX7Ij/ycfP9+sX69rD3xRDlY9z2OusqnT5eyiRMT+j7L9POXl1AreBEJkAAJkAAJuIzAxvPPD1OuJQMHJqxcs9GVRtm4SabvYayQVO6ze/fuVIqFyni9vOlIqgy93n+n7Sc/Z58f8iO/VL+At02aJDXLloWK53ftKkfee6+k8l2WShncuL7vD1qwqY4uy5EACZAACeSEQPX8+bJz9uzQvfOaN5dWs2ZJXopLfZnqhC8s2FTXT61QndbB8qmtYZsxID/yc/Ilx+cnOM/Png8+kM9uuinscWk/b56U9O6d8iOUqeeHFmzKQ8KCJEACJEAC2SRwYMcOWTN4sOCvkSPVVHHJoEHZbEbC96KCTRgVLyQBEiABEsglASjXfWvXhppQeNppAgXrVqGCdevIsF0kQAIkQAIhApsqK6X61VdD7/PbtZPWai3WzUIF6+bRYdtIgARIgARkx9NPy+apU0MkGipnpg7qmNucmuxDRQVrJ8L3JEACJEACriEAp6a1o0eHtad8xgxp2qOHa9oYqyFUsLHI8DgJkAAJkEBOCcCZaZ1SrlanprIJE6R01KictivRm1PBJkqK15EACZAACWSVACxXWLBGilVIV1ivXpGoCna22sDbvn17KS4uln79+slHH32k+/Poo48K4v9aX1dddZU+t2rVKh3Ptrna8NuzZ09ZunSpPv7xxx/r62+77Tb9nkICJEACJEAC9RGAUxPWXo2Yddf6yrnpfESgCQQ/Hjt2rJxzzjly6qmnyrRp02T48OHy73//OxSCapaKmNGiRQvdDyhiyChlskOZ3qQ2AEMRDx06VNZa3Knd1Gm2hQRIgARIwL0E4C1sdWpCSzupYw1LStzb6Cgti7Bga2pq5Gc/+5k89thj8otf/ELOPvtsWbFihc5YY+I1Dhs2TFu2F198sZx00kmyZcsWeeutt+TKK6+USWpP0s033ywbN27Ux+wyYsQIbeWizhnK1Id1C4VcXl6ulfYTTzyhy8N6PuWUU2Tr1q32KvieBEiABEjApwSwzxX7Xa1SMWeOJ5ya7EMSoWDPOussueeee7RCfeONN+Ttt9+WM888UytCo2Ch+KAMKyoq5N1335U1a9boejt27Kj/4jjkk08+0X+N3HfffTJf7Vv6wx/+IF26dJGCggJ96qmnnpJ5KtTVvn375Oqrr5ba2lptOb/zzjuC6WoKCZAACZCA/wlEi9RUOnKkZ5ya7CMUMUVsLrjxxhu1ZdlDuUI/8sgj+nBeXp4cddRRcuGFF0qrVq20tfrjH/9YK0NIfn5+2N89e/aY6uTNN9+UxYsXyw033CADBgzQx00+V6zjnn766XpK+qWXXpJbbrlFmjRpItdee62sXLkyVEesf0xOv1jnebx+AmRYP6N4V5BfPDr1nyO/+hnFu8Iv/AqULmlscWo60KGD9iJeV5e3Oh4DJ+cyxS+mgh0/frxWeHBOwnTwMpUW6Ne//rV+GXnttdfkabUI3bBhQ30IFihk7969+m9RUZH+C3nhhRe0An7//fdDx8w/LVu21P9iWrhp06ahcoWFhaE6IwrxAAmQAAmQgG8I5C9cKI1ffDHUn0NKf9Tcfrun+xehYDFdC2vzjjvu0NbrepUx/tZbb9UOTMuXL5fPPvtMJqh9SBCs1zZu3FiOP/54/X716tX6r5kaPu644/R7CBR2OxXa6vrrr9fK9txzzw2dc/oPvJdTFTPtnWo2Ba+XN7/cUmXo9f47bT/57dQfvVQ/P+RHfnh+8pThter++8O+xjs/95wU9+0b96vd7Z/fCAW7adMm+dWvfqWnZr/zne/o6eFmzZrJMccco6eM71cQsOYKxfqi+rUBR6fWrVtLXwVijlqILi0tlYcfflh7F/fq1Utv34FgShlK9l6VEBdKFmu9FBIgARIggWATOLhzp3xqc2oqnz69XuXqBWoRChZbdKBkoVixZgrr9Le//a32/IVV++WXX2oPY0wLwyN4ugIBwfXYqnO7Muk7deokDz30kF6ztQrWVaeqeJJXXHGFVsIUEiABEiCBYBPYeP75YZGa4NRUNnGiL6BEKFgoTihSvOyCNVJ4+0aTDmox+vXXX484hWlieCQbGa0WrPEyMmbMmND/C9UcvFV27doVUR8PkAAJkAAJ+IPA1nHjpEb59xgp7N7dU5Ga6huFiG069RXgeRIgARIgARJwSmD73LlSbUk3h0hNHeE067FgEvE4UMHGo8NzJEACJEACaScQLUNOhVK4+XUxFNJ+wxxVSAWbI/C8LQmQAAkEkYAJJmHte+spU6Rk0CDf4aCC9d2QskMkQAIk4F4CCIOIcIhGivr3lzaVle5tsIOWUcE6gMeiJEACJEACiRPYoLyDEcjfSH7XrtJKJY/xq1DB+nVk2S8SIAEScBEBODVVzZwZahGcmqBc89Rfv0rENh2/dpT9IgESIAESyA0BODVtuO66sJsjcXqjbt1y06As3dUXCtaEy0qF2e7du1MpFirj9fKmI6ky9Hr/nbaf/Jx9fsjP//wQqWn9wIFhwSSOUPEPGqm1WKefP6flM/38cYrYkXplYRIgARIggXgEEEyiVsW0N1J42mnSsi4DW7xyfjjnCws21UDj1gF0WgfLO1tHIT/yc/KFyufHnc/PJuUdvHvRotDQ5quELwjij/XXIHz/0oJ18qlmWRIgARIggagEdqioTJtV7HkjUKodfBapKWrHLQepYOsjxPMkQAIkQAJJEYgWqQlOTU1VCtQgCRVskEabfSUBEiCBDBNApKZ1KqEL/hpBhpxSlW0taEIFG7QRZ39JgARIIIMEsB0HFqwRZMhBnOEgChVsEEedfSYBEiCBDBCoUtPACChhBOuunS2RmzJwS1dXSQXr6uFh40iABEjAGwQQAtEeTKKTOuan9HPJjgQVbLLEeD0JkAAJkEAYAQTvRxB/q1TMmRM4pyb7Y0EFayfC9yRAAiRAAgkTQKQmKFc6NUUio4KNZMIjJEACJEACCRLYNnlyhFMTtuRQRKhg+RSQAAmQAAmkRKB6/nzBywicmjoGLJhEPHBUsPHo8BwJkAAJkEBUAtiKgzjDVkGkpvyKiqjXB/GgL2IRp5oJBgPuNBuD18ubhz5Vhl7vv9P2k5//s8HEUwxOnx+n5XP1/GHddW3fvmFoWt55pxzs2VOS+S5x2n+n5TPNjxZsvE8Pz5EACZAACUQQ2Hj++QIla6Sof385YuzYiOuCfsAXFqzTTBp4CJzWwfLuzOaR6Aec48fxS/RZiXZdkJ6fDRMnSs2yZSEM+V27yrGPPRaRIScap1jH/MqPFmysEedxEiABEiCBMAKI0lQ1c2boWF7z5tJq1qxAB5OI94hQwcajw3MkQAIkQAKaAJya7JGaoFwLunUjoRgEqGBjgOFhEiABEiCBwwQQRMIeTKL1lClSdN55RBSHABVsHDg8RQIkQAIkIFq5IhyikZKBA6VNZSXR1EOACrYeQDxNAiRAAkEmAKcmBPI3kt+uXWDTzyX7HFDBJkuM15MACZBAQAjsUIEjrE5NiNSEYBJBzpCTzNBTwSZDi9eSAAmQQEAIwKlp7ejRYb1FjOGmPXoEhIDzblLBOmfIGkiABEjAVwTg1LROKVdrhpyyCROkdNQoX/Uz052hgs00YdZPAiRAAh4jAMsVFqyR4j59hBlykh9EKtjkmbEECZAACfiWwCblHYy1VyNm3dW3Hc5gx3wRKjGZ4NJ2lk6DRXu9vOGRKkOv999p+8mPwf7t3ynJvHfb87d70SLZPHVqWBfaPPec7GrQQFQU/4iuOW1/rstn+vNLCzbikeEBEiABEggegdr16yPSz7V68EFGanLwKPjCgnUaKBr8nNbB8gwW7+BzyOdPbf9wIvz8OePX7NAhWXX55WEZckpHjpRvJpghh/yj86cF6+RTzbIkQAIk4AMCiDFsdWoq7N6dwSTSMK5UsGmAyCpIgARIwKsEdqqA/ciSYwROTZ0tkZu82i83tJsK1g2jwDaQAAmQQA4I7F26VLZNnhx2Z0ZqSt9AUMGmjyVrIgESIAHPEEAQic2XXRbW3vLp06W4b1/P9MHtDaWCdfsIsX0kQAIkkAECq/r1i3BqKlOB/SnpI0AFmz6WrIkESIAEPEHAHqkJTk2M1JT+oaOCTT9T1kgCJEACriUAhyarU1Ne8+bSkRlyMjJeVLAZwcpKSYAESMB9BKJlyGk9f77kV1S4r7E+aBEVrA8GkV0gARIggfoIwKkJ665WOXLSJCns3bu+ojyfIgEq2BTBsRgJkAAJeInAmsGDw9LPlQwcKFCwlMwRoILNHFvWTAIkQAKuILBBeQdXW4JHMFJTdobFF7GIU80EA8S5zuaQ6/ubxyxVhrluf67vT37MpuPkq9rp85vI81et1lirZs4MNRNOTS3uv19nyHF6f6+XT4RfvPGtr/+0YOPR4zkSIAES8DCBmmXLIiI1tVKhEQu6dfNwr7zTdF9YsE4zOWC4nNbB8tGzSST6USA/8kv0WYl2HZ+fyOcHTk3rf/jDsGASZRMmSJvhwyMQkl8kvwhIcQ7E4kcLNg40niIBEiABrxJAMIl9a9eGml/cpw+DSWR5MKlgswyctyMBEiCBTBPYVFkpO1TwCCP57doJgvhTskuACja7vHk3EiABEsgoASjWzVOnhu6B9HPMkJNR5DErp4KNiYYnSIAESMBbBKJFakKM4aY9enirIz5pLRWsTwaS3SABEgg2ATg1rVPrrvhrBE5NpaNGBRtMDntPBZtD+Lw1CZAACaSLADPkpItk+uqhgk0fS9ZEAiRAAjkhUKWmga1OTVh37WyJ3JSTRvGmElXBzp49W9q3by/FxcXSTwWH/uijj0KobrvtNmnbtq20bNlSxowZI7W1tfrcqlWrpI9yA2+uooT07NlTli5dqo9//PHH0kBFDEE5CgmQAAmQQHoJNPzgA9lw3XVhlXZSyrVhSUl6b8TakiYQoWCXLFkiY8eOleOOO06uv/56efvtt2V43cbkv/3tb3LLLbfIKaecIpdccok89NBD8vDDD+ubjlLz/MtU1JCbbrpJdu3aJUOHDg0p36RbxQIkQAIkQAL1EsjbskWa3Hxz2HUVc+bQqalectm5IELB1tTUyM9+9jN57LHH5Be/+IWcffbZsmLFCjl06JA89dRTkpeXJ3PUAD7wwANSoXIILly4ULaoQX7rrbfkyiuvlEkqO8PNasA3btyoj9llxIgR2spFnTPUtAas20cffVTKy8ulRYsW8sQTT+jysJ6hyLdu3Wqvgu9JgARIIPAE4MwE5dpAGTRGSkeOpFOTi56MiFCJZ511luC1fft2eeONN7QFe+aZZ2pFuGbNGikrK9PKDwIF+8knn+jjkI4dO4aO4x+cw1Sykfvuu0/mq8DTT6t9Wl26dBFYyxAo7nnz5smgQYPk6quv1hb0tGnTZPz48YLp6ilTpoTqiPaPqSfaOR5LjAAZJsYp1lXkF4tMYsfJLzFO1qsK1Hdk49WrQ4cOdOgg64cMkXV136vJ1xjcEpl6/iIsWIP4xhtvlN4qEW+rVq3kkUce0Yf37Nkj+fn5oVHA/ziGF8ScM3/NcZx78803tWV8ww03yIABA/T1UNqQq666Sk4//XQ59dRTpbq6Wk9DY30X1vLKlSv1NRQSIAESIIHDBPLVzGHjF18M4ThUVCQ1t98uh5o1IyIXEYiwYE3bYD1C4cE5CY5OWF9t2rSp7Nu3L9T8vXv3SpEaWByHmHM4DsE5Iy+88IJWwO+//37omPnHWLmwjFGXKVdYWBh2v4iCdQfgXJWqmDRtsYI111ev18ubX26pMvR6/522n/x26o9Iqp8f8kueH4JJ/Eelm7NK5+eek+K+fev7uoo47/T593r5TD9/ERYspmt//vOf6ylcrKlefvnlslpNQ8Ab+Nhjj5WqqiptZUIwBQxnKByH4DpzHH9xzggU9u3qFxYcpaBsKSRAAiRAAskRwLrrKmXwWGWf+m5NRbkmd2denQqBCAW7adMm+dWvfiUXXXSRVoiYHm6mph2OOeYYufTSS+XgwYNa8WKdFM5Nw4YN0+uyfdWvJzg/Ye30rrvu0tt8evXqFWoTppqhZOHMBO/kAwcOpNJeliEBEiCBwBKAcrVGaqo95xzZd/HFgeXh9o5HKFgozsmTJ2vnJkwPQzHCUxiev5hGvOOOO7Tz05NPPikTVBguWLgQKOLjjz9eK+UStf8K3sBYQ7VKkyZNZKoKQr18+fLQ9h63A2L7SIAESMANBKJFaqpRRgvFvQQi1mAbNmyolShe0QTKFy+7dFAebK+//rr9sJ4mxhYfI6NVrEy8jMCZyQgUuVWwn5ZCAiRAAkEnsH3uXMHLCCI1Vaj323YeXsMNOh+39j/CgnVrQ9kuEiABEggiATg12SM1QbkyQ477nwYqWPePEVtIAiQQUAJYb10zeHDYumtrFRegRMUMoLifABWs+8eILSQBEggoASjXfWvXhnpfMnCgtKmsDCgN73WbCtZ7Y8YWk0BaCGB/OxwS8XrmmWei1oltdXBuxD5X7FP/wQ9+IP/4xz+iXuumg1999ZV2woSjJQLafKCmWa3yk5/8RB83/cf/5rXDkk910aJFOnkJHDRbt26tA+WYBCeZ7u+GiROl2pIRJ79dO73uSvEOgQgnJ+80nS0lARJIlQBifL/22muh4gsWLAhFWDMHX1Vf7v3799db6o4++mj58ssvZfHixToq27///W+BY6MbBdm/kKAEwXFiiQmQACfMdkpxNWr09Vdh48aNdbF33nlHh2+FQsU1mzdvlrvvvltvVbznnntiVa0j08Fh06qoY14c4wQcmqpmzgydhVNTBxVilhlyYgBz6WFasC4dGDaLBDJJANvsoCgQUAYCCxaJPqwCZQLliv3r//vf/2T9+vXSpk0bHRr1ORU5yK2C7YXr1q2LuxXQKNhx48bJ448/rvtjXiaSHOIBQLlOVJbkWjVNi62LECQ6ibXDYf/+/Tq2uhOJ5tRUrhKj0KnJCdXclKWCzQ133pUEckoA+9QhSK7RqVMnbZ3+9a9/DWvTT3/6U3n22Wd1Vi0IplNNdDYTzQ3HoXQxvVqf0oXiOe2003Q9yJz14x//OBTHPOzGdW+6du0amra1TuGa/+3TvqaO73//+9rCRgrNWGIULILoxBJY8BAE3YH06NFDB9zB9DOseLug/wgH+8UXXwjqRzsRFS8ZgVPTOrWN0RpMokxNdZfG6Usy9fPa7BLwxRSx+bCkgm737t2pFAuV8Xp505FUGXq9/07b70V+mB7GnnWsTyLJxqeffiqrVq3Sma6sMam//e1vh55zZNdCGaSgxHTqGWecoZWIlR/+j/UcYS3zsssu02uZUOoIs/qb3/xGK0JEf4tWDtm64kV8g3UZbfxwH4i1Tlic1veff/65vuZf//qX/PGPf9RR6bp37y5IcoJoc4inblJl4geBKXvUUUfJf//7X91uRKqz3h8x1TGljGxhULRXXHGFgGG0vhmw9vZvVuk8YcEaKVQ/SJqr4Dzx6rD3NVQ4gX/s90+gSNglXi9vOlMf31hc6uu/LxRsrM7zOAmQQCQBTAdjehjWJCzJ8847T+699155/vnn9TRxQUFBWKEXVdaWoUOH6mNQGJXKi9VMLeMYFCWU7kknnRR5s7ojd955p/4PYVKRVQvy3e9+VztMQdnCOrQLclLXJ/V9wcUqbyxwTPcawZrtK6+8otderVPA+FFgxCQ2sVrw5hysewTOgYJFGfxwSEY+V9fvVj9EjDRSir61+tFD8S4BXyjYVDN5WIfNaR0sf4SjTwH5ZY8fpn0hUJpYb4QlhqlPWGZQeCadpBlQhEtFrucNGzZob9y5ygEHqSzNmJ1//vlxs+lAWcHxCIJpX6OcTj75ZFmxYoU+B8cgJxLt+bF6+2Iq2HoN2gHHLUwn/+hHP9Lry3Do2rhxo/zpT3/S1rYRlDNljQMUFKi1PvO/Wb/F9HC0NsXq4yGl2KFgrXKs+iHUtG3bWEXCjidzr2gVsnxmPn++ULDRHhgeIwESiCQAT9ilS5fqEzOVl+pDDz2k/8cUMCSaNzESecDKhFfs2WefrT1koZxmKMebRMTqTYuEIXbZtm2b/ZB+f7EKYm8ydEW7AM5JmLJNRcyPDDM1iOnoCy+8UH7/+9/rHxGIyW7EmtfaWLaYNk6X1CjLeZMlfCzqrVCJU+jUlC7CuauHCjZ37HlnEsg6AeM9jBtHU15Wb+J58+bpdUismUKRQakMVoEP/vnPf0Z18onVGasygmeyNY0lrFdYyNEEKTKRGCSWmLzTsc7HOo51XfzQ+Oyzz3TWLyNYN4VgmhwWaltlPcKyheWObToQeCdDrH3QB1KUg2odu0p5MludmkpHjqRTU4o83VaMXsRuGxG2hwQySMB4DyNhB5JwwLrEC0oFitB4E2Md9pZbbtEexL/85S91i3AN9sFC4NBjBMfgQYtc0dEE07PdunXTpzDFiillvDCNim0tCGARTaB80cZYr2jrttHqsR+DxQzliQASWF+GYGrYBNswaTbPOussfc4kIYGDFxQu2nvqqafaq9Xv0ScIPI3jOWiZwtvUOMCCNVKoHK0YTCKEw/P/UMF6fgjZARJIjAByPSPVJATTr1aB9XbBBRfoQ5gmhsCZCYKpYDhDQam+/PLLWolg/6gRpKxEWVi2sQTKGoJISPCuHTJkiFay2Guabrn55pt13QNVWEEj1157rT526623amt8pLISIQhIAeesY489VqB4YamifRBsU8IPDUylw9LFVDkEnsZWxyd9sE6wZQmCHyNwHoMDWCypUlyrLU5MCCbR2RK5KVY5HvcOASpY74wVW0oCjgiY6WE4NH3rW9+KqMsoXTNNjHXIhx9+WE488UTtVQunIVhu2M8K5ZGMQKFizRTex/AOhuUIhQflZbWGk6kz1rVw1MK2IHhFG8EWIxwzPwJmzZqlf0CABYJowMrGDwX8ADEOP8hvbUIl4sdJWVmZzpF90003xbq1VsTwkkZ9qAvTy9EEIRDtGXI6qWOM1BSNlnePNVDTL18na/VYP8x0jJMuGCeHVL3ovF5+yZIletSt+x+TeQy83n+n7Se/w/lIU/38BJEfgvevUNPT1nXX8unTpUxFjEpWgsjPysjtn19asMk+0byeBEiABBwQsKefKx42LCXl6qAJLJolAlSwWQLN25AACZDAWrUdxxqpKV/tx22ZZEAKUvQOASpY74wVW0oCJOBhAsiQg5cRODW1UU5OeeovxZ8EuA/Wn+PKXpEACbiIAKxWWK9WQfq5gwlGanJRV9iUJAj4QsGmGqgZnFKNZWoYe7286UeqDL3ef6ftJz9nyTKCwA/BJNbWbfEx/T1y0iQ5qByd+Pw5e37czo9TxEn8GuGlJEACJJAsgY1qOxKUrJEiFfMYCpbifwK+sGBT3SJgHV6ndbC8s3Uk8iM/J1+3bn1+NqitN/ZITceqfcBYf+X3z9cE3Dp+iT6TsdpPCzZRgryOBEiABJIgAIemKhVIwwiUKsIgMphEEhA9fikVrMcHkM0nARJwHwE4NdkjNUG5MkOO+8Yqky2igs0kXdZNAiQQOAKI0GQPJtF6yhQpGTQocCyC3mEq2KA/Aew/CZBAWglAuSIcopHiPn2kTV3ihLTeiJW5ngAVrOuHiA0kARLwCoFNSpEikL+RfJWdB/tdKcEkQAUbzHFnr0mABNJMYIdSpJunTg3VCqcmKFc6NaUZtIeqo4L10GCxqSRAAu4kEC1SU7nK90qnJneOV7ZaRQWbLdK8DwmQgC8JIIjEOhUG0Zp+rmzCBCkdNcqX/WWnEidABZs4K15JAiRAAhEEto4bF5YhB05NsF4pJEAFy2eABEiABFIk8LlKNbd70aJQabPummJ1LOYzAlSwPhtQdocESCA7BOAtDAVrlU7qGJ2assPfC3fxRSziVDPBYICcZmPwennzkKbK0Ov9d9p+8nOWDcWr/GrXr5f1tsARrR58UPa3by/JfJb4/Dl7ftzOjxasF34GsY0kQAKuIQCnps2XXRaWIad42DApHj7cNW1kQ9xBwBcWbKxMBskgdloHyzMbTDLPm/1aPj/eeX7W2jLk5HftKp3mz7cPaVLvOf7eGf9oAxtr/GjBRqPFYyRAAiQQhUCV8g5Glhwjec2bSxuHyjXKbXjIJwSoYH0ykOwGCZBAZgnAqcmeIae1Uq6N2rbN7I1Zu2cJ+GKK2LP02XASIAFPEDAZcqyNLZ8+XQp69/ZE+9nI3BCgBZsb7rwrCZCAhwis6tcvLFJT6ciRUqbWYikkEI8AFWw8OjxHAiQQeAJrVRhExBo2Uti9OyM1Bf6pSAwAFWxinHgVCZBAAAnAocnq1IRITR2ZISeAT0JqXaaCTY0bS5EACficQLQMORVK4eZXVPi85+xeughQwaaLJOshARLwDYFoTk2tp0yRElv0Jt90mB3JCAEq2IxgZaUkQAJeJrBm8GDZt3ZtqAslAwdKm8pKL3eJbc8BASrYHEDnLUmABNxLYIPyDsaeVyNwasLUMIUEkiXgi32wyQTXtgNyGiza6+UNj1QZer3/TttPfs6CtbuNX7UKHFE1c2boawKRmlrcf7/satBAVBR/+9dHzpOFuI1fBKB6Djj9/Dktn2l+tGDreQB4mgRIIBgEapYtk22TJ4d1tqVKR1fQrVswALCXaSfgCws2VqDlZGg5rYPl/RmsO9FniOPv7fFvduiQrP/hD8My5JRNmCDfHDs2oUeA4+/t8c/dLPhDAAAgAElEQVTU+NGCTejjw4tIgAT8TADBJKxOTcV9+jCYhJ8HPEt9o4LNEmjehgRIwJ0EPlfTwDtU8Agj+e3aSQfLe3e2mq3yAgEqWC+MEttIAiSQEQK7Fy0SKFgjiNQE5dqwpCQj92OlwSJABRus8WZvSYAE6gggUtPWcePCeJSrfK9Ne/QgIxJICwEq2LRgZCUkQAJeIoBITevUuutBy9YbZMgpHTXKS91gW11OgArW5QPE5pEACaSfABKn2zPkMJhE+jkHvUYq2KA/Aew/CQSMQJWaBrZmyEEwic6WyE0Bw8HuZpBAVAX7yCOPSIcOHaRZs2bSu3dv+aAuF+Kjjz4qDVREE+vrqquu0s1btWqV9FGu7c3Vw9qzZ09ZunSpPv7xxx/r62+77bYMdoNVkwAJkED9BBACEdarVY5Wjk50aqqfHa9InkCEgn3vvffkRz/6kRx99NFy0003yUcffSTDhw/XNZtwerNmzZIFCxbo19i6jdij1NrFMhUJBWV27dolQ4cOldra2uRbxBIkQAIkkAEC2OeKIP5WafXgg4zUlAHWrPIwgQgF+8UXX2gFO2/ePK0szznnHG2F7t+/P6Rghw0bJv369ZOLL75YTjrpJNmyZYu89dZbcuWVV8qkSZPk5ptvlo0bN+pjdhkxYoS2clesWCEz1FQNrFtYxuXl5dKiRQt54okndPni4mI55ZRTZOvWrfYq+J4ESIAEkiJg0s/hrxE4NRXXGQ9JVcaLSSBBAhEK9owzzpDZs2dL+/btZfv27bJkyRLp2rWrNG7cOKRgofigDCtU4uF3331X1qxZo2/XsWNH/RfHIZ988on+a+S+++6T+SqY9h/+8Afp0qWLFBQU6FNPPfWUVuj79u2Tq6++Wlu+09TetHfeeUe3hUICJEACTghEc2rClhwKCWSSQMxYxFCu5557rlayjz32mG5DXl6eHHXUUXLhhRdKq1attLX64x//WCtDSH5+ftjfPXv2hNr+5ptvyuLFi+WGG26QAQMG6OOwXiFYxz399NPl1FNPlZdeekluueUWadKkiVx77bWycuXKUB2x/sGPAIozAmRIfs4IOCudyeev8YsvSoEl3dyhoiLZroL6L/3wQ2eNdlHpTPJzUTcz1pRM8YuqYDEtiyng9evXy5NPPqmVH+TXv/61fhl57bXX5GlEPWnYUB+CBQrZu3ev/lukHmQjL7zwglbA77//fuiY+adly5b6X0wLN23aNFSusLAwVGdEIR4gARIggXoI5K1eLQWWSE24/Kvbb5eDylCgkECmCUQoWEzPnn/++bJp0yZ5+eWXpVevXqE2wJL97LPPZILKMgGpqanRU8fHH3+8fr9aPcwQMzV83HHH6feQ8ePHSzsV4/P6668XKFtYx+kSeC+nKsZxK9VsCl4vb365pcrQ6/132n7yO5wjNdXPTyb5Yb112aBBcsDy5VA+fbogS44Rp+Of6/KZ5JfId2qu++/0/pnmF6FgH374Yb2uii/cV155Rb8gV1xxhfzjH/+Q+1XyYay5QrG+qKZe4OjUunVr6du3r8yZM0dKS0sFdWANF8oZ23cgmFKGkr333nu1kj3rrLMSGT9eQwIkQAIpEVilZuGsTk0lAwdK2cSJKdXFQiSQCoEIBbt8+XJdDzS7dV4a3sR33HGHfPnll3pNFtPC8Aiern4RQrB3Flt1blfTL506dZKHHnpIr9laBeuqU6dO1coaSphCAiRAApkgsEEpUkZqygRZ1pkMgQgFCwsVr1gCb99ogsAUr7/+esQpTBMfUsmMjYxW8T/xMjJmzJjQ/wsXLgwrj/20FBIgARJIhgCiNFXNnBkqggw5CIPIYBLJUOS16SAQsU0nHZWyDhIgARLIBQFYrfZITVCuzJCTi9HgPalg+QyQAAn4gkC0YBKtp0yREuXoRCGBXBCggs0Fdd6TBEgg7QQQBhHhEI3AqalNZWXa78MKSSBRAlSwiZLidSRAAq4lAKcmBPI3kq+2BDL9nGuHKzANo4INzFCzoyTgTwK7VTYcu1NTBwTAKSnxZ4fZK88QoIL1zFCxoSRAAnYCNSqD19Zx48IOI8YwnZrspPg+FwSoYHNBnfckARJwTABOTVVKuR7ceTiaFCpElKZStR+fQgJuIBCxD9YNjUq2DSZcVrLlcP3u3btTKRYq4/XypiOpMvR6/522n/ycfX6c8NusAt3AgjVSeNpp0lwFsknmWXY6/rku74Qfyua6/bm+f6b50YINfTz5DwmQgFcIfK4C+GPt1UieyjHdWqXCpJCAmwj4woJNNdC4dSCc1sHyRzh6rsmP/BJ9gHYoByYoWKt0VqFdm7Ztm2gVEdfx+ePzF/FQJHEg1vNDCzYJiLyUBEggtwSwz3WtJdQqWtPqwQfp1JTbYeHdYxCggo0BhodJgATcRSBapKbiYcOkePhwdzWUrSGBOgJUsHwUSIAEPEEAMYbtGXJazZrlibazkcEkQAUbzHFnr0nAUwSq1N5WZMkxggw5nS2RmzzVGTY2MASoYAMz1OwoCXiTAEIg2jPkMFKTN8cyaK2mgg3aiLO/JOAhAmbd1drk8unTpbhvXw/1gk0NKgEq2KCOPPtNAh4gsKpfP4GSNVI6cqSUqcD+FBLwAgEqWC+MEttIAgEkgO04dqcmxBmmkIBXCFDBemWk2E4SCBABODTZnZo6MkNOgJ4Af3SVCtYf48hekIBvCMBqtQeTgFNTfkWFb/rIjgSDABVsMMaZvSQBTxDAeivWXa3SesoUOjV5YvTYSDsBX8QiTiZ7hh1ArrM55Pr+hkeqDHPd/lzfn/zSm01n4wUXhDk1FfXvL0UqwESs5zPX45/r+/P5S+/zZ9cP9b2vb/xpwdZHkOdJgASyQmDbpEmyd+nS0L3yu3YVRmrKCnreJEMEfGHBxspkkAwzp3WwPLNxJPO82a8N+vNT++c/y87Zs0NYEKmpw+9/n3CGnKDzY//d+f1DC9b+Tcf3JEACWSWQt3p1RKSmCuVF3LRHj6y2gzcjgXQToIJNN1HWRwIkkDCBBrt2SZObbw5bdy2bMEFKBg1KuA5eSAJuJUAF69aRYbtIIAAEClTi9LwtW0I9Le7TRxhMIgADH5AuUsEGZKDZTRJwG4FNlZXSyOrU1K6dYL8rhQT8QoAK1i8jyX6QgIcI7FCKdPPUqaEWa6cmRmry0AiyqYkQoIJNhBKvIQESSBuBaJGaMC1Mp6a0IWZFLiFABeuSgWAzSCAIBBCpaZ0K4m/NkLP/4ouldNSoIHSffQwYASrYgA04u0sCuSRgz5BzoEMHqRk/PpdN4r1JIGMEqGAzhpYVkwAJWAlUqWlgrL0awbrrVzNnEhIJ+JYAFaxvh5YdIwH3EKh+9dWIYBKd1LFDzZq5p5FsCQmkmYAvQiXGCgSeCKv6gjXXV4fXy5v+pcrQ6/132n7yqz/Yeu369bLeFjii1YMPyv727UVUajoIn7/6vmninye/+HzqO5spfrRg6yPP8yRAAikTOLhzp2y+7DLBXyPFw4ZJ8fDhKdfJgiTgFQK+sGCdBrrGYDmtg+XdGWw70Q8ixy8z47d24kSpWbYsNAyF3btLB2W9Yv3VKuSfGf58/hMjkKnnjxZsYvx5FQmQQJIE4NS0XQXtNwKl2pHBJJKkyMu9TIAK1sujx7aTgEsJIJjEBpUo3SqI1JRfUeHSFrNZJJB+AlSw6WfKGkkg0AQQRGJVv35hDMqnT5fivn0DzYWdDx4BKtjgjTl7TAIZJQDlao3UVDpypJSptVgKCQSNABVs0Eac/SWBDBKwR2qCUxPTz2UQOKt2NQEqWFcPDxtHAt4hAIcmu1NThTrWsKTEO51gS0kgjQSoYNMIk1WRQFAJRHNqgnJlhpygPhHsNwhQwfI5IAEScEQAQSTWDB4ctu7aesoUKbFFb3J0ExYmAQ8SoIL14KCxySTgJgKI1LRv7dpQk0oGDpQ2lZVuaiLbQgLZJbBWhQC9oaf4IpJTdsnxbiRAAobAtkmTZO/SpSEg+e3aCaaGKSQQWAILpoosqNTdp4IN7FPAjpOAMwJwaNo5e3aoEkRqQjAJOjU548rSHiUAq/XB0SL4Wye+ULCpZkIAA6fZVLxe3jwIqTL0ev+dtj+o/BBfeKNtb2uLO+/UGXJSeZZSKcPPb+h7PCXm5Jc+fgXPTJMmz077usK6/3yhYCN6xQMkQAIZIwCnpqpx48Iy5BwxZgwz5GSMOCt2K4HGG5dLyfzrBH+tcqiwuey9YpY/poidZkIAGKd1sDyzgTj5EvDS87Nm1KjwDDmnnSYdZ81y0n1+/mzZhZKF6aXnJ1rfPNl+y1prWJ9OHigNxqktakUl/lCw0QaMx0iABNJPYJPyDt6h1lmNNCovl9bz56f/RqyRBNxKYNtakbsHh6216qY2VUbGkEqR874OC8opYrcOIttFAi4jAMW6earykLQIlGueQ+vLZd1kc0ggNoHnZx72EN69I/yaLn1Erpkr0rIi7DgVbGyUPEMCJFBHAPtcEWfYKhVz5kijbt3IiAT8TwBWKzyEl78a1lestdYMmCxNLpoUlQEVbFQsPEgCJGAIIDOOPVITMuSUqrXYVL1/SZcEPEMgjtW66/L75GBpW2kSozNUsDHA8DAJkMBhAkicjljDRpAhh8Ek+HT4nkAMq9W61gqP+nhCBRuPDs+RQMAJVM2YEZEhp/OrrwacCrvvewJxrNZoa62xeFDBxiLD4yQQcALVSpHCerVKJ3WMkZoC/mD4ufsJWK3JdD9qsP9HHnlEOnToIM2aNZPevXvLB5bpodtuu03atm0rLVu2lDFqc3ltba2+36pVq6RPnz7SvHlz6dmzpyyti0/68ccfS4MGDQTlKCRAAt4gAKcmrLtapXz6dKaf88bwsZWpEHh1rg7Qb3dkknbdRSpfDdt+k2j1EQr2vffekx/96Edy9NFHy0033SQfffSRDB8+XNf3t7/9TW655RY55ZRT5JJLLpGHHnpIHn74YX1ulHJ4WKbCp6HMrl27ZOjQoSHlm2hjeB0JkIA7CERzaiqzhUZ0R0vZChJwRqBRza7D+1rhJWzffjNkijqn/A8qeqR0kwgF+8UXX2gFO2/ePK0szznnHIEVun//fnnqqackLy9P5ij3/AceeEAqKipk4cKFsmXLFnnrrbfkyiuvlEkqu8bNN98sGzdu1MfsMmLECG3lrlixQmao9R1Yt48++qiUqw3rLVq0kCeeeEKXLy4u1op869at9ir4ngRIIIMEsB3H7tRUrj6rFBLwG4EWny6VXr8fKvLO18FTdB9htd71/uHAEQ46HbEGe8YZZwhekO3bt8uSJUuka9eu0rhxY1mzZo2UlZVp5QeBgv3kk0/0cUjHjh1Dx/EPzmEq2ch9990n89XG9KfVhvUuXbrouiFQ3FDog1SC5quvvlrGjh0r06ZNk/Hjx8tsla1jikreHE9MPfGu4bn4BMgwPp/6zvqFX+MXX5QCS7q5Q0VFsn3yZFn64Yf1IXB03i/8HEFwUJj8koMHq7Xzy9PkBKVg7bLulFGy9uRRIuuUh/C6wzrKfk2i7yMUrCkI5XruuedqJfvYY4/pw3v27JH8/PxQ3fgfx/CCmHPmrzmOc2+++aYsXrxYbrjhBhkwYIC+HtYr5KqrrpLTTz9dTj31VHnppZf0NHSTJk3k2muvlZUrV+prKCRAApklkLd6tRSoH7ZW+er22+XgUUdl9sasnQSySABWK5Srnhq2yK7SDrLyzMmyq8VhQzEdTYqqYDEt269fP1m/fr08+eSTWvlBmjZtKvv27Qvdd+/evVKkfuHiOMScw3EIzhl54YUXtAJ+/31ldtvEWLmwjFGXKVdYWBh2P3s58x7OVamK2SifarBpr5c3v3xTZej1/jttv1/4NTt0SJapGaQDlg9SazVz1GbChLgfLfI7vA8yV98ffnn+ssIP66tYZ7VPB+MJV2utzYZUyklxn/bIk/U9/xFrsPAKPv/882XTpk3y8ssvywUXXBCq9dhjj5Wqqiqprq7WxzAFfNxxxwmOQ1arX8DmOP7inBFM996ufg3DUQrKlkICJOAeAnanppKBA6VNZaV7GsiWkIATAlCq49tHKFdYrf+69BHHa62xmhZhwcIr+N1339Vbbl555RX9glxxxRVy6aWXyiyVlgrOTKWlpdq56U6VZBnrsn379tXOTziOOtqrxMu9evXS23cgrVq10muq9957r1x//fVy1llnxWoTj5MACWSRwDblmIg9r0YYqSmL8HmrzBKIZ7X2nyD/ah++FS3djYlQsMuXH04ci6kH68I5vImhdO+44w65//77tVfxBDV9dPnll+s2Ye8sturASu3UqZPewgOPY6tgXXWqysYBZW2296S7Q6yPBEggcQLVyulwp3IkNNJQZcZBGEQGk0icIa90KQEE5seUMIJHWKVlOxGVr1VO6CtKyWW08REKFsoTr1gyWXkU4mUXBKZ4/fXX7Yf1NPEhtb5jZLTaAoCXEQSrMIItP1bBfloKCZBAZghgK84222cZyrVpj9T2/GWmlayVBJIkAKt14VSRRVG2limrVedsVcnQsyERCjYbN+U9SIAEckvAZMixBiuHU1OJcnSikIBnCSRitWaxc1SwWYTNW5GAWwjAqQnhEI0Uq+UfOjW5ZXTYjqQJuMhqtbadCjbpkWQBEvA2gU3KO9jq1NRIRVHroIK/UEjAiwQarVwqMm98/LXWHHWMCjZH4HlbEsgFgR1KkW5WjoZG8lTY0tbK0YlOTbkYDd7TEQFltTZ5/CYpWDwrsposr7VGNuDwESrYWGR4nAR8RgBOTYgzbJWWKnJTQbduPuspu+N7AnVrrQV2D+GmR4hcr2Zj4CHsAqGCdcEgsAkkkGkCcGpap5Qr/hopU9vsiusyZWX6/qyfBNJGYIGagVlQGVndyQMPb7/JkodwZAMij1DBRjLhERLwHYFYGXJMqDffdZgd8h+BtR8c3teKvxY5VNhcGoyfJ3Ky+zzgfaFgnXxJ7N6929GD6PXypvOpMvR6/5223wv8PlfTwFh7NaLXXZ95RjDmTvvvtLwX+MX7gnDaf6flg8Kv4Jlp0uTZ8EQU6PtX3c6WHcNnSGGL1qIe6HhDFfdcpr7/fKFg45LjSRIIMIG9S5cKFKxVjl60SPJUxCYKCbidQMMNy6RwzjjBX6vAat17xSzZcWxfV3fBFwo21UwM1pFxWgfLO/vCJr/088M+109HjAj7AqpAvPDevSO+lMg//fwjIMc5QP5R+MdZa20wTkUcU2ut++usVrfy84WCjfPc8hQJBJKAidRkdWoqHTlSSlW8cAoJuJpAjLVWgYfwNXNdudYaiycVbCwyPE4CHiaw4brrBNtyjDBDjocHM0hNj2O16gD9LvIQTmRYqGATocRrSMBDBKpmzJDtKmi/EWTI6chITR4awQA2FftZ71ap42wewtpqRXD+8yZ6EgoVrCeHjY0mgegEYLXCerUKwiDmV1REL8CjJJBjAgUvq3SJ8BBGPGGrdOlzeEq4pXefXSrYHD9cvD0JpIsA1ltX9esXVl359OlS3Ldvum7BekggfQSU1Vp07w9FxxK2isetVmtXqGDT97iwJhLIKQEoV7tTU9lEb06t5RQkb555As/P1NGYGvnQaqWCzfzjwzuQQFYJxIrUlNVG8GYkUB8BrLU+qOJhI5awVXxktVq7RQu2vgeC50nA5QSqVTacaE5NzJDj8oELWvPqrFb7Wmttp9Ok0YQ/iHh4rTXWUFLBxiLD4yTgAQI1y5bJ1nHjwlpaoTyI6dTkgcELShPjWK1fXTBJas4cK04DRbgVJRWsW0eG7SKBeghgvXXzZZeFXdV6yhQpGeS+oOf1dIWn/UoghtUq7bprD+Gab7T3a891v3yhYFMN1AwAToNte728ebpTZej1/jttfy75bbzgAqldvz70BVXUv78UqS06yYyl0/47LZ9Lfn74/LuVX4M9O3UM4cYfLAo9n+afmgGTBJarG/hnmp8vFGzECPIACficwLZJkwSB/I3kd+0qrWbN8nmv2T0vEIBShXKFkrXKgW921QH6D5R380I30tJGXyjYdMzfO62D5aME607iESW/xPnBoWnnbLU5v06Qfq7D738vTdu2TYJ4+KXknzj/aJDJT/HDlht4CL/zdWrEEKshU6ShisjULBo8dcyv/HyhYGOMGQ+TgO8IRIvU1FKlo2vao4fv+soOeYgAlCqUq31fa91aq1QE8/mkgvXQM8ymBpsAnJrWjR4dFkziiDFjpHj48GCDYe9zRsCstUqUtVZRVquOIxxgoYIN8OCz694iYA8mUdynj8B6pZBATggoq7X4gVERa63GQzioVqt1LKhgc/Jk8qYkkByBTZWVssOSESe/XTtBEP9dyVXDq0nAOQHLWmsDe239J4iMmmE/Gtj3VLCBHXp23CsEoFg3T50aai7Sz0G56khNO8M9Nb3SJ7bTowQQ4vAelVbOvtbasp3ofK0n9PVoxzLTbCrYzHBlrSSQFgJwasLUsFXKVb5XOjWlBS8rSZQAFOpC9SNvUaR1WnPGGCkYcafnkqEn2nUn11HBOqHHsiSQQQLRnJpKR46U0lGjMnhXVk0CNgKwWuEhjJCHVlFW6+6RD0ht595SUORsm5NfmVPB+nVk2S/PE0DidFiwRgq7dxfEGaaQQFYIxLFaBWutykO4tjZiFTYrTfPKTahgvTJSbGegCFSpaWB7hpzOr74aKAbsbA4JxLFaw9Za6QMQd5CoYOPi4UkSyD6BaqVIYb1apZM6xvRz2R+LwN0xAatVipRzHSUhAlSwCWHiRSSQHQL71q6VNYOVl6ZFyqdPp1NTdvAH+y6JWq3BppRU732hYJPJHmKn4zQbiNfLGx6pMvR6/522P538Dqrpto0DBoRFaioeNkwKlBdxrPFx2v5cl08nP/tnO5H3ue6/0/uni1+TxydLweLIZBH7e/SXvaNnyaGmyokpynSw0/bnuny6+MV61nyhYGN1jsdJwEsEtk2eLEigbgQZchipyUsj6L22Nt64XErmXyf4a5VDhc115pv9Pc7zXqdc1GJfKFinmRgwHk7rYHlnbvpB51f75z9L9fz5oa8GBJPo/Oyzkp9ghpyg82P/U/j8LVD7WhdURqqjkwdKAxU0omkSa63kH52/LxRs5BPCIyTgHQKwWjfYgkkgUlN+RYV3OsGWeofAWrX1C/ta8dcqmAa+Zq7IyYO80xeXt5QK1uUDxOb5m4Bedz3//LBOwqmpuG9ff3ecvcsNgThWq95+k4TVmpsOeOuuVLDeGi+21mcEoFyhZI2UDBwoZRMn+qyX7E7OCcSwWs1aa9M+THmYiTGigs0EVdZJAgkQ2KAUqdWpiZGaEoDGS5InEMdqrR5x72EP4eRrZYkECFDBJgCJl5BAugkgSlPVzJmhauHUhDCIDCaRbtIBri+G1SpYa0Ui9PMmyqEoW28CTCztXaeCTTtSVkgC8QkgvrA9UhOUKzPkxOfGs0kQeF79eIOHsD2tXJc+hx2ZWlYkURkvTZUAFWyq5FiOBFIggAw5iNSEv0aOnDRJSgbRczMFnCxiJ4CMN/AQRlQmq1isVnsRvs8cASrYzLFlzSQQQQDKFeEQjRSedppAwVJIwDEBWq2OEaa7grx0V8j6SIAEohOAUxMC+RvJb9dOWluCS0QvlZuj/fr1kwYNGujXM888E7URr7/+upx11lly1FFHSVlZmZxzzjnyr3/9K+q1bjlYW1sr99xzj5xwwgnStGlTqVB7jYcPHy4ff/xxWBMXLVokPXv2lCZNmkjr1q3lhhtuUKnZat3SjbB2NKneIjK1n8hc5X1unRKG1TpyukjlqyKcEs7J2FHB5gQ7bxo0AjtU4Ai7UxOCSeQp5ya3ydatW+W1114LNWvBggURTfzwww/l9NNPl3/+85/SvHlz2b9/v/z1r3/VxzZs2BBxvVsO3HbbbXL99dfLunXr5IILLtA/DJ5//nnp37+/mLi477zzjgxSU/YfqLVy/Hj4/PPP5e6775ZJ9cw0XHXVVVJSkt1MM0d/uFBOevyqyClhrLXerQJJKEcmSu4I+GKKOFYg9ESw5jrYdK7vbxilyjDX7c/1/RPhh604G0eNCnscW9x5p+xv3z70pZ7Isxrtmkz0/w9/+IMcPHhQunTpIitWrJC//OUvUlVVJQUFBaEmTJs2TVt0sGAfffRRadSokfTu3VvWrFkjs2fP1hZfMpKt52/OnDm6WVC0o1X0rC1btsiJJ54on376qf6BcMYZZ4jp29ixY+VONU7L1Ph973vfkwceeEB++tOfSlFRUahrhj9+YDz55JNy6NChmIkZovFIdfzytq+XwjnjpOPKpWHVYl9rzQAV0/rMsYeP1+MlnOr9zU29Xt70I1PPHy3YaE89j5FAmgggiETVuHFhwSSOGDNGitW0pFvlzyouMuTqq6+WTp06SXV1tfz9738Pa+55550nv/71r2WySlCQl5cnhYWFWiFDYPEZadOmjbbqXnzxxbDy9jfPqrjLZ599trRVsZePOeYYmaim03ft2mW/LPT+O9/5jq736KOP1i/8b31BKUYTUyfKQIqLi0NWpzm3dOlhpTVQBf2AdOvWTU8lf/XVV/L2229HVLt48WJp2bKl7FCOa19++aWu7+abb464Ll0HCl6eLc1u/Z40sinXA9/sKruvX/S1ck3XDVlPygR8YcE6DTQNek7rYHlnU51+5bdGWa7WYBLFffpIx1mRacHc0n9YdG+99ZZWmlib/Oyzz+T2228XrEkOHTo09EUzYsQI/b/55b93714xiunb3/526POENVwIrL5YfUQ5KCQo6WuuuUZWrlwpc9W2pW3btslzzz0Xuqf1n+OOO04aNmwoBw4c0Ifxv1Wg8KLd78ILL5RHHnlEnnrqKW19v/HGG9o6x7Xnq6hajRs31u8huIepA4p/rXJO27RpU0S9nTt3liFDhgim0vPz8wWWL1O9bNIAACAASURBVKbKo90/rJGWNwldi/VVeAi/83RkNUOmSEO1t7VZ5JmEjiR0/zg1sXz07z9fKNg4485TJJAzApsqKwVrr0YQTALrrm4WTHNieriP+iGA9cmLLrpIK1g4OtXU1IRNE5t+wPK75JJL5IsvvhAomx/+8IehLi5cuFBPJZ9yyikxu22mbaFkb7rpJn0dpm2h1N9//33tbGQXY2UbBZ/oF/y9996r+/fb3/5W/vSnP+lqYaU/9thjcuSRRwrWn41A4RuBQxQEFqpdoIivvfZarWBRZsaMGfZLnL+HUoVyte1r3VXaQVaeOVlOuuhK5/dgDWknwCnitCNlhSQg2lt489SpYSg6qWNuj9T0xBNP6DZffPHF+i+UG6ZsoViwRmkXTAcPUEni33zzTT1NCoUKK84IPIthGUJZRxNYvli3hXTs2FH+97//6de3vvUtfQwWZjoFSht9xDQurE54E69atUqmqrHCFLCxuHHPWP+nsz311gWFevfgwy970Ahltf5r6KOyq0XHeqvhBbkhQAs2N9x5Vx8TwD5X7He1SoVyrnF7pKbNmzeHpnlnqjCOmEqFbN++Xf+FhQZlagTKFWux//nPf6Sd2nIEb1yzDhu6qJ5/rOusl156acTVGzdujDiGA/gBsHr16phTxI8//ri2pq0Ch5wrrrhCr+1iixGcsmB1w1rHVPRvfvMb+dGPfhQqsmfPntD/pp1Z9RKOYbVKu+6HozFV9BBZsiQqHx50BwEqWHeMA1vhEwLRIjWVjhwppTYvYjd210wPo21QXnaxThNj2hfrmVCumCJ9+eWXBQ5NyUqzZl+vGmIrDOqyChR3NMG+1eXLl0c7pY/BMrbLJ598oh22IMZCxlozfhTAKQpbj7DvFeut69ev19uNzP2xrQdib5/9Hml5X89aq44jTPEEAU4Re2KY2EivEECMYcQaNuKlDDlmehiewdhuYl5Ye4XlZp0mfvDBB5XxtER74cJhKJZyhfcwrEPjOGQfR6xZYgoaAgcjTCfjhenZffv2yTe+8Q17Ef3+o48+0u2D5y5e1vbi/x49lHVnE+M5jMNY24VgPdYo6vLycn0Mzk8QTHdD4PQFhYu+nnrqqfqYXcx0MqaZjeOV/ZqE3sNqHd8+0pEJVutdqs1UrglhdMtFVLBuGQm2w/MEqpRzC7LkGIFTU2dL5CY3dxDesWa906y/mvZiTRVBGSAm6MRdd92l32P/J/aOfvOb3wy9YNkaQV0oi4AUseTyyy/Xp7B3FlO4WBuFkv3xj38cq0hKx7FGbPqBv/CKRsQqKGso+mHDhul6sdcVe34xTd5e7VXu27evPn7jjTdqCzeamB8Y+DGCaXNMNycl9ay16qARmBKmeIoAFaynhouNdSsBODXZM+TAY9jtTk2Gp5kehjVppk+trI3SNdPEZk0SFhvWbrFWal6xrNVYYwcFhjVTTNXCmxdWLxQsLGQo7nTKH//4Rx3JCV7H6DMCTPzgBz+QV9X4mTXb448/Xnsww8ELPzzgoIXAFMbDOVp7oIh/9rOfCaa88UMlmWhWej9rNKu1pZoen/IKrdZowD1yLKqChav6ueeeq6dpELfTCCK2mPik5i/Cg0HgiQdnAYRNw4Np9sRhrQTX4gGlkIAfCTRQTjN2p6by6dOluM7y8UKff/KTn+hpVuPRa28znJtMlCJYd2ZaNtoUrfnsow4oYpSDwown2OaDaVtYgFgnReCJZB2m4tVvzmE/LqxvKFZY35j6hVVu30YEq/y9997T7YGy/H//7/+FeRVHuxe+K9F2vP7v//4v2iXhx5TV2uTxyVJ0j2Jj9xDuP0FNCSur9YS+9dfDK1xLIMLJCb/YsH7RokWLiEabPWez1EZ5cx6/3CCjlBMHlCl+5UERY/oFG7MpJOB3AoUq6pA1/RycmsrUMQoJxCSAdHJqX2sB0stZBVbruLlUrDHBeetEhAUL77spU6bIvHnzInpiFCzWKrB2gWmjk046ScfzhCPAlVdeqQNiY8M4potwzC6IAAMrFzFOsSEb1i0UMhwMoLThaIHycCjAr0rrxm97XXxPArkmUKBi8uZZPG7h1FSeiUADue4o758eArBU5113OPuNXbnSak0PYxfVEqFgO3TooMOVWTdZm/YaBQvFB2WI+Jzvvvtu2EZxXIvjELjFW+W+++6T+So9F4KJY/rHBA+HFyIUOrwGEf8UWwAQcBtZLRA4nEICbiQAh6bGlhi7cGrq6KF1Vzcy9XWbYLXeoKJSLZoR1s2Dpcp7GWuto9TxohJfIwha5yKmiOMBwJ4xpG+Cl2CrVq20tQpPPyhDiIngYv5aN2oj0guCYsNT0GxWN0oc67iI3QkX+JdeekluueUW7a2H8GOIS1qfwBmC4owAGSbHD1Zr0zr/A1Nyt3KeeQv7Jev2TCZXY7Cv9vPz16hml7R7Z658U6WWs8vG7hfL2pNHSe1nDRwFjfAzPzuzTLzPFL+kFCyyZ+BlBDkjn8Yv9rpA27BAIWaTtzWt0wsvvKAVsNl/ZoUE93kIpoUR89OUg+u8qdN6Pf8ngVwSgFMT1l2tsk/5INSqyEAUErASKNn4gXR+eZropOgW+aq4law8Y7LsOJpbb/z8xCSlYOFCj+waEyYoDzcl8LDD5nC4tUNM9BczNWyNejJ+/HgdFQUu8lC28FJOl8B7OVVJNli4/T5eL29+uaXK0Ov9T6X9q5T/QbUllVrtaafJqXV5Ru3PR33vU7m/tU6vl/f184e1Vtt0sB67kwdKE+XI1F1NBzsdP1/zq+/Do867nV+EgkWKKAzaf//7X909hBBDRBPkX/zHP/4h999/v15zhWLFfjU4OrVu3VpvxkZWjNLSUnn44Yf1Bu1evXrp7TsQTClDySKbBZSsiZaSAENeQgKuIbBBWa7Y82rkgPJZqFGRjygkECKwVm2vQeYb/LVK0yMOxxA+eRBhBYRAhIJF2DBEUjHyu9/9TvDCBu077rhDh0uDJYtpYXgET1f7/SAIDI6tOkhthfRPDz30kM4paRWsqyJrBaK1QAlTSMBLBODUVKWi+xiBU9MehBW0xNP1Un/Y1gwQWDBVhbuqjKxYWa16+w2dmCLZ+PhIhIKFJYqN4bEk2vYdXAvvY2SosAumia31jR49WvAyMmbMmND/JvanOWDNtGGvl+9JIJsEEF/YHqmpQincD2PEys1m23gvFxCg1eqCQXBfEyK26biviWwRCeSWQLQMOWXKD6FkEKf6cjsy7rh7wTNqFwW239inhGG1PrBWrbnyOXHHSGW/FREWbPabwDuSgLsJrFUzLsjxaqRYOdUxmIS7xywrrVMKtdl9l0vDDcvCb8e11qzg98JNqGC9MEpsY84IbKqslB1qK5qRfOUJjyD+lIATqFtrbWjHwLVWO5FAv6eCDfTws/PxCECxblZOeUbg1OSlDDnx+sZzKRKIt9aKSEx9R6VYMYv5kQAVrB9HlX1yTABOTZgatgqmhZtGSeTt+GaswBsEnlce5PAQtmW+qe10mjSa8AeRlhXe6AdbmTUCVLBZQ80beYUAnJrWKeVqz5BTqrahUQJIAEH5sa8VsYStotZav7pgktScOVbnl6WQgJ0AFaydCN8HngAsV1iwRpAhB1tyKAEkEMNqlS4qetw1c6Um/xsBhMIuJ0rAFwrWhMtKtNPW63bv3p1KsVAZr5c3HUmVodf7b2//TpXr2OrUlKdSK7Z+5plQSLZYDwv5xSKT2HG38cvbvl4K54yTRiuXhnXgUGFzqRkwWVutEPvzk1hvv77KaXlTk9v4JcrBaf+dls80P18o2EQHk9eRQDwCe5culW22sIdHL1okeZz+i4fNd+cKXp4tBc/cKQ327AzrG9Za914xSw6WtvVdn9mhzBDwhYJNx/qH0zpY3tkaVK75FX7xhXyqQn9apQKxtRPMkJPr9vP+aXj+4qy1ypBKaXTeRCmO8T1M/mngH4NtIofdyt8XCjaRAeA1JBCLwMGdO2XN4MF0aooFKAjHY621tuuuojSpfc/0EA7CU5D2PlLBph0pK/QaAUwL252aGKnJa6OYWnsxDYy1VvlgUWQFQ6YILFcKCaRKgAo2VXIs5wsCcGqqnj8/1BcEk+ioAkw0LCnxRf/YiTgE3nlaih8YFbHWKrBalYewVPSIU5inSKB+AlSw9TPiFT4lAKvV7tSESE35FRU+7TG7pQkgUAT2tSoF28COhFarnQjfOyBABesAHot6lwCCSKzq1y+sA+Uqt3GxStdI8TEBpVS1crVFY6LV6uMxz2HXqGBzCJ+3zh0BKFd7pKayiRNz1yDeObMELFar/UY1AyZJwYg77Yf5ngQcE6CCdYyQFXiNgD1SU37Xrkw/57VBTKa9cazWXSPvlwPl3aQgmfp4LQkkSIAKNkFQvMwfBLarkId4GUGkplbK0YlOTf4Y37BexLFapW6t9YDaokUhgUwRoILNFFnW6zoCcGracN11Ye2Cci3o1s11bWWDHBKIZbW2bCcybq7ICX0d3oDFSaB+AlSw9TPiFT4ggPVWezCJ1lOmSNF55/mgd+xCiACs1oUqh++iGZFQ+k84vK+1iFuwIuHwSCYIUMFmgirrdB0BKNd9a9eG2lUycKC0qaysN4i/6zrCBsUmgHRy8BBGyEOr0GqNzYxnMkrAFwo21UwSIOs0G4PXy5unK1WGXuj/tkmTpPrVV0MfpEbl5XLkvfdq5eq0/UHgF+8byA388vZ+KU0enywFi2dFNLXmjDE6+80hlbtVDXjEeaftz3V5Pn/OsqFlmp8vFGzEp4YHSKCOAKI07Zw9O8RDp59Tx5ghxx+PSMHqt6Rk/nXS8PMNYR06WFoue0fPktrOvf3RUfbCkwR8oWCdZlLAyDmtg+Xdl00DTk2f3XRT2Aez7cyZUTPkcPzcN35xv1HrWWvNUzGEi5JYa+X4e2z8bQ+HW8fPFwo27geRJwNJAE5N60aPDgsmUTZhgpSOGhVIHr7qNNdafTWcfu4MFayfRzfAfbMHkyju04fBJLz+PMSzWvuMFBmlPIeTsFq9joPtdz8BKlj3jxFbmCSBTco7eIcK2m8kv107QRB/iocJrP3gsIcw/lrkUGFz2XvFLGnaZ7iHO8em+5UAFaxfRzag/YJi3TxV7YO0CJQrIzV5+IFYoMZzQWVkB04eKNUj7j3sIRx5lkdIIOcEqGBzPgRsQLoIYJ8rpoatUjFnjjTt0SNdt2A92SQQw2oVbLlBvtaTB8mhKFtvstlE3osE4hGggo1Hh+c8QyBapKbSkSPp1OSZEbQ1NI7VqkMdcq3VqyMbqHZTwQZquP3bWcQYxrYcI4Xdu0uFJai/f3vus54lYLX6rMfsjo8JUMH6eHCD0rWdKmC/NUNOwyOOkM6WyE1B4eD5ftJq9fwQsgPhBKhg+UR4msDepUtl2+TJYX2gU5O3hrTZZ6tFbpgoYvMQtq61eqtHbC0JHCZABcsnwbME4NS0+bLLwtpfPn26FPft69k+Ba3hR3+4UDouvT+y2136HHZkalkReY5HSMAjBHyhYFMNVI8xynWw7lzf3zynqTLMZfs3DBggBy1epMXDhkmB8iJOpi9O2+9lfrl8/vO2r5fCOeOk48qlYV+V2NeK4Pw1Z449fLweL2Gn4+f18nz+GOw/7APENySQDgJbx42TmmXLQlXld+0qLadNS0fVrCPDBApeni0Fz9wpDfaEZ7ep7XSaDhpxsLRthlvA6kkgOwR8YcE6DfQM1E7rYPnsBQuHQxOy5BhBhpzOzz4r+W1T/2Lm+GVh/JCnFflaEUvYIrX5RdJo2G3S6LyJUhx2JvE3HL8sjF+c4SD/6Px9oWDjjDtP+YwAtuLYg0kg/Vx+RYXPeuqz7jw/83A0JsQTtsiONt1l5ZmTpdd5l/qsw+wOCYhQwfIp8AwBBJNY1a9fWHuPVMnUC3sz56drBzGG1ao9hFVKuQ+b9XRt09kwEnBKgArWKUGWzxqBNYMHh6WfKxk4UKBgKS4lEMNqFauH8JIlLm08m0UCzglQwTpnyBqyQGDDxIlSbQkeYSI17crCvXmLJAlgGviewRFrrbqWIVO05UohgSAQoIINwih7vI9waqqaqdbw6gSRmhAGUWfIqWcbh8e77r3mv/P0YUcm21qrtOt+eF9rBRMveG9Q2eJUCVDBpkqO5bJCAE5NiDNsFShXZsjJCv7EbwKFCg9hKFi70Gq1E+H7gBCggg3IQHuxm9Ey5LSeMkVKBg3yYnd82+bGHywSmXuNitoS7iFMq9W3Q86OJUiACjZBULws+wTg1IRwiEaK+/SRNpWV2W8I7xidgFKoTR8YIVrB2oVWq50I3weQABVsAAfdC13epBSp1akpv107QRB/iksI1K21NqbV6pIBYTPcSIAK1o2jEvA27VCKdPPUqSEKcGpihhyXPBRca3XJQLAZXiBABeuFUQpQG6NFaiqfMYNOTW54BmJ4CB8sLZe8G58RoYewG0aJbXARAV8o2GSyp9jZez2bhtP2Gx6pMnR6f2t5ZMbZePnlYcEkjhgzRhqptdhY7Uvn/e3PRjLvY7Wvvjpy3f5E7o+g/AXPTpOCxbMiurO7z1VSfc7PpPAbrR1tmfIzvwholgOJ8I9X3k2f30Taab/Gaf+dls80P18oWPug8b03CTBDjvvGrZFKJ4e0ckgvZxVYrXtHz5Kd32SoQ/eNGlvkFgK+ULBOMzlgMJzWwfLRs0kk+qDvVonSdy/62hsV665dXn9d8DcRIf/EOMViGcEPa60L1Tr4ohmRRfpPkDwVjamoqERq6wJ9RJSPLBX3CMunefzi0o48Sf6Z4e8LBRv5uPCIlwjsXbo0zKkJbe+kwiLqSE2U7BNAOjkEjUCgfqu0bCcybq7ICX2z3ybekQQ8SIAK1oOD5qcm165fL5svuyysSxVz5tCpKReDXI/VqmMIK6uVQgIkkBgBKtjEOPGqDBBApCYoVzg3GSkdOVJKR43KwN1YZVwCtFrj4uFJEkiFABVsKtRYJi0EEGO4ZtmyUF0mQ05aKmclCREwHsISxUNY+owUGaXWYGm1JsSSF5GAnQAVrJ0I32eFQJXa24osOUbgzNSRkZqywj50k7UfSNF9l0vDDV//yNHnkAz9GjU2JzPmc3YHhHfzGwEqWL+NqAf6Ey1DDiI15VdUeKD1PmniAuUhvKBSGtq7c/LAw45MtFrtZPieBJImQAWbNDIWcEIA666r+vULq6LlnXdKcd++Tqpl2UQJKKtVewjjr1VotSZKkNeRQMIE8qJduXXrVjn33HOlQYMGcs8994Rdctttt0nbtm2lZcuWMkZF2amtrdXnV61aJX1UtpPmzZtLz549ZanaegH5+OOPdT0oRyEBKFcoWSPFw4bJEWPHEkw2CMBqvUEFhrAp1/09+os8sJZTwtkYA94jUAQiFOymTZukW7dusm7duggQf/vb3+SWW26RU045RS655BJ56KGH5OGHH9bXjVKen8uUw8pNN90ku3btkqFDh4aUb0RFPBBIAmtHjxZMDxuBU1PLadMCySKrnYZChWJVU8JhoqzWPdc8pl7z6ciU1QHhzYJCIELB7t27V6aopNbz5s2LYPDUU09JXl6ezFH7FB944AGpUGtmCxculC1btshbb70lV155pUyaNEluvvlm2bhxoz5mlxEjRmgrd8WKFTJDObrAun300UelvLxcWrRoIU888YQuX1xcrBU5rGmK9wnAoSmaU1NegpGavE8gRz2IYbUK1lqV1bq/x3k5ahhvSwL+JxCxBtuhQwe55ppr5N13343o/Zo1a6SsrEwrPwgU7CeffCI4DunYsWPoOP7BOUwlG7nvvvtk/vz58rRyaOnSpYssWbJEn4LihkIfNGiQXH311TJWTRlOU5bN+PHjZfbs2VrhxxNTT7xreC4+gUwyzFu9WppedVVYA3Zff728hVmSKDMl8VvqzrOZ5JdKj5t9tlo6vzxN8NcqtflFsvLMyfJZ+94i736YStUZKeM2fhnpZAYrJT9ncDPFL0LBxmvmnj17JD8/P3QJ/scxvCDmnPlrjuPcm2++KYsXL5YbbrhBBgwYoK+H9Qq5Sn35nn766XLqqafKSy+9pKehmzRpItdee62sXLlSX0PxJoEGarmgiZqRsMo+tZxQ21t9wVMyQuDoDxdKx6X3R9S9o013Wd7/dqktaBZxjgdIgATSTyApBdu0aVPZt29fqBWYTi4qKhIch5hzOA7BOSMvvPCCVsDvv/9+6Jj5x1i5sIxRlylXWFgYdr+IgnUH4FyVqpg0WakGu/Z6efPLLVWG9fUfTk3VagnBSMnAgdJBLTEYqa98feOa6/KZ5pdU/xE7GB7CiMpkFXgIqzCHJedNlNNsFZLf4ShiXv38u+r5q+9hjXLe789fxBpsFAahQ8cee6xUVVVJdXW1PoYp4OOOO05wHLJaTQWa4/iLc0Yw3Xv77bcLHKWgbCn+J7Bh4kSpVkH7jTBSUwbH/PmZhx2Z7Mq1i/rxebdyclLKlUICJJBdAhEKdtu2bdpx6e9//7tuCTyD8f5///ufXHrppXLw4EHtzIR1Ujg3DVPbLLAu21ftY4TzE9ZO77rrLmnfvr306tUr1JtWrVrpNVU4M12v1t8OHDiQ3Z7yblklAIemqpnqS79OEKmpQh1jhpz0DgPytBbdc77IXKVAEazfCKzWkdNFKl8VaVmR3puyNhIggYQIRCjY5cuXy5AhQ+TGG2/UFfzud7/T77GvFdOId9xxh7zxxhvy5JNPyoQJE+Tyyy/X1z3yyCNy/PHHayu1RKUZgzcwPI6tgnXVqVOnCu5htveEXcA3viAQLVJTufIYb9qjhy/655pOKKu12a3fEyRFDxNara4ZIjYk2AQi1mBhiR46dCgmlcmTJwtedoH38esqQbZdME1srW+02guJlxEEqzACS9kq2E9L8RYBBJFYp8bXGkyiTP0QY4acNI6jZa31sJtgXd11a62cDk4ja1ZFAg4IRChYB3WxKAmIPZhEsZr1gPVKSRMBrLUiYIR1OhhVw2pFgH5OB6cJNKshAecEqGCdM2QNdQQ2VVbKDktGnPx27QRB/ClpIBDLQ1hV/dWld0qTiyal4SasggRIIJ0EqGDTSTPAdUGxblbr60bg1ATlSqemNDwU76gfKdh+Y7da23WXXSPvlwPl3aRJGm7DKkiABNJLgAo2vTwDWRuSpm+yrKsDAp2a0vAoQKFCsULB2mWIim6m9rYe2Hl4H6f9NN+TAAnkngAVbO7HwNMtOKi+4KvGjQtzaiodOZJOTU5HNY7VqtdaK+iR7RQxy5NApglQwWaasM/r36Y8ymHBGmEwCYcDnoDV6vAOLE4CJJAlAlSwWQLtx9tUKe/gapW8wQjWXTtbIjf5sc8Z7ROt1oziZeUkkG0CvlCwJp5lKvB2796dSrFQGa+XNx1JluFeFXhk43XXhbFr89xzsgsJHJJYFwwqPwMO/c/b+6U0feAyafzBoohnsWbAJPnqgjoP4ShcyY+fXzw0yX5+rc9fxEOXxAE+f/GfP18o2CSeB16aBgK169fL5ssuC6up5Z13SkG3bmmoPVhVNFn2opTMv04rWasc+GZX2XvFLO0hTCEBEvAmAV8o2FQzYViHzGkdQSmPCE2rVHhMODcZKVbxqNtOcrYPMyj8QtCw1jpPzQC8Ojfym6P/BGmoPISbFZVEnotxJHD8bBzYfxV72oGQX2b4+ULBOniuWDRJAhvUtDBiDRvJ79pVWqoED5QkCCDjDbbfIHiEVVq2Exk3V+SEvklUxktJgATcSoAK1q0j48J2IUMOXkbg1NRGOTnlqb+UBAjAal2ognEsmhF5sbJasa9VkrBaIyvhERIgATcRoIJ102i4uC2wWhFn2CqI1HSwbVsXt9pFTYthtR4sLZe9o2dJ0SnnuaixbAoJkEA6CFDBpoOiz+vQ6679+oX1snz6dClWmZdS9V70ObKvu1eP1brr7J/KIWTBoZAACfiOABWs74Y0/R2CcrWmnysZOFDKJk5M/438VmMMq1Usa62Homy98RsG9ocEgkqACjaoI59gvzcoRWp1amKkpgTA1WO1cq01AYa8hAR8QIAK1geDmKkuwKGpaqbKP1oncGqqUMeYIScO8bXKw/ruwZEewpgGRgzhkwfFKcxTJEACfiJABeun0UxjX2C1YkuOVaBcm/bokca7+KyqBcpDGMnQ7XLywMPbb+ghbCfD9yTgawJUsL4e3tQ6h/XWNYMHh627tp4yRUoG0fqKRrTZZ6tFblBr0rBerUKrNRouHiOBwBCggg3MUCfeUSjXfWvXhgrAqalNZWXiFQToynb/nCsV78yN7DGt1kgmPEICASPgCwXrZKuI14NVO22/ed4Nw20q5GG1JSNOo/JyOfLee2Nux3F6f6+Wb7hhmRTOGScV6q9VDhU21zGE9/dQ+1pr1Zl6vIS92n/TZ6fttz9/yX7/Or2/18uTX/xg+4k+T6nqkPqeH18o2EQh8rr4BHYvWiQ7Z88OXZTXvLm0ZqSmCGgFz0yTJs9Ghofc36O/DhrBfa0RyHiABAJJwBcK1mmgaoy80zq8Xr7xp59K1TXXhH0I2ioP4tLevRP6YHi9/wm1H2usiCFsW2utzS+SRhP+II2Vh3DjhGhFXpTQ/SOLhY6wvLNgHeRHfnE+XvWeivX85NVbkhf4nkCDXbtknQqDaA0mUTZhgpSOGuX7vifcQXgI39AzQrnuaNNd3r78cW6/SRgkLySB4BDwhQUbnOHKTE8LVDYcazCJ4j59pHzGjMzczGu1IuMNrFZEZbIKPIRVcP4PmymlSyEBEiCBKASoYKNACdKhfLW3tdHSpaEuI5gEgvhTFIHnVZAN7GtFZCardOlzOGhEywqRJUuIigRIgASiEqCCjYolGAd3KEUKBWuVTsqDOPCRmuqxWuU8teeVQgIkQAL1EKCCrQeQX09jn6s9/VzFnDmM1JSI1erXh4L9IgESSCsBKti0ZoFC/QAAIABJREFU4vRGZdEiNZWOHBlspyZard54eNlKEvAQASpYDw1WupqKGMNWp6YDHTroIP5BlYKX1d5f7GuNt9YaVDjsNwmQQMoEqGBTRufNglXKOxhZcowcKiqSrywZc7zZqxRbrazWont/KI1Wfu3kFapp5HThWmuKXFmMBEhAE6CCDdCDgBCI9gw5X91+uxxq1ixAFOq6+upckXnXSSO71dqu+2EP4YoewWPCHpMACaSVABVsWnG6tzKz7mptYfn06fKfoKWfg0LFvtZ3omxFGjJF722lkAAJkEA6CDCSUzooeqCOVf36hUVqglNT2cSAbTeBUh3fPkK5HvhmV5G73qdy9cBzzCaSgJcI+MKCTTUTAgaqvmwI9Q2mF8pvHTcuzKkpv2tXOeLWW8My5KTK0Av9b7Bnp8580/iDRRHDWX3OT6X6nJ9JkVqLri/zTURhywE/84vXb6fjb+omv3iU6z9HfvUzindFpvj5QsHGAxf0c9UqGw5eRpAhp02AMuRAqUK5QslaBVYr0spVH3lM0B8R9p8ESCBDBHyhYGNlMkiGmdM63FgeW3FgvVql/bx5UtKtWwQaN7Y/opFxDkS0v5611oZqrRWuXQfq8rVGlI9zr2inWJ7ZWKI9F4ke4/Pjz+fHFwo20Yc4SNdFc2pqPWWKlAwa5H8MWGuFIxM9hP0/1uwhCbiYABWsiwfHSdPWDB4sCIdopGTgQGlTWemkSveXjWe19p9w2ImpqMT9/WALSYAEPE1g83tLZPvKD7gP1tOjGKPxG5R3MPa8Gins3t3/kZqQTg5WK0IeWqVlO5Fxc0VO6Bt+nO9IgARIIA0EdqxZJls3rZHtqz6QTe++qv8aoQWbBsBuqgJRmqoskZmQfg5hEP2aIQfOSwUIc7h4VuQw0GqNZMIjJEACKROo3rRWtn/yobZON//rVdmkXvGECjYeHY+dg1OTPVITlGtTvwaTUFZrs/tHSt729eEjRavVY08um0sC7iOwr3qHVqbGKoVlCgWbjFDBJkPLxddGy5BTNmGCP52asNa6cKrIohkSESmFVquLn1I2jQTcS8Csm36mFCksVOtUb6Ktbv2tPlLauYe06NRDWp/Ul2uwiYJz+3XI7Wp1airu00fKVWB/3wnXWn03pOwQCWSbAJTn9lUfStXfn5OajavlNz/7et000baUduouxRVd5BsdT5Rjep8jpUqp2oUWrJ2IB99/Pm2a7HhabU2pk/x27aSD5b0HuxTZZIvVaj9Zc8YYKRhxpwg9hO1o+J4EAk/Avm4KCxXTv8lIs9bttFUK6xSWaRv1gpgIULH2MVPBJkPZhdfuXrRIoGCNwKkJytVXTk2xrNamR8jucY9JbefeUlDkbKO6C4eWTSIBEkiSQDrWTfObHaGt0Tbf7nv4r1Km+cWpbe+jgk1yAN10ebRITZgW9pVT0wK11rqgMhL7yQP19pva2gaR53iEBEggEAS2/fsN2bF6mexa/3HK66aFx3SXDr36htZNi9tUpI2dLxRsqoGaQdFpsPJclT+oQvxtvPxywV8jxcOGSSMVYCIVHqmUySS/hhuW6RjC+GuVQ4XNdQzh/T3OE6nN/fiZtrmNXxi0OG9y9fzam0R+diLJvQ8CP+w33bHmI/li9b+1Uq36cGlykNTVJR26qlc3vW5a1qO3rK0+oOs4oW6nxUH1fzIs6/v8+ELBJk3ZBwUQY7hm2dfKBxlyWs2KshfUg30teGaaNMHeVpvs79Ff9o6eJYfU1DCFBEjAvwR2b1kvO/6rlOkn/5ZtSpF+oZTr/l3hCTvq633TVuXyDSjTY0+Ult176/8bq+nfMFFbGzMpvlCwsRaYkwHntI5slq9S08BYezWCDDldXn9dsP6aqmSz/dHaqO+/Vj3siMaEv1aBQr1mrjQ+eZA0jlZYHXNF+2O0LZHDbml/P5U3+NW6KGB/+ctfZMCAAVGb/+ijj8oEtQ0Mv+DvvPNOmTRpUtTrEj2Y6f4fOnRI0Oa77rpL1q1bJ0cddZScccYZut2tWrXSz89PfvITuf/++6M2+YsvvpCSktjrcJluf9RGWQ56+f5QnHvWfB0FKZX9pvZ1U6yhJjPVmyl+vlCw9T18fjqPEIj2YBJHK2XreaemetZa6SGc+ad469at8tprr4VutGDBgggF+/nnn8vVV18tTz31VOYblMY7PPjggzJ+/HhdY0VFhWzZskXmzJkjHygLZvHixfq4mRo84YQT9DVWadz46592xx57rOCap/3mqR/W48y9se43rVrxLzXtG74MlMidzX7TovLOUtKxm7T7Vu9EimX9GirYrCNP/YbY54og/lZppb44CqKkn0v9LtktadZaxbbWKnVWqyirlZIdAk8++aQcPHhQuqnnaZlafnjmmWekpqZGCgoKQg144okntGL56U9/qpXxu+++m53GObwLLFfI3XffLT//+c9l5cqV0qVLF3n//ffln//8p5xzzjkhBTtRxfK+6qqrot4R/V29erVWsJT6CZj9pvqvCt5QX2jBaDVivyksUv1S22TMFhlcm8x6abS6M32MCjbThNNUf7RITaUjR0rx8OFpukMOqlFWa7M4HsK0WrM7JlCekGuuuUZmqGWIjz/+WP7617+GWbFt27aVV155Rb7//e9L796xrYZmzZrp6eNnn31Wzj///JgdgZLGfTds2CCNGjWSiy66SO655x4pLi6OWqar8jVYvnx51HM4CIXZwxYatLa2ViZPnqzLDB06VP/t3FlZPmrKFxb59u3b9THzZR3r3lDMv/rVr/S1mD5v0KCB/OlPf9LKmSI6jKA1Tm869pti72mqW2TcMCZUsG4YhQTagGlhbMsxggw52JKzK4GyrrsEGW/uVpZ4tLXWIZUi5010XZP93iBMmb6u1vHz8vJksJolgcK7/fbbxT5N3L9//7ShgCX8i1/8QlvIWP+EVfmb3/xGNm7cKM8991zU+2B61ioHDhz2Am3YsKE+XFhYGFEOinvMmDFhx/HDAcoVAksWYhQslPRjjz2mGXzrW9/SbWyngrfgR8Wbb74pb731lhxzzDFywQUXREwlR9zcpwfMftP/Ln1RT/F++enypOP0Yt30iGOUc2bP70mbbr20hZrMuqkX0FLBemCUkCEHLyNwZupogklYtul4oCsiz888vK/Vngy9Sx/tyCQtKzzRDb810kwP91EhNsvKyrQlCQUbbZo4kb4vXLhQ7VGulVNOOSXm5ZWVlfrcD3/4Qz11CznxxBNlkfIpgJLr2bNnRNk///nPYceMUkzGSeU///mPvidkuJoBgrKEfPnll/rvL3/5S/0XgjXal156SVAGDl///ve/tYLFNDqsfLdPUYY64vAfTPFu/tcSSVecXkz1QqGmMn4Ou5LV4lSwWcWd/M1gtSLOsFUQqSnf5oSRfM1ZLgGrFR7CiMpkEexrrRkwWZpc5MwLNcu98d3tzPTwxRdfrPsG5QbF89///jdimjiRztc3bbpr1y758MMPdVVHH320/O9//9P/w2LE+u8bb7wRVcEmcu9417z33nty9tlny2effSa9evUKU6awZFu3bi1nnXWWdoj66KOPBBY7LFlY1tepWaQgCKZ6tSNShtZNg8DQ9JEK1sWjjXXXVWrbhFXKp0+X4r59XdzqKE2LY7Xuuvw+OVjaVppEKcZD2SGA6eGlS5fqm81UuYQfeeQR/b9Zm7RPE6ejVTvUs21k6tSpgpdVME0cTfADAE5GRuxTxI8//rheX40mcFA688wztdWELTrwhMb2HSNYL7YKpoQvvPBC+f3vf68tWT8KtshUqWhIqzes0vlNU1k3xX7TsuO+FYrT6/V103SOc1IKds2aNdKxY8ew+3fo0CH0wN922236l97evXv1FBP2lGH9A3vO4Jxg3OHT2QE/1wXlCiVrBE5NZcrD0TMSw2rVHsJ1a63WSFSe6ZfPGoppYHgPQ6zKy3Qz1WnieJise0rHjh2rLUWrYM0zmsDxKp6TE757ogmsUDhbQbkOGTJEr7Fi642ZooSi3rx5s7ZsrU5S+fn5ujp4U/tBYJk6yW9q32+a37qDFB3V1vE+dD+wjdaHpBSseRgxfYK1Ggi8BSF/+9vf5JZbbtGKFRu3se+su3LEwYeHkjwBTAtHc2pKvqYclYhjtXKtNUdjEuO2Zl0TnrZ33HFH6Kp9+/bpzzKsTbs3cYyqQodffPHF0Bos1nTtgu8Nsx0IDkrG0xjrr1Bm3/jGN+xF9HtM21ol0TU8BMXAPl+sCf/xj38U4xRl6tq2bZvAQxoWrfF8hhWNHxcQTCdD4DkMwRS32yVT66bWfgdlDTrVsU5JwWKaBQoW7uzmQcV0CzwQsXkbx59//nmBo4NdwWL6CRvVMe0CqxZrPbfeeqt+kPHLFFsEvvvd78o4FQoQ1i8+DPG2A6TacTeXi+bUVKGcnDwRTCIBq9XN7IPWNkwPv/3227rbZv3VMID1Bk9ZfFbNNDGmYPEesmLFCv133rx5eooZHry4DoK66tumgx/kl1xyiTz00EP62urqav2d0aJFC+3klC6BVW5+RMBT2Wodw3L//+2dC3BUVZrHP14hEAKBkAAhQBAQkSAwGhcMs4Cyi/hYYJTSUXaNUKMCjjBqwYBTAlOWY/koHq6CpVWIa+G64qhrMbruoKA4uioIAipPkYxB3giBCATY8z+dC7dvv+69fbv7dvf/q+rq5D7P/Z3T/fU53wvfUWjLHWqF6EX1ORs9erRgZQ52YcyIcfyECRN0c2AvhqxevVr+TeUCv+WWW3zx/eSF3RQl2RBjGi7e1Ku+yLbruFKw06dPl61bt0peXp48/fTTcqeabWH5GL9UjRgyZELZtm1bEE/YQDD7feCBB2T8+PHaMw8CpYw0ZjNmzNAxcJgF40OMgY6Bj7i7bBHMWq2ZmqBc06JCzqoX1betcgSxegh36x/wEC4bkC3dmDbPiXhOKBk4NMHByCpQlPgsGsvE+ExjlmkWLNvihe8DJ4Kl2tmzZ+vlWryg0DGThRdvaWmpk0tFPdY828SMyzrrMryHF6lc3vjeWrZsmU6n2FqlIEUbMas3vJTxP/Yjfvedd96R669XRSeSLAiRqYETkkrcUL3yTfm5ZrtsqXM2ozbqm7Yq66Pz9HYbWJnW8aZJ7gLbt2uklkQuWPljnIZfl8by8KhRowRu9lh22b17t4wZM0b/4sPAhMBTb+3atdqmARtsSUmJdprABweDEzNffCj79Okj9913n3auQE7TWbNm6Q8wbDKYJeMDXVNTE7ZlxnKNkTs17EFptLGRWnZqoTLINFazCkNOVVUJXn6WpidrpffKx6T9dwFHGXNbv7+ySnZV+Lv9fmbLtpFA3c4Ncnzbl3JSKVK8Th+68P1gh07j3DxpXtJT8noN1O94NWvX0c6pPCZOAo5msPg1a15Gwi8/2DagSFu2bCmw2RiCpRXzL1os+eAXKrZjOQi/Dg0pKirSfxqzX8Nmg//N14zzWX1/eu4f/hCkXOsrK32vXKFUoVyhZM1SW9hDtoyYKbXtg53ifN8JbCAJpJAAFOiJ7ev1rPTkDwGF6rQ5zUt6SMueAyUXyrRzQKE6vQaP94aAIwWLTC/vv/++jgeDgjQ866BIkWEF+2BHgWLEzBNB44bA1vrMM89IpVIaCGA3B3PH+yiGw5Wb69h1koh0ba/OP6qWyvaZQgFylN1ngMpmE8vuGu/9YUuCOGaIZWDEtX7+ZiiacbOllfISvjx0T8iWeNuf6vNd82sgker2p/r+2cwPdtOdH7+r65vW7vrGVZ7epm07SJ5Sppf+cmRInt6QD1uYDanu/1TfP9Hjz5GC3bdvn14WRnJsKMp5KiYTnncVFRXajgMbxsSJE6WwsFBXq8CSryHt2rWTwYMH6xkwloOtzk9h+j5rNh1TNp19iokhyNSEZBKxlGvKAEGpQrnS1pqyLuCN04uA2W7qNt4UITLaCUllQeqk3hFv+sm6DRpEv4aojvSikvmtdaRg4XwEgz9CcGBHhWJduHCh5Obm6hkQ9iH29fTp03rpGF52VsHsFR59qMNopEqzHpNN/6No+v6GROTGcyPHsC+dmmLMWnVsK4UESEBnQoon3hQIUZKt5IoGr94MzNObDcPEkYIFEMTKGZUprIAi7cNs1hAsJUMBG2L2sYIDlVGzEfsjJfy23jdd/0cSiX0qHMmcbKFY/TAp9KNTU4RZ65nScqmbsEhalUeurJKu/cN2k4AdAkh2X71FOXQ2pBZE/KlTQUk2Y1Zq5Ol1eg0e7z8CjhWs/x4hfVuEZBKYwRqSr1YBMHv1lUSbtV43VWrHzvVVc9kYEkgkAaMkG5Z53dY3Nceb5pb2kmIVJuOkWEEin4/X9pYAFay3PG1frUbZso8oO6shcGqC3dVXgsT8sLUieYRZilQau8kvivQdhhpfvmoyG0MCXhFIlN3UXN/UcPLxqs28jr8IUMGmoD+gWPdYkpv7yqkJs9blama6IsxsWs1ata01ryAF5HhLEkgcAV1BRiVvqMHsVC3zYrbqVGg3dUoss4+ngk1y/57atSuk/FwH5TTmG6cmO7PWJDPj7UjAawK6FNvWDbLrk/fkyPaNumi4U4HdtF35YGnX8zIpHTBYpxikkICZABVsEscDnJp2jB0bVCEn/9e/lnxV9DnlwllryruADUgMAa/tpnBCQrgMJN44zsQ8Ma/qFwJUsEnsCeQYtlbI6aBih1MtBT8or8f/qopua011I3l/ErBBAHbTg9s26BAZL+NNzXZTG83gISSgCVDBJmkg7FPewaiSYwiSSfRetUqcpej2uLFq1tpjzb9L6YbloRemrTWUCbf4jsB+VSwcS7yHNn/q2m5adFmldB00IlBFhvGmvuvjdG5QRijYeDzxkBc5HrFzfp0q5fWDmr2apaOqHlKrakvaOT9a+9ye33SLKi+2ZLKUHtwddPlzLVrLiSnLpL63imutV7tieAm7vb9x03Q/33gOt2Mw3Z8/3vY74Qc76ZEdm2Tv+o9c200LepRLQY9+0mHAL6WgZz9p1vEi3QQjbzrKzjvpy3ifP97znfAzjjW/x3v/dD8/0fwyQsGGGzh+2VavKg3tuf32oOYUqRSSLYakLjFD8/9+THLffiwE0ekB10ndnYvkXMs2Ifu4gQSSSeD4j7vlyM5NKj93QJnu27DG8e1bdugibZUyLW5Qpog3tUq8CsJ6Pf5PAmYCGaFgvQjSjvcakc7/RqWLNGdqKlRFnbuqNJFWiXS+9bhI/9s6f5eytSKuFe8mqc/Jk6ZTX5ZmFWOkWaQbxNhu6/5RrsHz4/tRk878zqpapid2qPCYOO2m8OJFakEjI5ITu2k688PHiu335+cnIxRslO/tlO5CpiarU1PKMjW9puJaX5sTwuNA90rZcs1MqaxIfuHokMZwQ1YQMMeb/vDVp7q+6TaHT454U3jzFvS5Ui/5lvTu5/AKPJwEEk+ACjZBjOHQZHVq6pmKCjkRZq2CZeApL8rmE20TRICXJQHRjkeIN9XJG1QSB7d5evXsVIXGWPP0OrGXsj9IINkEqGATQByzVsxezYJMTTllZQm4W5RLRpi1SsXoQKpDZGNqqAcb5SrcRQK2CHgVb4oybFjmNceb2moADyIBnxGggvW4Q5BMYuvw4UFX7aSKqecPG+bxnaJcLsasVZStlUIC8RAw4k13rnlX9isHJDgkYZsTQX3TJsVlktdroAz61R26vqkTu6mTe/FYEkgFASpYj6lbMzUVjB4tJXPmeHyXKJezM2uNcjp3kUA4Al7l6TVmpVjyzS8pUwsoq/XtSi4fGu623EYCaU2ACtbD7queNk2OqeQRhrTo31/KTMklPLxV6KVQ8eaJsSEewtrWiuT8108LPYdbSCAMAcNuinejaHiYw6JuQp7eSHbTqCdyJwlkEAEqWI86Ew5N+xYsOH81ZGqCcm1SoOycCZbmKxeLIK4V+YTNcqmaFShHJikqS3ALePl0JWDEm26v3qpTC8IZyakg3rT4kl/QbuoUHI/PeAJUsB50MYqm11gyNUG5JrxCjpq15i38V0FWpiDhrNWDXs28S5jz9OrZqVKmbuym5njTHJUJqZmypcYbh5l5tPlEJMBcxHGPASSRQKYmODcZUjx1qhSMSbAj0V/UbFnFtTblrDXuPszUCxh20wNKmWJ26ra+qdVuaubFMJlMHT18Li8IcAYbJ0UoV6RDNCR/6FBJaDIJ2FqRjQl1W83CWWucPZnep9Numt79x9ZnJgEq2Dj6tUZ5ByORvyE53boJ4l0TJg2zVquttf7iSp3qkLbWhJH31YWNeFMkbqj+v7+Kmzy9rTp102ExbfsO0knve/0jM3n5qpPZmIwgkBEKNp5lKrfJvo+vWCF75qr0gw3SuHVr6fDyy7pCTqwKNOaRY+f+jVXFG1S+sdpaUfnm6Mj75fiw30ieyifs5L7W0euWoZ32W+/l9Pn9fL7RtkTxO137k44x3fulSnqvqslAmWKbE2mW1zpQQWagqiCD5Pcq6T3sphCj/xLVfrvtTNX90338Jnr8xeo/8otejS0jFGysQeD1fjg17Z08OeiyRY89Js37eZ8PNedvyyT31ZnS6ETwl+qZ0nKpm7BIjrcLlNvy+hl5vdQQOF/fdPtXOoEDvHydCuqbYlbarudlUqSUaV7Hrk4vweNJgAQ8IJARCtYLD0a714AzU81vfxtUIafNPfdI6aRJcXVHyP3hvARb6+dhlpzHzZYmKra1lbrjmYZ6rSHnO2wNz09+NQ7YTfdv+FQOK2V6cOMnrvL0GvVNO5VfqSvJwMPXjbD/k9//5n4i/8zknxEK1s0XittzrBVycsrLBbNXTwVKFcrV6iHcrX8grrXM3Zeop23kxRwRMNtN3cabGnZTePUiVy+S3xtLq/F+QTt6GB5MAiRgiwAVrC1MgYP2zZ8vR0xOTEgmUapssZ5JjFmrzshE8T0Br+NNjYxIzNPr+65nA0kgiAAVrM0BgRSI1ZZkEherbaeVkvVEOGv1BGMqLlK3c4NsqlkvXsSbGpVkkKeXQgIkkN4EqGBt9N+pXbsESfzNUrZkic7U5Nb70bgWnJfgISzrw8yEla2Vs1YbHZTEQyLFmzpxRTLy9GJm2vqSK7RnL5d4k9iJvBUJJIkAFWwM0HBqslbIKbzjDimsqopxpo3dataa/0xViIew0NZqA17iD0mU3dTc8nh/oCWeAu9AAiTglgAVbAxyWBZGAXVDPKmQY7K1qqjZYOGs1UokKf/TbpoUzLwJCWQVASrYKN0NpyZUyTEETk09483UhBSHT6rlZquHcFE3kcnqXn2HRWkRd3lF4Hx9002fyZHtG3USB6fS6RdD5edWRZJb0lOG3Xa3rm9KIQESIAGDABVshLGAWavVqQlpEHPKXH6JQqEuV5mfVswPuePJa+6R5uP/JJJXELKPG+InYLabIr2gm5JsZrupOd7UKBhO5Rp/P/EKJJBpBKhgw/Qo7K5bhw8P2tNl3jzJHzYszNE2NmHWirhWJOo3i5q1Hr/jGanvPUSa53nkjWyjOZl8iNVuCs9epyXZwsWbZjIzPhsJkEBiCFDBhuEK5WouPwenpuJp08IcGWNTlFmrXDdVewjX14dYYWNclLsNAlCc+7/6m87Te3z3tzoTktOSbEae3q6DRugsSEjewHhTjjESIAEvCGSEgo3HE9OarBo5hs1OTcjU1OaPf4wYjmM93+gUJOZH+A0S9ZvlbGEXqbtzkZ61Sv2FZOtuOzPS/Z1ezy3DeO/v5Hxznl63dlNrnl7JL9So8vJUsQQldWfVqyH9pBOG6cAv3PM44Z+I841rkl84uva3kZ99VuGOTBS/jFCw4YC52XZs2TLByxBdIWfRImnsIJkE4lqbv60S//91UUgTYGs9+S8z5Rxqt1KiEoDT0ZEdm3SeXihTNyXZjDy9bVXS++IBQ3S8qVXiVTDW6/F/EiABEjAIZISC9SJIv9l338mBWbOCRkb3pUulYIiaadoQ3YYotlZ4CDdXHsLNI1wr3mdI5/NRMebwts8FDkjI0+uF3RQZkZws9aYzPwwptj++H63kR34RvpptbY40fjJCwdoiEOWgs2pJ0JpMotPs2VIwZkyUsyy7lv4urIewVIwOhN/QQ1gDs8ab7v92neOSbDmqlqm2l6rqMS1KL9Yz05LeobNT+53HI0mABEjAewJUsIrpnttvF6RDNKRg9GgpmTPHFu0m1RsDqQ7Ve5BgGXjKiyIVDpS0rTum10FGvClmpZihwhHJqSDeFBVkMCvFu7kkm1vbidM28HgSIAEScEog6xXs/t//XurWrDnPzVGmptfmSqvX5oQyz9JZq9fxplCm8OqlkAAJkEA6EshqBYssTT8tXny+35CpqUxta1IQI+HDLjULQ1wr3s2SRbNWI970B1UwfP+GNXJk5yZX8aZtuveVtr0uk7KrRuoZqhO7aTp+4NhmEiCB7CGQtQo2XKamLio1IirkRBU1a5Usm7Va7aZu4k3NdlMs8eKF7EfGEm8kJ4GofcGdJEACJOBjAlmpYJFE4vs77wxKJlE8dWr0CjkRZq3nWrSWugmLpOXQ23zczc6almi7qbPW8GgSIAESSE8CWalgdynlGlQhp7JSMHuNKFFmrcfGL0zruNbTh36UEzvWyydr39ROSG7y9CLetLjP5XpWSrtpxFHEHSRAAllGIOsUbI3yDj5iqojTtEsX6WRKLhHU/xFmrQJba5VSyMOq5JyLrD+pGmNY6q1ZtzpsvOmPNhtlzdOb0/EiaabCZrjEaxMgDyMBEsgaAlmlYKFY98xVNlSTQLmGzdT0lwUBW6u1rNylQwPhN0Vlvh8kWOqt+WKVDo3x0m5qfnCGyfh+GLCBJEACKSKQNQoWS8JYGjZL2ZIl0rSfJUEBKt7AQxhZmcyCWatKzi/XTwve7pP/oED3rF2tsyAlIt7UJ4/JZpAACZBA2hDICgUbzqkJFXIKq6qCk/gWxD9aAAAI/0lEQVSnyawVITLaEUkp072bv3CVp9eob3qkSb4079xTRk2YmjaDlg0lARIggXQgkBEKNtYy5d4pU0Iq5LRdsEArVyR7b3KoWvKefFBQAccs8BBGcv6TIyYFNoext8abLD7W+adrf5J9X32scvV+peNND6sk+NjmRFCSrbj/EB1vWoR3lVoQdlPIejWzh8RiGOl+sdof6Txje7qfbzwH+cXq6ej7yS86n1h7yS8Woej7E8UvIxRsNHQ/qWo41go5pStWnD8lb/ULkv/uU9K47mjQZeovrtThN2cLu0a7vOf7UJIN9U0D1WQ2Os7TiwahJFuHgb/UOXrxyuuY3GfwHAovSAIkQAJpSCAjFGwkD9Zjq1bJ/pkzg7ql9+rV0rKrUjgxbK1Nla0130GHRmpDtEtgibfm4/+RQ6ok27HvvnaVpxchMpiVdu73DyF5eqPd27rPTfvN1+D5gRUBK1e7/5Mf+dkdK+GO4/jx5/jJCAUbbsAheT8q5Jily7x5gUxNkWyt3fqLTH9TTQHLwl0yrm1mu6nbeFOEyCA3rzne1FjaiPcDFtfD8WQSIAESIIEQAhmrYK3l5+DUVPybKpEnlNL9XClRq4ybHfAStm538X+0eFO7l0NqQa1MVcL7TuqdeXrtkuNxJEACJOAPAhmpYEMyNfXvL12r/knk3u4ilrjWM6Xl2tbaqtxeYfVw3Qa76fZvVMFwl/GmuCZKsqG+qTlPb7h7cRsJkAAJkEB6EMg4BYsKOXgZklPYWi4Z20EaPzs+tEfUrLX2n38Xuj3KFi/iTREiY8xKESIDRyQu8UaBzl0kQAIkkIYEMkrBWpNJFHQWuWj4WWm0+b3groGtFcXQy1TlnDChN8bBRkm2PWtVNiSXeXrD2U3NjXHrHp6GY41NJgESIIGsIpAxChbJJLYOH647r0kzpTsrRKBg5WRtcIdGsLWaS7JBoSIjErY5EdpNndDisSRAAiSQ2QQyRsFCuULJQqlCuULJBol51qp2GCXZvv/0f3XM6fEfdzvuadhNC/sN1ku8XQZcpeubUkiABEiABEgABDJCwVZPmyYnN6+XHlc1zFotfXtw6N1ysNtgqVm6wHWeXrPdFJ69cEaCGEu8+W3ii8PicCQBEiABEsgsAmmvYG9U/XFq+QLpd31g1nrstMhB9dpTp97P5UrN0Z9Fdj6njsLLnsSym9q7Co8iARIgARLIZgJprWCvUMvAj5SLHCkUeWe/yIFTStmeNXenUq4xxMjT27G8gvGmMVhxNwmQAAmQgH0Cjc4psX+4f46s27ZR/jz+Mjl+xlmbth4T2ar8nqpPBF4HlVKmkAAJkAAJkIDXBNJ2Bvvjn5+LqVz/rpaJtyiF+ncoU/U3lCqFBEiABEiABJJBIG1nsGdqvpf/HNtdKdnABLxVu2Jprzx6kcABTkhIM0ghARIgARIggVQRSFsFC2BQsrv/4wnp+Ku7pUWvfqliyPuSAAmQAAmQQAiBtFawIU/DDSRAAiRAAiTgEwKNfdIONoMESIAESIAEMooAFWxGdScfhgRIgARIwC8EqGD90hNsBwmQAAmQQEYR8J2Cffvtt6W8vFxat24tI0eOlD179mQU8EQ/jB1+O3bskEaNGgW9evbsqZu2ePFivX3NmjWJbmraXX/v3r0yatQozefJJ588334yu9CVkRiZO5vjz93Qf+GFF6RHjx7SqlUrGTJkiKxfv15fiOPvAs9IjFI1/nwVB3vo0CG57bbbBF/2M2bMkEceeUSmqTzDr776qrsRmWVn2eVn5E++9957ZejQoZoSPrSUyARqampkwIAB0r59+8gHZfkeu4w4/pwPlHXr1sldd92lFevEiRPl8ccf19+VX3/9tfOLZegZdhklc/z5agb73nvvSW1trVasDz30kNx6663y1ltvyenTKrkwJSYBu/yMATZixAjBa+zYsXLttdcGXX/Lli3St29fadu2re6LbJe6ujqZPXu2LF26NCKKbGdmhxHgcfxFHEIRdxw+fFgrWIy/WbNm6c/rt99+G/TdmO3jzw6jZI8/XylYLB1BjOXKsrIyOXnypFRXV0cceNxxgYBdfsYX3PTp07UCbaMqAS1ZsiQI5XPPPSeY4Xbu3FkeffRRwYc3mwVLc1OmTNHLw5Ek25nZYQR2HH+RRlDk7ddcc41eCu7evbscPHhQVq9erU1pzZpdqMuZ7ePPDqNkjz9fKdgTJwK5DHNycvRIM96N7ZGHH/eAgF1+9fX10qFDB73kCcWKZc/JkyfL/v2qYkKDQLlOmjRJHnzwQb2FS1Hn0UT8g8wiognawfFnj1O4o6Bc4QeA9/nz5wcdwvEXwBGNEY5I5vjzlQ22ZcuWmtCpU4EM/FhyguTl5el3SnQCdvndfPPNgpchR48elalTp8ratWvPb8MvZYhhc8RKAiU6ATKLzsfYy/Fnj5P1KDiQDR8+XHbv3i2vv/66XH311UGHcPyJxGIEYMkcf76awfbq1UsPmO3bt+v3bdu2CZRG165d9f+U6ATs8vvoo49k7ty5AsUKMZSn+YdMtKXQ6K3I3r1kZq/vOf7scTIfhVnXDTfcIHAkW7lypdx4IyphB0u2jz87jEAsmePPVzNYhOXAHvjwww/Ll19+KW+88YZ2dGrSpIl1LPH/MASi8Vu0aJHMnDlTO40dOHBA5syZI5999plUVlbKvHnz9I+YiooK2bx5c5grcxOWz2H32rlzp4axceNGWb58uQwaNIhwGghEY4TwMY4/90Pl+eefly+++EJ7/X/wwQf6BZkwYYL7i2bYmdEYYcafivHnKwUL5frKK6/I/fffr93QYbR+6qmnMmwYJO5xovHDLBXOJfDIvummm7Tj0rPPPisffvihVqwLFy6U3NzcxDUuza+MHx7jxo07/xQvvfSS4IXxSgkQiMaI4y++UWL88MWPPLwMsXr/x3eX9D47GqNUjT8m+0/vMcXWkwAJkAAJ+JSAr2ywPmXEZpEACZAACZCAYwJUsI6R8QQSIAESIAESiE2ACjY2Ix5BAiRAAiRAAo4JUME6RsYTSIAESIAESCA2ASrY2Ix4BAmQAAmQAAk4JvD/pODsc/CWY0wAAAAASUVORK5CYIIA[/img]
Podemos observar que la inclinación de las rectas que representan el movimiento de los tres autos tienen distinta inclinación o pendiente, cuanto mayor sea su velocidad, mas recorrido hará un auto en para la misma cantidad de tiempo.[br][br] En general, podemos escribir las funciones de este tipo de la siguiente manera:[br][br] [b]f(x) = mx[/b] o [b]y=mx[/b][br] [br] Donde [b]"m"[/b] se conoce como [b]pendiente[/b] de la recta.[br][br] Volvamos al ejemplo del auto viajando a [math]80\frac{km}{h}[/math]: la pendiente de la recta que representa a la función es la velocidad (los[math]80\frac{km}{h}[/math]), que es la variación del espacio recorrido en un determinado tiempo, y podemos expresar esta relación de la siguiente manera:[br][br][img]data:image/png;base64,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[/img][br][br] El símbolo Δ (se lee "delta") incida en matemática "variación", y la variación entre dos valores se define como la diferencia que existe entre ellos. Por ejemplo: la variación entre 5 y 1 es 4, dado que 5 - 1 = 4.[br][img width=255,height=111]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUQAAACOCAYAAABJ7nGgAAAABHNCSVQICAgIfAhkiAAAGQ1JREFUeF7tnQmUFdWZx79mbRroRTbZbBpZVFBonNEgI4saQBwFPOYwjhNogiaMOgPkZBgTR7acBFEjOOOZjBNUiIZgAiKLTERDA85EttgCIghC04QG2WlobPae+y+43fWq33v96r1XXcv733Pe6X5V99767u/e+6/vLlUvrVIFYSABEiABEpB6ZEACJEACJHCVAAWRLYEESIAErhGgILIpkAAJkAAFkW2ABEiABEIJ0ENkiyABEiCBawQoiGwKJEACJEBBZBsgARIggVAC9BDZIkiABEjgGgEKIpsCCZAACVAQ2Qa8ReC87Hihj6SlpUlaiwL5+Ky3rKM1qUGAHmJq1LPnS3lp/9vy9JQiz9tJA4NNgIIY7Pr1R+muHJEVP/qRrD7vD3NpZXAJUBCDW7c+KVmllK2bKk/9/pTktEzzic00M6gEKIhBrVm/lKviM3lx/H/J0X4z5aVv5/jFatoZUAIUxIBWrD+KdUF2vzZeZu39lsx64wnJk0v+MJtWBpYABTGwVev9gl0+8I7803NFkv/zN+XJbo1F+GZO71dawC1sEPDysXheJXDlmPzhX38ohV1nyKdP3ySNpdyrltKuFCJAQUyhyvZOUSvlzCc/lafebS/PbZwoPdK9YxktSW0CafwJgdRuAK6U/sphWXBPe3ls7eUol+8q07d/LlNuaRQlDk+RQHIJ0ENMLk/mFhOBy3KpQaY0bGgeJlfKxYumRZVmOdKkfkyZMRIJJI0APcSkoWRGiREol8JH28s9C0+LXDdG1u2fJ3c3TSxHpiYBuwS4ymyXGOOTAAkElgA9xMBWLQtGAiRglwA9RLvEGJ8ESCCwBLioEtiq9V/Bvj5xVn7z4U5pUL+ePP63PaVpekP/FYIW+5oABdHX1Rcs45+avVr2H1aLKiocP10hM753V7AKyNJ4ngAF0fNVlDoGHjn5jdSvl2Y8wffpl4dTp+AsqWcIUBA9UxWpbUjp0XI5d6F6H+KxsorUBsLSu0KAiyquYOdFrQQ27fxaGjaoL43UB15io4b15X+3llqj8TsJOEqAgugoXmYeC4HLVyrltWVb1ZMql+XCpcuC7xXnL8nK9cWxJGccEkgaAQpi0lAyo3gJfLi5RNKVR9ilY/ULYvvd2l7W7zgk2/YeizdbpiMB2wS4Mds2MiZIJoEdJSfk6dl/lNPfXDCybdbk6lab8oqLxvc2ORny9nPDJLuZel8iAwk4TIAeosOAmX1kAlu+OipPvvxRlRgiZodWzdUcYnWzPKxWnp94YZWcOHMuckY8QwJJIkBBTBJIZmOPwIKPdsoriz4V7QkiNRZSJv/9X8v3HugRktm+r0/LpFfXyJf7T9q7CGOTgE0CHDLbBMboiRGAp/er5dtk0ZpdRkbtWjaTg8euvgbsJ/9wp4zs38U4PvPtjfLuut3G/7d3byN/vrYvccIjfeTR+24yVqIZSCDZBCiIySbK/GoQwKrxrr+clGX/t6dKCM2RWqt5wu8Ovln+7t6bqg5fqayUn/16g+woOS67D5wKyTOneboMvaOTDL4jV3rmtaxxPR4ggXgJUBBN5M6euygH1QbhdVsPyJUr6oRyQs5cm+yPF3CkdI3V8DDIAc8hlyrPr/hQmWCuEKFL+2z5qjRU3FpnZ8jkR/9KBuR3DItj7vvb5K0Pdsg3qm7MIa9tlpF3PeUp9unaWrqqFeomimmF2rqT7BD0ugIvPB3UWO0BbZLeQPr2aCedrs9MSS885QXx4qUr8j8bimXdlgOyaefhkI53640tZdsebvuIR2Bu76aGubtCH79rkZmunlGuXhwZPeQWeXJk71o7HjzEXy7dIh+rOkJo16KpHDx+toZZee2ypfhgqODWiMQDYQmkN2oQ8qRQhrqh3dOnowzqc4P0v6192DRBPJiyj+5BCDFH9f4nxbJz/wmjU166DLewOjQwrXYGsfLrukwQw27Kk4Mw/rOaC4THGEvo2iFbXvzH/rLuswPyH+8WSausJmEFsVINzRniI9CwfpqY1/Hhke9UW6JW/Gmv3HTDdfJw/65V87vxXcEfqVJSEI+eqpAJ/16o5qaqVy3z2maHfEf1XWEHS1or7tujrXRXHev+b+VJZzXctRtwwxpkeCwdpWjXEflg0z75VP3FsLkqcJ3FLtZqdGEWqZo3vbr3Ew7Dz9/eYHj8P/nunZLROLiykXJD5o8275dfvLNZrC8P6JHXQrYXH5e7e3WQbh1y1HO1adJV/TXviYu7tQUk4QU1P3dRedHn1UsY0tLSjP/rqb/qlxuNEuIY3mWIkNWskXGuu/IIs9UiiFOrwrAJ23L2HiyT61tkyNkK0w9VBYR7vMUAm2/UI5AY+egREOoIC1aoGwTUV8MG9TBdbsz5lp29IGuK9qupjfPqyNVHKM3Xx9ztjx+7Q/K7tY7XLE+nSylBfO/jr+Rnb20wPJS9Js8CWz++M7CbjLqnu9E4GEgg1Qng7UNvrfpCza/vC5lX792ltXqc8qj85w/vlT5qnjhoIWUE8Y9/3i/PvPaxUX+ZGY0N4cNLSH/w0G0ydlhPxzyYoDUYlie1CGDf6NTX/yTrvzgkt3ZuocTwuAEAj1j++tn7pWPr5oECkhKC+MW+4/LEix8KhhA63KZWkH+sNgLHOrEfqFpnYUjAJoHlanFljnqy6HQ5htJXQ+d2WfLqxHulVXYTm7l5N3rgx4fYFDxj/voQMcTc4Ixx/SiG3m2XtMxjBB68q7P8VP2kQ2O1PUcHzNv+9/KtHrM0MXMCL4hL1LwhthCkN6reCP1vo++U9mrekIEESCB2Anf1bCdj769+zjyrWboU7T4in3x+MPZMPB4z8IK4qHCXHFKbeC9cvCK5avf9+OG95JZOLTxeLTSPBLxJYNwDPY3FlO435EhZ+TkpUSv8C1d/6U1j47Aq0IK4Uz0He/LM1TkPbDXA7pAC0x0uDl5MQgIpT2DmD/4m5M1D2MKGqakghEAL4hb12N2JMxVqVbmRWiFrKQ/1u5GryUFotSyDqwSuU/tKh6iXa2BhsqlabcaLO7CHNwgh0IKon5vF25jxKvqeatsAAwmQQOIEcttkylblcJy99mbzvQF5hjy4z+CoOodX+P0Hb6uqfeyyZyABEkicwMD8DiGZ4EmvIISU2IcYhIpiGUiABJwnEOghs/P4eAUSIIEgEaAgBqk2WRYSIIGECFAQE8LHxCRAAkEiQEEMUm2yLCRAAgkRoCAmhI+JSYAEgkSAghik2mRZSIAEEiJAQUwIHxOTAAkEiQAFMUi1ybKQAAkkRCDQT6poMrt375by8nLp3LmzZGXxaZWEWgwTk4CJwKlTp2Tv3r2SmZkpXbp08T2bQHuIzz//vLRrd4PcffdgGTmyQFq1ai0PPTRCioqKfF9xLAAJuElg48aNMmzYg9KmTVvVt8ZKv373SYcOneSll15y06yErx3YR/dGjBglJSUX5I47pqlK62WAqqy8LJs3/1JWrZooy5cvUxU6LGGAzIAEUo3A0qVL5eGHH5ahQ1+V228fr4p/9Rf8Dh36VDZunCLdu2fL7373ti+xBFIQZ8yYIUuXbpUHHlgUtlJ27VouhYXjpbh4t2RkZISNw4MkQAI1CZw8eVJNPXVVzsRv5MYbh9SMoI4sXz5cRo3qK88880zY814+GCKIUP7i4mIv2xuTbc8+O0UKCjZLixbdIsZfvvw7kpd3Wfr37x8xDk+QAAmEEli9erWUlrZVzsZrEdEcObJNfvvbATJ9+pSIcbxwYuLEiTXMqBLEVatWyZAh4RW/RiqPH8jM7CATJvwlqpXbt78jy5YVyKVL56LG40kSIIFqAg0bZqg5wwVqWDw8KpaXX75ezp49HDWO2ycr8Qp9S6haVCktLbWe8+33Jk1a1mp7RkZLqV+/Ua3xGIEESKCaQL16DdU0U+39q0mTHF9iqxLEgQMHSqdOnXxZCKvRp07ttR6q8f3YsS/k/PnTNY7zAAmQQGQCFy6Uy9Gj2yNHuHamrGx/rXG8GKFqH2JeXp4xf1hWVuZFO23ZNGjQt2XHjkVy882PREy3Z89bsnDhQrVSNjRiHJ4gARIIJYB1hpkzfyV9+nw/IprPP1+gzufLBx+8HzGOV08EcpV55cqV8thjY+WRR1ZK27a312C/evUkteCyX61EL65xjgdIgASiExg69EE1P3izDBr0Qo2IpaXr1Zab+2XJkt/LfffdV+O81w8EUhAB/Y033pDHH39c+vb9F2N7QOPG2XLkyFbZs+dNyc3NkcWLF0p6errX64f2kYDnCJw+fVo5G4/KoUMVqm8VSOvWt0pFxQnVt/4gmza9Iq+/PldGjx7tObtjMSiwgojC45GiuXPnytq1n8iZM+VqCN1FbSgdofZIjYqFDeOQAAlEIbBgwQLlCS6TnTu/Uo/EZiqPsZ/hhOTm5kZJ5e1TgRZEb6OndSRAAl4jEOhnmb0Gm/aQAAl4mwAF0dv1Q+tIgATqkAAFsQ5h81IkQALeJkBB9Hb90DoSIIE6JEBBrEPYvBQJkIC3CVAQk1Q/eHMwPgwkQAL+JUBBTKDuIIBr166VsWPHSk5OjsyZMyeB3JiUBEjAbQIp8ZsqTkDGyzAQsrOz5bPPPnPiEsyTBEigjglQEOMEvmbNmqqUEMeSkpI4c2IyEiABMwE99QRnwxpwLtxxa7x4v7s+ZN63b58x7MRHB32Mc3LxVivTkYB/CWDEhSmo/Px89TjgIGNKCn/rYlrKVQ8Rr/CG6MHDwvxbWlqaevV/gfq9k0LjmP4/kfc0wpNDvnYCfqq0d+/edpIwLgmQQJIJWKeiJkyYINOmTUvyVUKzc00QUTAInf5dA3iF06dPl9mzZwv+HzFihPH3vffeq4pjlwSAIh+773iEIOLaTrrmdsvC+CSQSgTMTgmcEzhHdeGkuCaIECuInQ4QIAQIGIIuPECYAzzK+fPny/Dhw2t9wzfy4LA7BB+/pBAB9Ck9tz1gwACj5PpYr169PH3DR981z9PXVbW5JohmMURhdeG1IFpdY1QkhtUQUsw3okITGUrXFWBehwTcIBCE6Sj0dbyhGwECCVF3fNSmfnnK9aB+ugA/f2V8agtqftGIh79eCaqiDJumTp3qFZNoRwoTQDtUU09VBPAd7VO9p9A4pkZXxndzHLu4ioqKKtWwtqrf6v5b21+kUb/tHPVyuo+PGTPG6Of4KAeoUomh4/3eNQ8RdzAsdmDOUE+ewuszBwyX9VxjyIkYvyBfrFTZDbgL4fdlHL8b2TWM8UkgBgLxTEdhhKZ3emDkpcQo6pWcnI5C3kuWLKmaPoMh0IGRI0caHyf7piuCCPivvPKKestuliGIevisNzsDAOJgmJzIsBhg1Z3M9jwirkkxjNofeNLDBOxORyE+FjTRV/RCJKanlGfmSj9A39NTZxqz7o9YE4C91rWFZFWHK4IIwYEYTpo0yagIBMwPYL4A+40ghrgLWCs2nkI7tTI1b948Y3EHYcuWLcZffNd3WTQmBhJwm4B5YcXscJjtQluGEOKD/gKxQb9EP7QKk9PlgeDhF0ARINDhHCK9AOuELa4JIgoF4FB+NcdhlA3fAQTuulNCliyIaFzhKitZ+TMfEoiXgN3pKHiDSKP7XCyC49R0FPq/3hkSaYTopDa4Ioio6HBucaQ7WLwNw8l0EEMKopOEmXc8BOBU2J2OMrdliBFGanBKonmHTk1HwRasJUALrFNo4KHPxcMmljS++ZEp3C0wJMVfuPhw6wFPe5exFJZxSCDoBNA/IFaYjkLA1BOOYT8iPEEIJo6hD4WbJ4cIIb2bb26C94n+jekz9HHd5yGGmEYLZ3ey6tU3gpisAjMfEgg6AXh5ejpKe1l6OgoCE2nIiWEz4sMz1Okjxa0LhrAB4gibo9mdTFsoiMmkybxIwKcE4JHhEVctgPDEsAPEPGz1adFsmU1BtIWLkUkgeATgGWLe0RrU7mnrocB/pyAGvopZQBIggVgJuP4+xFgNZTwSIAEScJoABdFpwsyfBEjANwQoiL6pKhpKAiTgNAEKotOEmT8JkIBvCFAQfVNVNJQESMBpAhREpwkzfxIgAd8QoCD6pqpoKAmQgNMEKIhOE2b+JEACviFAQfRNVdFQEiABpwlQEJ0mzPxJgAR8Q4CC6JuqoqEkQAJOE6AgOk2Y+ZMACfiGAAXRN1VFQ0mABJwmQEF0mjDzJwES8A0BCqJvqoqGkgAJOE2Agug0YeZPAiTgGwIURN9UFQ0lARJwmgAF0WnCzJ8ESMA3BCiIvqkqGkoCJOA0gZQWRPzeKz4MJEACJAACKSuI+O1a/BB2fn4+RZF9IW4CuKGuXbu2Rnr8njA+bgfYh58U9WpAPwz3i39u2ZuygjhnzhxDCFEhkyZNcos/r+tzAmhD+O3itLQ04+aKm6z+H22rroMWaIjM2LFjJS8vT9DWvRrADj+D6pWQkoKIRoMGk5uba9QD7qBr1qzxSp3QDp8SgEeIdpSVlSVLlixx5Ufecf2pU6fKyZMnjY+XQ0FBgWzZssVTJjbwlDV1ZMy0adNkwoQJ0rt3bxk5cqRxVXiJRUVFdWQBLxMkArixonMjoE2NGDHCteLBDm0L2vnSpUtdsyXahefNm+eJKQWrjSkniLiDwiOEl5idnS0DBgww5oBwd0cl6cZkBaW/Iz3i67ToAPpYp06dZMyYMZGS1slxlEN3guHDhxsdVB/zgn3hIGBoCZtRJ7ARdoMv6qOkpMSoIwytvBpgM8SHITYCuq9hKI8pBi+FlBNENFxUBDocAv7H3A8CvETc3fU5a0VBLNH40TkhgkiHY5WVlUY6zNlgmBJtTkSLpzXv2r5rcYsWD7ZAXHB9NDptH2zCOe0Fe2lOCSII2/CB8KF+8IGQ4zuGn+g08N5xLJ4AJvPnzzfY2Amx3kD0wgDqFgF24saI9H4LqA+wshtivWmBFeoarLyw6GQtZ0oJIjwOXSEaBBovhs+YU8Q5iEW4uz2OWT2B6dOnG3NFaERIh/S1VTIagu441sqI9h2iG00QdNn0iqIWdRyHIOpFJNjqpYDOAbbaA0QZ4YH36tXLEHZdDrtiZi4jyox6shtw7Vg8fuSPYTOuATtxcwTvN99809Xhs93yIj7ab2Fhoe2kaGOxePFggzYZyemwfeEkJ0gZQURDhYChkVoDOiQqqayszIiDThru7m72/LTwoRGgcvW8UTTvENcNJ7ZWe+L5rkVZp9X24c5ttg9l00EvJoENyo4bQ7RGvWfPHtm+fbst85o3bx5xWITrQgDN19R2a576RmO1C7bDk4lF6HCNeG5CsRQUeYO97uD4C8YYLeCj20e4vA4fPiwbNmwIdyrisfT0dBk8eHDE84meAHen5kDBBZ9oN/ZE7U80fcoIIjpWJLcejRhCpbff4K+1o1mFTHcw3VFRyW5WtF37IDxYUNJDUQg5hqYod6QOsXjxYpk7d66tNgfPKdI8Ebhbh+96T5/mahZwXBg3LggQ+Ifb/2fLuCRE1mJo9nj0zVSPGKxiri+7YsUKmTVrlm0rdu3aZTuN2wm0V2itT7ftsl4/JQQRjRYVEs1LgCCgc2ISX3tOkRoyIFoF0Qo20nd0kni2GmAIaWeYUZt92hNDPAg5RBDTBih7JEGcPHmy4ONU0DZDRMN56Liu7lC4AdgRROSN/YF2QjQ7kA8Y6vnn4uLisDaj7UUK48aNE3y8FuJhVVv71N6y+eZongbBceRhvUHWNZuUEER0HjRciB0+kQIqTXta1m046IhYCYVHpYeYyMfsFSIORDTaXRDCG8+kNeayIOqRgs5Xbx3S5TSLOsoGUUVcbasWHt1xIwlRpOsmchwcUS+4JuatIok4zkcTltpsQL6RvNRoabGgY+600eKaz5nTuDlqiNVeczwIUjwPKmD0pesv3HUxB24NaI/6xhzPvKU1v6R8V4YGOijQqIm4Pmq+sYoN8lAdpFJ5ApVqrs3ITzX2qvNKiCrVHc41lmb71MbcqvJqg2CfarSVavK7ho04hrLA/nDnayRI0gFdN7ALQXlkht2wXwd1Iwj5ro/rMlZFdOkfMDPbCzPUjgCjHGgnbgbNSPN105Zw1w7XTsPFq8tjabhYUpTVo5nAQ7IztDIXA96U3u0Pr0oPkfSKGjxK7Q1iyIThpp1hbTKR4W6LOzQ8LtiHYS9s0xvPo9mHeOHm85JpX7i84EmhfuC9gS28YJQBnjh46/lN6/wo8sIxLIC53XxRBrDGcBzeIOwHa9hX2wJbOCaJHgNH7eHBq9ZznNpTnT17tqtz3SgfRjoYJWn7cAztwAtDZjQohhgJwHuyelDwGK3HYswu6dFgB+wxh9rsgxejFlKMJEjvhlcD79Ua4D1GC17xELWNYAebvdIWorHjucgEAu8hJnrHDXJ6eIbwnvW8IbwdbAAP55F5jYNXPESvcaE9iRGgICbGz7epI02eY3LbvBDjtQJiSKgfvcSQC7ZCyN1enfQaJ9oTHwEKYnzcmIoESCCABOoFsEwsEgmQAAnERYCCGBc2JiIBEggiAQpiEGuVZSIBEoiLAAUxLmxMRAIkEEQCFMQg1irLRAIkEBcBCmJc2JiIBEggiAT+H1duPkH9m1jVAAAAAElFTkSuQmCCAA==[/img][br]Y la fórmula de la velocidad queda:[br][br] [img]data:image/png;base64,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[/img][br][br][br] Entonces, conociendo dos posiciones de nuestro auto, podemos calcular su velocidad, por ende, su pendiente. Por ejemplo, si tomamos el punto de partida [img]data:image/png;base64,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[/img] y el punto correspondiente a la hora de recorrido 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[/img][br][br] Lo interesante es que podemos tomar dos puntos cualesquiera pertenecientes a la función y calcular su velocidad, podríamos haber tomado como 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[/img][br][br] En general, la pendiente de una recta resulta de la variación de los valores de "y" con respecto a la variación de los valores de "x" y podemos calcular la pendiente de cualquier recta si conocemos las coordenadas de dos puntos pertenecientes a ella mediante la fórmula:[br][br] [br] [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIEAAAAsCAYAAABCIttgAAAACXBIWXMAAA64AAAOtwHt2emUAAAJIklEQVR4nO1bCVhU1xk9b2AAEQkiIGhQQBGXpHGphoBLxKCSNFI+MRqtC42gmFisVaBJWkGSqK0hbthPRRSxlBoRiHHBiEtdMBFXFHED3NjHQNhGlrm9b0YajYO857w387RzPj7mvvvucP6597z/LnMwJYTAiP9vmBo6ACMMD6MIjDCKwAijCIyAUQRGQNIiUJH7B4LRf1wCyujVG4klOD7DETKAMVhITTfIykHuWHwZkPmkQ5HlDxvU4j9BLhi1VQHYTkdW4Tb4WIsUo0j8khUBqTqCP8/SCIDFjeMFUFIRWBoyKNNOcLTWFFX1P+EBu7tuuISU/Qp1ndOUefC0fv74pSkCUkOyoz/AxpKfqyrOXEBlixd6mBguLDCWsLe3oAUlUFuOmmbA6twWpJayN3vh93MGsSIVL1OJxC9JESgvrULIqiJa8kDYChdsjMhEQ9EPuKUMRY+OMGBalsOxvyPwDY2t6h6qm6pwM24Hyukdk+GRCBlg3v5nu7yGhH5yEArV01oxsPaOwqaIQejw2KDqzq8N0hNBUwFJCF0KOr6wm7kG4aP3IxWZuHv/Eq5WqTCio8yAadkcjgO60dci4H4Rygt34osdVfS6C6b+NRDOHLIUUSpw785tlLc8rRUDmz5KPKkT3fm1QWIiaCGl6QsReYLmOfkoLFvqA4fmPHSmd+7iDs7cUWJ2d0sDpmWGsfYYQrrhJIrrz2PzgqM4TgdT5hmFqDdtWEL6Q0hdXhIWh0Ri44kSqOw98Yf4XVg5wYntbKbDkGjmwJloEfkfoqmE7A0fi3dXWyOp7Dim2jNt9oekREBqsvHZHzNQQ8tuC2MxrYcpTBXdaapnUYH8uw30lV0aipMWucDCdTj6yNaiWFWI1INsjQsWrAqCm7x1AFpQmb0du0oG48NP3XBp3Vqsnh+LGWP/jsEW+uAHmu+mkgX+0xF3lu0vr3b/poRE0Eiurp+PuHu02CkAKxcO1MyH5rbEqROtq1GhJL8cjehCzERKi1zAWL8Cn97AkWuaa6fgePxlWMdHWpgyPYN2kxu/M4OVeQ0y8xJw6HAZap6a/oXkp5nBDKg0G4NZft9j6772/6ZkRNBSsguLYs6rywMiPsM7DjLNDdPOcLahrzQ9lF4poyLoBzM+aVFoyO3RpztV2TVKaD8d8V+Mhg3zCz6ZOWNlTkjN6VhEptXBdto0/EqovS0HfpnDRCYlewK5tuK150kEdeT0inDsqaNFuTdmeTUi/+JF9gZBczGIXNOquqgY9XQRaMVwS4uCgTSQOxcKQBzkuLZ9AeYdZh/rrpi5NRbj7WRa3/LgRjze943GeecQ7PvKF51/KRSR+flAEiJoptu5P627o7loOoHFPoOwWFvDygIomgAHM25pUSioKnYj2HMyMh+01pjDM+ZbrPWz036CWZdDlk4IwR78BvGH1rADpZMwefPzhOFFQKrIkZglOMllzlQUoJKKgM4H3NKyQGgoOodKNhvRQbD28MPcmNVYEugOS618hCi+W4LYK0DPqZ5oyNyM9SZdyNDAQAztYvJM8fHj54+2RdBYQJI/CUdcxhHkXFfQuZimYY8ALIocB2VGHDZl5EJBOsDVNwzrEmPwtpPpswXE2DBvJZSDJHBoq06Ll3HbQU7ESIttoeOwZUxOzTKOrZtQkVfAbl5xK/lTzE9m63oi/HV/VgR64OePNkXQeD0JUStTcf2RutqraYgKSnukpgGF3y3HpJBfoyhjIrGXgdHtROzpECItihmfBmZM34+vgHzM713CQ870icgDiWi/ZRsiUBHFmQMaAZiOwIaz/4TXufkYPjMD1bSq96JvkRbaFYdmeSPsWCPqT+3F1YaJsKdTcnPZSaRm7Fbv9Z8aYvMcrNd0MmcIkRbFjO95RRsiqMPlPbmaYv+J8O3njJcthuNlsCIwR98xI/CKmxkeDO0KHKMLOoamgIfDYOWTwvxEUkQJVoi0KGZ8zyu0i0B5Ewd/0Dwr3UZ5wZG2Ut46jdvqGle84WJB5+dq3DhXrGnv6gkXHQ/pGIYR3fZMCHnmhZQ+4tMnHu0LrSJoqfgeWUVsqQOGjHOnvx/g4uHTmhRq54WRznR5Xp+P/Rc1S3q3t4bC7uGaR/w5VzdIPT5DQKsIanL3qr/FA/rB79VOdIlQipysQs0bBvqhryVdOOYfRbb6S7uXMGyMK50kNJ3VXH4K6XTOrWqH2EI1l865+N+cq8tTygdSj88Q0CKCBnI98wzYrx7QwweeDvQRr83DPo0q0NdvEF5iVLh/9gDU5zTMq3in/8+HNFajk5kfSbIeQn82SD0+Q+BJETSX4uSRe+qi1VBf9KLTvzI/Czm1bI0jRno7QY565O3LhXqSdB+LIbZi7NEl6DF8QfGkCExdmbALBGGP1g1cjkKy/LFmo7f/CLJdvMAk6TF8QWH4Y2NtkKrH8AWFJEXQrsewpZgkjXPFjKxGmHhvQuHR2XBGMf49qT+mpFVDPnwt8rI+Qm8zAacOQ3DqiV96IuDiMTTpxgREBRHHrA0oPfE3xF95H8Hn5yKYdgYsfLA2cY7wg2EITj3xS0wEHD2GFFavL0L44A1YePY6Vn80G3tPsUfBNghI2IYP3OSiRGcITn3wS0oE3D2GFPJemBEdiKh3d6L6aApyaJV72C5sntxdbegUJUAdOXU+qBLpM0tIBHw8hmoHGWMz8G3ymslOHGMPLh2CseXz0egsE3MLqRunbnZz3fnbgmREwM9jSFGfS2Lfm6vpDBbl6dhyeiW83xTx/8Da5RTTbs6FH7ys5q2QiAh4egxVZeSbD8cjPLuRzhvvIajj19iSW4Gkz3cjZuQ04iRGNmjhwimi3ZwDP1+reSskIQJ+HsN6lK4KQODWYro88MU/MhMxKa8RX/uno/ZgLHYUTUaYm9Afq55c/JILp1h2c278fK3mrTC8CHh5DG/i2q5QhEZkowkumJf+L4T0toDMYT4CbNORdP8sNu64iXmRHmzyECgbsDuWUIznyim43ZwHP0+reSsMLwI+HsOH8J+S+HiFtQ+2KQi2CRvZQ5gwjr9NRDHhzimo3fwZ+PnC8CJ40SCw3VwfMIpAUAhvN9cHjCIQFMLbzfUBowgEhRTs5tyt5q0wisAI/BcIntk0h71tJAAAAABJRU5ErkJgggA=[/img][br][br]
[b]Ejemplo1:[/b][br]Para determinar la pendiente de la siguiente recta, elijo dos puntos cualesquiera que pertenezcan a la gráfica, por ejemplo 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[/img]
[b]Ejemplo 2:[br][/b]En este caso, voy a elejir los puntos 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[/img]
[b]ACTIVIDAD 1[/b] [br]Determinar la pendiente y la ecuación de las rectas a partir de los puntos que se indican para cada gráfica. 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[/img][br][br][br][br][br][br]
[b]ACTIVIDAD 2:[/b][br]A partir de los puntos dados a continuación, determinar la pendiente de las rectas y su ecuación. Graficar:[br][br]a) P[sub]1[/sub]=(-3;-1) y P[sub]2[/sub]=(6;2) b) P[sub]1[/sub]=(1;3) y P[sub]2[/sub]=(3;9) c) P[sub]1[/sub]=([math]\frac{1}{2}[/math];[math]\frac{1}{4}[/math]) y P[sub]2[/sub]=(4;2) d)P[sub]1[/sub]=(-6;4) y P[sub]2[/sub]=(0;0)
[b]Graficar una función de tipo y=mx a partir de su pendiente[/b][br][br] Podemos graficar una función y=mx a partir de dos puntos pertenecientes a la gráfica. Pero existe un método mas sencillo, y es a partir de su pendiente. Veamos un ejemplo:[br][br]Tenemos la siguiente función:[br][br][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,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[/img][br] Significa que si nos desplazamos 5 unidades en x ([img]data:image/png;base64,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[/img]), partiendo del origen, por ejemplo, tendremos que desplazarnos 2 unidades positivas en y ([img]data:image/png;base64,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[/img]) para hallar otro punto de la recta. Veamos:[br]
Si la pendiente es negativa, como por ejemplo en la función:[br][br][img]data:image/png;base64,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[/img][br] Podemos considerar que la relación entre los desplazamientos es la siguiente: cada 3 unidades [b]positivas[/b] en x ([img]data:image/png;base64,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[/img]), hay que desplazarse 2 unidades [b]negativas[/b] en y ([img]data:image/png;base64,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[/img]) para hallar otro punto de la recta.
[b]ACTIVIDAD 3:[/b][br]Graficar las siguientes funciones lineales definidas por fórmula en un mismo sistema:[br][br]a)[math]y=\frac{3}{4}x[/math] b)[math]y=2x[/math] c)[math]y=-\frac{2}{3}x[/math] d)[math]y=-x[/math]
[b]Ordenada al origen de una función lineal[br][br] [/b]Partamos del siguiente enunciado: "Un auto partiendo de Neuquén viaja a una velocidad constante de [math]100\frac{km}{h}[/math] , en el mismo instante de tiempo, parte otro auto 150 km mas adelante con la misma dirección, y también a una velocidad de [math]100\frac{km}{h}[/math]".¿Cómo sería la representación gráfica de ambos autos en un mismo sistema de ejes cartesianos?
Para empezar, ambos autos tienen la misma velocidad, por lo tanto, la misma pendiente, la diferencia radica en el lugar en donde parten. Las funciones de espacio recorrido en función del tiempo para cada auto tienen que tener en cuenta la posición inicial, por lo que sus ecuaciones podrían expresarse de la siguiente manera:[br][br][img]data:image/png;base64,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[/img] [br][br] Donde e[sub]i[/sub] indica la posición inicial para cada auto. [br]Para el primero auto (A[sub]1[/sub]), podemos poner como e[sub]i[/sub] =0 km y para el segundo auto (A[sub]2[/sub]), e[sub]i[/sub] = 150 km. Entonces:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGsAAAAVCAYAAABBlxC9AAAACXBIWXMAAA7AAAAO3AGModRUAAAHcElEQVR4nO1ZDVBU1xX+3rrLLsuCoODPUhaNBmgwP0QLEgL+oCa2YBw11GJpNI4VYoiStmKI0EQGGjBYhWpMrRmpjtGArZZWIiMGNAk/kSimWFjkR6guuBBgF1hkl729bxeMrrv7nvlrmOGbYTjcd+55557v3HPufQgJIRjD6IDw/+3AGPhjjKxRBN5kDdSkk+BZr+Mylb1evQhl1mxIAOa7c+37g1FTRXY/H47fFPXgx2/VoTrRB6KRtREduZafgk1J+1F0rRcOUwPxi6Rs/PGlILgJHkDHvgekp/Y8isurodT6Y23cIkwR3j+PH1mDdWTfi8kmoli0ll9Ft3E2pgh4zf4BQ0/aSrOx6Ve/xd9arD0fIm0n1yM46n10DI8MqiqRGx+Ga/orOJfgSxwwBG4dDsIMrTgSvQAvXwIcI/+J2HjrajzI0pOmgxuwrdIICMQ0CW4DzZVouR2DKY7cs3+wGGojf18fghW5jbZ1BqqRlWAmQRSYjJN7F0CZshwJhRp8kpKEohfyESHloTOBY3Npr6DwP2bRP+IxONtQ4yRrSHUCm7degB5eiD0Qg5L16ahVfYHmPoJAR+4d3l+dQSIXvYZScSRyPspD3MMOD1Q6ia6BFOzcjvS/FKCitQ+Mxxy8mHkYOWv94PhNyvA4V0zzMJjESXMXwqn8HJosVAZqP0D+dVaagOiMrfjpHBkTnhFPcgrT0NhbhNwqLRZ5cOtELHax64quvgiXBszyxY0KCDdSYUYy+aJmB2aJv1qjfbLIl6Q46RUU9FJX1ryD1Mh+rKTDteS/+LdqEFHuYo6I3CbX8v6Mcx3s9eAf2H/6BjZsnk6EPINs7P6EpCyaj7Qqw1cuqS/i4Lpo+D9dgYSZItPYQE02iXv9LDqN9qwxcAl5AwcSA4ZJljCzthwmp6N8EO5Xg1/KKVm99yye9NaVwcQDZmKer9QkiRXB8KV1rXGwF1cvqdDlzaXTBv1iFyKyuWYDaSs/j5sWo24h4ZhuEV67ZPVXZSDukBpwmI+M9Gfg7ngecjZJNDdRfYOWw0e5yHLA9MjVeHJnOj53CMOa8KngSxRIFylOWGEmyvfXOJL3B6yaXILnH1qJgr4GVLbS9w+TZWj/FCdOFUDLYVJk2Ih9ZrLMf3uGMUs9qaCtsXLZHIK2rRumB0JXeEiHG7RQhoksJ4M0DKpudIu5dDRgU01kc50aXCmsNcvBB9F0Ntp0FhCIxLDsdbbJ0jeQg/Fvg63ovom7sUZBVQfGQz6eDmh0aGnook64cOwShnEOSkOV7vdET18t4nUyMmOoNQ8pubeopMCruel4VqrEqb37caGPfeqH0OmSO7qyhccYDTnG1zRv8Plc8I0/KeiUOHN50CQ+/EwQ5FLJfSSNwAZZRqL+1zYkl5vrSl3qE5Cm3qtxq+4W7WPe/I6TAgfGZmbZgObSCVSZItGCXXPdsevOk8lYtu8Q1k37rq+I4+A8ebxZNHRD3UdjMZ6mvKEXnf3mYZeprnDl1HGxGyODqgwft7GSG+bO97ZJFAvrdvou4q0t+eix8xJ1fTu7y80lRa8ip7cuQeQeFxxu/xjRHsy9LzTqiYEWAiHvnWUkus4umgwsJPALDYOPXAGf2fOx7Ocr8LTCkTV0x9bX61lcoFXBJ5B44QJa0YDS+n6sk8twu6UcStNGkOGRADkmTAyEfZ2p5jubjRj013+EepPkg4U+UrseWSFLTxrf24zdbNeUPYe82qOImDhyodKiePU0RJzqp/w04ktajJ3aTpAtz8Vg7+c6+vwpC1uEaCuSsSCMlkLxPGSWfUh+5y/hESgB4+zlTWT4DL1s34t6EzlRD0HQ0wLl9U7oFT9iM/AODLfKcZL2rG4OqxJjLO1ZAN8bh8QvCsvlWci52YmjWzOxKmceqX8jm9JCIVuCF2bLIJFw6ThBW7GdWI8BIbqODpgPgu24XN2MdqOB3OyagEdnud/X3+8jy9h5Bkkp5WCTVBGbjJ95Su/6UmEkbpOc6O9+dmtBTVPfm0atwyEca5dW4FChpbVBNBW8jyo2ywZLceSsCgn+/E6DsrmvIMYzH+/c0KAwPhjeIxfFgH24/lkcFOPu0l1wlOkiR7lMPjikTyLx7eX4a/RJ9FSmIjJopBeI8NSOdCwx3Z+4dPSotRkDuntnPEYmo4xS1Yw9S2dgDzs19DjUpVFwt4iSBVk6Ur0rAce7qcgEIXHT4xYlQwBH1+Gt2tEANXVAMGklc6xsGVFmPG6FLDEzc9UGsvDd11DiEInYpXLep0HGOZTJKjlOnF5OxoEiJXoIezWagZAQeqL83v5RIGQ8Vx8hnxoS8VLyeyi9roNoyk+wOikbezb5DvcXIbh07MVAGrgDh7c3YWNWEZrY4iT1QugcNzDsGu2T5cgEpNWDpNlyXsIEZDaDZPJfrvSJbUyxehv/CXd7MzOK2flhFHZ+rdkPAOdw5gOtjQxgnJhHYv6EEvpjExw6dmMwbhKzOPUMGlOtP74bY1/dRxHGyBpFGCNrFOFbIkvE+CReBUn8dqyNwTrGdtYowv8AmuoxxLEcNXsAAAAASUVORK5CYIIA[/img][br][img]data:image/png;base64,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[/img]
La diferencia entre las dos funciones es que intersecan al eje de ordenadas en distintos lugares, es decir, tienen distinta ordenada al origen. [br][br] Ahora estamos en condiciones de definir cualquier función lineal a partir de su pendiente y su ordenada al origen:
[b]Definición de función lineal:[/b][br][br] Una función lineal, es aquella función que tiene por ecuación la forma:[br][br][img]data:image/png;base64,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[/img] o [img]data:image/png;base64,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[/img][br][br]Donde:[br][br][i][b]m[/b][/i] es la pendiente [br][i][b]n[/b][/i] es la ordenada al origen[br][br] A partir de la ordenada al origen y la pendiente, podemos graficar cualquier recta sin necesidad de utilizar una tabla de valores.[br][br]Ejemplo: [br][br]Graficaremos la función[br][br][img]data:image/png;base64,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[/img]
Nota: La pendiente está expresada como fracción ([math]\frac{3}{2}[/math]), pero también podemos expresarla como decimal ([math]\frac{3}{2}=1,5[/math]) y la función puede expresarse como:[br][br][img]data:image/png;base64,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[/img][br][br]y la variación de [b]y[/b] con respecto a [b]x[/b] queda:[br][br][img]data:image/png;base64,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[/img][br]Es decir, por cada una unidad en [b]x[/b], debemos desplazarnos 1,5 unidades en [b]y[/b] para hallar un punto de la recta.
Ejemplo 2:[br][br]Graficar la función:[br][br][img]data:image/png;base64,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[/img]
Ejemplo 3: [br][br]Graficar la función[br][br][img]data:image/png;base64,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[/img]
Nota: La pendiente, además de darnos la inclinación de la recta, nos dice si la función es creciente, decreciente o constante:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAoAAAAEhCAYAAADvZRH1AAAABHNCSVQICAgIfAhkiAAAIABJREFUeF7tnQn8jcX3x49I9n3LLkVoQSUqkSKUtKGyhlJJFG1KSvtCm9JGVLTQRilpU6GVlEohlArZQ7Lk7z39Hv/r697v/S53ee5zP/N6fct9lnlm3jNn5syZMzN5du0OpiACIiACIiACIiACIpA2BPKlTU6VURFIEwJr1qyxoUOH2ubNm9Mkx8pmvAjkyZPH2rRpYx06dIjXJxSvCIhAkgjkkQUwSeT1WRGIE4EvvvjC2rdvb3379rV8+TTGixPmtIiWukSYNGlSWuRXmRSBdCKg3iGdSlt5TQsCeHWUKVPGBg4caAUKFEiLPCuT8SEwevRomzp1anwiV6wiIAJJJbBfUr+uj4uACIiACIiACIiACCScgBTAhCPXB0VABERABERABEQguQSkACaXv74uAiIgAiIgAiIgAgknIAUw4cj1QREQAREQAREQARFILgEpgMnlr6+LgAiIgAiIgAiIQMIJSAFMOHJ9UAREQAREQAREQASSS0AKYHL56+siIAIiIAIiIAIikHACUgATjlwfFAEREAEREAEREIHkEpACmFz++roIiIAIiIAIiIAIJJyAFMCEI9cHRUAEREAEREAERCC5BKQAJpe/vi4CIiACIiACIiACCScgBTDhyPVBERABERABERABEUguASmAyeWvr4uACIiACIiACIhAwglIAUw4cn1QBAJA4N8V9lyzvJYnTx7Lc/BNNv+f//K0a/Uka5l/97Xd1w+7d6Ftj0VWt/9iEwe2t+PqVrbi+/8Xd56itazN1Y/ZEzd2sIYV9nffy1fuKOv68Je24d+MH91q395e/7+05mlod39PYnfZpk8H2UGkP0856z51te3z2p5ottinl1Zw7xdsP802Zow+9DdpvfJ0a1SrghXJ+7+07lfK6p5+g03+ZVtmb+qeCIiACCSUgBTAhOLWx0QgIAT2K2vNOh/9X2YWv2Ef/rHD/Xvz/NftK6f1HWzntKlq+2fI7pbZfay8U7rC/RWwdm+HUa+2/2EfTphss3/4zTb+9xmzTQvt7fsutT63T7K5K/+7uPPPOfbcFa3skrfX7lbvQkMBO/yqcXbzYVybazde/KQt2viNDe893JbsvlK221gb3rqMxaQxJK0vvGlfLFxpmz2Nctc6++HNO6z9yUNtzt8ZgOinCIiACCSJQEzavCSlXZ8VARFIGoG8duApna2B+/7X9sKMVbstaFvtxykzbB2Xqra39gcfEPPUle8x0b6e/4Hde1Kh/8Vd266dMsfmvXOrNXba5jp74+k5tinjlwseaVc/M8Tq7r6+Y+ZAa9/+bLv5u90/ynazscNbW5k4tITlu79kcxfMtcnXHP5fahaNtafmbcmYMv0WAREQgaQQiEOzl5R86KMiIAIJJpCv6hnW2xkBd9nnz35kq7cutWlTf3WpqHLu+Va3wL4JKnTMCPvhz1W2alW4v99swslF930p5ErBCodY7XrNrVf/Eyyfu36AHVj3cDvilD52RaP/Hty0bJltDDOfW6jBdfbcEFTAbfb9hz/v/n9Z6/r0cGsdQfv7f2tlYWvy2EoX+dbJra24s15GsFb+lwT334IH1rJDa9e3tpdfZg3dlRX2zdLNGayTIS/onyIgAiKQQAJSABMIW58SgUARyFfF2vU5zvLsztT2T5629755xyYtIIdVrMMF9SyM/rdbV9xpO3fssB0R/nbuPXcbEdf+xctYYXd3m23ZvvulPAdYyZL/szhu32o7wsZTyA7r1suO9GIte7p1P6F0bKZ+I6bULG/R8uaptdu2bJcCmAkr3RIBEUgcASmAiWOtL4lAwAjktUrtr7K2BXdn65/pNvTa4bs97HaHGl2s22Fh1T/b8uXVdtiBFa1ixXB/1azr+39ljVGe/Zzi+V/4T9vLs9//XwmrZW1bZI/3vN7mea/9+bRdeP0Hti6ssmj2/9bKZTa1exn3Vv5TX7DFznoZ3Vq5J3l7pXXPVf1DBERABJJKQApgUvHr4yKQ2gT2K9vSBnZCOdplCz/8xWWmTu9uVif27n+5BLXdFj/V0676ePdK3CJt7YEnOlu53TH+OqqrXf/+urD6ouUrbKXKlLWyZctYyYJ53ff3O6CElSnLtdJWdPeKZAUREAERSFUCUgBTteSUbhHwBYFidtygy622l5Y8x1q/Cw62/BHSVqjJ47Zy1y7bFfZvq01pXSzCm7m7vHP583b51R/v3pYmnx1/90jr2/M+e/iMIrsj/d0e73WLzf4rghkwd5/V2yIgAiLgWwJSAH1bNEqYCKQGgQNqnW8X1vkvrYXaXm3nVv1veYZvUr9rvX0wZKC9zQLcav3t/h41LF/eCnbm3TeYW5+77EHr+9hPu70JI4UCVveqV+y96e/atNuP+Z/vYaRndV0EREAEUoNAnt0jcQ19U6OslEoRyBKBzz//3Hr37m38v0CB8L54WYoo04f+tQ0Lv7Hf8ha1zR/dYmdd+Kz9ZpWt36wF9lCT/5ZnZPq6bqYEgdGjR9vUqVPt5ZdfTon0KpEiIAJZJ+CzoXrWE64nRUAEkkhg11qb1udo6/TBzj2JKHnuCLu+kZS/JJaKPi0CIiACWSagKeAso9KDIiACewhsX2sr9y/7vy1UStrh5z1o00efawf+t1ZCoERABERABHxOQBZAnxeQkicCviSQv5b1m/aH9fNl4pQoERABERCBaARkAYxGSPdFQAREQAREQAREIGAEpAAGrECVHREQAREQAREQARGIRkAKYDRCui8CIiACIiACIiACASMgBTBgBarsiIAIiIAIiIAIiEA0AlIAoxHSfREQAREQAREQAREIGAEpgAErUGVHBERABERABERABKIRkAIYjZDui4AIiIAIiIAIiEDACEgBDFiBKjsiIAIiIAIiIAIiEI2AFMBohHRfBERABERABERABAJGQApgwApU2REBERABERABERCBaASkAEYjpPsiIAIiIAIiIAIiEDACUgADVqDKjgiIgAiIgAiIgAhEIyAFMBoh3RcBERABERABERCBgBGQAhiwAlV2REAEREAEREAERCAaASmA0QjpvgiIgAiIgAiIgAgEjIAUwIAVqLIjAiIgAiIgAiIgAtEISAGMRkj3RUAEREAEREAERCBgBKQABqxAlR0REAEREAEREAERiEZACmA0QrovAiIgAiIgAiIgAgEjIAUwYAWq7IiACGRO4N9//7Vdu3Zl/pDuioAIiEDACeQLeP6UPRFISwIoODt27HB/Cv9PYPv27fbggw9aly5drEKFCkIThQDKsoIIiEAwCUgBDGa5KldpTCBv3ry2YsUKu/jii41/K/w/gX/++cfeffdd+/jjj61UqVJCE4XA4sWLrXLlylGe0m0REIFUJCAFMBVLTWkWgUwI1K1b1+69917btm1bJk+l561NmzbZp59+ag0aNLCqVaumJ4Rs5Lpp06aOlYIIiEDwCOTZPVUkZ5jglatyJAIiEIbA2rVr7ZRTTrExY8ZY/fr1wzyhSyIgAiKQHgS0CCQ9ylm5FAEREAEREAEREIE9BKQAqjKIgAiIgAiIgAiIQJoRkAKYZgWu7IqACIiACIiACIiAFEDVAREQAREQAREQARFIMwJSANOswJVdERABERABERABEZACqDogAiIgAiIgAiIgAmlGQApgmhW4sisCIiACIiACIiACUgBVB0RABERABERABEQgzQjoJBAfFjjnb+7cudO2bNniw9QpSSKQugQ2btzoZIsTQTZs2JC6GVHKRSAFCHAUZeHChV1K8+TJkwIpTq8k6iQQn5U3nVOHDh2MjmrBggU+S52SIwKpTYDB1erVq61kyZK2//77p3ZmlHoR8DmBYsWKWbly5Wzw4MHWqlUrn6c2/ZInC6DPypyT+b777jsbOXKkcaarggiIQOwIrF+/3jp16mQjRoywevXqxS5ixSQCIhCWQI8ePdygS8F/BKQA+q9MXIqwUFSqVMmnqVOyRCA1CRQsWNDy58/vrBKSr9QsQ6U6dQhgcUfeFPxJQItA/FkuSpUIiIAIiIAIiIAIxI2AFMC4oVXEIiACIiACIiACIuBPAlIA/VkuSpUIiIAIiIAIiIAIxI2AFMC4oVXEIiACIiACIiACIuBPAlIA/VkuSpUIiIAIiIAIiIAIxI2AFMC4oVXEIiACIiACIiACIuBPAlIA/VkuSpUIiIAIiIAIiIAIxI2AFMC4oVXEIiACIiACIiACIuBPAlIA/VkuSpUIiIAIiIAIiIAIxI2AFMC4oVXEIiACIiACIiACIuBPAlIA/VkuSpUIiIAIiIAIiIAIxI2AzgKOG9qsRfzWW2/ZpEmTbNeuXe4Fzk5csWKFDRs2zMqUKbNXJFWrVrVBgwZZkSJFsha5nhIBERABERABERCBMATy7FY8/tM8wtzUpfgTWL58uTVt2tSWLl2a6cfy5MljQ4cOtZtuusn4t4IIiEB0Aq+88orNmDFjzwBr69at9uqrr1rLli33GWBVr17d+vbtawcccED0iPWECIjAPgTmzJljzz77rO3cudPdQ72YMmWKHXrooVarVq29ni9cuLAzaJQuXXqfeHQhMQSkACaGc6Zfefzxx61fv362ffv2iM/VrFnTpk+fbjVq1Ij4jG6IgAjsTeDdd9+1M8880zZv3pwpmrx589qIESPsiiuuyPQ53RQBEYhM4I8//rDWrVvbN998E/mh/91p27atUw7320+eaFFhxekBkY8T2OxE261bNzv++OMjvoLFj2ewUCiIgAhknUCzZs2sUaNGUV9o0KCBde7cOepzekAERCAygQMPPNAZM/Lly9y7rECBAnbZZZdJ+YuMMiF3pAAmBHPmHylYsKDdcsstVqJEibAPHnTQQda1a1dN/Yalo4siEJnA/vvvb3369Ml0Wpcp36uuukpTUZEx6o4IZJnAOeecY02aNMn0+fr16zs3DIXkEpACmFz+e76OH2CXLl32UfJk/fNJASkZKUuAqaa6detGTP+JJ55o7dq1i3hfN0RABLJOoGTJkm5AhZUvXGBQdumll1r+/PnD3da1BBKQAphA2Jl9CkXvmmuuMax9oQGfP6Z/tfAjM3q6JwKRCRQtWtR69+5t+PllDKyoHzhwoFbWZwSj3yKQCwKtWrUy/sKFgw8+2Nq3bx/ulq4lmIAUwAQDz+xzVapUcUogIyQvdO/e3apVq5bZa7onAiIQhQDTUuEWUJ122mnWvHnzKG/rtgiIQHYIFCpUyA2sGHyFBhZ8MBgrXrx4dqLTs3EiIAUwTmBzGi3TwEwHE2T9yylFvScCexMoX76886MNDaVKlXJTVdr2RbVFBGJPAD9ABl6hoXLlynbeeefF/mOKMUcEpADmCFv8XmLkdPPNN7sFIRdeeKGsf/FDrZjTjMAFF1xglSpV2pPr888/34466qg0o6DsikBiCDCTNWDAACtbtuyeDyKDFStWTEwC9JWoBMLuA/jJJ5/Ym2++uWfz1Kix6IGYEmDzTDawxTk9VHhi+hFFFpUADVXPnj3lHxaVVOo8wBYVI0eOdIrge++9Z7Vr106dxCulIpBiBDjZ6rrrrrN7773X9WVsyl6nTp0Uy0Vwkxt2s55x48bZzz//bI0bNw5uzn2es44dO/o8hcFO3oYNG2zUqFF2yimnZLqCNKcUvvrqK5s2bZoGWTkFmMP32BCaxSDlypWziRMnanFVDjnG8jWm4pmej8cRl999951NnjzZHbGpkBwCf//9t/Nrx+8Pw4ZC4gnAnhlFTl8JDWEVQB449dRT3YIEBRFIRwIczcexRvEKTz75pD3xxBPaCDVegDOJFws7JxVk5bSCTKLRrRgQoCyKFStmRx99tB1zzDExiHHvKCZMmGB33nmn5CzmZLMXIeWMUYnjTBUSSwD2uJZh0EPOQkNEBTCxSdTXRCD9CNx22212/fXXp1/Gk5xjrEE6firJhfC/z69cudLOPvvsuCaGhT5MQSokjwBKCH+Su8SXwdq1a51BL1yQAhiOiq6JQAIIsLej9ndMAOgMnwi3H2DiU6EvQiARMpCIb6g0Myegdi5zPvG8m1n91yrgeJJX3CIgAiIgAiIgAiLgQwJSAH1YKEqSCIiACIiACIiACMSTgBTAeNJV3CIgAiIgAiIgAiLgQwJSAH1YKEqSCIiACIiACIiACMSTgBaBxJNuEuJmpdWqVats0aJFxvFXNWvW1EKDJJSDPikCIiACIiACfiYgC6CfSyebaduxY4eNHz/e7by+fft2e/755+3KK690/1YQARGIHQEGWmyvMHv2bFu4cKE2Go4dWsUkAnsIrFu3zj777DP78ccfbefOnSITYwJSAGMMNJnRISjsK8df8+bN3UH3XOPoKwUREIHYEGAfwTfeeMMuv/xy27JlizvdoH///sYpIwoiIAKxIfDOO+9Y3759DSWQo2k5xnH9+vWxiVyxOAJSAH1UEb799ls30snJsUXbtm1zR5dVrVrVDjnkEJcrdv/mKLN77rnH/vnnHx/lVEkRgdQlgIxyrBKW9hYtWriB1g8//GDDhw+XlSJ1i1Up9xGBJUuWWLdu3dwgi02MUf7++OMPu+OOOzSjFcNykgIYI5gobfjecfYkYevWrcZ5r0wTEZiG/fzzz2316tURz3+dO3eunXbaaXbppZfap59+mq2Kzsjo448/tqOOOmqPzx8bQDZs2NBWrFhhX375ZYxyqmhEILgEcKNADn/99dewmWQa6tFHH7UyZcrY4Ycf7mSNc05bt27trq9Zsybse7ooAiKQdQIck8m5tfXr198jY23atLGxY8fa8uXLsx6RnsyUgBTATPFk7SbWt5deesmooIxQON6I8ycZwdx9991OCeR67969ndUgkoWvQ4cO9swzzzjFr3v37tapUyebOnVqlqaWNm7c6DotOqbQULZsWffz+++/z1pm9JQvCHhHJ/kiMT5KBFxQsubPn+9ShaygsHkDKxS4r7/+2g16eDargQPrmXK64IILrEuXLrZs2bKwryLr06ZNc2dqhp5ucOSRRzo5Z5CnIAKpTAC5YdqVGSn6KmSMc7Pp17iHjHHvt99+y5aMZYfJlClT7IgjjnCDKy/UrVvXuVzgd6sQGwJaBRwDjvnz57eTTjrJhgwZYnXq1HEdSY8ePeyTTz6xfPnyuYUZTBnRUf31118Rv1iwYEE77rjj3KHoCxYssGeffdauueYap9T16tXLKZgZFTwvsg0bNjhhLFq06F7xFylSxP2W70RE7L68wcHpixcvtpNPPtl0dNl/RUTHw4CIwVWpUqWcXGF1Y/CF3DDIevzxx23ixInODeLpp5+2AgUKZFq+KG0odKNHj3ZTTEw33XDDDUZnEy6gKFIubdu23es26eGcU2YATj/99HCv6poI+J4ACt/06dONc8pRvvBvffLJJ52M1atXz+6//34bN26c+12uXDl77rnnzOtjQjPHbBj9XaSArDBoIo6MAXcl3CyOPfbYvc4OLl68uOtPvVm2jO/pd/YJSAHMPrOwb/zyyy9uhIQAtWrVylVcrBRNmjRxHcKBBx7orAMoidEOxEbwmF6666677JJLLrGXX37Zbr31Vnv44YedhfDQQw/dJw34+xGwUIQG77d3f58XdcGXBBhd41OGUo8fp5RAc40/CvHgwYPtxBNPtNdff91Z61joxD1WvZ911llu8IQsRgowxVr+2muvuQ6Mad1zzz3XsMDXqFEjU9ZY2pHxcAMtLIIaaEWiruupQIC+ifaGhYQnnHCCTZ482c455xybN2+es3jTF3EfHz0s7ZGs7ChwQ4cOjZhl+jgGbOEUQE/GUCxDrexMCdMOSsYiYs32DSmA2UYW/oUZM2Y4YcASwf57WAExo+ODR6fCqIVpKYQnOwdj0zmhxGH9QGgivVuyZElnHcwoHN5v9gNUSC0CTEfi14mFGYVHSqA5GcICBwuUwQoVKrgpoVq1ajkrPPWcgdb5559vBxxwQNgCf/fdd93qwmLFirkBFn63xBNJtkIj0UArLFJdDBABrOJM8SJftDuVK1d2MsYMVKNGjdwsFzLWtGnTsNY/UDRu3NjeeuutTKmEsxzygidjGbcvox+kj5UxI1Os2bopH8Bs4Qr/MCZrpnsRDgQGC8H7779v1atXd0JDpf3ggw9c53TQQQeFjyTkKhV/zpw5bnXhmWeeaSiXTHsxGqOjCxfozFA22ZPMC3z3p59+MqaWSZtCahEoUaKEW/2GwsKioEi+o6mVq9ylFoWYwRDTQ3RM+Cb9+eefdthhhznZWLp0qWGNz8pAC55YPLKi+HmpptNigJdxoIVrB/FlRb5zR0Bvi0B8CXgyxoLCatWqOYs6MxLMPDENzCIMBmHRZAzZyuwvUi5Q8CpVqmS4NYW2eWyzhOxLxiKRy/51WQCzz2yfN3BApyMaNGiQs9Z4jqr4CaF8YcVDQWTLCBZjYKljSjhj4D2ms/BHYgUxK6AefPBBN42M+TuzwHewGGF2pzNiiorvojxiDcFHSSG1CDAQKF26tNsK4aGHHnIWYBYfRHMhSK1cZj21NP7UZ5Q9Vt0ywHnvvffcNBJTv3DBUsHCp9q1a0eMmI4LPyemgPEZfOSRR6xjx45uGhhrfWZ8KQOs/Jy0Exrw2WQaGsuHggikKgEULs9Y0b59ezc4+uijjwz/u7PPPttZ3vHtoz9CGYwUZs2aZQMHDox028kKCySbNWu2zzN8E0MKMkUfxrME3DaQecnYPshyfEEKYI7R/f+LjJAYnaDgETCh4/937bXXut8IFT4RjKAwrbO6N1zAsRahwIeQBSA4yYauggr3jncNocFX48MPP3S+gl27dnV+GyinDzzwQGav6p5PCaAA8sf0JFOWlCsDDFbHZaak+DQ7uU4WMoaCh98f07t0DnRWyIs3nUTHwyIqFnQwEGJfzIwBWcGywebNnTt3du4aY8aMcTKHYonssAgknOzRGbG6n0Ve+CpheSegmDLgwyqpIAKpSoBBFn0IfYm3gIrfTPd6CxCZjUD5o/6z3Vk49yKmiZm1ihSQQZ6JFNgFA59c+lLPWIJlEsXQ2+c20ru6nnUCUgCzzirik1TIF154YU/FxPo2YcIEO/744907jJpweKXTzmxVJ9NaTPMiUDnp4OkEsRQx/cyojU4SpdLbCiZiBnTDlwRQ/jZt2rRnWyGmHRkgcLILlsF0C0zvMhWFzx6BzmfmzJnGnmHeNC4WdpQyLOh0INECnRqWc6wdWOmxvqNgsqk6TvAZA99B0cNaeO+991qfPn2c2wWuFlgTUdAVRCBVCSBfGDSeeuopJ1O4N6F4DRs2bM+ACBnjOn6AKIrhAlb5li1bhruVpWsYUxiIseqYGRDcOjBocKhBtNmwLH1ADzkCUgBjUBGwMoRaGjCXs52EF1Dm8AWMFjIbEUV717uP8klnppD6BFhExEpwLFooNfiDYkVmuj8dA50KAxpWyBPooLDaNd997KGnALKFC1u1YBWMtgVMKEM6FWSWjgcrfWaDJpQ8rLFsH4MFEkshA76KFStmy58wHctQefY3AYwIbP2C/x+BKVe2gcHtwZMxpnaxzCFj8VLGMJrcd999zlUDCyQyx+CMftZLh79JpkbqpACmRjkplWlIgC0XmJLkFBeUE0bAjKo9n5h0Q8JUUKjvLM7iZ5xxxl4YcmN1ICKUORZTRQso4SjkCiIQJAIMfNq1a7cnSwyiMu5rGc5vLx4MmMHK+O14fCed45QCmM6lr7z7lgArTS+66CLXGDOljzLItVCnaN8mXgkTAREQARHwPQEpgL4vIiUwHQkcfPDBbrsDrH34vPFvpkDDLUxIRz7KswiIgAiIQO4IBG4fQHwWOMcTJ1UFEUhVAvjAeBt/MxXClkD4mOVkcVCsGXgyxiIMBREQgfgSYPNzVtwqiECsCQROAWQvPZxU2TxXQQREIPYEWJ3MqkBWviuIgAjElwCr/tkPVhvBx5dzOsYeqClgLBMofmzwinUCB3odn5WO1Vp5jicBzgF98cUX3fYQbAOR8VzceH5bcYtAOhHgNAxW4eL7y9544fa1TCceymtsCQTKAsi2GeyThrCwdJzVkwoiIAKxI4Bs0SGxKTOnYTz22GOxi1wxiYAI7CGAQeOZZ56xVatW2Zo1a9weeGzUrCACsSIQGAUQYXn11VfdSQEEOig2ZuW6ggiIQGwI4I/E3nsEZIu9ujiLV0EERCC2BHC1YGN/Lzz99NP2ww8/qE+LLea0ji0wCiBHP9EZhQY2tOTQagUREIHcE8AHCeUPi4QX+DdWdw20cs9XMYiARwB5ev311/c6cxr/9ttvv922bdsmUCIQEwKBUADpmBgdcYRNaPD8J9Q5xaSuKJI0J8Du/8hZxvDoo48ax7RJzjKS0W8RyBkBXC3CneHOfqCfffaZZC1nWPVWBgKBUADx/cPaFy4gMAoiIAK5J8ARaZx5mzFw9Nr48eMzXtZvERCBHBL4/fffbdasWfu8jQ/g2LFjtSJ4HzK6kBMCKa8AMlJiS4o5c+aEzf/PP/9sw4cPD3tPF0VABLJGAGv69ddfH/Hhm266yebOnRvxvm6IgAhkjQC+f/3794/4MFZ4pocVRCC3BFJeAfztt99sypQpETkwLTVx4sSI93VDBEQgOgG2fvn8888jPoicsTpYe5VFRKQbIpAlAps2bbKpU6dm+uyYMWPcVmcKIpAbAimtAHLax3XXXWd0TpkFtoMZN25cZo/ongiIQAQCOJ8PHjw4qt8RW8JMmzYt6nMRPqPLIpD2BJjivfbaa6Mu9HjzzTdt9OjRkrW0rzG5A5B0BRDHckYzLVq0sFGjRu2p0FdcccWePf0iZXHmzJlZMoVjlWAndaaLFUQg3QisX7/erd499dRT3Up5z0rHlO7QoUOj7i3G1G5WT9YZMmSIjmFMtwqm/O5DgG3I8Es/66yz3MlUXt/z8MMPW58+fSIqeMxoPf/88/vEF+7CiBEjjG2ZFEQgpwSSfhJIiRIlrHNWXjdUAAAgAElEQVTnzm7T5ieeeML9u1ixYnbCCSe4ff0YEUU6zaNevXp79v0DAJaKq666ys4//3xr1qzZXkzy5MnjOr5IceUUoN4TAb8TQJ46duxo8+fPd4Otbt26Wbly5ey4445zq3rxOcqXL3JTUKtWrb02Vef5QYMGOYWybdu2+2TfD+cV75MoXRCBBBIoVKiQnX766cb2ZGyTdPHFF1vt2rXt6KOPdv0as1f58+ffJ0UlS5Y0DBuhga1fkNeLLrpon+d1Cs8+SHQhGwQit/rZiCQ3j9JZcNh9z549nZVi2bJldvjhh1vjxo1dxxROSLzvlS9f3vjzAr4TCESNGjXsiCOOyE2y9K4IBIaAJ2MMrpg2WrhwoetQjjrqKHfCQIECBTLNa9myZY0/L7APWfHixa1KlSqSs0zJ6Wa6EsDgQN+FEsh2LixSRAGsU6eOdejQwYoUKRIWDYO1jH1X6dKl7cADD9znetgIdFEEskEg6VPAXlrr169vFStWtPfee89d+u677+ykk04yBElBBEQg9wTq1q1r1atX3yNjbOnStGlTyVju0SoGEQhLoHLlyk5x81woMHBgBVS/FhaXLiaYgG8UQKag6Iwwf2M237hxo1WoUCHBOPQ5EQguAWQM1wiOS0TG+EMhVBABEYgPAVyOkLmvvvrK+et98803hrFDQQT8QMA3CiAwGBlxwPzkyZOdD6B8ifxQRZSGIBFo0KCB/frrr27rpEaNGsknNkiFq7z4kgAKHwuxkLlDDz3U9t9/f1+mU4lKPwK+UgAPO+wwYxUUC0PweVAQARGILQE6IFbeM7jCV1ZBBEQgvgQqVarklD4s7g0bNozvxxS7CGSDgK8UQJzKW7VqZW3atJH1LxuFqEdFIKsEGFidfPLJbnsKWdizSk3PiUDOCbCy9/jjj7cePXrI4p5zjHozDgR8owByksDHH39st9xyi1vJqyACIhBbAsgY/n9snl6qVKnYRq7YREAE9iGAzLECmC1cMHAoiICfCCR9GxhW+5YpU8YWLFhgNWvWdNNSWiHlpyqitKQ6gR9//NENqpYuXeq2c2ErCslYqpeq0u9nAqz2Zd/Zv/76y21nph0t/Fxa6Zu2pFsAb775ZmcaZ8+kY489VtNSca6LrK5mw2yF9CHARrTdu3d3m89qcVX6lLtymjwCTz31lHXp0sV+/vln53KhAwiSVxb6cmQCSbcAPvTQQ26kxB6AskpELqhY3Pn999/djvQtW7a0fv36SdmOBdQUiOPOO+90R0/hjC6/vxQoMCUx5QkMGDDAevXqZewDmNkpOymfUWUgpQkkXQHUat/E1J8ffvjBHQHGkXucBMHJK/K1TAz7ZH8l9LScZKdF3xeBdCDA6R38KYiAnwkkfQrYz3CCkDackN9//3077bTTnPLHEURYAaMd/xWEvCsPIiACIiACIiAC4Qkk3QIYPlm6GgsCO3futPHjx9uVV17p9n5jAcAjjzxiZ599tnxSYgFYcYiACIiACIhAihKQApiiBRct2X///bfhXzls2DC36IMV1k8//bRbBCBfy2j0dF8EREAEREAEgk1ACmAAy3fdunU2dOhQGzVqlO3YscMaN25sY8eOtVq1akn5C2B5ZzdLLLpiEKCBQHbJ6XkREAERCA4BKYDBKUvD34+j9FiB9vLLL7sOnuneRx991LQQIEAFncusTJgwwe1Ndt5551nBggVzGZteFwEREAERSEUCUgBTsdTCpBnlj021WeDBaQ+cPcm/2QJEq33DAEvTS2vWrDH2BVy0aJF98cUXNmTIEJ27naZ1QdkWARFIbwJaBRyA8mdKb8aMGc7ah/LHSl822B4xYoSUvwCUbyyzsHXrVrcYCAsgLgIdO3a0Tz/91FgwpCACIiACIpA+BKQApnhZ05G/9NJL1qlTJ7e/X7ly5VzHznmvnK6iIAKhBNgMeuLEiXb55Zdb4cKF7ZNPPrEzzzzTnnzySZ0Qo6oiAiIgAmlEQApgChc2K30ffvhhd9D4qlWr3ErfF1980R1BpBMfUrhg45x0Nqi977777LHHHrOqVavaypUrrX///k4pXL58ufMlVRABERABEQg2ASmAKVq+69evd/5bWPo2b95sxxxzjL3++uvWvHnzFM2Rkp1IAhxPxUBhypQp1qJFCzcFzDZBZ511ls2cOVNTwoksDH1LBERABJJAQApgEqDn5pPeSt/evXvb8OHDXUfNKR+vvvqq1atXLzdR6900JHDEEUfYK6+8YgMHDnS+o5wW0759exs5cqSmhNOwPijLIiAC6UNACmAKlTXK34IFC9z2HWzzwkpfFMHnnnvO8O1SEIGcEChevLjdcccdbq/I6tWru1NjBg0a5FaRa0o4J0T1jgiIgAj4n4AUQP+XkUshK31nzZrlHPZx3MeB/6abbnKnfdCBK4hAbgjkzZvXzjnnHHv77bft1FNPdX6AHCPYpk0b++ijjzQlnBu4elcEREAEfEhACqAPCyVjkpjmfe2119w2Lz/99JPhxM/mzoMHD7YDDjgg4+P6LQI5JlC7dm1nXb7hhhvcIGP+/PnWrl07527AFjIKIiACIiACwSAgBdDn5cg2L6z07datm1vpW61aNbfSl99a6evzwkvR5KH4cZQg9axGjRr2119/2fXXX+8WjXDSjFYJp2jBKtkiIAIiEEJACqCPqwOre6+99lq7+uqr3Urf+vXr2xtvvGEnn3yyj1OtpAWBAIMLFhd98MEHdvrppzulD8tg06ZN7cMPP5QSGIRCVh5EQATSmoAUQB8WP53t6tWrrUePHnb//ffbjh07rG3btvbmm2/aYYcd5sMUK0lBJYDFedKkSW6RSIECBWzJkiVuSvizzz5zfqkKIiACIiACqUlAZwH7sNzoWK+55hrX8RJQ+p566imd2erDskqHJOFnSn1k70D+j1sCm0d/8803TgmUK0I61ALlUQREIGgEZAH0WYl+8cUXhiM+m/JylBuWl6+++krKn8/KKd2Sg5LHXoF//PGHOz+YwGkibD/EymEFERABERCB1CIgBdBH5cWGvEz1Ll682EqUKOGsflhcdKavjwopjZOSJ08ed9b0mDFj7IQTTjB+r1ixwvkIsmp427ZtaUxHWRcBERCB1CIgBdAH5cU02ogRI6xr167O969y5crO4b5z587G/mwKIuAXAih9bEBeqlQpGzBggB166KFuj8A777zT7R/4888/a4GIXwpL6RABERCBTAhIAcwETiJusbcaU2tss7FlyxZr2LChm1I76aST5FuViALQN3JEAEWQusom0WwPw8IlVgdjGWTPSi0QyRFWvSQCIiACCSMgBTBhqPf9EEdusZ8fp3kwfca2G5MnT7a6deu66TUFEfAzAepomTJlbPTo0TZq1CgrWrSo8xHkqEK2L9q0aZOfk6+0iYAIiEBaE9Aq4CQVP1Nl3bt3t5kzZ7oUXHLJJW7BB75/Uv6SVCj6bLYJUFfxUeXc4KOPPtqdTT1v3jzn0sCCJjYxZxW76nS20eqFFCHAgr0XXnghbqn9/vvv3RZMM2bMiNs3FHFyCTz55JNWtWrVhCdCCmDCkZt9/vnnzt+PY93oPDnT98orr7RChQolITX6pAjkngCrhFEA3333XWf9GzdunOuwWrdu7VYLd+jQwW0joyACQSOwaNEie+edd+KeLb6jEEwCHPSQjKAWOcHUmeK96KKL3LFuWPvY6PmCCy7QSt8El4M+Fx8CTAlzTnWTJk2cX+vvv/9uPXv2tE8//dQdL8fiEQURCBKB9u3bx9V6M2HCBCtZsqS1adMmSNiUlxACFSpUSAoPKYAJwo5TPH5S1113nfONqlKlitvrT4s9ElQA+kzCCLBxNEpfgwYNrF+/fk75GzlypM2ZM8dNDWMp1JRwwopDH4ozgUaNGhl/8Qq4VLAzRJ8+feL1CcWbpgS0CCQBBf/333/b4MGD3WpflL8jjzzSpkyZYi1atNBK3wTw1ycST4Ap4aOOOsqtCMa/lenfTz75xM466ywbO3as/fPPP4lPlL4oAiIgAiKwh4AUwDhXBvb1w0EePyg6vVatWjnl74gjjpAVJM7sFX3yCbBxNFa/xx9/3J0a8ttvv1nfvn2tf//+bhNpBREQAREQgeQQkAIYJ+7si8aJHji/P/fcc25fNKbFWC2GOV9TYHECr2h9R4AVjGx3hP9r8+bNjb0vWfV29tln2+zZs7VxtO9KTAkSARFIBwJSAONQyih/bIHBdBeb4+IThQM8flA480r5iwN0RelrAkwJs3H0iy++6E4QQSlE+Tv33HOddRA3CQUREAEREIHEEZACGGPWHIv15ptvuo7t22+/dSt92QuNs1ILFiwY468pOhFILQJMCXNsHOdcH3TQQW6VMFsgMS3866+/plZmlFoREAERSGECUgBjWHic5sGpCEx30Zmx0pfpXzbH1R5oMQStqFKaABZxTgt55ZVXrGXLlu4UHBaGnHPOOe5oOR0jl9LFq8SLgAikCAEpgDEqqL/++suGDRvmrBnr1q1zizwmTZrkjnfTlG+MICuawBBAJlgNzx5n11xzjRUpUsS5TXTs2NFZzJO1MWpgACsjIiACIhCFgBTAKICycnvlypVuVePdd9/tHNxZ6fvqq6/GdW+orKRLz4iA3wmwcfQtt9xiY8aMsdq1axuyhELInmfLli3ze/KVPhEQARFIWQJSAHNRdCz2WLhwoV144YVuCovA9O/48eOdf5OCCIhAdAIch8j0L1PCWMyZAsYyyCKq9957z/CrVRABERABEYgtASmAOeRJJ/Xll1+6Y9zeeustt8Dj6quvdtNXWDUUREAEsk6AKeG6devas88+6zZNL1q0qM2dO9c6derkjkvExUJBBERABEQgdgSkAOaAJRaJadOmuc4JJZDzTZn+vfnmm50vk4IIiEDOCLBN0pAhQ5wiWKdOHVuzZo07PpHzs5cuXZqzSPWWCIiACIjAPgSkAO6DJPMLnObBGb5M9S5ZssSqVavmNrW97LLLjKksBREQgdwRYMV8u3bt7PXXX7f27du7RVTsH8j0MAMvTQnnjq/eFgEREAEISAHMRj3gHF/2MLviiiuMI95YxcjJHpxowEa3CiIgArEhgNJ3yCGHOEsgi0SKFy9u33//vVslfM8997gztRVEQAREQARyTkBaSxbZofBdddVVdvvtt7szfVu0aGETJ060xo0bZzEGPSYCIpBdAvgCXnvttfbSSy85H8GNGze6TdW7dOmiKeHswtTzIiACIhBCQApglOrASl98j1jpy+kFBDaxff75552FQkEERCC+BPLmzes2jOaEHVYL85vp4VNOOcUtwNKUcHz5K3YREIFgEpACmEm5ovzNmzfPTTu98cYb7kxfNnrm7FKOtFIQARFIDAGmhKtXr+5O1mHBFVPCixcvdu4XWOWZEkZeFURABERABLJGQApgBE5s8zJ9+nS3FxknFHCmL75Ht912m1b6RmCmyyIQbwIFChSwAQMG2JQpU9wqYTZeHzp0qBuksShLSmC8S0Dxi4AIBIWAFMAwJbljxw5naWCql+nfihUrupMKOLBeK33DANMlEUggARZcNW3a1D744AOn+LFqmKngZs2aOUv99u3bE5gafUoEREAEUpOAFMAM5cYCj7vuussdRcWZvlgZOKEAS6BW+qZmJVeqg0mgfPny7sSQBx54wIoVK2bLly93PoKsGmbjaFkDg1nuypUIiEBsCEgBDOFIp8EWL2zojCKIlYGppmOPPTY2tBWLCIhATAmwIATL/DvvvGP16tVz1j98As8880x3TKOUwJjiVmQiIAIBIiAFMKQwR40a5Vb6sqqwbNmybrFHzZo1A1TcyooIBJMAg7RXX33V+eoS3n//fXdM44YNG4KZYeVKBERABHJJIO0VQCwEP/74ox1++OFuvzEC/8f3j+lfBREQgdQgwLZMa9eudYM4poS/+uorN5AbNGiQpoRTowiVShEQgQQSSGsFEOVv5syZblPn+fPnGysMH374YbfSt2DBggksBn1KBEQgFgTYLqZXr142Y8YMa9CggbGga/jw4da6dWv74YcfNCUcC8iKQwREIBAE0loBXLFihXMa//33311hYilg8QerChVEQARSl0D9+vXdimDPhWPWrFluIddvv/0mJTB1i1UpFwERiCGBtFQAsfxxpm/VqlVt1apVVqNGDfvyyy9t2LBh7pQBBREQgdQnwPZNP/30kztPuHTp0u7fyPpll13mVvgriIAIiEA6E0g7BZDVvUwR3XjjjW56qEmTJvbhhx9aw4YNjekjBREQgeAQYOumzp07Oxk//vjjncw/9thj1qpVK+cjqCACIiAC6UogrRTA1atXW/v27W3s2LHGSR/nnnuuO1+0SpUqUv7SVQKU78ATYGDHFjFMCXOUI0c6YvFv06aNjR49WhtHB74GKIMiIALhCKSFAsiUL9M/jPqnTZvmfICuvvpqe+aZZ9y2EbL8hasauiYCwSGAjCPrnCM8btw4q1Spkv35559uOhi/35UrVwYns8qJCIiACGSBQOAVQJQ9HMBR/ubOneuOchs5cuSelb5S/rJQS/SICASEwP77728dOnRwG0e3bNnStm3b5mYEsAbOnj07ILlUNkRABEQgOoFAK4Bs6Dxp0iQ37bts2TLnCP7CCy/YJZdcojN9o9cNPSECgSSAX2DdunXtpZdessGDB7vtnxgc0k6wDRR+wgoiIAIiEHQCgVUAacTvvfde69Gjh61Zs8YOPvhgmzp1qjsiSit9g16tlT8RiE6AKWGOfRw/frxbHcyUMFtBXXjhhW67GAUREAERCDKBQCqAnOlLQ37TTTfZli1brHHjxm6xR6NGjeTvF+TarLyJQDYJMCWM5e+tt96ydu3auQUhzBKcdtppbuWwggiIgAgElUDgFECmfRnVc64v/2bzV84IrVWrVlDLUPkSARHIBQGmhGvXru0WhzBoLFy4sM2bN8/5Ct533332999/5yJ2vSoCIiAC/iQQGAWQxR6LFi2yhQsXuhW/NOqXX365c/CuUKGCP+krVSIgAr4hULJkSbvhhhvs+eefdwoh20bhI9i1a1f75ZdffJNOJUQEREAEYkEgEAoge/px9ucFF1zgGuoiRYrYXXfd5bZ84FB4BREQARHICgGmhJn+Zc/Ajh07ulmEV155xdq2betWDjPQVBABERCBIBBIeQUQn50XX3zRzj//fHfYO5a/IUOG2BVXXOFW9ymIgAiIQHYIsDUUi8aefPJJt10Ug8jvvvvOOnXqZLfffrtt3rw5O9HpWREQARHwJYGUVgDxzXnooYfcti4rVqywgw46yDXcderUsXz58vkSuBIlAiKQGgRQ/Ngwnu1iOElk/fr1zr+YmYYlS5akRiaUShEQARGIQCBlFUAaY87zxWeHVb+c8/ncc89Z9erVtdI3QmHrsgiIQPYIMJBkw2h2EUDxI0yePNlat27truF+oiACIiACqUggJRVA9ui69NJLnfWPw91Z6TthwgQ7/PDDU7EMlGYREAEfE2BKuFq1avb44487v+JSpUq5hWbnnXee3XrrrbZx40Yfp15JEwEREIHwBFJOAZw/f75blYffHxs6c5bnU089ZVWrVg2fQ11NGQJsxItPp4II+JEAi8uuvPJKe/nll+3II4+0TZs22S233GJdunRxuw+kygKRtWvXSs78WMGUpsAR2LBhg23dutW3+UoZBdBb6cuo+4MPPrCiRYu6xpcROds3KKQ+gTvvvNMp9++++67rXBVEwG8EWGTWrFkzN/2L4scgdMqUKe4s4ddff93NSPg9PPLII9azZ0+bOXOmOwtZQQREID4EXnvtNbd4bNq0ae5QCr+FlFAAaVQZddPgshqPff04s/Oqq66yggUL+o2p0pNDAuy7hmWXkxnOOecc92+upYplJYfZ1mspRoAp4UqVKrlVwmwUXaZMGVu8eLFrn1gksm7dOl/nCAsg/tKnn366UwRnzZql8499XWJKXKoSwJCBz/DZZ5/ttpXymyLoewUQ8+mjjz5qF198sS1fvnzPjv00tuzZpRA8AoyU2HONMmZPNnyvKHspgsEr61TOEdtM9e/f3xjlN2zY0G0Pc8cdd1jnzp3dQNXvC0RYSMc5yOxx2KtXL5s9e7YUwVSukEq7bwnQpzFrcOaZZzpFkP7NDxZBXyuAOFdzNNO1115rzKUfd9xxzirEqjymYhSCTQDL7+eff+78PFu0aGHDhg1zvlZszqsgAn4hwA4ENO49evSw/Pnzu3OFsa5NnDgxJaZYaVtRBFnZjCL46aefShH0S+VSOgJFAIMWbcUZZ5zhFMHp06cnVRFM6GZ5bNcyadKkLDWKdPJTp061t99+23X4TPuiBNA48RcuAPfXX391DTArhRVSiwArK8MFLH8ofkyvMe3GFDEWYVZ9ayCwLzH2x0T5iNcZtijmS5cutffff1++miH4sQKyP+DHH3/s+DC9ykj/qKOOcr6CfgnffPNN2KQw4EYRZMqKDgrrJmmXjIXF5S6yaA3fzzVr1kR+KJd3sCbTnzETopBaBD755JOwCf7nn3+cIogCeMopp9jAgQPtxBNPTPj+xQlVAGlgUM6iOUoz3Td37lz3HCPqo48+2ipWrOimVfiLFHgeQZwzZ4798ccfkR7TdZ8S+P3336OmjHJlUFC/fn077LDDoj6fjg8wtQCjeK0+Y2pz1apVhiLhd3+3RJc/W8S0a9fOnUrE2eRjxoyxZ555xtVVtpLxgzK1bNmyTLEwUH/vvffsmGOOcVPbCpEJoADCauXKlZEfyuUdjBr4QuM/ppBaBH7++edME8wiLBZjYcw44YQTMn02HjcTqgDiOM2u+pEClp7PPvvMevfu7ZS/woUL2/XXX5/lxR44XLJ4oF+/fm4KRiG1CHTr1s2effbZiIkuX7688QzlW6VKlYjPpfuN0qVLu30x4xVotJi+6NChg/N3U9iXAAoyR1JSn7HE0oEPGjTIzj33XDvggAP2fSGBV9jK5oEHHgj7xUKFCjkFlk32NcAKi2ivi/AaNWpU9Adz8QQuMJUrV7bBgwfnIha9mgwCrLi//PLLw34a4xY7CuDa1Lhx47DPxPtiQhXAzDLDNC8mUTZ4xhLEyroRI0a4zVa12CMzcsG/V6JECddxDhgwwOrWrauTXoJf5Cmfw3LlytnIkSNdw44iyKwGA9uvvvrK+TRzn9XEfglMUbO3IWll4ZXaXL+UjNIRNALIfc2aNd0pZueff35SB4S+WEmBRYHNnLEmoPxxpu8LL7zgfqshClr1z3p+GF2zagpfUPxfOI/VT51m1nOiJ9ORAG3XhRde6PYJZKEI7dz999/vBjO4qfhllTD+1Vgh2H8TeVObm461VXlOBAGMGfjW4ifMorFkzwb4QgFkUQdQmMJlFMq2Ciz48IO/TCIqhb6xNwHPNM7ej7gMNGnSRHVBlSRlCTRo0MAtrOjbt68xqMExHCsbvoE4gycrsIcqFgh82Jhe1Ib6ySoJfTfoBBhUtWrVyvlmMwhk0OWH4AsFEGfjWrVq2amnnuqmgXGIlKXHD9UjsWlgGoqyx3GexUJsSyFrRGLLQF+LDwEWh9DwM9OB/yqLBvr06ePcGvh3Ive4RM5QStlSCyUUtwoFERCB2BPwpnvZvYKZgGOPPTb2H8lFjL7wAWQkOm7cODv44IPdEW8K6UkAZ1kGAqoD6Vn+Qc81ihcWNwY51HWmgR577DG31yULCdjtIBGzHiykYn/VYsWKBR258icCSSVw8sknO5cPfH79GHxhAQQMI1J1/H6sIolLE3uOqQ4kjre+lBwCrK5lSpi9vxj84g/IaRxYBxNxNu8RRxwh5S85Ra+vphmB2rVr+1b5oyh8owCmWb1QdkVABNKYANa3u+66y23Xw5Qw+5ey3cdFF13k9lhM5JRwGheDsi4CaU1ACmBaF78yLwIikCwCTPey6pYTVTgNgK2w8Mlr3ry5ffHFF1ICk1Uw+q4IpAkBKYBpUtDKpgiIgD8J4PvMggy2iiFwigiK4Y8//igl0J9FplSJQCAISAEMRDEGOxNr1651y+cXLFjgMrp582Z3LJKOIQt2uadT7lgl/NFHH7l6XbVqVXeUJfte4kAez2PGQhlzVCdnk3pnBeOPiNxxiomCCIhA8AhIAQxemQYqRxs2bDD2ibzvvvvckYAofbfffrs9+OCD9v333wcqr8pMehNgSrhly5ZudfAZZ5zhNop+5ZVXrGnTpm7vwHgGBlWcSfroo4/axRdfbJwnfccdd9hDDz3kFqkoiIAI5IwAcow1/4033nDHQuLfyxnB8ZbprKRWCmBWKOmZpBEoXry4WyHZtWtX+/bbb42zFemgWEXJBtEKIhAkAuwbxqIQTkK6++673cbRCxcudHuksmiEM9LjETh3vU2bNtarVy/XWQ0fPtwuuOACJ2f4JyqIgAjkjAAuHbNmzbLu3bu7/W3x77355pudESPZQQpgsktA388SAbYJYoqqfPnyVq1aNcuXL19C9kzLUuL0kAjEkABKINvDsE0Mm8fWqFHDWeRuvPFGO+uss+I6JcwWMQSOqDrkkEMkZzEsV0WVngRw5ejYsaMhW5MmTXL7fo4ePdrGjx+fdCBSAJNeBEpAVggUKVLEsAZu3bpVp8RkBZieSXkCbBx90kknOd/ATp06uVXCnIu9aNGiuOWtQIECVqZMGTdVpdOY4oZZEacZASz5bPQ+Y8YMJ8uccMWRp8kOUgCTXQL6flQC27dvdwfVY/mbPXt21Of1gAgEhQBKWKVKlezpp592U0b4BjZu3Dgu2WN6GQWzZs2akrO4EFak6UyAxV0YMPwUpAD6qTSUlr0I0CHxx6iJ80o7d+5sX3/9tVuViMO6ggikAwFvSrhv37727LPPGpbBWAYsi8gZU1MVK1a0nj17upXAbE6N7CmIgAjkjsCvv/5qK1ascJHMmzcvd5HF8G0pgDGEqahiS8wllgEAACAASURBVOCaa65xKyDXr1/vFnzwb1YB4xtVuXLl2H5MsYmAzwmg+OEKEevAqnqsiiw2adGihR133HHuE5dccomzPiqIgAhknwCrff/55x+3bRnbKV166aXG0XBffvmlLVmyxBYvXpz9SGP8Rr4Yx6foRCBmBPr16+f8JVgAQueH8Lz22mvubEXM6QoiIAK5J8DKX1b6chY3i6sOPPBAt/qX4+qYDlYQARHIPoHly5e7fTxZBHLDDTc46/rJJ5/sdrIoUaKE9e7dO/uRxvgNKYAxBqroYkeA1Y/8eYHO6dhjj43dBxSTCIiAs/KFWvoYbOGwriACIpBzAuxYMWLECDegOuigg1xEAwYMsBNPPNFZ2enPkh2Sn4JkE9D3RUAEREAEREAERCCGBFjl6x3v6EVbunRpt9m7X4J8AP1SEkqHCIiACIiACIiACCSIgBTABIHWZ0RABERABERABETALwQCpQBylibz7vFYKeeXAlM6RCDZBNiWhIU4bMytIAIiEF8CbMxdqlSp+H5EsaclgUD5AHJ80j333ONW2CiIgAjEhwDOy7feeqtbJaogAiIQXwL9+/d3J0coiECsCQRKAcQyUaFChVgzUnwiIAIhBJAzLO0KIiAC8SfAwgEFEYgHgUBNAccDkOIUAREQAREQAREQgaARkAIYtBJVfkRABERABERABEQgCgEpgFEA6bYIiIAIiIAIiIAIBI2AFMCglajyIwIiIAIiIAIiIAJRCEgBjAJIt0VABERABERABEQgaASkAAatRJUfERABERABERABEYhCQApgFEC6LQIiIAIiIAIiIAJBIyAFMGglqvyIgAiIgAiIgAiIQBQCUgCjANJtERABERABERABEQgaASmAQStR5UcEREAEREAEREAEohCQAhgFkG6LgAiIgAiIgAiIQNAISAEMWokqPyIgAiIgAiIgAiIQhYAUwCiAdFsEREAEREAEREAEgkZACmDQSlT5EQEREAEREAEREIEoBKQARgGk2yIgAiIgAiIgAiIQNAJSAINWosqPCIiACIiACIiACEQhIAUwCiDdFgEREAEREAEREIGgEZACGLQSVX5EQAREQAREQAREIAoBKYBRAOm2CIiACIiACIiACASNQL5UytCKFSvs3Xffta1bt4ZNdoECBaxNmzZWunTpsPdjeXHXrl02c+ZMK1WqlNWtWzds1GvWrLGnn37a+vXrZwcccEDYZ/x48d9//7X33nvPDj74YKtRo4Yfk6g0iYAIiIAIiIAI5IJASimAZcuWtVq1alm7du2ckvfoo49a8eLFbdOmTfb555+7361atcoFjqy/umHDBrv66qutcuXKNnHixH1eRFk977zzrESJEnbZZZftc9/PF1atWmWXX365nXrqqfbQQw/5OalKWzYJoNwziPr999+NQUy4cPjhh9vRRx8d7lbMr61cudK+/vpra968edhB0o4dO+yNN96wAw880I499tiYfB/Zfe655+z111+3Dh062EUXXRSTeGMdyebNm2369OmuTStUqFCso1d8CSaA7NFPLViwIKLsVa1a1U4++eSEpAz5R/YIDRo0CPtN+tYnn3zSevbs6fpahWARSKkp4Lx58xodwl9//WVt27a1Zs2auYrbtGlT69u3r5177rmGkpiIUKxYMbvvvvts6NCh+3yOzvW6666zPn362IsvvphyjTcMH3nkERswYMA+ecvNhdmzZ9vGjRtzE4XezSWBPHnyWJMmTezNN9+0iy++2FavXm0ofIceeqgVLlzYxo8fb1999VUuv5L1119++WXr1q2b/fjjj/u8hKw//vjjdu211xpKW6xC0aJF7cgjj3SdX82aNWMVbczj+eKLL6xz5872wQcfxDxuRZh4AsjeEUcc4eo6g465c+c62atTp44zaLzzzjtOLhMVmEm78cYbrX///mE/ST97wQUX2JQpU1y/qxA8AillAQQ/IygqI6MkBIpRDL/z58/vFC6uJSLst99+dvzxx+/zKdKzZcsWu/POO61ChQoJS88+CcnFBRTtU045JRcx7Pvqhx9+aNdcc42bWlZIHgHko0iRIk7xq1KlinXq1MmwOhAaN27sLNYFCxZMWALPPPNMlw4s+6Fh+/btzn2CzpKO0UtjLBKG7P7yyy9WsmRJO+SQQ2IRZVziOOqoo2zs2LF24oknxix+uH766aduEJAvX8o1/zHjkIyIkD1ka926dcYghIGPZ2mn30ARpGwSFXBLwoCBZTJjQPm78sornaGlS5cubnCYyoEZuT///NMp3LEMtE+UaSzbp1imL1pcKdUC7Ny5002JALtevXoubzTkX375pZ1zzjnOH+/bb7+1SZMm2dq1a+3BBx80GnsKf/DgwXbzzTe7Rp8p2zlz5thxxx1np59+unsOwbvlllv2mvpiemrq1KlOQIiDKSgUIywHr732mptGQ4AqVark0vLPP//YW2+9Zfj+MbrC2sVUKh0uiisd2aJFi+yJJ56wzz77zH2XfNxwww1hp7+Ik2/PmjXLvvvuO6dM0nFjuaEBwaLGNBbfR0hvu+02K1eunN10000uPXz/lVdecQoyCtjtt99u1apVc/eWL1/u8rb//vvbsmXL7LTTTrNjjjnGfYsRH9NP5C3Un/K3336zt99+21lgf/75Z/cdyuTVV191TM4++2yrX7++3XvvvW6ag+ljvjd8+HC766673DTemDFjnKKOvyaB5z766CMnnHROTKunemPjMubj8Ouvv7p6SHlTJgTKkYBigMwkKlSsWNH4yxiQJeStR48ebnAX64BVjQ433Ldj/a2cxoeMM0UdqwBTZHLJkiV2wgknxCpaxZMNAliyaSsZ9Hh9GG08f/RriZrBIsnIeaNGjfZJPcoofRjWQdrvRBlV9klIjC6gI2DlxBUrlgogusZVV11lDzzwQIxSmvhoEtfSxyBvdFzff/+9q5AvvfSSDRkyxC688MK9hIYODcUI3wUqOJX5+eefd4oSwoW2jt8e/oLly5e3Z555xlq2bOkUwBkzZuxJJQoiZnoWQnTt2tXFd8cddzgl76CDDrL58+e7P09gERgUG66df/75bnSHsnr//fe7OLE0fPLJJ04x5VsoU8SNLxIWw3Bh27ZtzpKIEoelBF8gLAJ0Xihu1atXd4odyiZTdyhtf/zxh8vzwoUL90yJk34USBQtwscff+yUSDpYFMelS5faiBEjnALGghbuw5ppbgLx8R3yd9hhh1n79u3t/ffftx9++MFZjFDmJkyY4BTdF154waUV5RLFnLLiG1gVL7nkEjelQIfulQuKOf5fLVq0cIo5/ocK8SVABwRnBjPUI5Q/2FOHUTr4jVxQ3gxcCNSNkSNHuut0VsgYAwqe4XnqJIMwFH1PmeQ9b9D21FNP2ahRo5w8IEvr16+3Z5991skYAzYvUC8YFCCzpJNBjTclTfoYQLCoivqFJYU24IwzznAKbWaBwRBpR+5JCwu4qHPUSy8woEO+Hn74Yef+wGCLQJoY6TNwwyrJwIdBE4E0MrBk4EKeSO8VV1yxR6aRzcmTJ7tv0gHxXS/AkWlefKy4T/tCufAOA0wGj1774b0DO9qM0aNHO+UY2UXu4TVw4ECXPn7zHnKKLBPIG24yDOoYbDHI8wKDWy/fpJ37CvEhQLtKW0ybR19EHaAuU5+wyOFnt3jxYidH9G2edY76e+mll7o2l/6C/o86R52kvKmzXrscmnJkhLaZ+sLAnH6Q8NNPP9k999zjfPv4nheQVwwVzNTw/1tvvdXJGeGbb75xbk/ILHUEuezevbtLB0aBzAL3cYciHfQ1/NsLyBf9IXJA3UamaU+4nrFuU/95P7RuEw/XaZ8Y4GBYId1///23ywOGCeJD9rx2gr6VfvWxxx5zssd7GID4Jn3/3Xffbb1793ZGFPprXDFQiGFPmdDfEi/tAtP2GIu8gKwhh6QDK6rXjmTGJ1n3UkoBRHCoKDR8dF5MkSAw+PMQUDb4o0HDL5BAJUAAmK5F4Jj2oPIyAsOKRaeFBY2Kj3JDQIlCQaJj4T0UFio6lYJ/UwEQ5JNOOsn95hvXX3+9s6pR4DhsoxSVKVPGVTzSRDr5HqM+OrKOHTs6ZRIl0LOGuY+HBM9Rnc4IZZUpZTpRvotyS7wICBUOSyb3EFDiR+nDmsOqaNKAENPh0WGQFzoj/FFQABgdoYjBhjSRf085IDkIPp0HylvDhg33KNPwIv88jy8VjQrfJa+kDWWS/8ObkS9WRhRm0o5gwgz/LkaZ5BWLFPlUiC8B6gMKHZYg6gudAI0j9ZWAnFBudBae4zcNHJ0SDSD3KLNp06Y5pQclg/vUTxQ04iagyNA50IDSWCJLdDrIMTLCgIGOAMs9ARnkN64CPEujS72ivtKI8jxpo6MgXSh01HsWiaCQRgq0GXRavEvbQSOPrDLlTeA3gzMGKMgji8zoABnMkSb8FGn8kQmmzOFHPgnVdw/C6AhJH+0MdR2uWN35N3HSufMe7Oh0CDCi06ajYJqNP5Q4ZhCQSVbfIxOkmUAaiReLIBxggwWCgRmKA3JDZ8agjXjwjUY5Rc4IMG7durWz6KNYYgEkTrjBhkEtAzfyRrwK8SHADAvKCu0hSjptL0oc9cgLtJEoIbSrnjUehZ0BEwNu2lxkDTnwZIh+BeWQ+uMFjADebBFtN/WEekx/haGE/oj6481gUT/pa5jloZ6hgFK3hw0b5uSAPpN0MUDjj3qCFZ16n5mSQ/1HmSIvGEeoi8g4fRd1kPaD9NGPcx9DB/0jljvSzKwWdRuZp27T74fWbfJLW0R7QDz0c3yTfpVncS+hvjNYxfgDfwZLKL70V+gADNw8lwjKgvaQOObNm+eMKbRD8EchpP2jLaCc0BGIgzyRF4wsyHzt2rVdO8KCO4xWfg0pNQVM40SDSEPGVCMFRUPrWaqATGOP4FDwFAgNOYVIg+kFCoVpRszBCBIjdASJOAkUNJWTRtkTQJzkvUDF5M9TMungsKDQKXjTl4wwaLA9J3OEjQpH444iRLx0OjS64RRAOg8aCBa2IHgEngtdIcbog44MIaSSUzERVDp1Rjp0tnQy5J/OnOkuTNZMgzMC5XlC6AowOj1Ga0yPE1AI6fjpsHkfiySdPiM54qExQYDJN9MJNFB04qTZY0Yjg0B40400NEx7U0ZwplFCmLBOaLWjwx63QHkiRzS21D0GMzRQNJpeXaeOUq+YkkIRQY6wUlAvUJqoN8gcckY9oj6g4CBXlLlnVaP+4uiOAkUDScdFvaG+egMH6oTn/0c9oV5gpfO2ViINNMQMLhjQIBekid9YlmmQSZ83nZYRHI09lhPqOPklb9RZ2g5viyPyz4CIToH8sfCEzoYBEhZQBinUaZQkeGFd8Hx+qO+kD8spz/fq1cspvuSP75I2rpFeWGC9IKAIovxh/aQDply4x6AKfp7VxZNDGNPR4A9Ip0O7xkAP/nRc5BMFHj7eqmHaAo8LbQdtEHKJ3NHeoTCQRiyqfIey4bo3oM7IUr9zR4C+inKjzjNDRF/GjBBKiSczyBZlRZ2ivhKoQ1hoqcPUN8qbNpR/U09QRmiLQ8ubeClXBlL0Y8SPQkIdRakiTr7BQkq+R9qwQCOD9Eten0qbz8wYAxa+h+ED+UX2UdaY/uQZ7oULyCdGEWTnrLPOcmknvbxD/pELBmX0Ad50NINL0o/yyb+9uo11PFzd5rvegJY6TTuBzMGSNo1+l/4f7jzHzAV9MxZR8s415Iv+nHdgSf+ObHm7eWAdJC30czzjGUowsHj9GgoxgyuUW4wZKK20e55hKRyfZF9LGQWQCo92zQidykSg0cUC4CkyXEMZATodEQ0kUyxUAk9ZQ0joqPhNQ8i7xItwedYOLAooLJH8MYiTykvBIkhM1yAwoc7aCAqVEQsIzzAdTKfAyIb/c5/Kz/RzaPq9CoGVhAbbq5QZK4oXJ6MjrCteHChUdFZ0oIwyETZGgZ4lgZEkSqT3O2O8jFDpJLwOzhsl8g5KLUKPIJAHgieoWGloGDx/Q77rNWooHOSDzpeAwkz+vIU8WBf5Zuh0XMZ06XdsCFAnqXuMlOn0qTfUmdC9LClnRsCMmiln5AhlhUbbe466SwfiDWhInWdFo5FnIEbnwICBBpWAckFnRKD+0hkyCKMBRbnkWRQWLNxeYPTNN4iDdNFBIffIK3KOYsr7kRTAcePGOWsFAyHiQYGj/vE+1jDixLJPmlEIGTTR6JNfZITBFJ0mlm8CbQkdgxfIJyy4RgcGLzpYpuiYGsK6g7JHuulg6XDptFH2kBFvgMg7tAUEjw2KATJFm0VngqIKI/5NG4TyiCwSiJ9v42pCPryZB9o4AnFwDQWXTox80wHyLd4hn+QFRSMR+6i6RKVZoF5huaLOe7M4lJk38PJwoIww6+INFqivyBaKFPWEQJ9Fe0n9ofxot1FkUDwI9GHUe2TQa1epF96gh3abb9AOEKjDTIPyTa8f5DryR30gjdQP2m0MJShipJ12gm+GvuMi/F9Axkk/07qehY16zZ8ne8iZlw5ew3iBnNK3ETLWbdyPaLe8us0zyBV9CO4ZyAVKIIHZMdLtcSHPyCTWdZQ/6j/xw9VbkEO7hnEFeUTBI93wJ07aMAIc4Ip8EjxDCUzoO2lHUFgZVHkzHO5Bn4WUmQKmIqK147fmjTYogFDrGY0ciyu8UTMNL50FI2MKCjM1jSjWDZQOCpYKQIVCeaMjRIhooGkkvQpLmdFBUSl5HiUTIaZgGZ1QwajQXkGjBFHwKD2M1nkPpROFh46KyovAki4U2nB+b6SFeLwKRxoQGKwXBEZWxIEghjqy8wyjF6ykjPj4HgJGJ07ayRtMQhsdz4ri5Q1hoSJjyaCh4A8LD9+isSH93rYcWDX4Jgog13mHaSXySoPHPRorLEzE402fc51pARrC6rutMfwmzwrxJYB80MGEDjyo+940EF+n3OgQUAA9xYEGjvpMvaCeUJ+pV1ioUaxoNGm4vXg9f1fiDjfA4Rs0xt5AgVE6PqP49vANAt/kOyhryAkySN2iocZK5SlK1CFvcBFKj7pIYx+aPxp2GnzP4kmbQieFFZL6h5UCxYh6jqwg6+Q7YyftfQelijqNFSM0DfgI0YHRnjAYRcFC+aVNgS2KeCQ2pMPzUfQslsRHG4YMYdVhmyZvAMv3GWByn07Ka19gxgwHgTaKNhRW3KeN4B3yTRsGd9LIwFchPgS8Pow679Un2mcGGKEB2UEhYdBBe0/7SV/g1VmvvKmj1AXiQslCAaIfIjAwol/wFL6MOWJWCPlgQIAcMQtGvBhUvIA1mfbCs9zR3yCT9GkofPRbyDAyH0k+mJL2DDIZ04A8M0iin/L6cdLCOyi2yL3Xd2ZWt4mXes4MEv0RMk88BCz49KFwpi1DjlBoPWMN8onFn8GbN/tE+0Bgahg9ACUSvYH+z2vLKCPS6Fn/MJSgR3jtCO+iBCKDfg4poQBSmJihUWIQinAdCpCpUDSuFApWMASL31gtsNJRmfCJQeGgEyEeKjGFh7WPxpxvoWQyFYqlBMFDCBAwAo0zIysaSuKiUlFRsVAiHHyDtNLRULGo2AgaQkyl8NJOZ4clk86HdGcMCC4VlftUUvKOkPJ/Ag06nSbCE8qDhoNKSBpIPx0tlZ48EsgbeaEjIV7yjBATUAx4jopNZSZv+BbxR16Jiw6T+GgcvIYI4fKme71vohzwHRoavuVNOfEdhIL7WCNRyukMvUUsLiEKcSOAQoViEtrp0PCFWl8pQ+oscoPPDwoC9Z5GE18/lHUaSTYKp9yRGeoRI1/qNGVKXaJehq7oJk7eJdAZEicNL/WD56mPoduy0OjSoDMtjCJEPWXggUWbuD3llA6Vb1IfQwNKDoM95BPFi/jxVyIdXOObKHnIFAMcRvt0NLDgOzyPbIa6mPCNUHlFLmhLmA0IlUPyR1vFZvDcZ9BKnKSZTh0ODMS8wLdoQwiki/YDq4YnpyjY8EZRQ/mlzEg77FG8kVvP0s815BdlkO+RX2SMAF8v3zBjRgLFNDTfexKlf8SUAGVCu+dZp4ic36GGBuoXgxwUM9pyLFVYv2k/qbO0u5Q1Zc4AmuteeXsbpVO/qNPEHTooQY6Jn+c9BQaZpV4iJ15b72UaKzhtANOnKHjIPGnwBhnII9dpS0hXuEA66AM9yyXPeOkgndTvUOs9dZq+G5880o8chavbGHm8uk3fTp4weiAj9CvIl9c+0MYgm8SNBRYLJumBBe0WfT2DPDgQD20kijV55T36ajgjI+QTnYD+lQEyfT7fIh/8Ie+0I7SLsMG44ueQEgogsOmIGGnQKTD9ES4gSFRYnmE0RMPLFAkViQLB4kZjiL+PZ2WgkHiOzgKrFdfxR6Dw6XhwgKXQPSsAz/MNr+LSsNPw0gkx8mBLFBprLIDeNCqKE9/A98/rJEgfgoHlJdwozbMaMOrCbw8HV6yOnqUGweKboY0JTKiomPKp3LyHXyLveQovJn4U5EGDBjlfCJ6j4SBddHwIMyMerAt03qSNKTKYMp3N1AKKAEoilR9eOJF7CoRnSkdRRCARDr7tOd3Dj+/hU0FcbJiNosjIM9KUe7iy1rXsE6Bc6VxQ0jKblqBhp24yyODfDHY8BQuFjIaSRhEfJa8+M0hCLihTGnYUIjofGlgaYhRHGmrPysvAjI6Nb9DAUycpf0+54ntYuagfzXdPr1JPaZhJi7eVA/lBbhkoYamj8Q4NfJ/6xjMotXyftPMt6icDKL5Jx8dACzlFdnE0598oaHyP9od2g3zhIM+7BDoC0gSH0E6ce+SfaSL+yAtWDW+hCjLMN+lQkQ/SFLqSkPTyPWQLPyj+z6COThs5YtDKans6RwKDSxh4/pm0DfDFAkT64MK3KXPyzH3aQqwmXr75JvnGt0sh9gRQumFNGYRr770vUqcYNNNv4VfOYHnp7oV71EMstsgPZUndREnxFBsGDFj/GJAgK8zi8B7XkT/kmO8TaLdRepAjFk8w+EAp4jr1jvpCGriHSwADIJ7hfZQbb1DHM9QjlCpkMVwgHdQp/ONIFwMR4iWQB/JH/SfwbRQ/Fmsws4DsRqvb8MB4gFwgJ7Rt/CH79NHkm76Kdog+iuvUddiQH5RR5Jp8YHUnnyjqWDk9HYE2D5mlL0Z2eNdrs2j3KAMG1cg08kZbxzNeOxKOi1+upYQPIB0Af9ECyg9LwQmeORcHbgrV+41SFxroAFgggZLoKTFYCFkaTmdER8if19ERD/5EVE7eIRAHCyV4no4gdNqW+1RAOo7QgBLqrUz04g69T/z429G5IJgIYaiVBoWUv4yBuGgYsBYiUJjqicsLKJZYQUgreUFh877PN1A0qfhe5eebjGqwNCLA5M2Lj/wzXRYaED4EnLh5jpEaDRdxe+/BCOWUESz/5tlwDDLmTb9zToBGicEAShpliDLkTXFkjJX6TEeFkkdjjPLE6JcRNBYjFA8adgYgXmBAQyNMx0VHhPJBY07j7Fm7qUOe+wYKizcgY9BBPcO/jQ6MThAlh1WIKDXUG2SAjozBlicH/J900KngfB0qH6SLARirLJE9Gnoc76mPdFx0cnyXuJFdBm8MioiPTs6zROJDRR1ndSR5ZBrOU0BhChd8cENljG8zcER5pb3hO0wfMVgjjbQHxIl/IgtPYIblgnaHQAdLx4gyygpt5IwtJfBvIh101gwm+T9yg5Uh9Kgu0sI3KQ9Wc/I+8gx7yh4FhPyTb/wJSQP5xhIYaoF1iVHINQHKB0sebTGDHowEtO3hfC0pT5R9FDfKuPnufg/lifaTgYtnsWNBkPc+7zDgQAkjXuoP8oCycvPuLYooU+qDt6iR56mDKGbUPeQdCzhyTf+JskndoX6i+PA88kg8of7mvEeeqF+RfHBZjEG6aAt4n3Qy2KeOogAyyKONoA9moISRB1nxZDlj3SYtWMBpk1AS6dup11gNkR/qNXkmftoL2iIUQW+BIgtjMHyw6wXv8y1kGAUd2WbgRxpRAL0+CcWOPoqyIw8MrigjnvVcYOj3aL9YmY088T14w9nPIc9uYPscCIpiQkZZzaIgAulIgBEcjskMBLyFD7HkwFYBNL5sheO3gAKGwuQp7Sj+TE96Sn249NIQ80dn4DWcNC3EQ3wZByJcY/Qe6o/K84zGGbjw7YxWtYzf9eKnw8uogHnPknYsDKSLgZw31Ur8oekkLXQYGf1j+QbKp8fDGxhlTEu431j3eI84Q6fieDazvJJmOj7e8zpCnveskHR4kfLrpYP8kFbvu6SFfKAAZsw3ZRE6QAuXl3hdQ4lGqUDR9hz1Y/ktFHDynnGgGstvxDouZIC66BkSKB/KLrOBcsbyJk3EQT2iDiAjXrlzj29Qz0JdNLx6x3ORFnWE5jUr6QpNh2ccCU1HqHzxzYxyEo5taF5JA+kmeO2J124QN9eI05uC5hrGD9KAfHltCGwzDiC9b9NmUIc8/rwDV9iFtlHe98K1I+HykahrKMAMMNkmjtm40JASFsBEgdJ3REAEzDVqods6oGxktGpn5EQjm7Hx9hrZjM/ym29k7GR4nkaWv6yEzOL33ift3ipkrpHGcN+NlD++4c0CZCVNoc+ggEWaas8sr6Q5lD9x8jxKrDfrEC0toR07z4Za9b13iTNSvqPFr/vxI5CxjJGVaIOhjOVN6lBoQut+aIozfoN74epdZrnMSrqipSMn8hWa11AuGQdn4eo31xjseCErbUjGto13MrYhxBfue5nx88O9lPAB9AMopUEEREAEREAEREAEgkJACmBQSlL5EAEREAEREAEREIEsEpACmEVQekwEREAEREAEREAEgkJACmBQSlL5EAEREAEREAEREIEsEpACmEVQekwEREAEREAEREAEgkJACmBQSlL5EAEREAEREAEREIEsEpACmEVQekwEREAEREAEREAEgkJACmBQSlL5EAEREAEREAEREIEsEpACmEVQekwEHSv3FwAAAWdJREFUREAEREAEREAEgkJACmBQSlL5EAEREAEREAEREIEsEoh4FBznxy1ZsiSL0egxEQgWAQ5D5wxIBREQAREQAREIIoGwCmDlypVt5MiR9tRTTwUxz8qTCGSJQLVq1fY6LD1LL2XjIQ4qX716dTbe0KMiECwCGBp27NgR10xt2bJFchZXworczwTWrVtnO3fuDJvEPLt2h7B3dFEERCBuBG644QYbPny4SfzihlgRpwiBsmXL2vTp061OnToxTzEyhqxJzmKOVhGmEIESJUrYRx99ZLVr194r1VIAU6gQldTgEPj3339t27Zt6piCU6TKSQ4J5M2b1/Lnz5/DtzN/TXKWOR/dTQ8CkWRMCmB6lL9yKQIiIAIiIAIiIAJ7CGgVsCqDCIiACIiACIiACKQZASmAaVbgyq4IiIAIiIAIiIAISAFUHRABERABERABERCBNCMgBTDNClzZFQEREAEREAEREIH/A9pVa/iNh0tpAAAAAElFTkSuQmCCAA==[/img]
[b]ACTIVIDAD 4:[/b] [br][br]Graficar las siguientes funciones lineales[br][br]a) 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b) 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