Un punto puede determinarse con divesos sistemas de referencia:[br]En el sistema de coordenadas cartesianas, se determina mediante las distancias ortogonales a los ejes principales, que se indican con dos letras o números: (x,y) en el plano; y con tres letras en el espacio (x,y,z).[br][img]data:image/png;base64,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[/img][br]En coordenadas polares, mediante su distancia al centro y la medida angular respecto del eje de referencia:(r,[math]\Theta[/math]).[br][img]data:image/png;base64,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[/img][br]En coordenadas esféricas, mediante su distancia al centro y la medida angular respecto de los ejes de referencia (r,[math]\Theta,\psi[/math]).[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARcAAAECCAYAAADUyJP8AAAgAElEQVR4nOydZ2Bb5dmGr3O0JUtesZN4xCuxnRACYYQNnUBbCpTVrwUKZZXVUjqADmjZK5RC2bNfWQU6gBbafszSAi2rJKFkOdu2ZEnW3uOc74csRV6xHVvWkX2uX4l0xitZevS+z3s/9yPE4gkZFRUVlSlGLPYAVFRUZiZqcFFRUSkIanBRUVEpCGpwUVFRKQhqcFFRUSkIanCZgUiSxO23/4ILL7yAzZs2ARCLxfjbX/9a5JGpzCbU4DIDufyyy/jLSy/R29PLiSeewEsvvciPf/Qjlu65Z7GHpjKL0BZ7ACpTSyqVoq2tjVtXrgQyM5arrrySM7/5Terr64s8OpXZhKCK6GY2v370UVrb2jj88MOLPRSVWYa6LCohUqnUuI+VZZlf/epO9ly2TA0sKkVBDS4lxMMPPTSu49LpNNdfdx1HHXUU++67b4FHpaIyMmpwKREkSeKmm26kv79/l8el02muuvJKTj31VNrbO3KPX/bDHyLL6gpYZfpQg0uJ8N5772G323n55Zd3edzll11GMpnk+Ree5+2332bjxg1ccfnlzK+bjyAI0zRaFRU1uJQMLzz/PADPP/fcqMc888wzHH7E4dxy663U1zdw5Oc/x7I99ySZTHLJJd+drqGqqADqblFJkEgkWNjWitPpRKfTsX7DRurq6oYd53Q6qa2tzf2/u7ubdCpFU3PzdA5XRQVQZy4lwZNPPIHT6QQgmUzy4AMPjHhcfmABaGhoUAOLStFQZy4KJ51Oc+ghB7N161ai0Sgmkwmbzca7771PeXl5sYenojIqanApIY499su88MKfij0MFZVxoS6LVFRUCoIaXFRUVAqCGlxUVFQKghpcVFRUCoIaXFRUVAqCGlxUVFQKghpcVFRUCoIaXEqERDxOMBDA5XISDAZIJBLFHpKKyi5RbS4VTjKZpL/fTSqZQpIkzCYzsXicYDBIMpkEQK/XYzAYMRgMGI1GNBpNkUetoqIGF8UiSRIeTz/hcJjq6jmUlZUhCAKWsjIsZWWDjk0mk8RiUaLRCH6fl+SAY51Bb8BgNGIymTAYDKrlgsq0ogYXhSHLMj6vF3/AT2VlJU1NYxce6nQ6dDodVuvg68TjcaLRKH6fj0QiQVpKo9fp0BsMA7McEzqdroCvRmU2owYXBeH3+/B5vdhs5TQ1NU9qpiEIAkajEaPROOjxZDJJPBYjFo/h9/kJhYKYzRYMBgP6gWWV0WhUZzkqk0YNLgogFAzi7ndTVlZG44ImRLFwefbsLKfMaiWRSBCJhGlcsIBkIkE8Ec+MxeVCkiUEBEwmE3pDJqczNFCpqOwKNbgUkezyx2wy09i4oGiJWEEQ0A/MXKxWW+7xdDpNLBYjEY/j83pJJBLIsoROp8NgNGLQGzCaTGi16sdIZTjqp6IIxOMxXE4noVCItoWLFJv30Gg0WCwWLBbLoMcT8TixeIxINILP5yMtpREFEYPBgG4gp2M2m9Wl1SxHDS7TSCKRoL/fjZROUzt3LqFQSLGBZVdkZzk2206zKkmSiMViuF0u4v1uDHoDMjJarRaD0YhRneXMOtS/9DSQSqXod7uJx+PU1NZiMpmKPaQpRxRFzGbzgM5GpL6hEdi5tIrFogSCAVLJFDJyZpt8IEiZTKaC5plUioMaXApIvlZlTvUc5s6bV+whTTsjLa1kWc4lkCPhMD6vh3Rayu1wqQnkmYEaXApAVqvi83mpqBifVmU2MZ4EssfTn1MgA1gsFkwms6pALiHU4DLF+P0+vB4PZVYrzS2talJzAuTPcirzHt/UtRFZkolEwng9/aQlKZdANppMGAx69HpVgaw01OAyRYSCQXp7e6iqrmZBU7OaQ5hijEYjVtvOWU6+Atnn3alA1mo0mSWVKbNVrjcYijjq2Y0aXCZJNBrF5XRiMBiQJIk5c2qKPaRZwWgK5PwEcjAYVBPIRUQNLrtJdls5nUoxb9489AYDXq+n2MOa9YyWQI7H48RiMcKhEJ7+fqLRCGazOSMGNBgwGozqLGeKUYPLBMnfVq6dO1fd0SgBRprlrFv7CfPr6kkkEsRiMTweD8lkEkmW0A1oc1QF8uRQ37VxMmhbeU7NrNxWnmloNBpMJtMw3VG2uDOeiBMI+IdZWKjFneNDDS5jsDsWCIVCdZ+bHnLFnez0sJAkKbe0Cvj9uJxOZGR0Wm3GwkJvQKfXYTTOPIHk7qIGl1GQZZm+PgexaJSKyiqam1uKPSQ2bOzikksu4Y477ij2UGYdoijucpYTDofx9ngwmc0ICIMsLAwGw6xMIKvBZQQCAT8ej4doJELn4iWKmf5aq6r5xJ/gqKOP4vnnnlfzPQogO8vRG/QEggGampoHKZBDwSD9bldOmzObFMhqcMkjEongdrkwGAw0Ni5g44b1igksWb5x/V387YE7Ofjgg/jLX/7K3Llziz0klSHsSoGcTSD7vN4Zn0CeGa9iksTjmWpeQRSZX1en+Erlo877DjVNTZxw8v/w4gt/pKKiothDUhkHoyWQsxYW0VgUn8+bm+VodVoMBkPOKVBpP3RjMauDS74FQk1NraJ1Dn0OBwAetxuNRkPHIZ+hdd+DufOJ33HVRecUeXQqkyE7y8lHkiTsvT0E/H6SiSTxeHxQAtloMGIwGhX9Qzgrg0spWSB4PP24nM7M1icCldXVJBMJEokEolaHLxxl/bq1mam4Xo/ZbMl0CBhi8KRSWoiiiChq0BvEQbKH0SwsdDpdznRdKQrkWRVcUqkUPp+3JCwQAgE/DocDURBpbmnBYDAiIw9azwPYKqro6FxMMpEgGAwSCoUIBAJIUhpZzpg1mUwmjEYTtvLyGbOen62Mx8Iiv7hTr9fnSh6mO4E8Kz5psizj9Xjo63Mwv65e0RYIkUiE3p5uZFmmrq6esiE9ikZDp9ezZetW7rv3Hu66+55crVMwGCASjuD3+3C7XciyjCiK6A0GdFrlTqlVxs9YFhbxeByv15PTSdXXN0zLj8yMDy5+vw+v10u5rRxRFLHlVdYqiUQiTm9PD4lEgnnz5w+ykBwv++67LyeffAonnXQiDz/8CLW1tZSXV1BePjjhm0wkCIVCmcK+VIr169bmZjlGoxGzpYyysjL0ev1UvTyVIjDSLMdu70WSpGm5/4wNLvntOhYMtOtwuZzFHtYw0uk0Pd3dRKMRamvnUllVNanrHXnUUcyvq+O0007lzjvvpLNz8bBjdHo9lVVVWMrK2LolSntHJ0BOfRoKBnOJbiCztDKbMZst2Gw2RaznVZTPjAsuWa2KXq8varuOsZAkCUmS2LhhPdXVc1jQ1DRl195zzz159NFfc8Xll/Hr//3NuN+DkSwMskur8IAdpbPPgSRJmaXVQALZbLGMe/mmMnuYMcEl264DYP78+egUOqWXJAmHw47f5wOgc/GSgtynvr6exx5/YtLXEUVxxKVVNBolHA4RjWR3LZIIgoAsy2g0Gnw+H2VlZWoCeRZT8n/5ZDKJy+UkmUwyd+48RUuq3W4X/W43JpOZRe0ddG3cUOwh7TYjicEkSaK3p4doNILX04+zz4Es79zhMhlNWMrK1FnOLKFkg0s6naZnYFelpqYWs9lc7CGNitfjwensw2Aw0NLaVtREaXZJUwiySyVBINdaBBhoGxshEgnT57DTm85sk4saDUaDEZPZhM1mQ69XrohRZeKUXHDJ+qqEQiFi0SitbQsVu6sRCgWx2+0ICCxoap60WM9s0LPl/bdo2e+Q3Trf7/dz6qlf5/77H6C+vn5SY5kIer0evV4/rEwhFosRCgWJRqJ4vV6kdBpBEDIy+bwEskppUlLBxe/34fN6sdnKaWpqZuOG9cUe0oiEw2EcA1t+dXX1WKZoGVBTVcnhc3T83yvP0f6pY9BMMJ9RXl7OHb+8g29+80xuuulmli5dOiXj2l1GSiCnUilCoVDO6b/PYSeVSmG39+Lz+TCZTVgsZYpWVatkKIngMmhbualZsQVcgiCwZfMmkskktXPnFaSg8FOHHMT82g385q/P0vLZ4yZ8ftvChfz2t09z9llncfrpp7N06R5TPsbJoNVqqaioGPTeberaSHX1HCRJGti18uUUyBpNprjPYrGoCmSFoei/RDgcxu12YTQYFb2tnEql6O7eQSqVYk5NDdXVcwp6v45F7VxkKeOhF35PJB6f8PlVVVX89umnOf9b5zF3bm1O56JkNBoNFZWVVFVX5x6TJCmTywmHCQT8OQVyts5KPxB0hu50qUwPigwusViMfnfGAqGurl6xlZ+SJOGw9xIIBKioqCQeixU8sGSpq6vj0lNP5Mmnn92t8w0GA/c/8CBbt2ye4pFNH6IoUjbC7lMikSA8sLRyu1w47PaB4zWZftYmI7IsF2PIswpFBZdQKITP60EQRWpq5yo2UQvgsNvx+bzYbDbaOzoRRRGfzzutY7BarZx95jem9Z6lgF6vR19VNUztHAqFiITDhEIhgFw1uU6nw2gyYzabsFpVBfJUoYjgkkqlcLtdePr7WbCgiTKrdeyTioTb7cLtcmE2W1i4qL3oa/ypvn86nVbs8nOy5M9y1q39hI7OxTkFcjQSzRS3OhyDllaqAnn3Keo3Y1C7juo5BAIBdHplLoE8Hg9ulxNR1NDa1jYjNRmyLPP1r32NS777XQ4++OBiD2daGE2BnLWwCIfDgyws1ATy+CnKO6Okdh1jEQwEcDgya/aGxgWKFutNFkEQePiRRzj3nHPYvHkzp512WrGHVDR0ej1V1dXDEsjhcIhIODIogSyKIhqNhnQqRTgUmjLpQakz7cFlqFZFqdvKsVgsVwc0b/78QT4ZM5mysjIef+IJLvvhD1m3di3XXHutmoMYQBRFrFbbsM9CIpHA6/EQi7lxOOwkB+qsNBotJpMRszmzrFJqvVuhmLbgkq9VaRywQFAiyWSSnp5uEvE4giCwqL2j2EOadjQaDbf94hfcffddvPLyyxx51FHFHpKi0ev1VFZVEggGaFu4KPd4VoEcCoVw97uRB3xU8hXIM7m4s+Cvami7DqUmC7PbysFgkPLyCpqbW1i39pNiD6uoXHTRxcUeQkmzKwuLaCSas7DIMtMSyAUNLtlqZaW363DY7fj9PqxWK4vaOxQ7q1K1GaXPaAnkeDxGMBgcsCT1I0lpJEnK2FhIEmZLGVartaRmOQUdaTKZpKamVrGBZagFglKDSjweo7enB1mWWbf2k9w2qcFonPapdTKZVOzfs5QxGIwYDEbI02Da7b0kEgl0Oj1+nxe3y5mratfpMn2pLRYLVoUWd5ZOGJxCfF4vTmcfer2+6BYIuyKVSuX8UWpqaxFFkc7FSwbJ3rNT63xthtFowmQ2FUT2fs3VV9PY2Mh53/rWlF9bZQhypl1s7ZCumvkWFk5nH729PQCIGk2ma6PRiK28vOjeRrMquEiSRNfGDWg0GppbWhSrVRlaVjDUAnNXsvfsh87tcuUEYVPpm3LNtddy/XXXcdFFF3LHHXeW1DR9pjCahUUkEiEcDhGLxti+fRuyJCHLMnq9PpNAtpTlfJGng1nxyYhEIvT29pBOp2loaFS0AjhbVmCxlOXKCsbLaB+6fNm71+PJreU1Gg3pdHog3zQ+2bsgCPz0yit55pln+Nr//A8PP/KI6rmiEMxm8zAdliRJBAIBIpEw/S4n8Xicqmmqf5vRwSUej2Hvzaxba+fOw9nnwKzQToTZsgKj0TjlBlgjzXJSqRQBvx+nsw9Pf//O4r6BWY7RZKSszDqqb8opp5zCvHnzeOyx36i7SgpGFMVBFhZ2e++07djOyOCSn6vIt0DI3/ZTCn6/nz6HHVHU0NLamknqTQNarZYyqxW320VLa1vu8XzZu9/n36Xs/fDDD+fwww+flvGqlB4zKriMlatQEuFQCEmScDmdiiorGE32rvqmqEyUGRNc8rUqE81VTCexWIzenm5SqRSCILBw0aKxTyoyu0ogZ/I5IVxOJ/beXuLxeGZJ171j1sreVTKUfHDxeb14vR5MJjNtCxcpdvciv7NiTU0tVdXVJa8A1uv1VFVVUZXnm/LIww/zyisvs3LlbQSDQdxuVy6BnPFNyXjgWiwWxaq1VaYGZX4Tx4HX4xkwcw4qWqtSSku1qeCYY45BEODc887l17/+39zrzZe9e/rdOOy9uXNmmuxdJUPJBZdQKIi9tze3ldrQuECxgaVUlmpTzZFHHsm+++3Pqad+nV/96ld0DLz2kWTviUR8kOxdljPaDK1Wi9FoxGS2qGUPJUrJBJdIJIK9t2dQu44N69cVe1gjkl9WoOSlWiFZtmwZDz/8CA/cfz/XXnfdqMfp9Qaqqw3k5Y8H+aYEA/5cpbrGodnZudFiUX1TFI7iP/XxWAy7PZMonDtvfkHadUwZgsD6dWsxGI2KXqpNF42NjbsMLKMx1DdlU9dGamvnYjAacwpkx0A/I1Ce7F0lg2KDS1arEomEmTOnhuaW1mIPaVT8fl9Gai9JtLS1TZtWZbYxns6NO3Zsz0nctVrtrPBNUSqKe7dlGXp7uvH7/ZSXl9O5eEmxhzQq+Uu1+voGduzYrgaWMZAkiXg8PqUdE0fzTcnK3j397p3FnaKIQW9AlmVisdiw83p7e6mrq5uysRUTu93O/Pnzi3Z/RQWXdCrF1q1bKLNY6OhcrNgE6NCyAkUv1RTGxo0buPTSS3n44UcK+sEfKnvPkk0gh0JBdmzfjiTtnOU89dRTLF++D7W1tQWb5Wzq6uLf777LwQcdRHNLS0HukcXr9XLXr37F9TfcUND7jIYigovH04/L6USWZZoWNClGrTqU0coKVMZPR0cnd955J2ec8Q1uvvkWli9fPiXXjcViXHLJd1izejUffvghHR2dHHDgAeh0OgJ+P/5AAJPRxI9/8hP22msvXE4ni9rbgYwJ1+OPP4ao0bDHHkvYvKmrIArklStvJRKOcO5553H22Wdx911309JauOX+kiVL2GPpUm67bSXf//4PCnaf0ShqcAkE/DgcDkRBpLmlhW3btqHRKG+2Mtu0KoVm4cJFPPXUbzn7rLM459xzOOaYL0/6mkajkfvvf4BHHn6YCy+8gPvuv5+DDjpo0DE/u+oqPv2pI3jzH/9Em/c583g8PPrII7zy6muDZstDLSwcdnumzkqrnXAC+Z677+bVV1/lpZf+giAIHHbYYTz00EMFn1V8/etf59hjv8wxxxxDxzS37S3KNzkSidC1cQN9Dgd1dfUsXLRIkbkKQRCw2+25Le/2jk7mFXENO5Oorq7mt08/zT//8U/iu9HvejT++c9/YLVa2X///Yc9d9zxxxOJRHj0kUcGPX7LzTfz1a/+z7BleDZ5XFdXT9vCRXR0LqZz8RLq6xswm81EY1F2bN/G+nVr2bJ5M8lEAofDTiDgRxow4wZYv34dP/nJj1m58rZctwuLxcLbb781Za97V1x80cX89Cc/nZZ75TOtM5dEIk5vTw+JRIJ58+djs5VP5+0nhMvlJJVKkUwkFNFZcSZiNBq56eabp/Sab775JocccuiIf6+tW7cAEE/sDGbRaJRnnnmaNR//d9z3yPqmzKFm0HW2b9uKJEmDZjmCKPK9Sy9lr733pq1tZ/V5v7sfl8u9Oy9xwnz+yCO54ILz6e7untaVwbR8YwbV1dTWUlVVPfZJRSJrganT6dBqteoSqITY1NVFd3c3F1500YjPv/zyy4iiyGmnnZ577NVXX6GpqWnEsoNEIsGqVavYY489MJvNJJNJ1qxZQ01NDY2NjYOO1WhERI2Gurr6QY//9+OPee2117jjjjvo6d5BOp0x3n7vvXcRRQFPfz/lFRWTrrPq6enB4XCwdOlSDIbBToOCIHDggQfypxde4PivHD+p+0yEgocxe28vGzesx2Aw0NG5WLGBJRgIsHHDevr73SxoaqaltU2VnReJQCAAZHIhPp9v3Oe9+eabABxxxKeGPfePf/yDJ594gpUrb+PAAw/MPf72W2+z337Dl1AAN990Ez093RywYgXr1q3lphtvpN/t5pSTT+Kdd94Z15ieffZZRFHkpJNPoW3hIto7OulcvIT//ve/NDYuIBQKsXnzJtavW8uG9evYumUzvb09+P0+GNIvcFNXFw8/9NCgxyRJ4gff/z5L91jC5z77GQ5YsQK/3z9sHAcedNC0LcOyFHTmEo/FMBgMitaqxGIxunfsQJLS1NXVK9oCU5blGd8uNBKJcOIJX0Gj1fLG668jCALHHnss9z/wwJjnvvnm39Hr9Xj6+3nt1VczM+aeHv797r+x99r569/+b1iSd+vWrRxy6CHDrvXRRx+xeMkSjjzyKL7+ta9xw/XX8+v//Q3PPfdHPvroIyLh8Lhez4sv/hmbzcaVV+7MeSTicfr6+rjo4osHzYwTiQTRAR9ct8tFIpFAlmUi4QgGg4EHHnyAn/3sZ4Ouf8stN6PVaunu6cVoNHL1z3/Ok088wQUXXjjouLq6OrZu3TquMU8VBQ0uBqORmpraQt5it0kmEvT0dBOPx3MWCErF6/HgdPYBGZvCrBeMRqPFaDRgtliwlllnhG+K2WzmU5/+NNdecw2QCajPP/88hx12OBd/+9u7PPfNN99kn332oXrOTonAvPnzOeHEE0f1+XW7XdhGaNX71lv/5Mwzv8maNWuQJImrr74GURT5yldOYGPXJhoaGsZ8LcFgkE8++YQLL7yIW1euzD3+6COP8Nhjj3HkkYM7WWYVyOVZS8reXmRkqqqq6dq4kXlz59LT05NTIAcCAfocDq688ioMBgMajYYf/fjHXHfttcPGUlVZhdPpHHPMU8msy1KmUym67XYikTAVFZWKLisIBgM4HA4EBBYM9NVeuKg993xW9h4Ohenv758x7UI/XvPxsMfe/+D9XZ6zceMGenp6OOvss9lnn33GfS+fz4elbLivctYX+K23/klb28KcHkUQhHEFFoDt27eTTqdZccABgx5/+eWX6exczN577z2u6xiNRv71r39xwgkn0tTcDGSWQw8+8ACXXPLdQe6AkUgEvV6Pw24f1F7GVl6O1+sd1/2mitL61E0CSZJIp9N0dW2ksrJK0YnacDiMw947qAJ8JGZqu9A9l+3JH//4h0GP7bXXXrs8582/Z/Ithx02MU/fiooKIpHoqM///Y2/c+hhh07omlmyX+Zly/bMPebxeHjppRf5xS9un9C1enp6coEFMjM6SZKGqXzvvvsujjvuOJLJJCFnKGe8vmHDenQ6HbFoNFNjMw3MiuCS9VWRZZn2jk7F/pJPRVnBrnxTAoFM0MlvFyrLMr093RhNZmw2myLem+9rtbwDvDzw/89//vOcccYZuzznH/94E4PBMKK+ZVfU1NQQHEggDyWVSvHOO2/zi9t/OaFrZrEO5O9qa3c2NXv88cdYsKCJU087bULXspXbWLVqVS7IvvXWW+y7336Djvnvf/9L945u9h5B9fzRqlXMmzePVCpFOk+DU0iK/0kqIF6Ph74+B8YBC4StWzYrsl5pOsoK9HoDc+bUDHosEY+zZctmNBotwYAftytTgiGKYtF8U4T167DdcAP/V17Oxj/9GbG+nngsik676xayb775Jvvvv/+ECyIXLGiiq6trxOc++OADAoEAhx122Kjn33jjDTQ1NXPSSScOe27RokWYTCbSAzkSt9vNnXfcwW8ee3zYdvGqVat49NFHuOKKHzFv3rxh1zrllK9y8kkncs+997H33nvz4p//zM+vvhrIzFafeuopnnzyCZ555tkRx+lyuejs7KTMalVbi0wGv99HX18foiDS1NwypRW4U4kgCPR07yAUChWnrEAQEASBuUM+zPmy96xvylDZu9Vmm/r3NZ1Gd845EI2SvPseFgzkKjZ1bRzx8Fgsxrp163jv3Xfp7e1l+fJ9+PDDD+ns7Bx3fdpBBx/EL28feYmSzbc0jfJ3CYfDXHfttWg0Gj7/+c8Pe95sNnPqaafxwfvv8+nPfIbvXvIdrrv+Bg4++OBhx/7u2We57957MegN3HzLLcOer6+v58Ybb+K4Y79MQ0MDHq8Xs9mM3WHn9ddf57BDD+Xpp5/BMkpfrvffe4+DDxm+K1ZIZlRwiUQi9PZ0I8tyZltZwXkFh91OOp1GEAQWtXcoakY1Ht8Uf/cOpHSmp5FOp8NkMmE0mgbJ3ieK5raVCO++i/SlY5BOPXXM4/v6+vjXO++g0+m4++57APjXO+9QXVU1KD+xKz772c/x7YsvJhgM5pYxWTo6Orjm2mtGPddisfD7P/yBDz74gH63G412+Izg1ltXctddv2L1mtVcdvkVLFu2bMRrfeeSS1i8ZAk7dmwf9X5HfOpTrFu/gdtv/wVPPfkU27ZtpbWtjd///g8sXbp01PNkWebf777LNddO3LhrMsyI4FJKZQVZC0yj0YRGo6Gufnw7D0pgLN8Un89LPB7P6HEiEQx6A2aLeZedG7MI69aivf56qK4meU8mUASDwV0G3aamJs6/4IJJvSaLxcJxxx/P07/9Leece+6g5770pWPGPP/oo7/A9m3baWhsxJ5nOp7FZDLxwx9eNuZ1ampq+NrXvsa9A699NEwmE8lEktNOP43LL79izOsCvPLyy3S0d7BgwYIRx1goSj64dO/YnkmA1s5VtFbF4/HgdjnR6/W0trah0+tLvrUIDPdNcfb1kUwmqKmdSygYJBaL0tvTnZO9a7W6XOfGnOw9lUJ39tkQi5F88CEYWKY9+8wzVFZVsmzPPXc1hEnz4x//hNNPO5Wzzj57wjNIWZYJBAPo9bvOCY2H1197jQOHiPxG4vnnn+Omm8Zfk3X//fcXxdOlJIOLJEn0dHeTTCax2cppbVtY7CGNSjAQwOHIbAcqqbNiodEPdG4cSiwWI+D3EwqF6Pf0I6XTzLvvPmrff5/oZz5D8KgjsUrStC4T582bxze+cQYPPfgg533rWxM69/HHHuOYY8ae4YyF3+/nvfffG3M2sqmri08++YRlY1mwcSAAACAASURBVGzNZ/nbX//K3sv3Zo899pj0GCdKyQWX/HYdo32AlUC2rCCVSlJXX6/opdp0MnRpJaxeje6hh5CsVpw33kTI6cz4EcsyLpcTSUrnZj2F5PRvfIObb76Jd955Z1iJwK748rHHUlFRQSIxOdsIjUYzLkOnZCrJd7976Yg7SkPZvGkTr7322pRXno+XkgkuI7XrUGJrkUQiQW+JlBUUnWQS3XnnIiSTpH7zG+YNUaxara+h0+lIp9M4HPbcDFCv12M0mTCbzVittimb5Vx++RVs2bx5QudMlcXpeDcfOjsXjztYaDQabrr55pyHzHSj+OCSrasxGAyKbteRSqWQJIktmzdRVV2t6LICpaC9/nqE//wH6X/+B+mE4TqRrNObXq+ntnYuVpttkALZ6/HkZjlZS8rJKpALaTs53Yx3x6xQKDa4hEJB7HY7opCpq1GqViVrgZktc+/oXFzkEZUGwkcfoVl5K9TUkFx524jHHHvccWg0Gjz9O02VRlcgJ3IJ5D6Hnd5dJZBVpgXFBZedFgi7rqtRAvlLtY7OxYpcpimSeBzdWd+EZJLkXXdBTc2Ih80ZqG7ODy6jMVL+TZIkwqEQ4XCYQMCPy5WpChZFEUmS6HM4KCsrU/RnrJRRTHCJx2OkkkkcdrviOyvmbysreammVLRXX43w3/8inX460vFfKdh9RFHEarNhHWK3kEgk6Nq4gVQqiX2gQFSWZTQaLQbDgDbHUoZB7dw4KYoeXFKpFN3dO4jHYohipguAEs26YXBZQeOCJsUu1ZSM8O9/o/nl7VBXR/LWlWOfUAD0ej2iKFLfMNiqMqtAjoQjeDyeERXItvJyRRR3lgJFe5eGtutobm5hw4b1xRrOLimlsgJFE4uh+9Z5kE6TvPc+qKws9ogGMZaFRb5vCoDBYMBoNGEym9T+1CNQlODisNvx+bxYLGW0d3Qqqq5mKJs3dZFKpaidO5eKCmV9GUoN7ZVXIqxdS/qss5COPnrM49evX4dBbxjzuEIyWgI5Ho8RCoWIRqK4nC6SyQSQKbI0mUyYTGbKrFZ0uskrd0uVaQ0ubrcLt8uF0WiktW2hYnMVWa1KOp2msrKKyqqqYg+p5BHeeQfN3XdBfT2pG28a1zlv/fOtaZH/7w4GgzGzfB/IIScScbZt20Z9QyMBv59gMIi73400UJya37lxKrU5SmZagovf78dh70Wj0dLS2qrYnMrQpVo8HlcDy1QQiWSsFCSJ5H33g4KT9ZNlV0urcDiM1+PJucOJGk1hLSyKTEGDi5SW2LplM8JAAlTJdTX5ZQXZpZrPN72eozMV7Y9/hNC1kfT55yMdeWSxhzPtjLa0yvdA9vl9yJKEIAhotVqMJhOJRAJ9CS+rChpc0ukUtXPnUV6u3Lqa7FLNbLbkygqUSLbNhN3eO+Wy90IivvEGmvvuQ25pIXXd9cUejqLIznLyHQIlScrsWEUixGMxIuFwznrCYDRiNpkxWyyK/qHOUtBvkk6vV+yb4Pf5cDjsGAwGRed/UqkU9t5eIpFMnxxZlul3u3fK3kUx55tisZQp6/0Oh9FeeAEIAskHHgQF94RSCqIoYrOVY7OVI0syMpkdynwFst/vIz2wTS5qNBgNRkxmEzabDX2RE+D5KPNnuoCEQiH6+hyKLyuAwUu1Re0dCIIwrF1o/ofO7u/JfeiygrBiyt61l/0QYdMm0hd/G/nwibnyA5x19tnA6DaXs4mxLCwi4QherzfX00ir1ebay9hsxZnlzprgEolESCaT9DnsJVVWMJYF5kR8U4buWhiNhQus4muvoXn4YeTWVlIDRtIqU89ICeRUKkUgECAWjdDvdtE3UE0uihpkWaJqmjYpZnxwicdi9PZmLDBFUaRt4SLF5ip8Xi9OZ9+UlBWM9qELBgJEoxHcLleukrtr48Yplb2LwVBGLCcIGWc5BQfymYhWqx0IIIODSCwWw6HaXE6e/HYdNbW1VFVVK7awMBDw09fXh4BQ0LICrVZLZVUVlQMfukQiwdYtm2lobJxS2XvVNVfD9u2kL/0e8qG711BMZeoxGo0YjEYEYXp+XGdccBmqVVFyZ0VZlunauBEZmfnz64pWVjAZ2fvQ7VXjq69g+8MfkDs6SQ1pmq4yu5hRwSVbVmA2WxRdVhCPZ2wlZFmmprZm2BdUCYwle4+EI7l2oVlthjmRoP7SS5EFgeRDD8EkZ2BvvfUWZrMZm1VdVpUiMyK4lEpZwdDOii6nU5GBZVdkZe/5OWRZlomEwxjOPBOtz4fz7LNx2KyIA/2JTSbzbvmmrF+3TrHyf5WxKengIssyW7dsRqvV0tLSqlj/jdGWai6ns8gjmxoEQcD6xuvo/vQCqcZGwt//AR1tbYNk7y6Xk+7uHcDMl72rZCjJ4BIOhejt7UGSJOobGhTtrD9SWcGMw+1Gd9FFoNXSf++9yIbMzHEs2Xt+50YY0GbkJZBVSpuSCi75nRXnzptHn8NRUK3GZCiVsoKpQHfJd8DhIP3TK0ks2wsG7AdGY7QEcigUIhwO4ff7cLtd9PU5iMdjdLS3Ewj4ETWaUXshqyiPkvjEp9Nperq7iUYj1NbOzVUq9zkcRR7ZcLweD65sZ0UF53+mCvGF5xF/9zvkZctIXX45eHev2DMje7dhy7OkXL7PPuj1BkRRJJFIYO/tJZ1OIQgCGo0m55tiKy9XjbcViKKDSyltK4dCQSRJor/fPXssMF2uzHJIp8vUDk1xID366C8AGfn/nDk1g7xwswpk1TdFuSg2uJRKriIcDmPv7UWWM+XyCxe1F3tI04bu298Gp5PU1VcjL18+rfdWfVOUj+KCi9frxe/zYTKZWbioXbHT3Xgsht3eSzweZ978OsrLy2dEY/nxIj71FOIf/4C8996kx9GGdDoYLYEciUQIhYLEorGcb0o6nWbzpq6Bzo3FK+6bySgmuHg8HtKpFOFQSNHtOrJalUgkzJw5NbOzs6Ldju57l4LBQPKRR0HhhkZms3mYFcX6dWuZU1ubMWryenD27bSw0Ov1mIwmLBYLZapNxG5T9OASCPhx2O1oNBpEUaShsVGRgSW/s2J5eTmdi5cUe0hFQ3fJJeDxkLrhBuQ99ij2cHYLWZaxWW3YrMN7GuU6N/Y56OnpBlC0b4pSKVpwCYfDOAYaUtXXN2ApK1Nsa5H8soKOzsWzevqs+d//RXz+OeQDDiD93UsLeq9nn32WcpuNtrbpmx2OZmERiUQIBYOEw2F8Xi/pgQSyTqfDZDajVfjsrRhMe3CJx2PYe3tJJBLUzp2n6M6Ksiyzbu0nmMyZ/M9M1qqMi54etJdfBkYjyfvvhwLnw4KBAFqtMnJuIy2tUqkU4XCYUDBAKBgilUyyft1aRFGz08KizDprexpN27dlaF1NdfWc6br1hPH5fDmDHSWXFUwrsozuggvA6yW1ciXyLF4WZtFqtZSXl1NeXp5rLbJoUTvJRIJgbpbjQ5IyFhZDFcgz/ceq8K9Olunt6S4JrUp+Z8X6hka6d2xXA8sAmocfRvzbX5EPOoj0hRcVeziKRjewtMpfXkmSRCQSIRIOEwj46e935yws9Hr9qBYWpUxBg0sqlaKrayPl5eWK1qoMLSuYSX/gKWHbNrRXXA5mc8ZKQaHyACUjiiJlZWXDPHsSiQThUIhIJIzL6cJht+dmOZIso9VoMi1GFLjJMRYFDS4CAq1tbYptgjZaWYES8Xq9yLI8/e1CZRndRRdCMEjql3cgL1xU2PvlseeyZcrqZlAA9Ho9+qrhXT1DoRDOPgfJZJKtWzYjSRKiKO60sLCWYTZbFPuDDQUOLhqtBlFU3q9cKZUVBIMBHHZ77kM0v66eUDCIf8AdThpopKXX6zEYjRltRpl1yj50mvvuQ3z5ZaRPfYr0+edPyTXHy/777w/MTvf/srIyggEzRpOc6/iQr0B2u1wkEj25oKPX6zGbLZgtlqI5Gg5lZmeUhiAIAn19Dvw+H1abjY7OxQiCUOxhjUgslnGrk6Q0dXX1lFmtCIIw4q5F/ofO09+PvTdjwjxZ2buwZQvan/4ELBZS99wLQ94r8bHHED/5hPTxxyMvX47mscew9vaQtljge9+f3BugMozRFMj5CeRAIJBLIOe3lylGAnnWBBens494PI7BaGRRe4diywqSiQQ9Pd3E43FqampH1FwMZVe+KVkfXH/AP8g3xWgyYTAYRg+ukoTuvHMhFCJ19z3IbW2DnhbefReqKpGOOgr9ySeRPudcUt/6FtJTT1H1oytInnAicnPz7r0JKhNitARy1nQ9a2EhyzKSJFFZqbYWmRI8Hg+ugXYdOp2OhoZGRa5T88sKKioqp6SsYJfG29EoAb+fRCLB+nVr0Wg0mQ6ZJjOWsjKsDz2I8OabSJ/9LOmB5mT5aP78Z1JXXYX4zDPg8ZA+5WSYOxepvJzgaadjWLBg0uNX2X3yOzfm09PTjThNs/UZG1xCoSB2ux2BnZ0VldpapLe3B7/PN2ZZQYrJB8X8WU62tUh7R+cg2Xv/229TcfnlpLVaNv3oR4g7dmAym7BarbnkfPpLXwKtFvHDD5EOPhi5czEA0S9+kcDnP0f9FATweDyu2GVrqSKK4rDlbaGYccElv6xA6Z0VZVlm/bq1WCzjKyvYGhJ5bn2A4ztsuzxud8jJ3iUJ/emnI0gS8v0PMHf/FcPahQqCgHZONcbeHhr+8hLCyadM+XgAnnj8cdWgu4SZMcGllMoK+vvduF2ZNfBELDCtZXpu/tsOmqwtLK8rzBat5vZfILz1FtIXvkj6G9/ACCN2bgwFg8R7utF2dbG1rZXggOxdRkYjiiQScbW4b5ZT8sFFkiS2b9tWEmUFfr+Pvr4+REFkQVMz27ZumVAGXxTgc59u5YJnN/H0mZ00lU/tn09Yvw7tNddARQXJu+4a9TitVktFZSXiG68jGAzUnXQymEy5dqGxWIytW7ciD2yTZxPIqm/K7KJkg4s0YPizdctmKiurFK1VyS8rqKurn5QOocyi57CDm/n6Yxt47YLFGDRTtH5OpdCdfTbEYiTvux8aGsY8Rfz735FXrMg1PzMajZjNFnQ6HfUNjcBg2bvPm0mu52tzZqLsXSVDSQYXe28vPl9GsdrWthC9QZnT7/yygnnz509ZC5Q51Sbamiu58e99/Pwz86bkmppbb0F47z2kY76M9LWvjesc8eOPSR999K6P2YXsPZtAdrtcgywps74piTG6CKgom5IKLvntOha1d7B5U9e0Zb4nQn5ZQU1tLVVVY2tVJsqeS2r4w583cPGBc5hjntyfUVj7CdqbboI5c0jec8+4z0s8+RSMQ4czEqP5poRDIcLhMOFwmI72jM1pPB7H6XQSDoexWCxYysrUpVUJUBLBxePx4HY5EUUNrW1tik0UajQaerp3EAwGp2GpJrDv3vO5/C/dPHzi7ovVhHQa3TnnZJZDDz8Cc+eO/+Ta2t2+72hY8tq+NjVlXtemro1YLBYkWcLlcmIf2A3UaLUY9KpvilJRdHAJBgI4BnxVGhoXKLqIzW7P7FRZLJZpqQAXBGhssPHifx187IiydN7uOdrX3n8/wgcfIB17HNJJJ03xKKcOi8UyqLUIoPqmKBxFvuvZuppUKkldfb2i27W6XE48/f2YTGa0Wi119WMnQqeSg1Ys4PKXunnxrIlXK2tWraL2/vuhpobk3XcXYHSFZTTZe8bCIEJgoLgz65tiNJkwGoxq18ZpQlnBRZbp6e4mmUxSUzuXKiVbIHg8OJ19GAyGXLeCQrcWkfPSSwICIFNVaSQmC6x2RFk2kdlLIoHxnHNAlkn+6lcFWeIUA1EUsdpsI89yQkEi4TAOR5B0Os26tZ/snOWYzFit1pL0TVEqigguqVQKe28vyWQSm62cefPnF3tIo5ItKxCFnWUF04UkCwgCyDLIsgRkos2eS2q4620XD5ww/noe7bXXIq5bi/cLX8D8lRMKNOLJsWXzZnRT9GXX6fVUVVXnkuvr1n5C5+Iluc6N4VAIj6d/UHGnyWxWtTmToOjBJb+zosFgoLKqsthDGhEllBWIyAPzFZDYOY1pnG/l9+/3EE/JGLRj754J//kPmtt/AXPnYv/xj2kb84zi8Prrrxdc/j9W50af10OfI+MOp1TfFKVStODidrvod7sxmcwsau9AFEVFthZRUlmBAEhyZkkkk8kjaEQBSZZpXlDOE6u9nLXPGEvJeBzdWd+EZJLYL24nXa7cfFaxGM3CIhqNEgoFiUaiBIIBUslkTgyo1eqQJYlUKqUmkAeY9nfB5/XiHLBAUHJnxXQ6PaAA3qK4sgJxILRIgCBDWoaORXN46p9bxwwu2p/9DOGTT0ifcQbJY4+FLZunZcwzgYy96OBlcNY3JRgIkEql2LypK9O5URDQGwyZzo0jiAhnA9MWXILBAA6HAwGBxgVNim0GLkkSvT3dhMNhBEGgY8BKQEkIopBZG8lybgZjNGpBI7LWGWNx7ch6D+Ff/0Jz5x1QX0/q5lumccQzl6xvitFoJBKNsmhRO5BRIEciESKRMH0OO73pzDb5bOrcWPDgEovH2LZ1S66uRskWCPn5n0XtHYr1f5EkGQnQipnkbpaO9jnc+o6bR44bYTs8EsmI5SSJ5D33QmUlJFR5faHQ6/Xo9fphy+hYLJZbWnm9XmRJAjICzGwCuaysbEYsrQr6ChLxOPaeHsW368gvK5iIBUKxkfNyLwCN9eU8/5F9xGO1V16JsHED6XPPRRqjHkgpnHraaQiCwI7t24o9lCljpARyKpUiFAoRjUbwevpzDfkkSUKj0eByOSkrsyp2tj8aBf0W6fV66hsaC9/+YjeZyrKCgR+ggpBdqmXJBBQBSZIAEQYCjFYAi1nHxv44i6p3vhbh7bfR3HM3NDWRuvGmwg10ijEotCB1qtFqtVRUVAyb5ezYvo1EIkE0Es0pkAF0Oh0Go5GyMisWi0WxP4aFHZUCiwoBQsEgdnvGIX+yZQWxGNx8kwZbucw/3mzkBz8UOPhgeewTx0n+Ui1LZrcos1OUSstZuQtpWaKxsYKnP3JxxRHzMh+6cDizHJJlknffA3nXUVE2Wq0OjVabay0Cgy0ssrOcXAJZr0c/4PavhJWCMkNeAdm6ZQvJZIL5dXWTLitIpeC0U7V8+csSZ5wpsedSJ5d8p5L33k9NepwjLdWyCl1BBKSBbWlRQCSTgxEQaGqw8eY/N/PVxnAmz3XttVRv6iJ4+ulEV+yPuvFc2uzKwiKbQHa7XPQ5HMMSyNZp/mGZFcElkUjQ070jU1ZQUztlnRVXrhQJBOAbZ2TWRLW1CdasEejpgfr6MU4eBb/PR1+fA71eT2vbwkFb9ZKcmbH0bxHZvlag/SAJfbmMIGS2p9OygNGoJZKQWdDajukfb6D73e9Iz52L+4eXEe5zDmoXajAYkSSpZNuFquxktARyOBzO2Vh4PR5SqRQVFdMjVJ3RwSXbWTEYDFJeXkEymaR8ikRw27bBjTdo+O3TqdzqLxzO9ELaskWgvn5iS6PsVr0o7Nyqj0Rg1SqB1asEPlolsONDkV+frae6RaJusYxWI+xU7Qo7t47mzyvjjdV2jv3WeSAIpB9/grqOjkH3C4dCBEJBpKDEtq1bBrnDmUxmzBYzFktxfVPee+89zGYzRoMa+HYXi8UyqFDTbu+dtp5dMza4DN1WFkWRQMA/Zde/7TYNdfVw1FE7g4jdnvkSTCTVFIlEsPf24PMJ+PwLWLvWzH8+FLA7BDQaaF8ks3wfmQsukHh1TZozHk4Acq73jCRnugjkFzU21FdQecX5sG0b6e9cgnz44cPuaykrQ6fXE/T7WdSeCTz5svd+t5venp6B1yPkZO+WsrJpqypes3q16v5fwsy44DJSWcFUE43CU0+KnHmmRP7lP/44kxieO3fXs5beXvj3v1K89lotGzYICMJCqqu1LF4My/eROPlkaUTPJoFs4BKyGrrM4wOzlmwp40Fd/+LQv/8Oub2D1DXXjPt1TbRdqOqborIrZsynYTrLCv7v/wSCQdBo4Pe/3zllePllGzYbtA5plvjaqwJ/fE5kyxaBdFqmbn6QRYuCfPrTYVbeNofMjmt6XPcWycj9keW8KZKMIGf2kAzBAMdddhaCIJC4776cefZk2FW70HA4PKhdaDqdRqPR4Ozro8xqVbTBl0phKfngEo1E2LZt67SWFbz9lohGA8v3GTxD+fBDC5/7nMzQyVJ9g8x3vpPEbOolEPBTXl5OXX0D69Z+wkSlHELWc0HIOLpoREhLGe2LRoAvXPc9bB4nyUu/h3zIIZN7obtgtHahDoedSDhMMpmgt6eHdDqVm+UYjUYsloyNpZpAnvmUbHAJhUIkk0lcLif19Q3T+gu55mOBxYtlvvrVncq5desgnRY56eThM5Bymx2fz0s6Pb7Oirsi66qmEWRAzJUCCED7G39j2QtPkGxpRfr5z3f7HpNBFEQMBkOutUiWrG9KMBjE3e8el2+K1WbDYlZd40qVkgsuiUSc7h2ZbWWNRsOCpuZp/xV0u2C//QfPWv74RxGDIcVXvrLz8axWxWg0DttWngyCICPJAoiZnSJBBmPQz9GXn4MkCMiPPw4KM6veHd+UIw4/HEtZGY4BwaNKaVEywSWVStHb0zOos2KxCgsFARoadgaRdBp+/aiGs892UFZWTSDgH9hWFmlpbc01b58qNIikBiqLkDPy/y/9/NtY/W7iP7gM9ttvSu9XKEZLIMdiMYLBALFoDH/ATzKRoLt7B0ajEcNA47WZUtw3k1H8XyerVQkEAlRUVCqis+KCBZC/CnvmGRGTCc46y0XXRg8yMvX1DVO+ZSvntp8zCyFREkGAjldfZI+XniXZ1gZX/nRK71kMhs5yNnVtpKa2FlHUDOrcmF0iqp0blYmig0u+VmU62nWMl2OOkVi1KvNF7+uDq68WufOOTYhiirnz6rBabWNcYfeQ5IxBlChkxHMgYPK5Oebys5FFEfnxJxS3HJoqBIRJyd6nevaoMjaKDC5Kt0A4/RsS731Hw403iKxfH+bOO+zsv38FfX2hggUWGKh/HiiEFhBJyzJf/Nm3sYT8pH7yU+R99inYvZXKaLL3UChEJBwmFArh9XhyCmSdTodxYEdRkiTF/GDNRBT1rZUlic2bNk15AnTqkfjxj7pzS7V58zPClr4+R2FvKwCikKmCFWWWvvg7Ov/2R6LtnYg/+lFh710EXnjheWxWG42NE+8FNdIsJ+ubEomESafTdG3ckJvl6HV6LGUWtXPjFKKI4BIMBrD39pJOp2lsasJaplxbgKIv1WQJGRGL28XRV12EpNGgeepJZIV65kwGt8ud+UzsRnAZiXzflIDfT3tHJ7BTgRyJhPH7fKQHLCk1Gi2GAQsDVYE8cYr6bg3qrNjQgMNuR6/QL0l+WUGxlmqZ/GWmucgXrroIczhA8uc/R166dNrHMpMYTYGc9U3J79yoRN8UpVKU4JJMJOjp6SYej1NTU5v7ozrsI1s0FpOROisWC2Fgt2ivF56k89UXSC5ZivSDHxZtPDOZXfmmBINBopEwLqcTe29GgyNqNKRTKTyefqxl1ilr5lbKTGtwkSSJnu5uwuEQFRWVNLe0jn1SkQgGA0iShMfTT1NziyLW4TJg7XPw+asuRhI1yE88Dgqd6c1U9Ho91dXVkDfLAfB6vfQ57ASDQfrd7mEJZEtZGWVFtrCYbqYtuOTnKjoXL5mu206YSCRCT3c3MhmlaNvCiTd4LxSyLPPln56HKR4leeONyEuU+z5OBR2dnSVT+GixmNFotTQ1NeceyyqQo5EoHrcbR+9OpfFs6NxY8ODidrnw+32YzZaCWSBMBSN1Vix0Y/mJcqp9Owu3biSx93LkS75b7OEUnEMGCi83dW0s8kh2j7EsLGKx6KCeRvkJ5KkyNSsmBQ0usWg09+uv1A4AI5UVKJJolEu3dZHSauHxxzJ+DyolSTaBnI8kSYTDISLhCMFgALfbRSqVQhAEkslkpnOjxaLovl9DKWhwMZpM1NTUKjKwKLGsYDTeev+fXPTTC6lpaaW9bwerv/lNbDYbeyxdyp5L92Tf/fZj8eLFuYSvSukhiiJWq22QCNPe20sqlcRqKycSCeNw2EmlMhYWGq0Wg96A0WjEarMpsqfRrNu4l2W5+FqVcbJ5+2YuvOp8Pu76mM/deAYth9Tzzp1/Qn4lyD333sfWzVtYvXo1t628lZ6eHiKRCDU1Ney9994s3XNPVqw4gPrddQpXUQSaUXoa5Xdu9HfvQBpYWul0OkxmMyajCavNVlRtzqwKLpIksXHDeiyWMkWWFWTp97n59tUX8/pbb3DQzw/k/C9fQDplRKP1cuj3D+Xjlo/50le/yJ9++yeOOOJTg87dumULH/7nQz5es4bHH3sMp9OJKIosXLiQvZcvZ9myZaxYcYAif+lUxs9oFhaBgJ9oNIrP58XlcuYsLHR6PRazhWQiyXTNb5X57ZpivB4PLpcTSZJYuKhdsWUF4WiYK265nGeff4alF+7JRXdelHtOo43l/r30hKVYG8r4xs9O53d3/YG5lp2Gu80tLTS3tHDCCSfmHotGo6xZs5p3//1vnn3mGW684QZCoRAVFRW0tLRw0EEHsXz5PixW2O7TIw8/rBp0TwBRFKmoqBzWOiSRiBMKhQiHwkSjEVLpNNORqJjRwSUYCOBw2EEQaGhcQPeO7YqcraSlNNfc+XMe/PWDtJ7ayvkfXDDmOJtWNDP/wTpuXH8D35r/LRZXjR4YTCYTK1YcwIoVBwCZD9uO7dvx+/1s276dj9es4aWXXsJut5NIJGhubqazszNzzgEHUF6utlIrZfR6A1VVBqqqqtXWIpNlUFlBff2kOysWknsfv4frf3Edcz8/jzP+deaEPGD0Bj1VS6u4r+s+ToydxOF1w1uI5DN0Z6xt4SL22Xc/vvKVE3LHJBIJNmzYwOpVH/HXv/6FX/7ydvx+P2azmUWLLB/lUAAAIABJREFUFrF4yRJWrDiA/fbbT7G5KhVlMKOCy2hlBUrkyecf56c3/RTjHkaOfeE4bLU2RN2uf1G2rN5My7LBqmZRFKlZVMMft/+BHRt2cErrKei0gye9kiRh7+0ZWArtemdMr9ezdOlSli5dytdPPS33eH+/m48//pjVq1dz/333ctUICeT991+h2NowlelnRgSXoZ0VlVxW8Opbr/C9ay4lYotw1NNHMWdBDYlEgmQiSSwSI0QAyAQNrUaLRqdFZ9Dj7/Gx9q21w4ILAAJUN1Xzt5f/wh0X3c5ffvc3qst31mt5vR7Ky8snJWKsrp7DEUd8algCuatrI6tXrWLN6jU89pvf4PP5kGWZ1tZWlu+zD3vttRf77rtfyShtVaaOkg4ugiDgcvZlgkpFBe0dnYrVenzw8Qd8+6qL6An38NnbPkfrXjuDhMFkgLzNm5ScIpGIk0qmSMYSxCJRXnn2ZZZ/ZjlerweNToNWp8VkMCPk5f7bP99BOpnmkCMP5pG7H6HKUplTRhcq17Rw4SJaW9s48MADc5qhyqoqVq1axapVH/H8c89x/XXXEQ6HsVqtLF68mH333Zdle+3N0jGquQ859BAMegPpdKogY1cpLCUbXFxOZ6aBusGgaK3Kpu2buPhnF7Kmaw2H3XgYXzziS2OeoxW0aA1aGOhpFAvHEKMampe2kk6lSCdTxCIxIqHIQL8iDaJWg1avpeHTjch3yXzlvON58NaHOPazxxX09Y2mGVqxYgUrVqwYdKzT6eQ/H37Iu+/+mxdffJG+vj4SiQSNjY25BPLBBx+M1ZYRknUM+K2Uqvx/tlNywcXT34/L5cRoNKLT6Zg/v06RgcXj7+fin13E62+/wYor9+f84y/Y7Wt9+PKH7P3ZvTBpjZm/WJ68QUIikYwTjyQIB0IIgkBNWw3HPnMsl/7gu5jmGzmw8aApbyrvcjrp73dPqGastraWo44+mqOOPjr3WDKZZP369az66CP+9re/8qtf3YnP58NkMtHR0cHiJUtYtHAhNbW1UzZ2lemhZIKL3++jr68PURBZ0NSMyWQqWmuRXRGJRrj8lh/y7PPPssf5S7nwjgsRxN1fqsmSzKb3uzjw6tNGfD6ZThIKhpAlGVu5DZMhk9tIzklyyrOn8NT6p+hdZ+dAa2YberJN5T39/bjdLgwGw5TUjOl0ulwC+dTTBieQV69azfvvv8cTTzzBjTfeSDQapaGhgcWLF7Nkjz047LDDaWiYGpc6lalH8cElEonQ29ONLMvU1dUrtjxdlmX+9Jc/cctDt5DaL0X7le1o52rZ0LWe2pq5VFZWjn2REdjw/npa921D1AyeGcTTccLBEFJawmQxYzEODhI6QYfOqKN1rzI+6v4IMaTh6wu/jpRM71ZT+fzgPh1tc5OJJHV18zn11FOZlzc73bplC//56D98vGYNv3v22VwCuaWlheXLl7PnnsvYb//9p7yti8rEUWxwSSTi9Pb0DLJAUCp/+MPvuW3lSg477DD+8ft/EJNjrOlfwyfeT1jfs543oq8TSATQanRISJiMJkxmIyaLCZ1Zj9lipqzMgsFgwGgyYTKY0Ov1mEwmPvzrfzj2kmNz94pLCSLBMKlEEmOZCS1a0qk0TreTaCRCNBolGo0RjUWJB2NEghGikRh/Dv+Jrc4t/GDfH47cVD4cIhwKDWoqL4oiWq2WeDwOwIKm5oLv+rhcTjz9/ZhMZixlZWh1+kFLrqwCOV+bE4/HWbVqFatXreKFF57nxhtvIJVKodfrByWQ99hjD8Um/GciigsuqVSaPsc25VsgAG+8/jrXXXctixcv5o/PPU9tXl5gb/YZ1FMnGomQSqVISxJ9cQfulBtvyke/1I/X48XV68SfCLA9voN4OkY0FcXX78Pr9PLc08+hETRIpIkn40iihFE0oRf0GHR6REHEqrdi05dTYSxnnn4+1aZq6ubU0dzaTKOtkebKFoKBIMcdeyz33nMvbQsX5sYqiiI2qw1bXkVuNBqle8cOYrEYRqORVCrNju3bANBoNFPeVN7j8eDsc2A0GnN2oln5f34gGQmDwTBqAvmDD97n4zVreOWVV9i2bRuJRIIFCxbQ3NzMoYcdxsEHHTwjvFOUiGKCiyRJpFMptm/bSnX1HEVbIPznww+58sqfIooi99x7L+3tHSMeN1pPndZYW66iNRaPDa5ozVuaXPrwdznz29+kqWJBzhy8obFxtxOz5eXlPProrzn33HO44vIrOPyII4Ydk06n6enuJhqNUD1nDnPm1Aw7Zneayo9GIOCnz+FAFEWamlumdLlVW1vLF77w/+19eXxUhbn2M+uZNctM9oUQ2SFBRRQrCGq1Aoptb6Xf94mKraLe9qooWgGhV3bEHaHXCgJWai2KULW91rZhEQGXKpIFCFtCMksmyexnm+Wc74+Zc5hJZpKZyUwImOcffsx6ZnLmPc/7vs/7vDMxY8ZM8TaTqRXHGhrQ3NyMf3z6KTZu2BBVQB47dhwmTZqEKydMGJCNgosJAyK4mM0muJxOAMBlw4YN2O14Z8+cwZIlz6C1tRXPP/8Crpk0KaXXiT/R6gZFkXA6HWhqPYvas0eh8anQbrPBYDBCn+APtieUlpZix4738OC8eWhubsY9994rvr/Z1Aqv14vcXEOPwT3RpfJA/AIyRVGwmE3gOA4lJaUZN0EStjcQBIGp027oxrbs9k7U1tbi6NGj+N3vNuLMmTNgGAYlJSUYM2Ysxo4dg8lTrkfFAL7oDTRc0OASuVlxxMhROHPm9IU8nLiw2WxYsXwZjhw5giVLlka1UtOF0ERryLfD5XJi2/5tmD1pNsrLh4D1sWBoGhazCYFASFAml8uhCi9lz8rOTmoYTafT4e3t27HkmVCglMmkcDocyM7OTlkz1NNSea/XA4qk4HK7wAWDCIaZjlqtRl5+AYgMmp+7XC60WS2QyWSovOwyKJVEzMcZDMaYCuTIAvLOnTths4VsDEaNGhVVQFYoBsR1ekDhgnwjLqcTbW1WKJXKAb1ZMchxWPfcWuzevRsPPDAPr23YmNH3EzpjHMeh5lQN9izbB4VcAR26L4mLlZp03amj18dnOjKZDAueXBAV3DOh4hVYTiAnALPZBIokkV9QABWhAkVRcNg7YWuzim75SoIQLR05jkv5fSmShMlkAiRAaVl5yt2j+AXkI/juu++we/curFmzGj6fD4FgAEUlRbj26h9g6rRpuOqqq77XBeR+DS4ejxtWqxVSiaRf2pmpIhAIYOuWN7Fp0ybMmjULW7dtg0atQUdHO7RaXdqP2+djYWpthd/vR0FhIYIyDo/NeLzbAGIkYqUmPp8PFEmCDC9lF/ZASaUyEAQBjVYDvV4PiqRgs7X1S3AX5r5cLheyc3KiNj8IStyo4w8XwNvarJg48SoAwMmTjeJS+aysrLjsI/Qa57uMhUVFGVlaFioghywsHHY7jhz5FgeOHYCvwo9Obwf2fFODPy7dDnuLHQgApSWlqBpVjeunXI/p06cP6CZFOtEvwaW/8+u+YNeuD/D8unW46aYfYt/+z6BWq0W39lA9wSlqQ/q67jMQCKC1tQUswyC/oAAGw/n28Owps5M+drGA3EVTQ1EUSK8XTocTbVYrJBIJpFIpeJ5HZ2cHtNrQ8i+pVAqaptMWPNusVjgcdmi1OowaPabXdCteAZwkSXGpvNPhQDDM0s4XkDXQqDUwmU1gGQYFBYXINRjS8hniweNxo76uDnuP7IXvMh+G3l8JQhsOenPOP47neJyra0ZtTR1e/+R/sPyVZaBdNLQaLYZVDsPY4WNx6/TpmDp12oD0mu4LJAzr4zP14qbWUCszEAigqLikV9OhxsYTqKioSLig23jiOIZWXpbwlbfxxHEMHzEy5kn+908+wZo1q1FdXY1nly3r9eoSue6Tokj4/f7z1F6phEqlhlqjjnnl7GoOXlRcnNDxpwohuPM8j+LiEmh1uqidOgxDw+fzged5PProo5gzZw5+9KNb4x5/bxCKpyqVCqVl5RlJtwKBAEiShNfjhsvlOr9qlSBAKAmoNeqMsEyKonDsWAP2fbMXzjwXKm+uhCYnee2P+aQZh35/EP6mAHQKLUwmE2iaFgvI48aNxZgxY1FQWICSkvT5IFssZhiNef1Sisgoc/H5fNBnZaGgoLD3B18gfPnlF1izejU0Gg3e3v5HlJeXJ/S8ntZ9esNLzdttXjE1EQqwfr8fDMMgq0vxlGTIbipbADhpbsS3p4/gymFXYETJyKQ+G8swMJtDKULX4B6vALvzgw/w4Lx5OHXqFObOnRuVWoW0LVros7JiXmXdblc47ZViaGVlRrt+crkcNEWJdp2CijdTLNPnY3H2zBl8dugzfG3+GkU3FaOyKvnAQntonNt3DiVUCX731OvIy4u+iJ05cxpHvv0WR48exY4dO2Cz2QAAo0ePxrhx41BVXY3Jk6dcFArkjDIXs9mU1GqR/mQuJ04cx6qVK+F0OrFm7XMYN25cQq+RKkytLXC5XJDJZJBKpVHrPoNSDm/s+T3Wzl0XxapW7ViJ//nb71CcW4wz1jN4b+H7uOnyH/b6XoFAACZTKxia7pZuJQKe57Fi+XI4nA688MKLkEgk4g+ZpilRsQuE6g9yuQIURUIikaKktDTjJ35bmxVOhwNqtQalZWW9dsq6skyBpSXCMru692m1OthsNpjbzWhub4bZYYIr4II0RwaiRAl1vhq5hblQaqLPSZfFhf1b92N86Xj8n+v/b9yWtmDNKpVKUVpWDpVKFaVAPnasAfX19SBJEiqVCuPHj8eVV4Z8c6qqq3stIPcnc/neBRetVoe1a9egvr4ey1eswJQp1yf03FQR2RkrKS2LOlYhNXn1w1fw4wk/hlquBsdxkEqlqDlWgwOnD+DVX6yH0ZCHb898i+d3rsM7T/0p7ntFplvZOTkoLi7p07G/8847KCwowA9vvjnm/RRJoqXlXJgZyMDzfBRLCI016FJmMEePHoVKRYgiRYfdDputDQRBdPsuU4HP5wPp9YKiSDF9BwSWqQ6ZWQcCMBiMKCiMz755ng/tim6zoqm9CWdtZ+FiXWCVLKS5Uny+6wCa95zD4qcX4965c2O+hqCIBkKpq07fvUPYFe3t7fjm3/9GXV0tGhoacPbsWQSDQZSVlYkWFtdee22UArm34EKSZNouDt+b5rzdbsfmzZtx6NAhzJ8/Hy++9HJGo7fX64HFbIakh86YVCqFTq+HQqXE5eOuFG9nWQZHa2qxZvZaODod6GzvgIZXQafUouXcuZjU3mqxwOl0QKPRps3f5q677op5e6SKN1bxNFLbYrfboxW8PQxHdsXXX32FXEMuioqKolS8XbtkqUKpVEJpMHQ7/uamJjidDigUCshkMjgcdvH/KpU63HU73+aXSCQwGAwwGAwYE+6GcRyH999/HxuXv4bpM2bgqaO/ifl5BWtWn8+HvPwCGJIoROfn53ezsACAU6dO4YvDh7Fv/z5s2vQGrFarqEAeNmwYpk67AVdccUVMxrd58ybU1dbi1fWv9XmO7JIPLhRF4amFT+Kvf/sYP/npT/Hc8+ugVWvQdPaMSI0VCgVUajV0Ol2ffU9IkoTFbAbPJ9YZq2uuw4jS6FrKnvo9WDR7Mcrzztd/OI5D4deFUCgUUcOFHMeJU82ZNiMPBoOinajBYIyr4u1JwUtTNNxul3j8QCi1ipWaMAyDNqsVbVZrv6l4Bd3PqNFjooJBpALZYbejzWqNSq26LpWnaRoetxv//FdNTOYuBGiKImEwGNNqzTp8+HAMj5gdAwCn04kvDh9CQ8MxbNu6BS0traAZGmWlpRgzdmx4wHMi6mpr8fbbb+PA55/jtfWv4eZbbkn5OC7Z4BIMBrFy1XJsemsTJvx8ApbXrQDpJnGo/RBoM41AZwAqnwoFWQXI1+QjV50Do9EoBhapTJbUukyWYWCxmMGyLAqLihOe4m5ub8LQgqFRtzWaGzF9woyo2w4eP4irR14jdpZcLhesFjMUCiWyc7Lh9/nQbrPBarGA4zjIZHJoNBqo1Cro9foetSG9ged5WK0WOB0OyOVyjBqd/OrYeAVklmHgDe9I9kYUwIPBIDo62lFaVoaKoZUZZZlOh0PU/QwbNhyKGO/V21L5rhYWMpkcP/rRj+Bxu2OyTMG9L1L3kwkEAgF0dnSAZVlMnXYDbp0efV61tLSgvr4OtbW12PHnP+PTTz8FEBp1mTXrdsyceRsWLV6MiRMnJv3el2Rw2bhhA557ZS1G3jISK46uhCYrRO8ILQFDsQEYf/6xlJPC6fbTYNtYsMdZyBgZdDIdKnIqMLRwKIwGo7guE+hO7QHAbDKBokgY8/KSvgJV5A/FX7/6GBOHh/54do8danl0IGvpaMG2f27BpkfejPK3KS0rj+tv0zU14cNqV5lMJg4X6nS6XlMToa2sVmswYuQorF61CkpCiYULFyX1OeOBUKlAqFQwGkMBpbW1BQxNIzc8SxUMBNDcdDaqzU+oVGlhmULxlAdQVj4kpTRAoVSipbUVpaWlKB8yBIBQQCbh9Xhjs0yFAiUlpd1EhOlEMBiEvbMTFE0hLy8fhUVFMR9XXl6O8vJyTJ8+A8FgEEbDeY0Uz/PYs6cGjY2NuHfuvZg///GktDiXVEH3T+++g98uW4q8qjzcs/FeGIuTXy1ia7LBus+KqRVTceOkm7oVYL1eDyiKAk1RYBhGLMBqtFpowh4kyZ6kP15xB6ZVT8N/zvwVdh7ciaEFQzFl7BQEuSB2HNiBNz55HdseeQtBKoBAIIDikpKoheWJQqD2FEWBoWn4/f641L6n4unLL7+EhoYGbNiwEQSROiOKPK5Yup/t27cjNzcHt912e9TxkyQJH8uKXatkWWa69lqdPXMGK1Ysh0wux4oVK1EU5wfc2dmJjnabKHCkyOgCslQqSyvLdDoccLldyM3NTUqndOLEccy56y7cdtvtuPYH1+KqqyZG2Ygki0siuBz97jvMe/ABnDp9CqNvGoPRN4/GqB+MwrAJwyGVJ0bfnRYnLPssqM4ajxnXz+gxQEQWT8vKyxEIBOD1eMAwNGiaPn/SyGSibF2v18f9XE7SiYc3PoR/fPsp9Bo9Jo28Fv6AH1+d+hKTq6Zg8cxFICRExpSnNE2DJL2gqdC/ggJWoVRCo1ZDp8+CVquNYjkffvgXbN68GVu3boOxD/uhhO8yKysrynEuGUSmJqGAH5tlCpPffd1r1dbWhrVr18BitmDJ0qVxtxhEuveVlpXFDXqRS+UZlkmZZbpcTjgdDmRlZSMnNzfp1FW40KQLF3VwOfDZfrz++uvweDxYtWo1hlRU4IvDh3Hw4EF8c+QbnG06i9sevg26Uh0kBRJo8jXILcqFSn/+9SknBfMBM4qoIvzHTT/r0Y5SKPipVKqEWqHCcCHDMGB9rDhcKJfLoVKruw0X1jXXYeaz0/HLm+9HnjEPVxVdhVwip19UvCRJwmoxiyMaao2mR22IkiBw+vRpHGs4hgcfeijp9zuv4lWjtKws7SreSJYmMAUAIsvUhllaKqnQu+++i/LyckyePDnm/WJRHyFr1lRau/EU1LFYpjc8vKrT6WAwGNPSKUwHLsrgYrFYsHLFchw/fhyPPvooRo8eLbKEELXMiupWuN1u2GxtaLY0o6mjCR/u+hCN3zXCWGnAyJKRuOfOe3Hd5MlxKb47nJvLpFKUDxnSJ9oaDAoetl6wDAO/3w8AkMnk2N+4Dzv//QF+/4vX4fV6kZWdjeLikoxO1rIsA4vZnLCdaCx3PeB8aiIMR8b7G9rtdnS02yCTyTBkSEXM4mk6EVk8LSouSYhl9jYcGQ8+H4vWlhb4/X4UFhV1WwifDtA0DY/HDYZmQNMUOI5DdnY2CouK+20HdKK4qIKL2+3Guueew969e/D440/gZ3feKd4XSY1Zlu1V9s0wDI4cOYKmpibU1dZCo9Vg8eJnot7P6w11L/pyBUoUFEVh7qv3oCS7BA/f8DCkUmkUy0nG3S0RBINBtLScA8swabETJUkSJOkFQzNgWSZKgaxSqyGThvQiEqkUZWXlGffijSxEJ+LeF4tlchyH5uZzGH/5+B4tLLqqeDM99cyyDDra2yGVyZCXlz9gBx4viuDCsiw2vLYe7733Hu6//348MO/BhK7mvcm+Bd+TrkUvYWyfYRg89thjIFQqVFZWorqqGuOqqnD55Zen9cfhsNvR1mbFtauuxdZfb8NPf/Af4vHHosZAfG1IIt+JoFXJycmN20VIFW63W5ywDgQCYpsXgBgwpTIZlAoltDotdDp92kRxQGj1ic3WBrVajZLSspR/eP/7v3/Diy+8gNtnzcLs2bPhY1n4fD4AIZYZSk00oOhQcT8T32VX+Hw+dIa9e/ILCvrEoPsDA7oVzfM8tm7Zgo0bN2DGjBnYu29/UidiT8OFpNcLkvRG+Z7IZHIEg4FQSy7cVv77p/8Ax3E4e+YMautq8a9//RNarRbjx4+Pek2GYURFZ6IQ/GMlEglKy8vx1B2/wfSrzusQ4mkrhOFIhqHR0d4uCrp6o/aRKUJf9kb3hH379uLP776LDRs3wulwgGVZFBeXRBWiExkuzM7Jwf59+6DV6boZb8eCy+WEra0NUqkUlZddlvLIweHDh7F69SpMuHICdn6wK+Ykv1BT8Xo9YsB0uZygKBKE4A6YRpYZCATQ0d4Ov9+PvPz8fvNB4jgO27Zuhdlixp133onRo8eI9zU3NcFkNuO6666L+/wBy1x2796FtWvWYOLEiVi5clU3j5J0QqC1JOkNMRKJBD6WFZ3QCIIInzSauNR4//79eOnFFxEIBlBSUoKqqiqMrx6PG268sdtjKYqCqbVVTLfStYspFDBJUDQFv88npiYSiURctTGkYmhGaXQwGMT77+3A+vXr8frrv0d1lyAcD7FY5s6dO5GdnY2ZM2fGZZld91r1RcXr8Xiw7NlnseDJJ1Ecp4AeqeItKS0V0+yuxx8IBMTzp7fhyHjgOA52eydIkkSeMa/ffZA2btyA6bdOx3dHv8Orr7yCffs/E++be+89AIC3/vB23OcPOOby1ZdfYeXKFTAajXh/5wcZ36gXeTWPZWgUmZr0JPueOnUqpk6dCgAwmUxoqK/HyZMno4ILyzIwtbaipaUFo0aPiauLSBVanS7qBHSGh+mkMhl0On3YNuB0eCeRLGK4sO+pSaTj3NRp01A9/nI89ugjeOHFl3D55Zf3+vxYLLOwsAg6nQ76rGzQFIl2m02c15LKZAgGAuB5HkVFxWlp0ev1erzw4osx7xN0P/Hc+3pjyXSYZYoWFj2wzK5alYqKaAV3f6CzsxMURWHY8OHYtm1bN8vRAwcO4De/ebrH1xgwzOX4sWNYvnwZXC4XFi9ejLFjx6VtJ04s2GxtcNjtCY/td0VkakLTNILhAqBcroii9jKZrFvB75133sG+vfvAsAxysrNRPX48br11Oq644oq0fDZBeQqE/GNj1YfiF8BlUcbfibSIbW1tcDjs0Gi0KC0rEwN0e3s7Nm/ehEWLFqf0OWLtLfL5fDCbWsEwjGh6FckylUpluAAen2UCoa6VKsxGe4KQbkkkEpSWlactJfF6vSGWQ1PwsWzUnBvP88jJNSA3Ba1KunDixPGQjqusDGPGjMa8efOwYMGTAEIZxvjqanx75Ig4qBkLFzy4mEwmrF2zGvX19Vi1ejWuvHJCt6o9kNpOnFiw2+1oT+PYfiQ4jgt52JKk6Hvi9/vFrk92dg70ej00Wq140jgcDtTW1iInJ6dbHcfj8aCurg7jxo1DVgJScUF5ynHBlFS8sdz1hAJyLGofucgs3d8lEB1cEnHv660ArlZrIJVJsWXLFuzduxcbN2zEZcOGxXzvkO7HAo4L9svQpNfjQWdnB5SECvn5+Rlx70sFhw4dwk033oDjx0+gYmiIQW164w2sWLEczedaegx+Fyy4uF0urFu3Dvv378PCRYsxc+bMGK8QQizZt7BuNNZEaix4vR5YLBZIIOlRLZkuRKZbBYVFIMlQPYQJays4joNMLu9Rtm6z2bBp0xuor6uH2+OGVqPFmDFj8PgTT0QVGoWxfZZlUVhYlPb6VFffE5ZlIZFIwPM8dHo99Dp9RljmnpoaqDUaVFQMgcvpTFnF6/P54HA48Ie3tuGDDz7AnDlzcPPNN0exTMFdL9UB1FRB0zTabTbIFXIUFBQOmKAiYOmSJdizpwYHPj8o3nbP3XPA8zy2//GdHp/b75+EYRhs3PAadu7ciV/+8n6sXLWq1+fE75qw8HjCO3FcrijZt0DtFQoFrFZrqHga9o/NJCILfsOGjxBPlp52+tAULQ5Hdt28+PTTC8XXoCgKDQ0NYn2E4ziYWltBkl6cPn0aarUGuUm6ziUCwfeEUKlgNrVCoVCguCRUzPR6PfB6vXE3L+r1+qiU0+/3g6KoXv2UAaCqugr2zk74fX4MHzEy5R+eUqnE7l27kJOTi/2fHYBCoYhimYIFhCBoVCgUyMnJhVwmE2fH0g2fj0W7zQaJVIqi4uIBu16nrq4O4yNqZjzPY//+/XjmmSW9PrffgkswGMTWrVuw6Y038POf/xz7PzvQ5yitVBIwGglEjogILMftcsFiMQMImfnIZDK0d7SDJMleWU4qEPQcCoUi4XUdPfmeUBQVNVErCbO0IeXlCAYCsNg74XI6xXUdDOtDTc2/8Mc/bkebzQZ5eOT/V7/+dZ8/W+S6jq4q3t42Lwo7iQSW2Waz4ckFC/CHP7yNystiT5C7nE5YrRYQBCHuje4rHnr44aj/C0ZdGq0WVosZDMPAaMxDQWGhePwdHe1gTa2hxyc5HBkPkRYIBYWFadX4ZAIqlQr5ESt9d+/ehba2NkydNrXX5/ZLWvTxxx+J6zoWLV6cUaVrPLVkV9l6MMwSEh0ujAeP2w2LxQypVIay8vKMnSwsy4QYQns7AoGAGDCF4Ty1WhPWCATLAAAMVUlEQVRytQunoH6/Hx0dHTFbqi+++AJGjRqFqnFVGFpZGfc9/X5/hBdvYZ8GFH0+Fm6PBzRJ4WzTWfzmqacwf/58XH311SLLlEilaLf1vXjqcrkSYkbC0KRWq4sqRMdC1+HCZN31otrKefkXhcE2EKq5PPH4fKxZsxYnT57Ee+/tQGNjI842NfdabM5ocPnwL7vx0ksvoaqqCs8uWxZzqXm6kKryNNWJ1HSN7SeKeMXTeMOR8TYv8jyPAwcOoL6uDrV1tTh37hwAYOnS34piNY7jYDGb4PF4kJtryIjy1OVy4Rf33Yfbb78dt9xyC9xul9hiloZXhGjUmqRY5ulTp7BixXIMGVKB5StWxH2c0Cns6+oTwYKDJCmwkcOFQi1QrYFarQbrY+H1emE0GlOyyrjQcLlcOHbsGEaOHIn77puLyspKvPrq+l6fl5HgcuxYA1atXAm5XI4nn3oKWfos8OAhl8lC5kAEAYJQpS3PtFjM4q7jVMf2IxEIBEKtQooEyzCi7Fsqk0GpVIKhaVFfkUlxHxAe27daIZOFmFEizCpZ3xOe5xEIBEL1qYhCdGPjSdTU1KB6/HhUVY3DiD7UPWKBokgse/ZZ3H333SgfUiGmW8myTIvFgjVrVqOjvQNLf7s0bns0cm90XwdQewLLMvB4PHDY7QgGg/0y1Z4JLFq4EHX1dfjoo48BAPX19Zgy+Toc/uILjBo1utfn9ym4nDhxHJ988gkee2w+gJBl3nPPrYXb5cKzzy7r1uYLBoNgGEY84UORnoNCoQgFHSUBlVqd8Amc6bH9SAQCAbScaw7L/JVhZ7EuBWStDnq9Pi3H4fV6YTabxO5WOmaZooYLu1hAAKEZLiFFkMlkoGkaDQ0NqKutRV1dHU6ePAmNRoN3/hR/A0Ei6GnTZCS6mkXFYpkUReHpp5/Go48+hslTpsRkmZEq3uI0KqLjYaBaICSL635wLW6fNQuLFz8DkiTxkx/fgbn3/QJ33313Qs9PObiwLIubbrwBJ0+exOcHD+KtbW+hoaEBv/3v/05aDBZaFEaHAg7Lwh8IQCqRitRerVaDIAgxxxPG9uVyOcrLh/Tr2H5JabRiONXhyHjoj7H9SHR0tKPdZhMLroK2RSqVho49Qd+TRQsXIhgMoqqqClXV1Rg7dmzMYq/Z1AqSJJGdndPr1TyWiK4remKZCrlc/H9JaSl0ut7XdfQFQhFYo9bAYDQOOAuEZLFr1wdobm6GilChtq4Wd901J66HTSykHFx+9av/xJY33wQAVFRUYNPmN0X5ezrAcZzIchiWgY/1geOC8Pl8CAaDKCgsRHZ2TkbZiq2tDXZ7p+g4l8wVKFnfk/4e2xd0P1KJBCWl3XU/XRXIvbnrBQIBNDY2oq6uDnW1tTh27BhmzZol7umJ3BvdW/HUarWiqKioW3AR0qPe/uY+nw8t55rh8/lAEASCQa67O51ag6ysrLScPwzDhLUqigElgEsHeJ4Hy7IpNSpSCi7Lly3D6tXn9SkEQeBobV3cLXLphM/nO890GAb+8ElPKAkQBCEynb5QUcHzlCAIlJUPSevJQpKkOGviC9dCBFGdSqVGfmEBdH00nu7t/a0WC3ieE/dGJ4NYBWRRm6PRdCsgC6mroIi2mM34r0f+CxUVFaKFRVVVlVhvoSgKd975Myx4YgGam5vF4PLxxx9h/fr1ePnlV+Jux+xNxZt+lhlhgZBfAGUa/IQvJSQdXJYuWYLnn18HADAajSgqKgJBEPh/d92FRx55NCMH2RuE6MqGGQ7DMOB4DhJIoFaroSSUIIjumpKuSNTzNF2ILERrtLrQyECY2gupiUKphFarhVabvPF3JHraG91XCO5ukZsLBZYBAEZjHnINuWIBled5NDc1obauVmQ6L7/yqmgGTVEUHnpwHto7OjDhygmoravFNVdfg8fmz485BiGsPnE5nSm59/XGMlUqFbJzsqNYmqBVyS8o6DcLhIsNSQWXPTU1OPzFYVw98Wpcfc01aT1BM4FEC8jCMFx/Ffzije13RSLuesJwZDxEplup7I1OFhRJwmQyARIgLy8fHBcE6T1//ADE71+n1UHXRcErgOM4LFjwBABg4cJFKIyzTtVma4O9s1McmkxnnaMryxSGIxUKBQrCE9uDiI+M6lwGKoQ6DsuyYYpMQS5XICcnB0pCCZVKBaWSSPtEauTYfmlZeUqt+ESpvV6flda90b0hUsVbWFQUN7XgOC48p0SBpqmU3fUiF5llYmgyEpEWCDk5uRmfN7pU8L0MLrEgpFY0TYuWhkEuCKVCASVBiCd+KkZLkXuj0zm2Hwmfzwev1wuaIuHxeMT1IMowrVdr1NBpdSDSrCAWVLwsw/Rp9UksC4tY7nosy8JqtfbbAGpf13V8nzEYXHqBkFoJrfKAPwAefEIFZIqiYDGbxHUd/TU0GanijSVbjyzAqlVq6FPomgSDQdHq0WAwoiBO2tJXCO56Ho8bDMOEVLxSaShgqjXQaDV93rwYC4JWRa/XIzfXcNFqVS4kBoNLChBYDsMwYMMWBDx4yKTSsAhQAYe9M5wiZH5sX1CeSqUylA/pXcUby/dEQCIWFl3XdWTyhxdr9Uk8BXKkO6BWp0tpfoeiKHS0t4MgCOTl51/0WpULicHgkkYEg0EwNA2n04FAIAiEGbRSqYSKUEFJhFKUdJ2wpKDilUhRXFLS52E4X3gGxuvxigVYcb2JSoVAIAiKIhPSqvQVkXujE9X9xCuAJzJcyLKMKCbMLygcsOs6LiYMBpd+QCwFMhDW5oRtF1QqVcL5PMMwMJta+7Q3OlFwHAer1QKnwyGmJADENrlGHdK2pCvli1Tx5uYa+pxucRwHL+kF6fVG7ccWFMgqQoVAIOTjkpefn/LWgEF0R6/BpensWfzlw79ALpdj7tz7oFQq8e6f/gS7w46f/uSnovXdIJJDvAKyXCYLaXLUqm4F5GAwCFNrK2iaytje6Eh4PO64xdNY2hCe53t11+sJVosFDoc9bQOoPYGmaZhNreA4Hvn5+RkfQP0+osfg8vXXX+PfX3+N+x94AHtqavDSyy/h+uuvx4MPPoQtW97EzvffxxdfftWfx3vJw+/3g2WYUKucYRAI+4bwHAeappGVlYWS0rKMdi1Cg36mlNz7eiwgx0lNEtX9pAM8z8Nu74TH7UauwZDUqo9BJIe4f0W/34+PP/oIzy5bBgAYMWIE9tTUYN68ecjLy8OxhgbMnHlbvx3o9wUKhQIKhQI6/fkhO8GSkQcPhg6lRMFgaCeRSqVKWIHcG4TVJ4FAIKG90bEQz13P7XaDokg4nQ7RXQ8IsTGZTJZxTxye5+FyOuF0OpCTa8DQytgueINIH+Iyl6azZ+HxelFdXQ0A+Nvf/oqfz54Ni7UNen1mp0sHkRjSZWHR30OTkatPsrKyEQj4xbEBINoDOSs7u88F8EgLBKMxb1Cr0k+Ie9Z1tT88+PlBTJgwYTCwDCDIZLLw3FF0l0goIDMsA7fbFbeAzPN81KDfkAwPnibq3icMR7rcLnR2dkQIAmO768WDYIGgIlQoLx8y2FbuZySc3O7btxdTp07L5LEMIk0QUqvI6wDHcSFtDk3D5XSijWXA0DQAwJiXB7VKDb/fn5EWbLKrT2KlVpEFZGFzYbwCMsMw6Oxoh0QqRUlJ6WBb+QIhblrE8zz8fj+USiVcLhdKS4rx9vbtorfGZ599BoPBEHf8fRAXB+IpkBUKxflZnxQtLILBIMwmEyiKhMFgRH546jmdoCgqNKtEU2BoGhzHQa1Wo7S0LOMmYoPoGXGZy91z7sLJkyfx5Vdf4y+7d4PjONE3k+M4fPr3v2PZ8uX9dqCDyAxipVY8z8Pv84H1hQY7nQ570gXkSBXviJGjMtZW1mg0UCqV4DpCFhuDFggDB3GZyx13zMLEqybihhtuwDfffoNzzedQXFKMO+64A+/teA/33HPPoMble4bIAjLN0OISMaUyFGwIggDp9abs3pcsotZ1GPMyPrs1iOQQN7gwDIM9e2pgMBgxadIkAMDBgwfhcNhx4403pcUwehCXBgQLC6/HA5qmIZfLIZXKQlsexG0P6bOw4HkeDocdbrcbBoMh42tdBpEaBuX/g8gIElEgE0oiaWvIQQuEiweDwWUQ/YpUC8iXyrqO7xMGg8sgLjh4nofPx4JlfWDoUNDheA6ycGpF0dQls67j+4TB4DKIAQuB5SiVykGtykWI/w+E/VXDyXCQkAAAAABJRU5ErkJggg==[/img][br]En coordenadas cilíndricas, mediante coordenadas radiales, acimutal y altura: ( u, 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[/img][br]También s epueden emplear sistemas de coordenadas elípticas, parabólicas, esferoidales, toridales, etc.[br]