[i]Calcular la nota media aritmética de los datos correspondientes a las notas de la prueba escrita realizada en el ejemplo 1.[/i][br][br]Vamos a utilizar la hoja de cálculo para completar nuevas columnas que nos permitan calcular los valores que buscamos.[br]Recuperamos los datos del ejemplo 1 que corresponden a la tabla siguiente:[br][br][table] [tr] [td][br]  [b]NOTA[/b][br]  [/td][td][br]  [b]Nº ALUM.[/b][br]  [/td] [/tr] [tr][td][br]  1[br]  [/td][td][br]  2[br]  [/td] [/tr] [tr][td][br]  2[br]  [/td][td][br]  3[br]  [/td] [/tr] [tr][td][br]  3[br]  [/td][td][br]  2[br]  [/td] [/tr] [tr][td][br]  4[br]  [/td][td][br]  5[br]  [/td] [/tr] [tr][td][br]  5[br]  [/td][td][br]  4[br]  [/td] [/tr] [tr][td][br]  6[br]  [/td][td][br]  7[br]  [/td] [/tr] [tr][td][br]  7[br]  [/td][td][br]  3[br]  [/td] [/tr] [tr][td][br]  8[br]  [/td][td][br]  2[br]  [/td] [/tr] [tr][td][br]  9[br]  [/td][td][br]  1[br]  [/td] [/tr] [tr][td][br]  10[br]  [/td][td][br]  1[br]  [/td] [/tr][/table][br]Para obtener la media bastará con completar la hoja de cálculo con una nueva columna, definiendo la fórmula que realice el producto de las celdas que se encuentran a la izquierda, es decir: A2*B2.[br]Pulsamos sobre el icono representado en la imagen siguiente para que aparezca la barra de entrada que nos permitirá introducir una fórmula en una celda.[br][br][img width=209,height=81]data:image/png;base64,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[/img][br][br]Aparecerá la barra siguiente:[br][br][img 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[/img][br][br]Situamos el cursor en la celda C2 en la que queremos introducir la expresión A2*B2 para obtener el producto de los datos por las correspondientes frecuencias.[br][br][img 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WYXRc/tCy/5/IP+/q/40f2hZf8AP5B/39X/ABrPiu7qWSZFtoQYX2NmY8naG4+X0YVJ5t7/AM+8H/f8/wDxFFmFy5/aFl/z+Qf9/V/xqvdXVvPLarDcRSMJScI4Jxsao/Nvf+feD/v+f/iKPNvf+feD/v8An/4iizC5Hc6TZXcjSTRuWbrtldc9uQCKfFp1tBAIIVeOMdAkjDvnrml829/594P+/wCf/iKPNvf+feD/AL/n/wCIpco7k0USwxiNS5A7u5Y/mSTTLu0gvrZ7a5TfE+MjJHQ5HI5HNM829/594P8Av+f/AIijzb3/AJ94P+/5/wDiKdmLQlggitoEghQRxxjaqjoBUlVvNvf+feD/AL/n/wCIqO3u7q5top0toQsqB1BmOcEZ/u0WYXRPYXOnx2sMhntlmMEaOxdQxAHAJ68Enj3NMvoPD2pgjUIdNuwduROscmdudvX03Nj03H1o829/594P+/5/+Io829/594P+/wCf/iKLMLj7BNC0qBoNOXT7KJm3mO3CRqWwBnC45wBz7VXudM8K3l6b66sdInumIJnliiaQkDA+YjPAA/KpfNvf+feD/v8An/4ijzb3/n3g/wC/5/8AiKLMLjL+w8MarMs2o2mk3sqrsV7iOORgvXALZ45P51Ho8VlpU+pbLmyjt7m5SS3jikUCNFgiiC44A5jOAOMY+lT+be/8+8H/AH/P/wARR5t7/wA+8H/f8/8AxFFmFy5/aFl/z+Qf9/V/xo/tCy/5/IP+/q/41T829/594P8Av+f/AIiobq+ubSAzSW0RUMq4WY55IA/h96LBc0v7Qsv+fyD/AL+r/jR/aFl/z+Qf9/V/xrF/tqX/AJ9E/wC/x/8AiaP7al/59E/7/H/4mkM2v7Qsv+fyD/v6v+NH9oWX/P5B/wB/V/xrF/tqX/n0T/v8f/iaP7al/wCfRP8Av8f/AImgDa/tCy/5/IP+/q/40f2hZf8AP5B/39X/ABrF/tqX/n0T/v8AH/4mj+2pf+fRP+/x/wDiaANr+0LL/n8g/wC/q/40f2hZf8/kH/f1f8axf7al/wCfRP8Av8f/AImj+2pf+fRP+/x/+JoA2v7Qsv8An8g/7+r/AI0f2hZf8/kH/f1f8ayINWnuLkQJaxhihfJmOMAgf3f9oVb829/594P+/wCf/iKdgLn9oWX/AD+Qf9/V/wAaKp+be/8APvB/3/P/AMRRRZiuTUUUVoSFFFFAFSz/AOPq/wD+vgf+ikq3VSz/AOPq/wD+vgf+ikq3QAUUUUAQX17BpthcX1y22G3jaSQ+gAyah0jVINZ02O+t0kjVyVMcq7XjYEhlYdiCCKzvFFvf6kbHSrHEazTCW4nkhZ40SP5grAFc7m2jGRkZ9Ki0G11PSte1C0vWSeC9xeRzW9u8cSSfddcFmwThW685akt/6/r/AIYHsdHRRRTAKqaT/wAgey/694//AEEVbqppP/IHsv8Ar3j/APQRQBbooooAKyb3XjbasdMt9Kvb6dYFnb7OYQqqzFRzJIvOVPStauP1mC2HjSS4v4dXFu2nxpHJp63WCwkkJBMHsRwfWl1X9dB9H/XU6XS9Sg1bT4723Dqj5BSQYZGUlWUj1BBHHHFW6xfCVtcWmgRwzrKqCSQ26z58xYS5MYfPO7bjOefXmtqmIKoa3/yC2/66xf8Aoxav1Q1v/kFt/wBdYv8A0YtJ7AjKooorMsKKKbIu+NkzjcCM+lJgZUniSCON7n7HdtYRnDXqqnlgA4LY3byoPcLjv05rXBBAIOQehFc7p9/caVo0Ol/2bdy39rGsKIsDeVKQMBvNxsCkcnJyOeM8V0K52jcADjkA5qgFooopAT6Z/wAhhP8Ar3k/9CSt2sLTP+Qwn/XvJ/6ElbtXHYlhRRRVCKn2yf8A6Bl1/wB9Rf8AxdH2yf8A6Bl1/wB9Rf8AxdW6z9a1zT9AsGvNRnEaAHYg5eU/3VXuaTdtWC1Jftk//QMuv++ov/i6Ptk//QMuv++ov/i6sQyrPBHMoIWRQwB64IzT6bVgvczbKe5a4vWXTblszjIDRfL+7Tg5f8fxq3515/0Crr/vuL/4updK/wBdqH/XyP8A0VHVSPxbp0mn6teKk+3SHlS4jKAOdmclecEHacHPY9MGou7lJXJvOvP+gVdf99xf/F0edef9Aq6/77i/+LqzPrGmWt1BaXOo2sFzcY8mCWZVeTPA2qTk88cVVt/E+kXGpalYi8hSTTADcM8qAKMZJ68AdCTjBpczCyF868/6BV1/33F/8XR515/0Crr/AL7i/wDi6mg17RrqymvbfVrGa1g/1s8dwjJH/vMDgfjVmzvrTUbZbmxuobqBshZYJA6nHBwRxTuwsih515/0Crr/AL7i/wDi6POvP+gVdf8AfcX/AMXWtRRzMLGT515/0Crr/vuL/wCLqvpzXkWm2sZ0y5bZCi5DxYOAP9ut6qEt9Fpnh9r+ZXaK1tTM6oAWIVcnGe/FJytqNRvoQedef9Aq6/77i/8Ai6POvP8AoFXX/fcX/wAXTofEFlcQ6XNEJWTVHMcPy4KMEZyHBOQRsII9eKl1nV7fQ9Mkv7lJZEQqqxwrueRmYKqqMjJJIFNtrcSV9iDzrz/oFXX/AH3F/wDF0edef9Aq6/77i/8Ai6kGvWT22l3Me+SLVHVIGUDjKM4LZPAwp/GrK6jYvHBIl5bslz/qGEqkS8E/Kc/NwCeOwNDbQWRS868/6BV1/wB9xf8AxdHnXn/QKuv++4v/AIunf8JR4e2yN/bum7YlVpD9rjwitjaTzwDkY9citGOSOaJJYnWSN1DK6nIYHoQe4ouwsjM868/6BV1/33F/8XVTVBe3FiYl0y4UmSPBZ4scOp7PXQ1Bd/6lf+usf/oYpXYWOZ/s/U/+gbN/38i/+Ko/s/U/+gbN/wB/Iv8A4qutopDOS/s/U/8AoGzf9/Iv/iqP7P1P/oGzf9/Iv/iq62igDkv7P1P/AKBs3/fyL/4qj+z9T/6Bs3/fyL/4qutooA5L+z9T/wCgbN/38i/+Ko/s/U/+gbN/38i/+KrraKAOVtLbULbUkkfTZz+5dcB4s9U/2/atTzrz/oFXX/fcX/xdX3/4/ov+uT/zWp6adhWMnzrz/oFXX/fcX/xdFa1FPmYWKFZ+vQGfQdQWOIyTNaSqgVcsSVPA+vFV/wC2rr/nyh/8CD/8RR/bV1/z5Q/+BB/+IolZpoFdO5o2Ksmn26spVliUEEYIOBU9Y/8AbV1/z5Q/+BB/+Io/tq6/58of/Ag//EVbkm7kqNlY1tK/12of9fI/9FR1x2q6TqKeE9YuLSyme5kmvopLdYzvnhklfaVHU4JDD2LY610+h3FzOt7KIIgWueR5p4/doP7tam66/wCeMP8A39P/AMTWXW5onY47UoZIYfEenzaVd3Vzq2Psjx2zOkgMSooaQDbHtcE/MRjOR1pk6alp82tIbBryaQ2TiSWykuImVQivIFGN7KQW2g7uM4rtN11/zxh/7+n/AOJo3XX/ADxh/wC/p/8AiaP6+4lKx59DYy3F9q9zfpr91DLFYyR3osFimLxyuSyx7BwpwdrKWIHRhjPT+EWv3gvWvEDqZx5d29ibSW6+UAvJGedwxtzgZC8ADFbW66/54w/9/T/8TRuuv+eMP/f0/wDxNO43q7k9FQbrr/njD/39P/xNG66/54w/9/T/APE0gJ6xdbhluPA9/DDG8ssmmyKiIpLMTGQAAOprT3XX/PGH/v6f/iaitGufscO2KIjy1wTKR2/3aTV0NOzuc3Pp17a+JNCEFrI9jJcNcSFE4t5PIkVt3oGLKf8Ae3eoqxq8ep65renR6awtbayVrt5ryzkZHk5RE27kJIG9uvGFPcV0O66/54w/9/T/APE0brr/AJ4w/wDf0/8AxNU9X/X9aE9LeVjitP07VbC6sdIuYXnjsNXM8VxDbusXkyQynAyWwFclcbjgbfUVBpkV39m8LaY2m3yT6XLKl2z2rrHGRBKoIcjawJIwVJHIzjIz3m66/wCeMP8A39P/AMTRuuv+eMP/AH9P/wATU9LFX/r7/wDM47w5o0luPCRl054za6VOsheEgxO3lcNkcE/Pwfetfwez2PhHTLW7guYp4bJWdGgfKgcY6fe/2evtW1uuv+eMP/f0/wDxNG66/wCeMP8A39P/AMTVN3v/AF3/AMxDkuEkkVFWUFoxIN0TKMe5IwD7dfam3f8AqV/66x/+hijddf8APGH/AL+n/wCJrN8Q6ld6XpDXYtIZSs0KhPPK5LSoo52HHJ9KcYuclGO7A2aKwP7S8Vf9C3Zf+DU//GqP7S8Vf9C3Zf8Ag1P/AMarX2E+6/8AAl/mK5v0Vgf2l4q/6Fuy/wDBqf8A41R/aXir/oW7L/wan/41R7Cfdf8AgS/zC5v0Vgf2l4q/6Fuy/wDBqf8A41R/aXir/oW7L/wan/41R7Cfdf8AgS/zC5v0Vgf2l4q/6Fuy/wDBqf8A41R/aXir/oW7L/wan/41R7Cfdf8AgS/zC5sP/wAf0X/XJ/5rU9c5aaxq8viKLT77SLa1ka0lmUpemTIDxg5/djH3q3N11/zxh/7+n/4ms505Qtf/AD/IE7k9FQbrr/njD/39P/xNFQM5OqV9eXkM8NvZWP2iSQMxeSQxxIBjqwVuSSMDHr6VdrJ1uTU98NvZWly8EgJnmtnjEijsq72XGf73OMccnIALel3/APaVkJzEYnV3jkTduCurFWAPcZBwfTsKt1V0xEisI4o7GSxRBtWCQqSo9cqzDnr1z61aoYGz4a/497z/AK+f/aaVtVi+Gv8Aj3vP+vn/ANppW1QAUUUUAFFFFABWV4h16Lw/psl01rcXcgRmjggjZi2Bk5IGEUd2OAP0rVqjrdvLeaDqFtAm+Wa2kjRcgZYqQBk+9TK6i7FRtdXLNtN9otYp9u3zED4znGRmm2X/AB4wf9cl/lRZRvDYW8Ugw6RKrD0IFFl/x4wf9cl/lWkrXdiI3srk9FFFSMKKKKACiiigDn9V8Q6hp5vriLRvM0/ThuuJ5pzE8gC7mMSFCHAB6llBII7ZpPGbiTwqXXo1zaEf+BEdVdVOq32sSw3ugX93pUDqYYbaS22XJGDuk3yqxAPRMY4yc5AFvxoS3hZiVKk3NoSpxkf6RH6Vvhv4sPVCkS+J/Ef/AAjtpDMllJeySuf3UbbSsaqXd+h6KOnckDvU19ql4JLSLSdPF69yhl82WUxQIgx1cK3zHcMLjnk8YrPvNAv9W8TXF9Lf3Nhb29uLa18gQv5ob5pWIkR8AnavQH5T2NZkFt4m0nSbbQIrC+ns7Z5Ije2stuJngGPLC73UKSDtLYyNpwBkEYf1/X4P7yv6/r+uxoHxqqQWLvpkpkuJ5YJkSaMiFo2KNgkjI37QGO0fMMkEhS1/FmqLa3uoLots9hZXUkDlb5vPcJJsJWPysEnsu/npmtzRo44dLhhi0yXTY4xtW2lKFlHqSjMDnrnJPPPNcPP4Wea11e1k8HCXULy8uHt9UP2YCMO5Mcm/f5g2gg8LnjGKOv8AXkHT+vP/AIB02qeItQsPt1zFovmafpyhriaacwu4ChmMSFCHAB6llyQR2zW8jiSNXX7rAEVyd+ur3Wom21DQ9QvtNtdnlJbyWwS7YAEvJvlViM9ExjjJzkAdYpLKCVKkjJU4yPyp9CR1FFFIZgTf8lDtP+wTP/6NirfrAm/5KHaf9gmf/wBGxVv1vV+GHp+rEuoUUUVgM5j+xbr/AJ/Yf/Ac/wDxdH9i3X/P7D/4Dn/4utiitLIm7Mf+xbr/AJ/Yf/Ac/wDxdH9i3X/P7D/4Dn/4utiiiyC7Keh29zAt7EJ4iVueT5R5/dof71am26/57Q/9+j/8VVXSv9dqH/XyP/RUdaNZsog23X/PaH/v0f8A4qjbdf8APaH/AL9H/wCKqeigCDbdf89of+/R/wDiqNt1/wA9of8Av0f/AIqp6KAINt1/z2h/79H/AOKo23X/AD2h/wC/R/8AiqnooAg23X/PaH/v0f8A4qorRbn7HDtliA8tcAxE9v8Aeq5UFl/x4wf9cl/lQAbbr/ntD/36P/xVG26/57Q/9+j/APFVPRQBBtuv+e0P/fo//FUbbr/ntD/36P8A8VU9FAEG26/57Q/9+j/8VRtuv+e0P/fo/wDxVT0UAQbbr/ntD/36P/xVZviHTbvVNIa0F3DEWmhYP5BbBWVGHG8Z5HrWzUF3/qV/66x/+hiqhJwkpLdAY/8AZvir/oZLL/wVH/47R/Zvir/oZLL/AMFR/wDjtb9Fa+3n2X/gK/yFYwP7N8Vf9DJZf+Co/wDx2j+zfFX/AEMll/4Kj/8AHa36KPbz7L/wFf5BYwP7N8Vf9DJZf+Co/wDx2j+zfFX/AEMll/4Kj/8AHa36KPbz7L/wFf5BYwP7N8Vf9DJZf+Co/wDx2j+zfFX/AEMll/4Kj/8AHa36KPbz7L/wFf5BY5y00fV4vEUWoX2r211ItpLCoSyMeAXjJz+8Ofu1ubbr/ntD/wB+j/8AFUP/AMf0X/XJ/wCa1PWc6kp2v/l+QJWINt1/z2h/79H/AOKoqeioGf/Z[/img][br][br]Al pulsar [b]Enter[/b] aparecerá el valor del producto de las dos celdas A2 y B2.[br][br]A continuación, seleccionamos la celda que acabamos de obtener.[br][br][img 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[/img][br][br]Rellenando hacia abajo, arrastrando esta celda que acabamos de introducir, obtendremos todos los  productos y calculamos su suma para lo que bastará con arrastrar la celda B11 hacia la derecha.[br]

Como era de esperar esta medida se podrá obtener de manera automática, basta con observar los valores obtenidos en el ejemplo anterior al utilizar la herramienta [b]Análisis una variable[/b].[br]En esta ocasión como tenemos dos columnas con los datos y las frecuencias, tenemos que proceder en la forma que describimos a continuación.[br]En primer lugar seleccionamos las celdas que contienen los datos de la variable y pulsamos sobre la herramienta [b]Análisis de una variable[/b] [img width=35,height=35]data:image/png;base64,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[/img]. Aparecerán los datos seleccionados.[br][br][img 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[/img][br][br]Antes de pulsar el botón [b]Analiza[/b], tenemos que indicar que hay otra columna que contiene las frecuencias. Para ello, pulsamos sobre configuración [br][br][img 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[/img][br][br]Indicando que tenemos datos con frecuencias.[br][br][img 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[/img][br][br]Seleccionamos las celdas que contienen los datos de las frecuencias y pulsamos la mano para capturar los datos.[br][br][img 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[/img][br][br]Ya tendremos las dos columnas (valores de la variable y frecuencias), por lo que basta pulsar el botón [b]Analiza [/b]para obtener las medidas de centralización y de dispersión.[br][br][img 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[/img][br][br]

Aunque disponemos de funciones en GeoGebra para obtener las dos medidas anteriores, no se pueden aplicar sobre los datos cuando están agrupados por frecuencias, por lo que en ocasiones, será mejor manejarlos en bruto.[br]A partir de la hoja de cálculo se podrá deducir la moda mediante observación directa en la columna de las frecuencias.       [br]Por ejemplo, para los datos anteriores la moda será la nota 6.[br]Para obtener el valor de la mediana, se puede añadir una columna más en la que aparecerán las frecuencias acumuladas.[br]Para ello, podemos insertar una nueva columna D en la que el primer valor coincidirá con la frecuencia del primer dato (B2). El siguiente valor será la suma de este valor D2 y B3. [br]Rellenando hacia abajo arrastrando el valor anterior obtenemos las frecuencias acumuladas.[br]Repitiendo este proceso podemos obtener todas las medidas de centralización y de dispersión a través de la hoja de cálculo.

Cuando los datos los tenemos en bruto, tal y como ha ocurrido en el ejemplo 2, al pulsar sobre[b] Análisis una variable[/b] obtenemos el valor de la mediana de manera automática.[br][br][img 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[/img][br][br]Este valor se podría obtener utilizando la función [b]Mediana[/b] sobre una lista de datos.[br][br][b]Mediana[lista datos][/b][br][br]Lo mismo para la moda para la que disponemos de la función con el mismo nombre que se aplica sobre una lista de datos.[br][br][b]Moda[lista datos][/b][br][br]Los valores obtenidos al utilizar estas funciones aparecerán en la vista algebraica.[br]Al ejecutar desde la línea de entrada las funciones [b]Mediana[notas] [/b]y [b]Moda[notas] [/b]obtendremos los siguientes valores:[br][br][img width=281,height=132]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCACEARkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD0g/2Yst1G9nEn2VA7lolwVIJyPbgj8Kjjn0c2r3M9va2kUZUMZ/LXaSoIBwTg/MBg4P4YJTV9OnurqFoFzHMvk3XIH7vcGz78Bl/4HVW40+7Wa7mW1nYtfCaF7aWMSKPJVNwD/Kf4gQ3Y59KEBaN1of8AaFvZBLRpLmEzRFQhDKMdPXOSRjsD6VPaDRr9GezFjcqpwxh2OAfQ4rKGn6mqWrmyhlcWdxEyOECBnKsvmKMA524bbkZJ7c1Y0S21BNUurm7iuVSWCNFNx5IIKl8gCM4x8wxnmgC0G0s6hLZCziMsUfmE+UuPcfUZB/4EKjS60I2VrdTLZ2yXcYeJbgIjEEA9+/I6VU/se+jkTURNNJcNOZJLX92FCv8AKRnGSQu3+LHy/Ssu8P8AZGlpaXcUUlxcaSlsITNHvRwCMbScsCW/hBOV+lHT+vMdtTpmXRluo7VhYi4lXckR2b3HqB1I4P5VFbzaJc3MtqsdotxEzKYWVA+FOC2OuPes2TSL5tWLEXRhllgl3RvCsabAow25S+QV/h4O7HHJqVbC9a8MX2DylW+kuftO5MOpVgAMHduOQORjHftQ/wCvwF0LrXPh1YPPafTBDv2eYXj27sZxn1xzipduliSVWt7VViiWVpCI9oU5565A4PJAHv1xlix1K10jSoIbV1eG28uVrcQmaNsLwDIdu0kHOMk4FV7bRdRSyCyWw3x2lmvll1/eNE7My8HHIx145+tMOhsNP4fS1W7aXTVt3basxaMIx9AehPBq2tjYsoZbS3IIyCI15rIu01GZknt9KktN5fe0PkNcZIUAksdgBwc4LHAXp20tEt5rXQ7K2uE2SwwIjrkHBAx2pATf2fZf8+cH/fsf4Uf2fZf8+cH/AH7H+FWKKAK/9n2X/PnB/wB+x/hR/Z9l/wA+cH/fsf4VYooAr/2fZf8APnB/37H+FH9n2X/PnB/37H+FWKKAK/8AZ9l/z5wf9+x/hR/Z9l/z5wf9+x/hViigCv8A2fZf8+cH/fsf4Uf2fZf8+cH/AH7H+FWKKAK/9n2X/PnB/wB+x/hR/Z9l/wA+cH/fsf4VYooAr/2fZf8APnB/37H+FH9n2X/PnB/37H+FWKKAK/8AZ9l/z5wf9+x/hR/Z9l/z5wf9+x/hViigDKu7GGS+t7WKOG3V45JHdIULHaVAA3Agff8ATtVG1Ph++uvsln4htri45/dRNau/HX5QmeKv6nOlrqFtNLIsUZhlj8xztUMWjIBPQZCn8qxLGw0HT9dvdZtrq0S8vgBK/wBqTHHXAzxk4J9cCgC8scUixRTm2tljW4ae4WBBkROEz8wIXOcnjtVG9v8AQ7ZN1vqJv9qPI62rWTMqqNxO0gE8AnjPQ1NeKlxpxWWb7NDfQ3sSzSDCjzJAyk5x1UEjOM1DI7Xk9udQ1rSZoIXZjEoVd+UZCDmRuMOeMUAaENsLp7e1ZYIm/f8Amyx26bn8uQIMAggZzk8U6Ky06byPLv5WNxu2L9nhz8v3sjysrg8HOMEgHkgVHHcJAba6kfyYpvtWyST5V+eZXXJPTKgkZqrafZLW9e9XV7Q3Fzj7W/npiXAwuBu+Xb0GM8ZzuPzAA2tNtLeayYz2ts8kbyRswhUbtjlc47ZxmrP9n2X/AD5wf9+x/hUejNv09pACFlllkXIxlWlZgfxBBq5QAv8AZlt6z/8AgTJ/8VR/Zlt6z/8AgTJ/8VVuigCp/Zlt6z/+BMn/AMVR/Zlt6z/+BMn/AMVWPd2On6v4sns9Zt7e7jis45LS2uUDpyziRwp4JHyAnGQCOm7nGslmvW0iK21ea2hE16lrdDbJI8KsNu0uGBGB1IOVHvmlcDsf7MtvWf8A8CZP/iqP7MtvWf8A8CZP/iq46XxFqP8AZj6jCqNcy6ZakPHEgbMkzIXBbjGDuAY7R34yaaJdVvdS0Vb24vIntNXkRfMNqZZF+zM+JBHuVW6rxt+U5xnBDD+vwudn/Zlt6z/+BMn/AMVR/Zlt6z/+BMn/AMVXK2Wt6qLaC5fU4pH1HTZ7sJdKiRWUi7dq5UA7AX2ncSfl69RWt4ZvLySW8s9QnvmuIfLfy76OASIrA87oDsZSVOOAwwc9RTsD0NT+zLb1n/8AAmT/AOKo/sy29Z//AAJk/wDiqyvCxx4euT6Xt7/6Pkrm7e5u/wCzrPUYdUXT5YPDkdyyxwR7ZNuTgqVwE9Qu08jBFTf+vk3+g7b/ANdbHc/2Zbes/wD4Eyf/ABVH9mW3rP8A+BMn/wAVXKXOtaytnrmoJczZt54baC1WOICLzFhJfLAZZfMbG5gvr7Pj1HX5NMe2Mt0lyl/5QzLZfbZIvL3kAAmHeCeQcfIM4zTt/X9eoulzqP7MtvWf/wACZP8A4qj+zLb1n/8AAmT/AOKqDw/eNfaJbzyTPNJ8ySPJGsb7lYqQwUlcggg7TgkEjjFaVDAqf2Zbes//AIEyf/FUf2Zbes//AIEyf/FVbooAqf2Zbes//gTJ/wDFUf2Zbes//gTJ/wDFVaVldQysGUjIIOQRXing+6fR/DetGI/NqNi7RZ7SLKYv/aiV34TBPEwlJSs04q3e9/ytcmT5dz2H+zLb1n/8CZP/AIqj+zLb1n/8CZP/AIqvK/D2vr4F8JaqkKxvL/bklpC027YmFX52C5YgAdBzWzpvxSMmg6xd3aWlzcaaqMj2YkSKfecAASAMMHrn8K6KuUYhNumuaN0k9r3t+r7kqotL6Hd/2Zbes/8A4Eyf/FUf2Zbes/8A4Eyf/FV57NL4il8feFX8RW1jHIUuWjNmzFcGLlWDfxD1BIOfal0rxNc6T8O9KuNNttJsBNJPua7ncQwhXYnCljI7N6Lnntipllk+WLjJNu3przdb/wB3t5b7vn1/rseg/wBmW3rP/wCBMn/xVH9mW3rP/wCBMn/xVcFH8SdUn8IRapb2lnNef2qtg4XeIpQRkMmSCuePvfl2rX03xPr0PiK/0TXLOwaeGxN7AbKRlVlBxtYuevvwBis55biIJuVtL6X10tf8wU0/6+R039mW3rP/AOBMn/xVH9mW3rP/AOBMn/xVcP4e+IWo3/i210a/OkzLdoxA093c27Bd4DOco/AI+Qnnv2r0OufE4WrhpKNTqr/IcZKWxU/sy29Z/wDwJk/+Ko/sy29Z/wDwJk/+Kq3RXMUVP7MtvWf/AMCZP/iqP7MtvWf/AMCZP/iqt0UAVP7MtvWf/wACZP8A4qj+zLb1n/8AAmT/AOKq3RQBU/sy29Z//AmT/wCKo/sy29Z//AmT/wCKq3RQBVFnDbqzxmXJGPnldh19CTTaszf6o1WoAuUVS1N2S2Uqqsd33WOA3ynAP44rPsLid72FZbWC3y5AMMu7eNrZz8oxyB60AaWoaXp2rRLDqVhbXsaNuVLiFZAD0yAwPNF5pOm6jAkF9p9rdRIMLHPCrqvToCOOg/Kse7sdP1fxZPZ6zb293HFZxyWltcoHTlnEjhTwSPkBOMgEdN3ONZLNetpEVtq81tCJr1LW6G2SR4VYbdpcMCMDqQcqPfNLoB1UeiW4vry6nkkuhdwrA0EyoYkiG75AoUZB3HO7J/CpY9G0qG1htItMtEt4JBLFCsChI3ByGUYwDnnIrkJfEWo/2Y+owqjXMumWpDxxIGzJMyFwW4xg7gGO0d+MmmiXVb3UtFW9uLyJ7TV5EXzDamWRfszPiQR7lVuq8bflOcZwQ/6/EH/X3X/4B2UOk6bbyXMkGn2sT3hzcskKqZuv3yB83U9fU06w0zT9KhaDTrG2sombcY7eJY1LdM4UDngVyllreqi2guX1OKR9R02e7CXSokVlIu3auVAOwF9p3En5evUVreGby8klvLPUJ75riHy38u+jgEiKwPO6A7GUlTjgMMHPUU7Ay4PDWgLe/bl0PThdb/M88Wkfmbuu7djOfepZNE0ib7P5ul2T/Zdog3W6Hytv3dvHy47Y6VxselaTD4R1TWfsNtFqcd3eNBepEon80TuIwHHzEk7VxnnOOhxVy61vXR4lkjjjnW3tbi2gaMNbLA4kVSxYuwk3fOduzglQOcmkuiB9fn+B1rWVoyXEbW0JS6z56mMYlyAp3f3uABz2GKrHQdGbThpraTYmxVtwtjbJ5QOc524xnJ9K53TNV1WTUUnl1UXEcmr3Nj9iEUYCxoXKnIG7eNo6nG09M81m2/ifxCdGvdQlM8fm6ZPdx+ebXbDIpG0RKjFyo3YPmDIIGcZIoWv9fMdne39b2PQIYIraCOCCJIoo1CpGihVVR0AA6CpK4jUdfvtAXUra71dpisVo8dzNFGGhMzsjlVVQGChdwBBPHORXIRa3rGr63LBoly0gurweXqN5BGJARARj5Vwp2q5yoBxj3zE5qO50UMNOsuZaRXV6Jf15anpfiDxbpHhuLN9cZmIylvH80jfh2HucVyUh8VeOBunY6HozfwjPmSr+hP6D61zemRnT7KfWJLSWW+fTpblbi9eGTZMpGGRQ7MepBLrkEDpkitjV21a8eTT7nVLiUJPYSrL5cSspkmK4AC4wCoIyCfUkVPJKbXNou3zsdHtqOH/grml/M/0X6s7jRxbaRYQaXaNI8UA2q0jbmPOetYVp8No4bLSIH1Mv/Z121wxEGPPVnV9hG7gZUevTpUWj3eqf8JEDKkwtDeT2zCV7ZYVWMNhl+bzS/wAoJBGMMSBgA1q+GdQ1GTUPs+p3dxI89t58assDQPhgC8DxHPl/MMCQbiCDnrXbh8RVoK1J2vr+D/Rs86o+dtz1/qxVPw8Q6deQDVHS5l1RtStrlIcG3kOMDGfmHHtmra+DZbvRNR0/Xdcu9Uk1DG+Ujy1i2/d2RglV5GTjr3rqKK1ePxD3l1vsr/fa/TbYnlV7nGWPgbUo9a0zVNT8TSai+mq8caNaKg2Mm0DhuvJJJyTx6VAnw3nttP0eOx14297pLTGO5NmsisJGJPyMcAjPXP8A9buqKr+0cTe/MvuVuvS1vtP7xckdjiV+HbLpZsDrLyD+1xqQkkgBY8cocMASeu7j6Voar4Mj1bXrzUpr10ju9MbT2iSPlQWzvDZ/TFdNRUvH4hy5ubXXoutvLyQ+Vf163OM0jwHe6dqWkXtz4ha7/spXjih+xpGnlsu3aNp4OeSxznj8ezoorGviKleSlUe3kl1v0t1YKKjsFFFFYFBRRRQAUUUUAFFFFADJv9UarVZm/wBUarUAWpI0lQpIiup6qwyDUFvBBHLKY7aKIq20MiYLDAPoO57ZHHrkCzVWPzVuJ/LiQq0oLFiVP3UH93njPc9AM9lAE1DS9O1aJYdSsLa9jRtypcQrIAemQGB5qHULTRLxUs9St7CcKAEhuURgOmMK30H5Vcja4JHmxRqMclZC3OB/sjvu/IevGbp5sRpbm5MIcbvtW/Gd/wDFmk3YCWPRLcX15dTySXQu4VgaCZUMSRDd8gUKMg7jndk/hUsejaVDaw2kWmWiW8EglihWBQkbg5DKMYBzzkUmjFjpUJbpzsz/AHNx2df9nFcTrnirV7fxJnT71vscGq29hNDIsSRkuASqgqzscEktuQDjAbBNNatL+v6uwezZ3EOk6bbyXMkGn2sT3hzcskKqZuv3yB83U9fU06w0zT9KhaDTrG2sombcY7eJY1LdM4UDngVm+ILrxBbywjRbTz0KnzD9mjlwe33riLH5H8Kp+JYL7VPAU1pd3Vrp13eKkUsl0RCi7nAIwruMkZAAY5J60dNB9dTWj8O6HDf/ANoRaNp6Xm8v9oW1QSbj1O7GcnJ5qxLpenz38WoS2FtJeQjbHcPCpkQc8BsZA5P5msLwa0UD6tpSWGn2z6fdCN5NPtvIimJRWB25OGAIB5PSum7UdrC9Tg/FtxpfgjT5riwgiOs6g8vl3DRqZUDuXc7gM7QTwPXHXBrjvDHih7PR59IsdAtLzULtirTNEv71D2k4+fGT1OMGtPxP4O8U67q0+p3v2WJSdsUZmzsQdAMD/JJrCtPDOq6Zfx3EdxAJImyCpYg+o6VxydVzuk7bfI+lowwNPDcs5Jyevz6bHYWXg4Xl1/a/iy9/tC7YDECHEaDsDjGQPQYH1rdisrQMq2Om2tuqvvXyoFXDYIyMDrgkZ9DSaLE14B5pNdNDbRwrhVFdUYKOx4NbEVKz996LZdF6IxbPwtp0Znkawtg11nz8Qr+9z13cfN1PX1rUl0nTp45UnsbeZZkVJRJErB1UkgHI5AJJAPrVyiqMComl6dHqD6jHYWyXrrse5WFRIy8cFsZI4H5CksdI0zTHlksNOtbR5zmVoIVjMh5+9gc9T19auUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAyb/VGq1WZv9UarUAXKggXE1yduMyg5xjPyL7DP5n69hPVWORYricMj5eUEFYiQflQdQvuO56HnAIUAtVBJZWk0yzS2sMkq/ddowWH406O4SUgKsgyM/NEy9ge4/2h+vocZ9pbyX9ot3Ld3CySjcojcqqDsMDg49+tJgatUJ9C0e6vDe3Gk2M10cZnkt0Zzggj5iM8EDH0FSabcSXNgkkvLgsjHGNxViuce+M/jWJ4h8ZxaDcSp9nW5W3VGnCSNvjDEAcBCo6j7zLntSclFXZMpKKvI6aori2gvLd7e6gjnhkG145VDKw9CDwa4mbWv+Ef17xnqhg+0C3+w/ut+3O5dvXBx1z0rU1TxkNMOu5sDJ/Y32fP73Hm+bj24xn3z7VPtI9f63/yIVaPX+t/8joLOxtNOtltrG1htYFyVigjCKM8nAHFT1yV/wCNp9O/tXztJU/2S8Pn7bnOVlxtI+XlueR0460/VvGj6Xcawo03zYtIMHnP5+0sJcYwNp5BPTPbqKbqR7/1/SD2sF1/rX/JnRXVsLlNprOHh6AnJAqjdeMvs8V/erYb9O067+y3ExmxJuyoJVNvIBYfxCrHh/xOdbu57aW0FnNCCTBJKfNUBsfMpUY9eCRz1o54t2GqkW7XNO006O1+4MVcqC7e8SEGyghmk3crNMY1x65Ctz7YqrFPrhmQTadYJGWG9kvnZgO5AMQyfbIqrlt2NGmLLG7siurMn3gDkj60k8yW0DzOHKoMkIhdvwABJ/Cud0CwtrrwRbxXjBYZczyskgAYby53MDyCOG/EUm9bCcrOyOmormfCETCbVLy3i+zaRczK1jCRtAULhnVf4VY8gVp65pqaha7vsFtfTxA+VFdORHk9SRggnjjI/EUKV43EpNxvY06KwPA8kcng3TWS4lnBjI3zDDZDHI69AQQPYCs7xZp0L3CxaajPr15PHJDNuy1siFQzZ/hTAPHct3pOfu8wnP3FJI7Cis/XYJbzw/qVtbrvmmtZY0XIGWKEAZPTrWH4T8rSruLQrjR7Wy1FNPjmea3Kt5yg7CWIUfNu7c9etNys7Dc7SSOsorA8W6nHZ6bDaG6S2bUZRB57uFWNDy7ZPAwuce5FVPhtNE/geyRJUZomkVwGBKkyMQD6cEH8RS51zcovaLn5DqqK5HxvZWd9Jp+nCytmvdTnEP2l4VaSOJfmcqSM5A6fWuptreGztorW3QRxRIERB2UcCmndtDUm5NdiWiuN8Q2ENj4g0e6S3jto59STfeRMWnkkYNiM5HEZ78n6Cun1K1tr6wkhu3K2+Q0hD7QQpyQT6HGD7ZpKTdwUm7rsW6K5nwhEwm1S8t4vs2kXMytYwkbQFC4Z1X+FWPIFRfEmIHwXezh5UeLZt2SsoO6RQcgHDceuaOf3OYXP7jnY6uikyPzrldaiEXxB8NOry/v/ALVvUysU+WLAwpOB1PQDNOTsipS5Vc6hJY5CwR1YqcNtOcH0NPrAldLbx3ExU/6VYFBsXcdyvnLAcgYP3jx2zW/TTuEXe4yb/VGq1WZv9UarUyi5UEC4muTtxmUHOMZ+RfYZ/M/XsJ6ggXE1yduMyg5xjPyL7DP5n69gAT1QfSYyzCO5uYY3JLxRuArE9eoyPwIq/VSTVLKKRkabJU4YqjMFPfJAwKTt1Anhhjt4UhhQJHGoVVHYCs2/8MaPqctxLd2e9rpVWbErqJAv3cgEAkdj1rUVldA6MGVhkEHIIrJ1HxJb6dqMmn/Y726uY7UXWy2iDlkMgTAGck5OfoDSly21Jny294muPD2lXZvzPZiT+0ggusu37zYML34x7YqF/CuiyQXkMlozpfCMXO+aRjLs+7kls5Hr371sVDaXdvfWyXNpPHPC+dskbblODg4P1Bo5Y9hcsexSuvDmk3v2/wC0Wm/+0fL+1fvGHmeX9zoeMY7YouvDmk3v2/7Rab/7R8v7V+8YeZ5f3Oh4xjtirGpalb6TYyXlyJTFGCW8qJpCAASSQAcDjqeKfY3keoafb3sIYR3MSyoGGCAwBGffmi0b2C0G7WKc3hrSLi5e4ltMtJIJZEEriN3HRmQHaT7kU+x0HTdNujdWsDLMYxFveV3KoDnau4nauewwK0aKOVb2HyxvexBd2NnqEIhvbWG5jDbgk0YdQfXB781Vi8PaHBMk0OjWEckbBkdLZAykdCCBwam1TUYtJ02a+mV3SEZKoBubJwAM+5qG91dNPjtluIJHurp9kVtAQzOcZOCcDgDJJIAofLfUT5b6mjWFpugg+Gzoeqw+ZEpYExysolUuWHIII7ZH86u3Wq/Y2sjPayKl5IsQ5G6N2BIDDOO2Mgn+taFFk2OykzKm8P2UmmXNhtmmiuFCslzdSyjjpjcxI/DGcVNc6NZXiQrOJS0KbFdJ3jbbxkEqQSDgVfrlfEHxE0PQt0SS/brpePJgIIB/2m6D9T7UpckVdmtLDyrS5acbs130KxDad5NukS6cxMO0kbARggAcc9857/Wibw9p01/LfEXSXEwAkeK8mj3AdBhWAwKNB1Y6vodpqEqLE9wm8opyF56VpU0otXsROkoycZLVGdDodmg1BGgUxX8heWPJIYkYJOehPtjtSw6Dp1utxsgZ3uI/KkeaZ5GZP7u5iSBz0FaNFPlXYnlj2Kum2Sadp0FnHwkKBQASQB6DPOKpP4b05dIt9Lt7YR21tMssS72/dsGLZBzknJPXjn8Ku6ne/wBm6Vd33l+Z9mgebZnG7apOM9ulctp/xDW+8G3niBtMMUlrKsQtPPyZC2zb823jO8dq6KWDq1oc0I3V0um72BqOiZ1M+nWlzf2t9NDuuLPf5D7iNm4YbjODketMk0yGTWYdT2ATRQtFvDHJUnOMdMd/XpWd4f8AFVtrHhWHxBeCLTYZCwbzpxtTDlRliAOcfrWtbX1ne2v2u0u4Li3Of30UgZOOvI44qKlCdOTjOOzs/VeYLllqiqnh/TEvEuxbsZEkMiBpnZEc9WCE7QeTyBUcPh3T10aXSZIT9kldmaJJXAALZxnOfrz69uKpS+M7FvEOk6Xp729/HqJlU3MFyrLEUXdjAByTkdxitZNZ0uTUDp6alaNeAkG3E6mQEDJ+XOelOeFqQs5R3V/le36dRWh/XmV5vD9lJplzYbZporhQrJc3Uso46Y3MSPwxnFS6hodhq1gljfpLNbqACnnOgfGMbtpG7oDz3rQorDlXYfLHsZsui20ktg+HZrGRnjkkmd3GRyMkknPvnii98P6dqF/Ff3KTm4gz5TpdSp5eRg7QrADI646960qKfKuwcsexlR2Nw3ieTUnVUgW0+zoC2WY79xOB0H45rVoooSsNKwyb/VGq1WZv9UarUxlyqcMdwLm5KvGqNMDgxHJG1O/GejDPPUc/LirlQQLia5O3GZQc4xn5F9hn8z9ewAHRrcAjzZY2GOQsZXnA/wBo9935j05zLPULOwsltbtxHcJkPGy/NIe5A/iz+tbFFJoClpMckWmxLKpVjuYIwwVUsSFI7YBA/CuO8ZWusf8ACQXl5pcF5v8A7HSOOa3Rs7/tKkqCO+3Jx6V31FTKHMrEVIc6scdZLqo8YTwTf2hc2Vy826RjNCtsuMKo52MD/CV+bnJxWVo0OoaT4JgtIdP1MX3niO5VjcBYkMjHcoU8jBGfLwTnrXo1FT7PzI9l1v3/ABOItG1UeCdfttRjvp5mluYLQNBKzuhTCYB3NtyTyScdzXQ+F2J8M6dE8U0UkFtHFIk0LRsGVACMMBnnuOK1qKqMLMqMOV7mFqdv5l/I39l61PnH7y11Hyozx2Xz1x/3yKtaNF5Qm/0LUbXOP+P678/d1+7+8fHv07da06KfKr3GopO5g+MxJ/wj0jbh5CyRmdMfM6b14Vuin3wfw61V8WacLnVtFvp7OW7srVp1uYoojISHTCnaOSMj9a6C+srfUbOWzuk3wyjDLkj9RyKliQxRKhdpNoxufqfrScLtilDmb+X4HFQ2uoWngnw/a3u5NQW9iEZkOfLO9iu4dwF4xkfUV267go3EFsckDAJqtdafBez28txvf7O4kjTdhQ4zhjjqee/FWqIx5QhDlOY8aeHdU16x8vT9YktAFw1ueI5fqRz/ADHtXiuqaNqGjXBgvrZomzgN1VvoRwa+kCMjBrH1TQLfUImSSNXVuqsMg1nVoKevU9rBZpPCrkaTj9z/AK9TyvRdO1S5sbcw+JL21jK/LGjPhB6DDit5fDWtFQf+E51Mf9/P/jlbll4ZFlKkUabYl4A9K6OPSodgyKaoxtr+plUzKu5txatftH/I4L/hGda/6HrU/wDyJ/8AHK6LwzHdaNDNDe6zcaq0rhlefdlBjoMsa3f7Lg9KVdMhU5Aq404xd0YVcZWqx5ZNW9EvyRW8RuJPCWrMP+fGb/0A15no0cgl0LTFjzFqdvbXjN2HkLJuB9ziOvYEQIuBTq9TC472FKVPlvfz8tPuepxtXt/XY8W0xYYvCHg6/wBVgafQrW5uTer5ZdEYuwjZ1HUZ9j3HfBtT2sup6R4vuvCttJHo1zHCLdIoiizMpHmmNOMDAIPHPT2r1+iut5u3JzUNb330+Lm2tvfS/boSqdrHkdjfeGrvx14Xn8M2IjWOGdZvLgMYZxESEJIG5hnk8/eHJrCs7i2utU0O5hFvZTRatGtxaQWLh4CZGIMlw+WZm5G3OOOgxXvNFVHN4x2g9rayv1lvp/e8mrb7ol0rq1wooorwTYKKKKACiiigBk3+qNVqszf6o1WoAuVBAuJrk7cZlBzjGfkX2GfzP17CeomtrdnMjQRlyc7igznjn/x1f++R6UAS1mTahOlsbrMMcbcxo6ksw9Sc8fkavR21vCQYoI4yBgFUAwMAY/JVH4D0rndW8PareYgtbyFYAMBpC25V9MYwfzH+LSu7XIm2loje0+9j1GxjuohhXzxnOCCQR+YNVb/xDpemXL213cskyQfaGRYnciPJBb5QeBg/TGasaZYR6XpsNlEzOsS43N1Yk5J/Ek1m6n4ZGpard332vy/tOlPp2zy87dzE785569P1qZ3+yJ86irbk83ifR4MFrssDEsxaOJ5AkbchmKghQR3OKraf4qgvvEGoaWIZAlp5flzrE7K4ZSxJO3Cjjgk4bqM1TTwXLbW1xb2mqLGl7ZRWl3vt95cRx+WGT5htJXPXNT2nhJ9Pub1rHUmhgvbaK3dfLzIgjj8tSr7hg456Hms71LrQi9W60LreKtFjWdprtoPs8QlkE0MkZ2E7QwDKCwJ4yM81oWd5DfQ+dB5m3JUiSJo2B91YAj8q5W08ALayPJ9st3Z7IWjhrIFZMSB97gsdxO3B5z3BGBW54e0VtB057Q3TXAaZpF+UqsYP8CgkkKPcmnFzv7yKg6jfvIs3mqW9jKI5o7tmZdwMNnLKPzRSAfaiz1S3vpTHDHdqyruJms5Yh+bqAT7UXllcXMoeHVbuzULgpCsRB9/nRjn8aLOyuLaUvNqt3eKVwEmWIAe/yIpz+NVrcq8r/wBf5lXxPez6f4euri1l8qcBVR8AkFmC8A9+apeLNVuNE0PydOkY30iOYnk+cqqKXdznrgDH1Iqx4ttWuNBllggaS6t2WWBo1zIhDAkrjnOM9Kdq2g6f4itnm3yLNJbPDFcRyuu0MOcqrAMM9QeuMGolzNtIifM20uxa0K5mvfD+nXVw++ae1ikkbAGWKAk4Hua5/wASeIr618Q6ZYadKEhF7BDettDbvNJwnI4+VSTjnkVq2uk3el2uj2VnfSGK0AScMm4TKFxkliSgz0A9QOgqtq3gux1K5iuIpp7WQXqXc2yaQiUqMYA3gKenzDkY4olzuNluElNwstzo647wTrkuqWlpJqWsXUl9cJI32aS3SONwGIyhEY3YGCcMetdFHDfDVLotdubR4lEUZjA8puckN/F6nPt71nt4fvJr62v73VVlmsIZUtWitthVnXaXYbiGOB0AA9qcua6aHLmbTRH4y1G702101rSeSD7RqMUEzxRCR/LIbdtUq3PHoelaejXUF3YeZBqEt8odlaSZFRwwPKsoVcEehANRx22rPplmP7RWO7jAMryW4ZZeMfMoIwe/DDn1qnBod3pWnOljfsLq4v8A7VcSeSCJCxG5dpPyrjHckY70e9zX6B7ylfoUvF2t3+mX3lW909vGthLcJ5MSyM8qkbQ4IO2PnluB7101lLJNYwSy7PMeJWbYcrkjnB7isjWvDLapfSXkF6LaSeyexm3ReYGiY5OPmGG688/SrVtYXNjd2NvbXL/2fb2nkmBowclcBW39c44x060LmUm3sC5lJt7GZqN9q2k6tpivfLctf3xhNmsShVh5+cHG7KjBOSRzW9qV4NP0u7vSu4W0LylfXapOP0rMt9E1CHXZtTfULWYysFAks2LxxA/6tG8zA+uOTyfSrMVlc3CanbahcNcW1yzJGDGEKIy4KjHUc9Tz1oV9QjzK5meE9dl1ErBfT3DXs9pHdiOSJEjCN3j28lckD5jnj3q14ru5NN0eXUUv7q3MK4SKBYj5rkgKPnRu/p71Sg8K3enxSXMOqsbyKwSxtZI7YZjjVsgFSSGY9M8CtPV9FfWbbT45rgRm1uormTCbhLszleowCT1/Skublt1JXPyWe5Z0eK/g0q3TU7n7TebMzSbVUbjzgBQBgdPwrndS8UyWviS9hmlubfT9MNuJmgiRgTJzmQtyF5A+Xnkmuhvo71ryye1uTHEkh8+PywwkXHduq47Y6msnV/CCapd3ji88m31EQi8i8rcZPKOV2tkbfQ8GiSla0RzUrWj0/wAjpK5DRfEV9qvjee380f2W9k81sgUfNtlEe/OM8kNjtgit9be6k1O8E9w0tjLCqrCYwuw8g4YcnPf04xWdY+D7PTfEMWp2s86Qw2n2aO2M0jBfmzncWPy442YxnnrTlzNqw5czasWfFuqXOi+GL3ULRQ08KDZkZAJYLnHtnP4VX8Panc3Gr6xpVxd/bBp7xbLgqqlg6ZwdoA4IParlpaX0mjzW17dLcTOZFWWa3GCpJxuQHBHt3GKz7fw5caTDNLp92kV3dXMTymG1VYyi/KIwmTtXHfJPWk+bmT6CfNzKS2/4cf4o1LUdMudIa0niSC71GC2lQxZchic4YnAGBjGM+9U/E+talb6tPY2F19mFnpMuos3lq3mFWwEO4HA4PTB960/EOh3WtPYmG+htlsrpLpQ9uZCzpnGSHX5eenX3qHWPDEmq3H2pL9be4lsmsrlhBuWSNjk7Ru+U5zjk9e9KSlrYU1N3saVheHUNEtL1lCm5gjlKjtuAOP1p1V47KWynt4ILhxYwWYhWAxjAZSoVi3XOMjHSrFaq9tTaN7alyiiimMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAGTf6o1WoooA//2Q==[/img]