tag:blogger.com,1999:blog-55399597404372173452024-03-12T17:17:25.290-06:00EXCELmhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.comBlogger13125tag:blogger.com,1999:blog-5539959740437217345.post-31418458043158494062011-02-28T23:59:00.000-06:002012-10-04T22:26:45.181-05:00INTRODUCCION<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-90_ssnqXNZc/TVWGuycVSrI/AAAAAAAAACg/3EmQjbM1f00/s1600/d.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://2.bp.blogspot.com/-90_ssnqXNZc/TVWGuycVSrI/AAAAAAAAACg/3EmQjbM1f00/s1600/d.jpg" /></a></div><h1 class="firstHeading" id="firstHeading" style="text-align: center;"><span style="font-size: x-large;">Microsoft Excel</span></h1><div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-3OkfCTY48O8/TVWGm5XbtoI/AAAAAAAAACc/sSk5QyJNNBQ/s1600/excel_2003-large.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="234" src="http://3.bp.blogspot.com/-3OkfCTY48O8/TVWGm5XbtoI/AAAAAAAAACc/sSk5QyJNNBQ/s320/excel_2003-large.jpg" width="320" /></a></div><h1 class="firstHeading" id="firstHeading" style="text-align: justify;"><span style="font-size: small;"> Concepto basico:</span></h1><h1 class="firstHeading" id="firstHeading" style="font-weight: normal; text-align: justify;"><span style="font-size: small;"> Microsoft Excel es una aplicación para manejar hojas de cálculo. Este programa es desarrollado y distribuido por Microsoft, y es utilizado normalmente en tareas financieras y contables.</span></h1><div style="text-align: justify;">Excel ofrece una interfaz de usuario ajustada a las principales características de las hojas de cálculo, en esencia manteniendo ciertas premisas que pueden encontrarse en la hoja de cálculo original, VisiCalc: el programa muestra las celdas organizadas en filas y columnas, y cada celda contiene datos o una fórmula, con referencias relativas o absolutas a otras celdas.</div><div></div><div style="text-align: justify;">Excel fue la primera hoja de cálculo que permite al usuario definir la apariencia (las fuentes, atributos de carácter y celdas). También introdujo recomputación inteligente de celdas, donde celdas dependientes de otra celda que han sido modificadas, se actualizan al instante (programas de hoja de cálculo anterior recalculaban la totalidad de los datos todo el tiempo o esperaban para un comando específico del usuario). Excel tiene una amplia capacidad gráfica, y permite a los usuarios realizar la combinación de correspondencia.</div><div style="text-align: justify;"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/--6ibF4CLVwE/TVWG3SNjzBI/AAAAAAAAACk/YAzgHUV_RAw/s1600/235115_2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://2.bp.blogspot.com/--6ibF4CLVwE/TVWG3SNjzBI/AAAAAAAAACk/YAzgHUV_RAw/s320/235115_2.jpg" width="256" /></a></div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><b><span style="font-size: large;">¿Para que sirve excel? </span></b></div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;">Una hoja de cálculo es un programa que es capaz de trabajar con números de forma sencilla e intuitiva. Para ello se utiliza una cuadrícula donde en cada celda de la cuadrícula se pueden introducir números, letras y gráficos. Cada una es una cuadricula rectangular conformada por filas y columnas. La intersección entre cada columna y cada fila es una celda, que es la unidad básica de la hoja de cálculo en la cual se almacenan los datos.</div><div style="text-align: justify;"><br />
La información que podemos introducir en celdas para la creación de un modelo corresponde a los siguientes tipos:</div><div style="text-align: justify;"><br />
<b>Texto: </b>Contenido alfanumérico, texto o cadenas de caracteres de números y letras.</div><div style="text-align: justify;"><br />
<b>Nùmeros:</b> Datos numéricos.</div><div style="text-align: justify;"><br />
<b>Fechas</b>: Ej: 11-nov-94.</div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><b>Fòrmulas</b>: Operaciones con constantes o con contenidos de celdas. En estos casos, al comenzar por una letra debe anteponerse el signo "=". Ejemplo: =A1*A7/4.</div><div style="text-align: justify;"><br />
<b>Funciones:</b> posee una serie de funciones incorporadas para cálculos matemáticos, estadístico,<br />
financiero etc. Se hace clic con el Morse en la posición donde se desea escribir, se introducen los datos en la celda y se presiona enter para pasar a la celda siguiente. Si se comete algún error puede ser modificado en la barra de referencia.</div><div style="text-align: justify;"><br />
</div><b>¿Para qué sirve una planilla u hoja de cálculos?</b><br />
<br />
Su principal función es realizar operaciones matemáticas -de la misma manera que trabaja la más potente calculadora-, pero también la de computar complejas interrelaciones y ordenar y presentar en forma de gráfico los resultados obtenidos. Los principales elementos de trabajo son:<br />
<br />
<b>Fila</b>: Es un conjunto de varias celdas dispuestas en sentido horizontal.<br />
<br />
<b>Título de fila</b>: Está siempre a la izquierda y nombra a las filas mediante números.<br />
<br />
<b>Columna</b>: Es un conjunto de varias celdas dispuestas en sentido vertical.<br />
<br />
<b>Título de columna</b>: Está siempre arriba y nombra a las columnas mediante letras, que en el caso de Excel 2000 van desde la A hasta la IV. Luego de la columna Z viene la AA, AB, AC, etc.; luego de la AZ viene la BA, la BB, la BC, etc.; y así sucesivamente.<br />
<br />
<b>Celda</b>: Es la intersección de una fila y una columna y en ella se introducen los gráficos, ya se trate de texto, números, fecha u otros datos. Una celda se nombra mediante el nombre de la columna, seguido del nombre de la fila. Por ejemplo, la celda que es la intersección de la fila 29 con la columna F, se denomina F29.<br />
<br />
<b>Rango</b>: Los rangos son una referencia a un conjunto de celdas de una planilla de cálculos. Se definen mediante letras y números. Se denomina mediante la celda de una esquina del rango (generalmente la superior izquierda), luego dos puntos y la esquina opuesta. Por ejemplo, al rango que comprende las celdas C4, C5, C6, C7, D4, D5, D6, D7, E4, E5, E6 y E7 se lo denomina C4:E7. En la figura 2 vemos la representación del rango de ejemplo.<br />
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<b><span style="font-size: large;">Prestaciones de Microsoft Excel. </span></b><br />
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<span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas">Familiaridad: </span></b></span><br />
<ul><li><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"></span><span class="hps" title="Haz clic para obtener traducciones alternativas">La</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Mayoría</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de la</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Gente</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">ha</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Usado</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Otro</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">producto</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Microsoft</span><span title="Haz clic para obtener traducciones alternativas">,</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">ya</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">el mar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de Word</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">o</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">PowerPoint</span><span title="Haz clic para obtener traducciones alternativas">.</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">La mayoría de</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">la gente ha</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">usado</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">otro</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">producto de Microsoft</span><span title="Haz clic para obtener traducciones alternativas">, ya</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">sea</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Word o</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">PowerPoint</span><span title="Haz clic para obtener traducciones alternativas">.</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Microsoft</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Excel</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">banking</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">La Que</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">estandar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Interfaz</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">YA ESTA</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Con</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">familiarizado</span><span title="Haz clic para obtener traducciones alternativas">.</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Microsoft</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Excel</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">utiliza</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">la</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">interfaz</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">estándar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">que</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">ya está familiarizado con</span><span title="Haz clic para obtener traducciones alternativas">.</span></span></li>
</ul><span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas">Tamaño:</span></b></span><br />
<span class="long_text" id="result_box" lang="es"></span><br />
<ul><li><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas">Microsoft</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Excel</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">puede</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">almacenar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">cantidades</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">muy</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">grandes</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">datos</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">-</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">hasta 1</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">millón de filas</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">y 16.000</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">columnas</span><span title="Haz clic para obtener traducciones alternativas">.</span></span></li>
</ul><span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas">Gráficas</span></b></span><br />
<span class="long_text" id="result_box" lang="es"></span><br />
<ul><li><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas">Excel</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">crea</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">gráficos de aspecto profesional</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">y gráficos</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">con</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">efectos 3D</span><span title="Haz clic para obtener traducciones alternativas">, sombras</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">y</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">transparencia</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">aún</span><span title="Haz clic para obtener traducciones alternativas">.</span></span><span class="long_text" id="result_box" lang="es"><span title="Haz clic para obtener traducciones alternativas"> </span></span></li>
</ul><span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas">Tablas dinámicas:</span></b></span><br />
<span class="long_text" id="result_box" lang="es"></span><br />
<ul><li><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas">PivtotTables</span> pueden <span class="hps" title="Haz clic para obtener traducciones alternativas">ayudarle a encontrar respuestas</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">a las preguntas de</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">forma rápida</span><span title="Haz clic para obtener traducciones alternativas">,</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">sencilla</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">y responsable</span><span title="Haz clic para obtener traducciones alternativas">.</span><span title="Haz clic para obtener traducciones alternativas"></span></span><span class="long_text" id="result_box" lang="es"> <span class="hps" title="Haz clic para obtener traducciones alternativas">Usted</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">puede arrastrar y</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">soltar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">los campos</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">para hacer</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">cambiar de imagen</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de la tabla</span><span title="Haz clic para obtener traducciones alternativas">.</span></span></li>
</ul><span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas">Formato condicional:</span></b></span><br />
<ul><li><span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas"></span></b><span class="hps" title="Haz clic para obtener traducciones alternativas">Con</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">el formato condicional</span><span title="Haz clic para obtener traducciones alternativas">,</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">puede</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">cambiar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">la</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">forma de</span> <span class="hps atn" title="Haz clic para obtener traducciones alternativas">una "</span><span title="Haz clic para obtener traducciones alternativas">celda</span><span title="Haz clic para obtener traducciones alternativas">"</span> <span class="hps atn" title="Haz clic para obtener traducciones alternativas">(</span><span title="Haz clic para obtener traducciones alternativas">la intersección</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">una</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">columna</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">y</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">una fila</span><span title="Haz clic para obtener traducciones alternativas">)</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">se ve</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">sobre la base de</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">la información</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">contenida.</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Por</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">ejemplo</span><span title="Haz clic para obtener traducciones alternativas">, es posible</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">que</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">las células</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">con</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">un</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">valor</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">negativo</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">que</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">el texto</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de color rojo</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">los valores positivos,</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">había</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">texto en negro</span><span title="Haz clic para obtener traducciones alternativas">.</span></span></li>
</ul><span class="long_text" id="result_box" lang="es"><span title="Haz clic para obtener traducciones alternativas"></span></span><span class="long_text" id="result_box" lang="es"><b><span class="hps" title="Haz clic para obtener traducciones alternativas">Compartir:</span></b></span><br />
<span class="long_text" id="result_box" lang="es"></span><br />
<ul><li><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas">Si utiliza</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Microsoft</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Office SharePoint Server</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">con</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">Excel</span><span title="Haz clic para obtener traducciones alternativas">, puede cambiar</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">la</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">hoja de cálculo</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">de Excel</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">en</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">un</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">archivo</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">HTML para</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">que</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">cualquier persona puede</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">ver</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">los datos</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">usando</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">un</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">navegador</span> <span class="hps" title="Haz clic para obtener traducciones alternativas">web.</span></span></li>
</ul><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"> </span></span><span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"> </span></span><br />
<span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"><b>Reflexion:</b></span></span><br />
<br />
<span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"></span></span><br />
<span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"></span></span><br />
<span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas"></span></span><br />
<span class="long_text" id="result_box" lang="es"><span class="hps" title="Haz clic para obtener traducciones alternativas">Excel es una aplicacion del sistema de Micrisoft Office muy util si queremos elaborar tablas de calcula de garn variedad; excel posee una gran variedad de posibilidades de creacion y generacion de tablas o graficas para cualquier tipo de fin como son, la utilizacion para la elaboracion de tareas escolares y profesionales ya que es una aplicacion con una interfas muy dinamica y sencilla. Las tablas pueden contener comandos o cadenas utiles para procesar matecaticamente y/o graficamente los datos.</span></span><br />
<span class="long_text" id="result_box" lang="es"><span title="Haz clic para obtener traducciones alternativas"></span></span><br />
<br />
<span class="long_text" id="result_box" lang="es"><span title="Haz clic para obtener traducciones alternativas"></span></span><br />
<div style="text-align: justify;"><br />
</div><h1 class="firstHeading" id="firstHeading" style="font-weight: normal;"><span style="font-size: small;"> </span></h1><h1 class="firstHeading" id="firstHeading" style="font-weight: normal;"><span style="font-size: small;"> </span></h1><h1 class="firstHeading" id="firstHeading" style="font-weight: normal;"><span style="font-size: small;"> </span> </h1>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-35121065150835388272011-02-28T21:08:00.000-06:002012-10-04T22:26:45.183-05:00VENTANA DE APLICACIONAl abrir la aplicacion encontramos una ventana como esta:<br />
<br />
<div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-QJO1uUy7Qz8/TWMmu8Pk-1I/AAAAAAAAADM/GKAyrxjnigQ/s1600/20080409170839-barras-excel.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="544" j6="true" src="http://3.bp.blogspot.com/-QJO1uUy7Qz8/TWMmu8Pk-1I/AAAAAAAAADM/GKAyrxjnigQ/s640/20080409170839-barras-excel.jpg" width="640" /></a></div><br />
A continuacion se describen los componentes principales de la ventana:<br />
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<div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><span style="font-family: "Trebuchet MS","Lucida Grande",sans-serif;"><i>La <span style="color: #00465c;"><b>Barra de título</b><span style="color: black;">,</span></span> los botones de <b><span style="color: #00465c;">Maximizar</span></b>, <span style="color: #00465c;"><b>Minimizar</b> </span>y <b><span style="color: #00465c;">Cerrar</span></b>, tienen las funciones propias de cualquier ventana de Windows. </i></span></div><br />
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<div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><span style="font-family: "Trebuchet MS","Lucida Grande",sans-serif;"><i><b><span style="color: #00465c;">Barra de Menús</span></b>: permite el acceso a los menús de Excel, que incluyen todas las funciones que ésta aplicación puede realizar.</i></span> </div><div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"> </div><div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><span style="font-family: "Trebuchet MS","Lucida Grande",sans-serif;"><i><b><span style="color: #00465c;">Barras de Herramientas</span></b>: permite realizar de forma rápida las funciones más usuales de la Barra de Menús.</i></span> </div><div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"> </div><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-36Rbbg9LrNs/TWMneJ4bIOI/AAAAAAAAADU/tBH4y9f_JI0/s1600/Image4665.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="28" j6="true" src="http://4.bp.blogspot.com/-36Rbbg9LrNs/TWMneJ4bIOI/AAAAAAAAADU/tBH4y9f_JI0/s640/Image4665.gif" width="640" /></a></div><div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><span style="font-family: "Trebuchet MS","Lucida Grande",sans-serif;"><i> </i></span></div><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-dVUlmRxVIyY/TWMnaHu3b4I/AAAAAAAAADQ/y52ju_Q1Dx8/s1600/Image4666.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="300" j6="true" src="http://4.bp.blogspot.com/-dVUlmRxVIyY/TWMnaHu3b4I/AAAAAAAAADQ/y52ju_Q1Dx8/s320/Image4666.gif" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><span style="font-family: "Trebuchet MS","Lucida Grande",sans-serif;"><i><b><span style="color: #00465c;">Barra de Estado</span></b>: Ocupando la última línea de la pantalla, se encuentra la barra de estado, la cual muestra información útil del estado del documento en uso, tales como Estado del Documento Activación del Pad numérico y haciendo clic con el botón derecho del ratón sobre la barra de estado, se despliega un menú que nos permite elegir la operación que deseamos realizar al seleccionar una serie de celdas.</i></span></div><div class="separator" style="clear: both; text-align: left;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><span style="color: black;"><span style="font-family: "Trebuchet MS","Lucida Grande",sans-serif;"><i><b><span style="color: #00465c;">Barras de Desplazamiento</span></b>: Permite visualizar cualquier parte del documento desplazando estas barras por medio de los botones de sus extremos o moviendo directamente la barra. </i></span></span> </div><br />
<div class="MsoNormal" style="margin: 0cm 0cm 6pt; text-align: justify;"><i><b><span style="color: #00465c;">Barra de Fórmulas</span></b>: Esta barra tiene dos funciones primordiales: nos presenta la fórmula que estamos utilizando en la casilla activa, y en el caso de que ésta casilla en lugar de fórmulas contenga datos, también son presentados aquí. La figura siguiente muestra los elementos que constituyen la Barra de Fórmulas, algunos de los cuales solo son visibles al momento de editar algún dato.</i></div><br />
<div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-YRTZmjU9-84/TWMoRoCpOKI/AAAAAAAAADY/3Gcx6g6rp50/s1600/iteventana3.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="138" j6="true" src="http://1.bp.blogspot.com/-YRTZmjU9-84/TWMoRoCpOKI/AAAAAAAAADY/3Gcx6g6rp50/s400/iteventana3.jpg" width="400" /></a></div><div class="separator" style="clear: both; text-align: center;"><br />
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</div><div class="separator" style="clear: both; text-align: left;">Reflexion:</div><div class="separator" style="clear: both; text-align: left;"><br />
</div><div class="separator" style="clear: both; text-align: left;">La interfas de windows nos proporciona, segun el sistema operativo, una ventana mas congruente y completa.</div><div class="separator" style="clear: both; text-align: left;">En la ventana de aplicacion podemos encontrar todas las herramientas que nos ayudaran a completar satisfactoriamente nuestro trabajo. En ella tenemos herramientas de formato de texto que esta conformada por los tipos de letra, fuente, tamaño de la letra, etc. Tambien la barra de imagen en donde podemos configurar e insertar imagenes prediseñadas o cargadas desde una ubicacion en el disco. La barra de archivo es en la cual encontramos comandos de guardado rapido asi como abrir documentos recientes, imprimir, rehacer y deshacer, etc.</div><div class="separator" style="clear: both; text-align: left;"><br />
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</div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-47179220722211854612011-02-28T12:02:00.000-06:002012-10-04T22:26:45.189-05:00METODOS DE ACCESO<div style="text-align: center;"><b><span class="Apple-style-span" style="font-size: large;">Los pasos a seguir para abrir el programa son:</span></b></div><div style="text-align: center;"><b><span class="Apple-style-span" style="font-size: large;"><br />
</span></b></div>Inicio > Programas > Microsoft Excel<br />
<div style="text-align: left;"></div><div style="text-align: left;"><br />
</div><div style="text-align: left;">Pero también puede comenzarse la aplicación haciendo doble clic sobre un ícono del escritorio </div><div style="text-align: left;">de Windows:</div><div style="text-align: left;"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-mv1yPLD7_04/TVlpJSXU4zI/AAAAAAAAACs/YtcQRu3yMec/s1600/Diapositiva2.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://4.bp.blogspot.com/-mv1yPLD7_04/TVlpJSXU4zI/AAAAAAAAACs/YtcQRu3yMec/s640/Diapositiva2.JPG" width="640" /></a></div><div style="text-align: center;"><br />
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</div><div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-HA_0pJ4qexQ/TVloDDkYsTI/AAAAAAAAACo/ld1mpnoAQEw/s1600/5v3r.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://3.bp.blogspot.com/-HA_0pJ4qexQ/TVloDDkYsTI/AAAAAAAAACo/ld1mpnoAQEw/s1600/5v3r.gif" /></a></div><div style="text-align: center;"> </div><div style="text-align: left;"> </div><div style="text-align: left;">Hay que tener en cuenta que el ícono del escritorio no siempre está disponible, aunque </div><div style="text-align: left;">podemos generarlo en cualquier momento</div><div style="text-align: left;"><br />
</div><div style="text-align: left;"><b>Aqui un pequeño tutoria de como entrar a la aplicacion:</b></div><div style="text-align: left;"><br />
</div><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen='allowfullscreen' webkitallowfullscreen='webkitallowfullscreen' mozallowfullscreen='mozallowfullscreen' width='320' height='266' src='https://www.youtube.com/embed/3HYNe-yzXFQ?feature=player_embedded' frameborder='0'></iframe></div><div class="separator" style="clear: both; text-align: center;"><br />
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</div><div class="separator" style="clear: both; text-align: left;">Aqui otras maneras de entrar:</div><div class="separator" style="clear: both; text-align: left;"><br />
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</div><div style="text-align: left;"><span class="Apple-style-span" style="font-family: Georgia,"Times New Roman",Times,serif;"></span></div><table border="0" style="width: 444px;"><tbody>
<tr style="vertical-align: top;"><td style="color: black; font-family: Georgia,"Times New Roman",Times,serif; margin-left: 0px; margin-right: 0px; text-align: left; text-indent: 0px;" valign="top" width="436"><ul><li>Opere a través del menú Inicio para encontrar el acceso directo.</li>
</ul><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-dyPWSMSAde4/TVlr4hMQCnI/AAAAAAAAACw/vWuQxFRnQ3I/s1600/Diapositiva1.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="300" src="http://2.bp.blogspot.com/-dyPWSMSAde4/TVlr4hMQCnI/AAAAAAAAACw/vWuQxFRnQ3I/s400/Diapositiva1.JPG" width="400" /></a></div><div style="text-align: center;"><span class="Apple-style-span" style="font-family: "Times New Roman";"></span></div> <span class="Apple-style-span" style="font-family: "Times New Roman";"><a href="http://1.bp.blogspot.com/-pVXe7NiVQRU/TVlr6OHW97I/AAAAAAAAAC0/j1kK6QJfd5I/s1600/Diapositiva2.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://1.bp.blogspot.com/-pVXe7NiVQRU/TVlr6OHW97I/AAAAAAAAAC0/j1kK6QJfd5I/s640/Diapositiva2.JPG" width="640" /></a></span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-5AuFh5nSTPE/TVlr7SzMe3I/AAAAAAAAAC4/xlk4pMxDUPE/s1600/Diapositiva3.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://1.bp.blogspot.com/-5AuFh5nSTPE/TVlr7SzMe3I/AAAAAAAAAC4/xlk4pMxDUPE/s640/Diapositiva3.JPG" width="640" /></a></div><br />
<div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-RGh7-uOiRJo/TVlr8XbGEpI/AAAAAAAAAC8/zTB18ZqXqOQ/s1600/Diapositiva4.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://3.bp.blogspot.com/-RGh7-uOiRJo/TVlr8XbGEpI/AAAAAAAAAC8/zTB18ZqXqOQ/s640/Diapositiva4.JPG" width="640" /></a></div><br />
<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-nrWv7SyTMGg/TVlr9Lv23WI/AAAAAAAAADA/3bFe_nkMyFg/s1600/Diapositiva5.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://2.bp.blogspot.com/-nrWv7SyTMGg/TVlr9Lv23WI/AAAAAAAAADA/3bFe_nkMyFg/s640/Diapositiva5.JPG" width="640" /></a></div><div class="separator" style="clear: both; text-align: center;"><br />
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</div><div style="text-align: center;"></div></td></tr>
<tr style="vertical-align: top;"><td style="color: black; font-family: Georgia,"Times New Roman",Times,serif; margin-left: 0px; margin-right: 0px; text-align: left; text-indent: 0px;" valign="top" width="436"><ul><li>Busque el archivo <span class="file" style="font-family: Verdana,Arial,sans-serif; font-size: smaller; font-weight: bold;"><b>Excel.exe</b></span> en el Explorer y haga doble-clic en el mismo.</li>
</ul><div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-CoE93aEcWUA/TVltTbAQfNI/AAAAAAAAADE/K_gbnY0H85Y/s1600/Presentaci%25C3%25B3n1.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://3.bp.blogspot.com/-CoE93aEcWUA/TVltTbAQfNI/AAAAAAAAADE/K_gbnY0H85Y/s640/Presentaci%25C3%25B3n1.jpg" width="640" /></a></div><div style="text-align: center;"><br />
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<tr style="vertical-align: top;"><td style="color: black; font-family: Georgia,"Times New Roman",Times,serif; margin-left: 0px; margin-right: 0px; text-align: left; text-indent: 0px;" valign="top" width="436"><ul><li>En el menú Inicio, abra Ejecutar, escriba allí <span class="type" style="background-color: white; color: black; font-family: Verdana,Tahoma,Arial,Helvetica,sans-serif; font-size: 14px;"><b> excel </b></span>, y haga clic en <b>Aceptar</b>.</li>
</ul><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-xa5oFfRR2Zc/TVluF318O_I/AAAAAAAAADI/SV2adQTJh-M/s1600/Presentaci%25C3%25B3n1s.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="480" src="http://1.bp.blogspot.com/-xa5oFfRR2Zc/TVluF318O_I/AAAAAAAAADI/SV2adQTJh-M/s640/Presentaci%25C3%25B3n1s.jpg" width="640" /></a></div><div style="text-align: center;"><br />
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</div><div style="text-align: left;">Reflexion:</div><div style="text-align: left;"><br />
</div><div style="text-align: left;">Hay varios metodos de acceso a la aplicacion de excel, desde algo tan sencillo como dar doble click en el icono en el escritorio y comandos abreviados con el teclado.</div><div style="text-align: left;"><br />
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</tbody></table>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-72994549382955804302011-02-27T19:23:00.000-06:002012-10-04T22:26:45.195-05:00TIPOS DE DATOS<div style="text-align: center;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><b><span style="color: #38761d;"><span style="color: black; font-size: large;">ELEMENTOS PRINCIPALES DE EXCEL</span></span></b></span></span></div><br />
<span style="color: black;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><b><span style="color: #38761d;">Excel es un programa de hoja de cálculo que para su óptima utilización ofrece cuatro elementos principales.</span></b><br />
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<b><span style="color: #38761d;">1.Hojas de Cálculo.-</span></b> <span style="color: black;">Este elemento permite realizar trabajos con números para calcular un informe de gastos, llevar el control del talonario de cheques, determinar si una inversión es rentable y realizar balances generales, estados de resultados u otros cálculos.</span></span></span><b><span style="color: #6aa84f;"></span></b></span><br />
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<span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">2.Bases de Datos.-</span></b> Se pueden efectuar análisis estadísticos de los datos contenidos en las hojas de cálculo, almacenar grandes bloques de datos o buscar y extraer cierta información de un grupo de ellos, entre otras.</span></span></span></div><span style="color: black;"><b><span style="color: #6aa84f;"></span></b></span><br />
<div class="content" style="text-align: justify;"><span style="color: black;"></span></div><div class="content" style="text-align: justify;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">3.Gráficos.-</span></b> Esta capacidad consiste en representar información numérica en forma de un grafico o diagrama. Los gráficos y diagramas son indispensables para extraer la información de un grupo de ellos, entre otras.</span></span></span></div><span style="color: black;"><b><span style="color: #6aa84f;"></span></b></span><br />
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<span style="color: black;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><b><span style="color: #38761d;">4.Dibujos.-</span></b> <span style="color: black;">Se pueden realizar anotaciones en los gráficos y en las hojas de cálculo. Esta posibilidad es excelente para decorar las hojas de cálculo.</span></span></span></span></div><div class="content" style="text-align: left;"></div><span style="color: black;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"></span></span></span><br />
<div class="content" style="text-align: justify;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><b><span style="color: #38761d;"><span style="color: black;">Existen 3 conceptos fundamentales en la estructura de una hoja de cálculo de Excel:</span></span></b></span></span></div><b><span style="color: #6aa84f;"></span></b><br />
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</div><div class="content" style="text-align: justify;"></div><div class="content" style="text-align: justify;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">1.-Columna:</span></b> Las columnas están identificadas por medio de letras que van desde la A hasta la combinación de las letras IV (256 en total). Las columnas se encuentran en forma vertical. </span></span></span></div><div class="content" style="text-align: justify;"><br />
<span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">2.-Fila:</span></b> Las filas están identificadas por números del 1 al 65536. las filas se encuentran en forma horizontal.</span></span></span></div><b><span style="color: #6aa84f;"></span></b><br />
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</div><div class="content" style="text-align: justify;"><span style="color: black;"></span></div><div class="content" style="text-align: justify;"><span style="color: black;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><b><span style="color: #38761d;">3.-celda</span></b><span style="color: black;">: La intersección de una columna con una fila forma una celda. Una celda es una localidad en la cual se puede almacenar un dato que puede ser un número, un rotulo una fórmula. En total existen 16777216 celdas en una hoja de cálculo. Cada celda tiene una referencia que esta dada por la letra de la columna y el número de la fila que forman.</span></span></span><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><b><span style="color: #38761d;"></span></b></span></span></span></div><br />
<b>Los datos introducidos en excel pueden ser de varios tipos:</b><br />
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<div class="content" style="text-align: justify;"><span style="color: black;"><b><br />
<span style="color: #38761d;"><span style="color: #38761d;">1.-Rótulos:</span></span></b><span style="color: black;"> son combinaciones de caracteres alfanuméricos, es decir, letras, números y caracteres de puntuación. La única limitación que pone a Excel a los rótulos es que no pueden exceder los 32000 caracteres. Un rotulo no puede iniciar con un signo “+, - o = ya que Excel los confundiría con una fórmula.</span></span><br />
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<span style="color: black;"></span></span></div><div class="content" style="text-align: justify;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">2.-Fechas y Horas:</span> </b>Excel reconoce las fechas y horas que se introduzcan en los formatos más utilizados. El limite superior de las fechas en Excel es el 31 de diciembre de 9999, correspondiente al numero de serie 2958465. Los valores de hora se pueden utilizar en formato de 24 o 12.</span></span></span></div><div class="content" style="text-align: justify;"><br />
<span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">3.-Valores:</span></b>En Excel valor es simplemente, un número. Los valores que se introduzcan en Excel deberán iniciar siempre con un punto decimal (.), un signo + o un signo -. Excel podrá manejar números con hasta 30 decimales.</span></span></span></div><div class="content" style="text-align: justify;"></div><div class="content" style="text-align: justify;"><span style="color: black;"></span></div><div class="content" style="text-align: justify;"><span style="font-family: Times,"Times New Roman",serif;"><span style="color: #6aa84f;"><span style="color: black;"><b><span style="color: #38761d;">4.-Formulas:</span></b>En Excel es posible introducir formulas para realizar cálculos dentro de las hojas. Todas las formulas que se introduzcan deberán comenzar con algunos de los siguientes caracteres +,- o =. Una de las cosas más importantes de las formulas es que no se pueden trabajar directamente con números sino también con referencias.</span></span></span><br />
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<span style="color: black;">Reflexion:</span><br />
<br />
<span style="color: black;">Excel es una aplicacion que nos permite introducir muchos tipos de datos y nos sirve para graficar datos, desde operaciones sencillas hasta ecuaciones algebraicas, sabiendolas utilizar.</span><br />
<span style="color: black;">Podemos introducir diferentes tipos de datos en la aplicion, los mas importantes como rotulos que son pequeños "letreros". Valores que son cifras o números para realizar operaciones matematicas y formulas que son comandos con los cuales realizamos operaciones algebraicas desde sumas y restas hasta ecuaciones. </span></div></div></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-27795444883487982842011-02-26T19:54:00.000-06:002012-10-04T22:26:45.179-05:00OPERADORES ARITMETICOS PARA PRODUCIR FORMULAS<b><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Operadores aritméticos:</span></span></b><br />
<br />
<b><span style="background-color: #9fc5e8; color: red;"></span></b><span style="background-color: white; color: black;">Para ejecutar las operaciones matemáticas básicas como suma, resta o multiplicación, combinar números y generar resultados numéricos, utilice los siguientes operadores aritméticos.</span><br />
<br />
<br />
<br />
<br />
<br />
<br />
<br />
<center><table border="1" bordercolor="#515c9a" cellpadding="4" id="table58" style="border-collapse: collapse; width: 287px;"><tbody>
<tr><td valign="middle" width="51%"><b><span style="font-family: Arial; font-size: xx-small;"></span></b><br />
<div align="center"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: blue;">Operador aritmético</span></span></div></td><td valign="middle" width="49%"><b><span style="font-family: Arial; font-size: xx-small;"></span></b><br />
<div align="center"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: blue;">Significado (Ejemplo)</span></span></div></td></tr>
<tr><td valign="middle" width="51%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">+ (signo más)</span></span></td><td valign="middle" width="49%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">Suma (3+3) "binario"</span></span></td></tr>
<tr><td valign="middle" width="51%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">- (signo menos)</span></span></td><td valign="middle" width="49%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">Resta (3-1)<br />
Negación (-1) "binario"</span></span></td></tr>
<tr><td valign="middle" width="51%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">* (asterisco)</span></span></td><td valign="middle" width="49%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">Multiplicación (3*3) "binario"</span></span></td></tr>
<tr><td valign="middle" width="51%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">/ (barra oblicua)</span></span></td><td valign="middle" width="49%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">División (3/3) "binario"</span></span></td></tr>
<tr><td valign="middle" width="51%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">% (signo de porcentaje)</span></span></td><td valign="middle" width="49%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">Porcentaje (20%) "unario"</span></span></td></tr>
<tr><td valign="middle" width="51%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">^ (acento circunflejo)</span></span></td><td valign="middle" width="49%"><span style="background-color: #9fc5e8; color: red; font-family: Arial; font-size: xx-small;"><span style="background-color: white; color: black;">Exponenciación (3^2) "binario"</span></span></td></tr>
</tbody></table></center><br />
<div align="left"></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Diseño de Fórmula Binario:</span></span></div><div align="justify"></div><div align="justify"><span style="background-color: white; color: black;"></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Operando 1 OPERADOR Operando 2</span></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"> Dato 1 + Dato 2</span></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"> Constante + Constante</span></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"> Constante + Variable</span></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"> Variable + Constante</span></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"> Variable + Variable.</span></span></div><div align="justify"></div><div align="justify"><span style="background-color: white; color: black;"></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Diseño de Fórmula Unario</span></span></div><div align="justify"></div><div align="justify"><span style="background-color: white; color: black;"></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Constante %</span></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Variable %</span></span><br />
<span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"> </span></span></div><div align="justify"></div><div align="justify"><span style="background-color: white; color: black;"></span></div><div align="justify"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">La jerarquía de los signos es la siguiente:</span></span></div><div align="justify"></div><div align="justify"><span style="background-color: white; color: black;"></span></div><div style="text-align: left;"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">1.- "( )" </span></span></div><div style="text-align: left;"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">2.- "%" Porcentaje</span></span></div><div style="text-align: left;"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">3.- "^" Exponente</span></span></div><div style="text-align: left;"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">4.- "*" Multiplicacion</span></span></div><div style="text-align: left;"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">5.- "+" Suma</span></span></div><div style="text-align: left;"><span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">6.- "-" Resta o diferencia</span></span><br />
<span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">7.- "/" Division</span></span><br />
<span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"><br />
</span></span><br />
<span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Reflexion:</span></span><br />
<span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;"><br />
</span></span><br />
<span style="background-color: #9fc5e8; color: red;"><span style="background-color: white; color: black;">Con los operadores aritmeticos podemos realizar operaciones algebraicas sencillas y complejas como sumas, restas, divisiones, etc. Los operadores se utilizan siempre en compañia de formulas para que el sistema de la aplicacion pueda reconocer las funciones y señalando siempre las celdas correspondientes cuidando que contengan un solo tipo de dato como valor o rotulo.</span></span></div><div align="left"></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-44319936659775584352011-02-25T11:35:00.002-06:002012-10-04T22:26:45.187-05:00FUNCIONES DE EXCEL<b><span style="font-size: large;">Que es una funcion?</span></b><br />
<br />
Una función es una fórmula predefinida por Excel que opera sobre uno o más valores (<b>argumentos</b>) en un orden determinado (<b>estructura</b>). El resultado se mostrará en la celda donde se introdujo la formula.<br />
El tipo de argumento que utiliza una función es específico de esa función. Así, los argumentos pueden ser números, texto, valores lógicos como VERDADERO o FALSO, matrices, valores de error como #N/A o referencias de celda. Un argumento puede ser una constante, una fórmula o incluso otra función.<br />
Excel cuenta con una gran variedad de funciones dependiendo del tipo de operación o cálculo que realizan. Estas funciones pueden ser matemáticas y trigonométricas, estadísticas, financieras, de texto, de fecha y hora, lógicas, de base de datos, de búsqueda y referencia y de información.<br />
<br />
<span style="font-size: large;"><b>Estructura de una función</b></span><br />
<br />
La sintaxis de cualquier función es:<br />
<b>=nombre_funcion(argumento1;argumento2;…;argumentoN)</b><br />
Esto es:<br />
<ol><li>Signo igual (=).</li>
<li>Nombre de la función.</li>
<li>Paréntesis de apertura.</li>
<li>Argumentos de la función separados por puntos y comas.</li>
<li>Paréntesis de cierre.</li>
</ol><b><span style="font-size: large;">Funciones por categoria</span></b><br />
<h3 class="post-title entry-title" style="font-weight: normal;">Funciones logicas </h3><div style="text-align: left;"><span class="Apple-style-span">Las Funciones Lógicas permiten evaluar uno o varios criterios, según corresponda devolverán un resultado d verdadero, falso o cierto valor numérico o de texto de acuerdo a dichas condiciones.</span><br />
<span class="Apple-style-span"><br />
</span></div><div style="text-align: left;"><span class="Apple-style-span">Aquí pueden ver ejemplos de las funciones logicas.</span></div><div style="text-align: left;"><span class="Apple-style-span"><br />
</span></div><div style="text-align: left;"><span class="Apple-style-span">1. <span class="Apple-style-span" style="color: blue;">FALSO</span>: solo devuelve el valor lógico FALSO.</span></div><br />
<div class="p_IndentList2"><span class="f_IndentList2">2. <span class="Apple-style-span" style="color: blue;">NO</span>: evalúa un valor lógico (VERDADERO o FALSO) y devuelve un valor lógico opuesto.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">3. <span class="Apple-style-span" style="color: blue;">O</span>: evalúa una serie de comparaciones. Si al menos una de ellas es verdadera, la función devuelve VERDADERO. Solo si todas ellas son falsas, devuelve FALSO.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">4. <span class="Apple-style-span" style="color: blue;">SI</span>: devuelve un valor entre dos posibles valores, dependiendo de una condición indicada.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">5. <span class="Apple-style-span" style="color: blue;">VERDADERO</span>: solo devuelve el valor lógico VERDADERO.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">6. <span class="Apple-style-span" style="color: blue;">Y</span>: evalúa una serie de comparaciones. Si todas las entradas son verdaderas devuelve VERDADERO, si al menos una de ellas es falsa devuelve FALSO.</span></div><div class="p_IndentList2"></div><div class="p_IndentList2"><h3 class="post-title entry-title" style="font-weight: normal;">Funciones de bases de datos </h3><span class="Apple-style-span">Las Funciones de Bases de Datos permiten hacer operaciones sobre valores de una base de datos de Excel. </span> <span class="Apple-style-span"><br />
</span><br />
<span class="Apple-style-span">veamos ejemplos de cada una de ellas.</span> <span class="Apple-style-span"><br />
</span><br />
<span class="Apple-style-span">1. <span class="Apple-style-span" style="color: blue;">BDCONTAR</span>: devuelve la cantidad de números en una columna o campo de una base de datos según una condición.</span><span class="Apple-style-span"><br />
</span><br />
<div class="p_IndentList2"><span class="f_IndentList2">2. <span class="Apple-style-span" style="color: blue;">BDCONTARA</span>: devuelve la cantidad de celdas no vacías en una columna de una base de datos, según una condición.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">3. <span class="Apple-style-span" style="color: blue;">BDEXTRAER</span>: devuelve un dato de una columna de una base de datos, según un criterio.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">4. <span class="Apple-style-span" style="color: blue;">BDMAX</span>: devuelve el máximo valor de una columna de una base de datos, según un criterio.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">5. <span class="Apple-style-span" style="color: blue;">BDMIN</span>: devuelve el mínimo valor de una columna de una base de datos, según un criterio.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">6. <span class="Apple-style-span" style="color: blue;">BDPROMEDIO</span>: devuelve el promedio de una columna de una base de datos, según un criterio.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">7. <span class="Apple-style-span" style="color: blue;">BDSUMA</span>: devuelve la suma de los valores de una columna de una base de datos, según un criterio.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">8. <a href="http://www.blogger.com/post-edit.g?blogID=5539959740437217345&postID=4431993665977558435" style="color: blue;">BDVAR</a><span style="color: blue;">:</span> devuelve la varianza de una columna o campo de una base de datos según una condición.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">9. <a href="http://www.blogger.com/post-edit.g?blogID=5539959740437217345&postID=4431993665977558435" style="color: blue;">BDVARP</a><span style="color: blue;">:</span> devuelve la varianza de una columna o campo de una base de datos, considerando la misma como población total, según una condición.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">10. <a href="http://www.blogger.com/post-edit.g?blogID=5539959740437217345&postID=4431993665977558435" style="color: blue;">BDDESVESTP</a><span style="color: blue;">:</span> devuelve la desviación estándar de una columna o campo de una base de datos según una condición, considerando la población total.</span></div><br />
<div class="p_IndentList2"><span class="f_IndentList2">11. <a href="http://www.blogger.com/post-edit.g?blogID=5539959740437217345&postID=4431993665977558435" style="color: blue;">BDEXTRAER</a><span style="color: blue;">:</span> devuelve un dato de una columna de una base de datos, según un criterio.</span></div><div class="p_IndentList2"><span class="f_IndentList2"><br />
</span></div><div class="p_IndentList2"><span class="f_IndentList2">12. <a href="http://www.blogger.com/post-edit.g?blogID=5539959740437217345&postID=4431993665977558435" style="color: blue;">BDPRODUCTO</a><span style="color: blue;">: </span>devuelve el producto de valores en una columna o campo de una base de datos según una condición.</span> </div><span class="f_IndentList2"></span><br />
<h3 class="post-title entry-title" style="font-weight: normal;">Funciones de fecha y hora</h3><span class="Apple-style-span"></span><br />
<div><span class="Apple-style-span"><span class="Apple-style-span">Las Funciones de Fecha y hora se aplican en cálculos diversos que involucren el tiempo en cualquiera de sus expresiones.</span></span></div><div><span class="Apple-style-span"><br />
</span></div><div><span class="Apple-style-span"><span class="Apple-style-span">1. <span class="Apple-style-span" style="color: blue;">HOY</span>: devuelve la fecha actual, según el reloj interno controlado por su ordenador.</span></span></div><div><span class="Apple-style-span"><span class="Apple-style-span"><br />
</span></span><br />
<div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">2. <span class="Apple-style-span" style="color: blue;">AÑO</span>: devuelve el año de una celda que contiene una fecha.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">3. <span class="Apple-style-span" style="color: blue;">AHORA</span>: devuelve la fecha, hora y minutos actuales, según el reloj interno controlado por su ordenador.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">4. <span class="Apple-style-span" style="color: blue;">FECHA</span>: forma una fecha con el año, mes y día indicados.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">5. <span class="Apple-style-span" style="color: blue;">FECHANUMERO</span>: evalúa un texto y devuelve una fecha, solo si dicho texto se puede convertir en una fecha.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">6. <span class="Apple-style-span" style="color: blue;">FIN.MES</span>: devuelve una fecha de culminación de mes, anterior o posterior a la fecha indicada, según un valor numérico</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">7. <span class="Apple-style-span" style="color: blue;">FECHA.MES</span>: cambia el mes de una fecha. Este mes puede ser anterior o posterior a la fecha que se le proporciona.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">8. <span class="Apple-style-span" style="color: blue;">DIAS360</span>: devuelve la cantidad de días existentes entre dos fechas, basándose en un año de 360 días (considera meses de 30 días).</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">9. <span class="Apple-style-span" style="color: blue;">SIFECHA</span>: calcula la diferencia de tiempo entre 2 fechas. La función puede devolver la diferencia en días, meses o años.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">10. <span class="Apple-style-span" style="color: blue;">FRAC.AÑO</span>: devuelve la diferencia de días entre dos fechas dividido la cantidad de días que posee un año.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">11. <span class="Apple-style-span" style="color: blue;">DIAS.LAB</span>: devuelve el número de días laborables (omitiendo sábados y domingos) existentes entre dos fechas especificadas.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">12. <span class="Apple-style-span" style="color: blue;">DIA.LAB</span>: devuelve una fecha laborable resultante de considerar una fecha de inicio y luego sumarle o restarle un cierto número de días laborables.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">13. <span class="Apple-style-span" style="color: blue;">DIA</span>: devuelve el número de día de una celda que contiene una fecha.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">14. <span class="Apple-style-span" style="color: blue;">DIASEM</span>: devuelve el número de día en la semana de una celda que contiene una fecha.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">15. <span class="Apple-style-span" style="color: blue;">HORA</span>: devuelve un número que representa la hora de un valor hora determinado.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">16. <span class="Apple-style-span" style="color: blue;">HORANUMERO</span>: devuelve un numero decimal, que corresponde a una hora en formato de texto.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">17. <span class="Apple-style-span" style="color: blue;">MES</span>: devuelve el número de mes de una celda que contiene una fecha.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">18. <span class="Apple-style-span" style="color: blue;">MINUTO</span>: devuelve un número que representa los minutos de un valor hora determinado.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">19. <span class="Apple-style-span" style="color: blue;">NSHORA</span>: devuelve un número nulo o bien, positivo menor que uno, este numero decimal representa una determinada hora.</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">20. <a href="http://www.blogger.com/post-edit.g?blogID=5539959740437217345&postID=4431993665977558435" style="color: blue;">NUM.DE.SEMANA</a><span style="color: blue;">:</span> devuelve el número ordinal de una semana en el año que corresponde a la fecha indicada</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2"><br />
</span></span></span></div><div class="p_IndentList2"><span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">21. <span class="Apple-style-span" style="color: blue;">SEGUNDO</span>: devuelve un número que representa los segundos de un valor hora determinado.</span></span></span><br />
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<span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">Reflexion:</span></span></span><br />
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<span class="Apple-style-span"><span class="Apple-style-span"><span class="f_IndentList2">Excel tiene incorporadas muchas funciones capaces de realizar operaciones segun su valor en una hoja de calcula, estas van desde poner la fecha del momento, la hora, realizar operaciones matrematicas como sumas, diferencias, multiplicaciones, divisiones, etc. Tambien se pueden aplicar a rotulos, a valores o a numeros. Las diferentes funciones que contiene excel pueden ser matematicas, estadisticas, logicas, etc.</span></span></span></div><div class="p_IndentList2"></div><div class="p_IndentList2"></div></div></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-54620727276590232172011-02-24T11:27:00.002-06:002012-10-04T22:26:45.191-05:00OPERADORES RACIONALES<div style="text-align: justify;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat; color: black;">Fórmulas.</span></div><div style="text-align: justify;"><br />
</div><div></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Una fórmula es una secuencia formada por valores constantes, referencias a otras <sup>celdas</sup>, nombres, funciones, u operadores.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Una fórmula es una técnica básica para el análisis de datos. Se pueden realizar diversas operaciones con los datos de las hojas de cálculo como *,+,-,Sen,Cos,etc...</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">En una fórmula se pueden mezclar constantes, nombres, referencias a otras celdas, operadores y funciones. La fórmula se escribe en la barra de fórmulas y debe empezar siempre por el signo =.</span></div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><b><br />
</b></div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Los distintos tipos de operadores que se pueden utilizar en una fórmula son :</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">OPERADORES ARITMÉTICOS se emplean para producir resultados numéricos. </span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Ejemplo: + - * / % ^</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">OPERADOR TIPO TEXTO<i> </i>se emplea para concatenar celdas que contengan texto. </span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Ejemplo: &</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">OPERADORES RELACIONALES<i> </i>se emplean para comparar valores y proporcionar un valor lógico (verdadero o falso) como resultado de la comparación.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Ejemplo: < > = <= >= <></span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">OPERADORES DE REFERENCIAindican que el valor producido en la celda referenciada debe ser utilizado en la fórmula. </span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">En Excel pueden ser:</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">- Operador de rango indicado por dos puntos (:), se emplea para indicar un rango de celdas. Ejemplo: A1:G5</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">- Operador de unión indicado por una coma (,), une los valores de dos o más celdas. Ejemplo: A1,G5</span></div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Cuando hay varias operaciones en una misma expresión, cada parte de la misma se evalúa y se resuelve en un orden determinado. Ese orden se conoce comoprioridad de los operadores.</span></div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Se pueden utilizar paréntesis para modificar el orden de prioridad y forzar la resolución de algunas partes de una expresión antes que otras.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Las operaciones entre paréntesis son siempre ejecutadas antes que las que están fuera del paréntesis. Sin embargo, dentro de los paréntesis se mantiene la prioridad normal de los operadores.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Cuando hay expresiones que contienen operadores de más de una categoría, se resuelve antes las que tienen operadores aritméticos, a continuación las que tienenoperadores de comparación y por último las de operadores lógicos .</span></div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Los operadores de comparación tienen todos la misma prioridad, es decir que son resueltos de izquierda a derecha, en el orden en que aparecen. Son:</span></div><div style="text-align: justify;"><b><br />
</b></div><div style="text-align: justify;"><b><br />
</b></div><div align="center"><div style="text-align: center;"></div><table border="1" cellpadding="0" class="MsoNormalTable" style="width: 32.06%;"><tbody>
<tr style="background-color: #93c47d;"> <td style="-moz-background-clip: border; -moz-background-origin: padding; -moz-background-size: auto auto; background-attachment: scroll; background-image: none; background-position: 0% 0%; background-repeat: repeat; border: 1pt solid windowtext; padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: center;"></div><div style="background-color: #38761d; color: white; text-align: center;"><b><span style="background-attachment: scroll; background-image: none; background-position: 0% 0%; background-repeat: repeat repeat;">COMPARACIÓN</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: justify;"><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Igualdad (=)</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: justify;"><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Desigualdad (<>)</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: justify;"><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Menor que (<)</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: justify;"><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Mayor que (>)</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: justify;"><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Menor o igual que (<=)</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 97.84%;" width="97%"><div style="text-align: justify;"><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Mayor o igual que (>=)</span></b></div></td> </tr>
</tbody></table></div><div style="text-align: justify; text-indent: 11.25pt;"><b><br />
</b></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Los operadores lógicos y aritméticos son resueltos en el siguiente orden de prioridad (de mayor a menor):</span></div><div style="text-align: justify;"><b><br />
</b></div><div style="text-align: justify;"><b><br />
</b></div><div align="center"><div style="text-align: right;"></div><table border="1" cellpadding="0" class="MsoNormalTable" style="width: 65.88%;"><tbody>
<tr> <td style="background-color: #38761d; border: 1pt solid windowtext; color: white; padding: 0.75pt; width: 65.94%;" width="65%"><div style="text-align: right;"></div><div style="text-align: center;"><b><span style="background-attachment: scroll; background-image: none; background-position: 0% 0%; background-repeat: repeat repeat;">ARITMÉTICOS</span></b></div></td> <td style="background-color: #38761d; border: 1pt solid windowtext; color: white; padding: 0.75pt; width: 32.48%;" width="32%"><div style="text-align: center;"></div><div style="text-align: center;"><b><span style="background-attachment: scroll; background-image: none; background-position: 0% 0%; background-repeat: repeat repeat;">LÓGICOS</span></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 65.94%;" width="65%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Exponenciación (^)</span></u></b></div></td> <td style="padding: 0.75pt; width: 32.48%;" width="32%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Not</span></u></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 65.94%;" width="65%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Negación (-)</span></u></b></div></td> <td style="padding: 0.75pt; width: 32.48%;" width="32%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">And</span></u></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 65.94%;" width="65%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Multiplicación (*) y División (/)</span></u></b></div></td> <td style="padding: 0.75pt; width: 32.48%;" width="32%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Or</span></u></b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 65.94%;" width="65%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Adición (+) y Sustracción (-)</span></u></b></div></td> <td style="padding: 0.75pt; width: 32.48%;" width="32%"><div class="MsoNormal" style="text-align: justify;"><b><br />
</b></div></td> </tr>
<tr> <td style="padding: 0.75pt; width: 65.94%;" width="65%"><div style="text-align: justify;"><b><u><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Concatenación de caracteres (&)</span></u></b></div></td> <td style="padding: 0.75pt; width: 32.48%;" width="32%"><div class="MsoNormal" style="text-align: justify;"><b><br />
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</tbody></table></div><div style="text-align: justify; text-indent: 11.25pt;"><b><br />
</b></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Cuando hay multiplicación y división en la misma expresión, cada operación es resuelta a medida que aparece, de izquierda a derecha. Del mismo modo, cuando se presentan adiciones y sustracciones en una misma expresión, cada operación es resuelta en el orden en que aparece, de izquierda a derecha.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">El operador de concatenación de cadenas de caracteres (&) no es realmente un operador aritmético pero es prioritario respecto a todos los operadores de comparación.</span></div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">FUNCIONES</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Una función es una fórmula especial escrita con anticipación y que acepta un valor o valores, realiza unos cálculos con esos valores y devuelve un resultado.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Todas las funciones tienen que seguir una sintaxis y si ésta no se respeta Excel nos mostrará un mensaje de error.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">1) Los argumentos o valores de entrada van siempre entre paréntesis. No dejes espacios antes o después de cada paréntesis.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">2) Los argumentos pueden ser valores constantes (número o texto), fórmulas o funciones.</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">3) Los argumentos deben de separarse por un punto y coma ";".</span></div><div style="text-align: justify; text-indent: 11.25pt;"><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify; text-indent: 11.25pt;"><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;">Ejemplo: =SUMA(A1:B3) esta función equivale a =A1+A2+A3+B1+B2+B3</span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-BgdN7HW4kFo/TZqiKTT0c9I/AAAAAAAAAIY/2xFi_ODDjm0/s1600/OPERADORES+RACIONALES.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="236" src="http://2.bp.blogspot.com/-BgdN7HW4kFo/TZqiKTT0c9I/AAAAAAAAAIY/2xFi_ODDjm0/s640/OPERADORES+RACIONALES.jpg" width="640" /></a></div><b><span style="background-attachment: scroll; background-clip: initial; background-color: white; background-image: none; background-origin: initial; background-position: 0% 0%; background-repeat: repeat repeat;"><br />
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Reflexion:<br />
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Los operadores racionales de excel son, por decirlo asi, los simbolos matematicos que nos sirven para realizar operaciones algebraicas en una hoja de calculo como las operaciones de suma (+), diferencia (-), multiplicacion (*) y division (/), entre otras.<br />
<span style="font-size: 10pt;"></span>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-43942054758615744242011-02-23T11:54:00.003-06:002012-10-04T22:26:45.185-05:00FUNCIÓN =SI( )<div style="text-align: justify;"><span class="Apple-style-span" style="color: red; font-family: Georgia, 'Times New Roman', serif; font-size: large; line-height: 18px;">FUNCIÓN =SI( )</span></div><div style="text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-family: 'Trebuchet MS', Trebuchet, Verdana, sans-serif;"></span></span><br />
<div class="post-body entry-content" id="post-body-6731243086227354199" style="position: relative; width: 596px;"><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: left;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: xx-small; line-height: 14px;"><br />
</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: left;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: xx-small; line-height: 14px;"><br />
</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: xx-small; line-height: 14px;"> </span><span class="Apple-style-span" style="color: black; line-height: 22px;">La Función SI permite evaluar una condición (comprueba si se cumple una condición) y devuelve un valor si la condición especificada se cumple (osea si es verdadera) tendrá un valor, y en caso de que no se cumpla (osea que sea falsa) tendrá otro valor.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: black; line-height: 22px;"><br />
</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: black; line-height: 22px;"></span><span class="Apple-style-span" style="color: black; line-height: 22px;">Se utiliza esta función para realizar pruebas condicionales en valores y fórmulas.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: black; line-height: 22px;"><br />
</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: black; line-height: 22px;"></span><span class="Apple-style-span" style="color: black; line-height: 22px;">Ésta nos permite realizar una pregunta lógica, la cual puede tener dos posibles resultados Verdadero o Falso y actuar de una u otra forma según la respuesta obtenida.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: black; line-height: 22px;"><br />
</span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: left;"><span style="font-family: Verdana;"><b><span style="font-size: small;"><span class="Apple-style-span" style="color: blue;">Sintaxis</span></span></b></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;">=SI(prueba_lógica;valor_si_verdadero;valor_si_falso)</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><div class="MsoNormal" style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;">Esta función requiere de 3 argumentos:</span></div><div class="MsoNormal" style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><ul style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.5em; margin-left: 0px; margin-right: 0px; margin-top: 0.5em; padding-bottom: 0px; padding-left: 2.5em; padding-right: 2.5em; padding-top: 0px; text-align: justify;"><li style="list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-indent: 0px;"><span style="font-family: Verdana;"><b><i>Prueba_Lógica:</i></b> Es la expresión que queremos evaluar, puede ser cualquier valor o expresión que pueda evaluarse como verdadero o falso.</span></li>
<li style="list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-indent: 0px;"><span style="font-family: Verdana;"><br />
</span></li>
<li style="list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-indent: 0px;"><span style="font-family: Verdana;"><b><i>Valor_si_verdadero:</i></b> Como su nombre lo indica, es el resultado si la prueba lógica resulta verdadera.</span></li>
<li style="list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-indent: 0px;"><span style="font-family: Verdana;"><br />
</span></li>
<li style="list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-indent: 0px;"><span style="font-family: Verdana;"><b><i>Valor_si_falso:</i></b> Indica es el resultado si la prueba lógica resulta falsa.</span></li>
</ul><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><b><span class="Apple-style-span" style="color: blue;">EJEMPLO</span></b></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Para entender esta función vamos a realizar un pequeña ejemplo donde tendremos por cada registro o fila el nombre, y 3 notas para cada persona. En la cuarta columna calcularemos el Promedio de estas tres notas (si o recuerda como calcular el promedio vea el ejercicio básico de Excel).</span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES"><br />
La quinta columna nos servirá para indicar la <b>situación del alumno</b>, la cual será <b>aprobado</b> en el caso de que su promedio sea mayor o igual a 4.0, o <b>reprobado</b> en el caso de que sea menor que 4.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh4.googleusercontent.com/-reDSOkoY8ac/TYry9IjNTKI/AAAAAAAAAGc/zORPEJjqNzA/s1600/formcond0.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="123" src="https://lh4.googleusercontent.com/-reDSOkoY8ac/TYry9IjNTKI/AAAAAAAAAGc/zORPEJjqNzA/s640/formcond0.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="640" /></a></span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Para estimar la situación de cada alumno procederemos de la siguiente manera: nos situamos en la celda donde vamos a calcular la situación del primer alumno (celda F2) y presionamos el piloto de funciones (fx). aparecerá la ventana<b>Insertar función</b>. En ella seleccionaremos la categoría <b>Lógicas</b> y luego seleccionaremos la función SI. En la parte inferior del panel aparece una breve reseña de la función:<br />
<b>SI(prueba_lógica;valor_si_verdadero;valor_si_falso)</b><br />
Comprueba si se cumple una condición y devuelve un valor si se evalúa como VERDADERO y otro valor si se evalúa como FALSO.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh4.googleusercontent.com/-GBfvkgacmqk/TYrzaZR0o8I/AAAAAAAAAGg/9Xo6EpbS2hM/s1600/si1.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="333" src="https://lh4.googleusercontent.com/-GBfvkgacmqk/TYrzaZR0o8I/AAAAAAAAAGg/9Xo6EpbS2hM/s400/si1.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; background-position: initial initial; background-repeat: initial initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="400" /><span style="color: #bf9000;"> </span></a></span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="color: #bf9000;"><br />
</span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="color: #bf9000;"></span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Presionamos Aceptar y pasamos a la siguiente ventana donde indicaremos los argumentos de la función. Para nuestro caso debemos evaluar si el promedio es mayor o igual que 4, por lo tanto en el argumento <b>prueba_lógica</b> colocamos el nombre de la celda donde esta el promedio (podemos seleccionarla con el puntero del mouse), y a continuación escribimos mayor o igual que 4 de la forma: E2>=4.<br />
En el argumento Valor_si_verdadero colocamos el valor que deseamos para el caso que nuestra condición sea verdadera, que sería Aprobado.<br />
En el argumento Valor_si_falso colocamos el valor que deseamos para el caso que nuestra condición sea falsa, que sería Reprobado.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh4.googleusercontent.com/-yLNdhfOBGUk/TYrzmrhzXaI/AAAAAAAAAGk/2kJ7ZjaNlTA/s1600/si2.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="255" src="https://lh4.googleusercontent.com/-yLNdhfOBGUk/TYrzmrhzXaI/AAAAAAAAAGk/2kJ7ZjaNlTA/s400/si2.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="400" /></a></span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: #666666; font-size: xx-small;"> </span><span lang="ES">Aceptamos, y luego autocompletamos para el resto de los registros.</span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4;"></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Hay que hacer notar que si seleccionamos la celda donde hemos aplicado la función si, veremos que la forma de escribir la formula manualmente es:<br />
<b>=si(E2>=4;"Aprobado","Reprobado")</b></span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh3.googleusercontent.com/-hUpRyKHdvNU/TYrzxwwVKlI/AAAAAAAAAGo/rPjQp4p2ejc/s1600/formcond2.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="115" src="https://lh3.googleusercontent.com/-hUpRyKHdvNU/TYrzxwwVKlI/AAAAAAAAAGo/rPjQp4p2ejc/s400/formcond2.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; background-position: initial initial; background-repeat: initial initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="400" /></a></span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><b><span lang="ES"> </span><span lang="ES">Formato Condicional</span></b></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><b><span lang="ES"><br />
</span></b></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Las planillas de cálculo nos permiten también formatear los datos tabulados en base a alguna condición. Por ejemplo podemos hacer que si cualquiera de las 3 notas o el promedio es menor que 4 se escriba con color rojo o que si es mayor o igual que 4 se escriba con color azul.</span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES"><br />
Para ello primero seleccionaremos todas las celdas que tienen contenido numérico.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh5.googleusercontent.com/--7wNABwr_nY/TYrz9dZxN3I/AAAAAAAAAGs/2cWJlRDLLFw/s1600/formcond1.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="128" src="https://lh5.googleusercontent.com/--7wNABwr_nY/TYrz9dZxN3I/AAAAAAAAAGs/2cWJlRDLLFw/s640/formcond1.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; background-position: initial initial; background-repeat: initial initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="640" /></a></span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Luego vamos al <b>menú Formato,</b> seleccionamos la opción <b>Formato condicional</b> tras lo cual aparecerá la ventana <b>Formato Condicional</b>.<br />
La Condición 1 la ajustaremos para que el valor de la celda sea mayor o igual que 4.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh3.googleusercontent.com/-GuoVjKrZzdo/TYr0MtgOimI/AAAAAAAAAGw/q2OraIefyBA/s1600/formcond4.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="180" src="https://lh3.googleusercontent.com/-GuoVjKrZzdo/TYr0MtgOimI/AAAAAAAAAGw/q2OraIefyBA/s400/formcond4.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="400" /><span style="color: #bf9000;"> </span></a></span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span style="color: #bf9000;"><br />
</span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span style="color: #bf9000;"></span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Después presionaremos el <b>botón formato</b> correspondiente a la Condición 1 y ajustaremos el color de fuente para que sea azul.</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh5.googleusercontent.com/-JDOYnOQYyzo/TYr0ZUMRqzI/AAAAAAAAAG0/UmuCDx9KJuM/s1600/formcond3.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="390" src="https://lh5.googleusercontent.com/-JDOYnOQYyzo/TYr0ZUMRqzI/AAAAAAAAAG0/UmuCDx9KJuM/s400/formcond3.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; background-position: initial initial; background-repeat: initial initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="400" /><span style="color: #bf9000;"> </span></a></span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="color: #bf9000;"><br />
</span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="color: #bf9000;"></span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Aceptamos, y de vuelta en la ventana Formato Condicional agregamos una segunda condición mediante el botón <b>Agregar</b>. La condición será que el valor de la celda sea menor que 4, y el formato será el color rojo.</span></span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><br />
</span></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4;"></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Finalmente nuestro archivo debería verse así:</span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"><span style="font-family: Verdana;"><br />
</span></div><div class="separator" style="clear: both; color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4; text-align: center;"><span style="font-family: Verdana;"><span style="font-size: xx-small;"><a href="https://lh6.googleusercontent.com/-EQ8HVEW6VMI/TYr0i5hk_xI/AAAAAAAAAG4/bQrvO8Usoqs/s1600/formcond5.jpg" imageanchor="1" style="color: #2288bb; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" height="126" src="https://lh6.googleusercontent.com/-EQ8HVEW6VMI/TYr0i5hk_xI/AAAAAAAAAG4/bQrvO8Usoqs/s640/formcond5.jpg" style="-webkit-box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; background-attachment: initial; background-clip: initial; background-color: white; background-image: initial; background-origin: initial; background-position: initial initial; background-repeat: initial initial; border-bottom-color: rgb(238, 238, 238); border-bottom-style: solid; border-bottom-width: 1px; border-color: initial; border-left-color: rgb(238, 238, 238); border-left-style: solid; border-left-width: 1px; border-right-color: rgb(238, 238, 238); border-right-style: solid; border-right-width: 1px; border-top-color: rgb(238, 238, 238); border-top-style: solid; border-top-width: 1px; border-width: initial; box-shadow: rgba(0, 0, 0, 0.0976563) 1px 1px 5px; padding-bottom: 5px; padding-left: 5px; padding-right: 5px; padding-top: 5px; position: relative;" width="640" /></a></span></span></div><div style="color: #666666; font-family: Georgia, 'Times New Roman', serif; font-size: 13px; font-weight: normal; line-height: 1.4;"></div><div style="font-family: Georgia, 'Times New Roman', serif; font-weight: normal; line-height: 1.4; text-align: justify;"><div style="text-align: justify;"><span style="font-family: Verdana;"><span lang="ES">Hay que hacer notar que si cambiamos alguna de las notas, automáticamente cambiará el promedio, y si la nota pasa de ser mayor o igual que 4 a ser menor que 4, cambiará de color y viceversa.</span></span></div></div></div><br />
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<b>Reflexion: </b><br />
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<b>La funcion =SI ( ) la utilizamos en una hoja de calculo para realizar operaciones de etiquetado a un rotulo o valor, es decir, por ejemplo, podemos asignar un rotulo como el resultado se la comparacion de un valor como por ejemplo, si queremos como resultado de que un alumno ha sacado menos de 5 puntos un rotulo con el texto "REPROBADO" podemos asignar la funcion si: =SI(C1<5, "REPROBADO", "APROBADO"), esto nos dice que si la celda C1 es menor de 5 se aplicara un rotulo con el texto "REPROBADO" y si es falso se aplicara "APROBADO". </b></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-1187283015405471762011-02-22T12:03:00.002-06:002012-10-04T22:26:45.173-05:00GRAFICAS DE EXCEL<table border="0"><tbody>
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<tr><td width="314"><div align="left" class="tit-1"><b style="color: red;"><span style="font-size: large;">Gráficos De Excel</span></b> </div></td> </tr>
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<tr> <td width="97%"><div align="left" class="padding-1" style="color: black;">Vamos a ver cómo crear gráficos a partir de unos datos introducidos en una hoja de cálculo. Así resultará más sencilla la interpretación de los datos.<br />
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<b><span style="font-size: large;"><span style="color: red;">Crear un Grafico. </span></span></b></div><div align="left" class="padding-1"></div><table border="0"><tbody>
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<tr> <td style="text-align: justify;" width="97%"><div align="left" class="padding-1">Un <b> gráfico es la representación gráfica de los datos de una hoja de cálculo </b> y <b> facilita su interpretación</b>.<br />
</div><div align="left" class="padding-1">A la hora de crear un gráfico, Excel 2000 dispone de un <b>asistente</b> que nos guiará en la creación de éste, de forma que nos resulte más fácil.</div><div align="left" class="padding-1">Los pasos a seguir <b> para crear un gráfico</b> son los siguientes:</div></td> </tr>
</tbody></table><div class="padding-1" style="text-align: justify;"><b>1</b> Selecciona los datos a representar en el gráfico.</div><div class="padding-1" style="text-align: justify;"><b>2</b> Selecciona el menú <span style="color: green;"><b>Insertar</b></span>.</div><div class="padding-1" style="text-align: justify;"><b>3</b> Elige la opción <span style="color: green;"> <b>Gráfico...</b></span> Si esta opción no aparece, sitúate primero sobre el botón para ampliar el menú.</div><div class="padding-1" style="text-align: justify;"><br />
O bien haz clic sobre el botón Gráfico <img border="0" height="24" src="http://www.aulaclic.es/excel2000/Boton_grafico_Excel.gif" width="26" /> de la barra de herramientas. </div><div align="left" class="padding-1"><div style="text-align: justify;">Aparecerá el primer paso del asistente para gráficos:<b><span style="color: navy;"> </span></b></div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><b><span style="color: navy;">TIPO DE GRÁFICO</span></b>.</div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><b>4</b> Elige un tipo de gráfico.</div><div style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;">Observa como existen más tipos de gráficos en la ficha o pestaña <span style="color: green;"> <b>Tipos personalizados</b></span>. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>5</b> Una vez elegido el tipo de gráfico, en el recuadro de la derecha, elige un <span style="color: green;"><b>subtipo</b></span>. </div><div class="padding-1" style="text-align: justify;">Si no tienes muy claro la diferencia entre subtipos, en la parte inferior del recuadro aparece una breve descripción de éste. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>6</b> Si pulsas sobre el botón <b> <span style="color: green;">Presionar para ver muestra</span></b> y lo mantienes pulsado, aparece en lugar de los subtipos, una muestra de nuestro gráfico según los datos seleccionados en el paso 1. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>7</b> En todos los pasos del asistente se dispone de varios botones en la parte inferior del cuadro de diálogo, hacer clic sobre el botón deseado: </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b><span style="color: green;">CANCELAR</span></b> para no realizar el gráfico. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b><span style="color: green;">ATRÁS</span></b> para ir al paso anterior del asistente. Si estamos en el primer paso este botón aparecerá desactivado ya que no tiene sentido. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b><span style="color: green;">SIGUIENTE</span></b> para ir al paso siguiente del asistente. Si estamos en el último paso, este botón no tendrá sentido. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b><span style="color: green;">FINALIZAR</span></b> para salir del asistente, pero creando el gráfico con todas las opciones que tiene por defecto. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;">En caso de elegir el botón SIGUIENTE, aparecerá el segundo paso del asistente: <b><span style="color: navy;">DATOS DE ORIGEN</span></b>. </div><div align="left" class="padding-1"><div style="text-align: justify;">Este pasos es el más importante de todos ya que en él definiremos qué datos queremos que aparezcan en el gráfico. Dispone de dos fichas o pestañas: </div><br />
</div></div><div align="left" class="padding-1"><div class="separator" style="clear: both; text-align: center;"><a href="https://lh3.googleusercontent.com/-MmOfECXeV_g/TYo3J6kZzhI/AAAAAAAAADc/qLz_TBM3TJQ/s1600/Grafico1a_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="400" src="https://lh3.googleusercontent.com/-MmOfECXeV_g/TYo3J6kZzhI/AAAAAAAAADc/qLz_TBM3TJQ/s400/Grafico1a_Excel.gif" width="386" /></a></div><br />
<div style="text-align: justify;"><b>8</b> En el recuadro <span style="color: navy;"><b>Rango de datos</b></span> aparecerá el rango seleccionado en el primer paso. Si éste último se realizó correctamente no tendremos que modificarlo, pero en caso contrario, al hacer clic sobre el botón <img border="0" height="18" src="http://www.aulaclic.es/excel2000/Boton_seleccion_Excel.gif" width="16" /> el asistente se convertirá en una barra más pequeña tal como:</div><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://lh3.googleusercontent.com/-DTE9Jlo7OJE/TYo3sAdYCNI/AAAAAAAAADg/kEd-2W6cQIc/s1600/Grafico0_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="36" src="https://lh3.googleusercontent.com/-DTE9Jlo7OJE/TYo3sAdYCNI/AAAAAAAAADg/kEd-2W6cQIc/s400/Grafico0_Excel.gif" width="400" /></a></div><br />
<div class="padding-1" style="text-align: justify;">Selecciona el rango a representar y haz clic sobre le botón <img border="0" height="15" src="http://www.aulaclic.es/excel2000/Boton_seleccion2_Excel.gif" width="17" /> para volver con el asistente para gráficos. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>9</b> Selecciona la opción <span style="color: green;"> <b>Filas</b> <span style="color: black;">o</span> <b>Columnas</b></span> dependiendo de cómo están introducidas en la hoja de cálculo cada serie de datos. </div><div class="padding-1" style="text-align: justify;">En caso de no tenerlo claro puedes observar en la parte superior del cuadro de diálogo, una muestra de nuestro gráfico.<b> </b></div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>10</b> Haz clic sobre la ficha <span style="color: green;"> <b>Serie</b></span> para completar el segundo paso del asistente para gráficos. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh6.googleusercontent.com/-RRZVp1MK0Ic/TYo5Lyww5JI/AAAAAAAAADk/kOu1NpLl4zQ/s1600/Grafico2a_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="400" src="https://lh6.googleusercontent.com/-RRZVp1MK0Ic/TYo5Lyww5JI/AAAAAAAAADk/kOu1NpLl4zQ/s400/Grafico2a_Excel.gif" width="357" /></a></div><div align="left" class="padding-1"><br />
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<div style="text-align: justify;"><b>11</b> En el recuadro <span style="color: green;"> <b><span style="color: navy;">Serie</span></b></span> aparecerá cada serie de datos representada en nuestro gráfico, nombradas como <i>Serie1</i>, <i>Serie2</i>,..., </div><div class="padding-1" style="text-align: justify;">Para cambiar el nombre de cada serie, seleccionarla y en el recuadro <span style="color: navy;"><b>Nombre</b></span>, escribir directamente el nombre, o si éste está en alguna celda de la hoja de cálculo sería aconsejable indicar la celda donde se encuentra, utilizando el botón <img border="0" height="18" src="http://www.aulaclic.es/excel2000/Boton_seleccion_Excel.gif" width="16" /> del recuadro <span style="color: navy;"><b>Nombre</b></span>, tal como explicamos en el paso 8. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>12</b> En el recuadro <span style="color: green;"> <span style="color: navy;">Valores</span></span> estará el rango de celdas donde se encuentran los datos a representar para esta serie de datos. Éstos aparecen según la selección realizada en el paso 8. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>13</b> Si quieres añadir alguna serie de datos, dispones del botón <b><span style="color: green;">Agregar</span></b>. Al utilizarlo aparecerá otra serie nueva, donde tendremos que cambiar su nombre y su serie de valores de la forma explicada en los pasos 11 y 12. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>14</b> Si lo que quieres es eliminar alguna serie de datos, tendrás que seleccionarla y hacer clic sobre el botón <b><span style="color: green;">Quitar</span></b>. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>15</b> El recuadro <span style="color: green;"> <b><span style="color: navy;">Rótulo del eje de categorías (X)</span></b></span> sirve para darle nombre a cada punto de las series de datos. Si este recuadro está vacío utilizará los valores por defecto, es decir, 1,2,3.. Para asignarles nombre puedes utilizar celdas de la hoja de cálculo utilizando el botón <img border="0" height="18" src="http://www.aulaclic.es/excel2000/Boton_seleccion_Excel.gif" width="16" /> (explicado en el paso 8) o bien escribiendo directamente los valores en el recuadro, separando cada uno de ellos por punto y coma. </div><div class="padding-1" style="text-align: justify;">Dependiendo del tipo de gráfico puede que esta opción varíe. </div><div class="padding-1" style="text-align: justify;">Observa la muestra del gráfico en la parte superior. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>16</b> Haz clic sobre el botón <b><span style="color: green;">Siguiente</span></b> para seguir con el gráfico. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh5.googleusercontent.com/-Jb6GCNxhWgU/TYo5kSF1c7I/AAAAAAAAADo/F8M8FWQuRfs/s1600/Grafico2b_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="400" src="https://lh5.googleusercontent.com/-Jb6GCNxhWgU/TYo5kSF1c7I/AAAAAAAAADo/F8M8FWQuRfs/s400/Grafico2b_Excel.gif" width="356" /></a></div><div align="left" class="padding-1"><br />
</div><div class="padding-1" style="text-align: justify;">Aparecerá el tercer paso del asistente para gráficos: <b><span style="color: navy;">OPCIONES DE GRÁFICO</span></b>, que consta de seis fichas para especificar detalles sobre el aspecto del gráfico. </div><div class="padding-1" style="text-align: justify;">Algunas opciones pueden variar dependiendo del tipo de gráfico. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>17</b> En la primera ficha <span style="color: green;"><b>Títulos</b></span>, escribir en el recuadro <span style="color: navy;"><b>Título del gráfico</b></span> el nombre que deseamos que aparezca en la parte superior de éste. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>18</b> Escribe en el recuadro <span style="color: green;"> <b><span style="color: navy;">Eje de categorías</span></b></span> el título que le queremos asignar al eje de abscisas (X) (eje horizontal). </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>19</b> Escribe en el recuadro <span style="color: green;"> <b><span style="color: navy;">Eje de valores</span></b></span> el título que le queremos asignar al eje de ordenada (Y) (eje vertical). </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>20</b> Haz clic sobre la ficha <span style="color: green;"><b>Eje</b></span>, para seguir con las opciones del gráfico. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh4.googleusercontent.com/-vhEr8-VYhOQ/TYo5zInlNdI/AAAAAAAAADs/WdV_wFrRY6o/s1600/Grafico3a_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="251" src="https://lh4.googleusercontent.com/-vhEr8-VYhOQ/TYo5zInlNdI/AAAAAAAAADs/WdV_wFrRY6o/s400/Grafico3a_Excel.gif" width="400" /></a></div><div align="left" class="padding-1"><br />
<div style="text-align: justify;"><b>21</b> Activa el <span style="color: green;"> <b>Eje de categorías</b></span> si deseas que se visualice, en nuestro caso, el eje X.</div><div style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>22</b> Junto con el eje de categorías podremos especificar la escala utilizada para ver los rótulos. </div><div class="padding-1" style="text-align: justify;">Estas opciones sólo tienen sentido en caso de que los rótulos del eje sean fechas. Con la opción <i>Categoría</i> sólo aparecerán en el eje las fechas de los rótulos, y con las otras opciones aparecerán todas las fechas entre los distintos rótulos. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;">En cualquier caso, si elige la opción <i>Automático</i>, Excel2000 tomará la decisión, y generalmente lo hace bien. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>23</b> Haz clic sobre la ficha <span style="color: green;"><b>Líneas de división</b></span>, para seguir con las opciones del gráfico. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh5.googleusercontent.com/-_UxjEaAJ8cs/TY09HgMl2zI/AAAAAAAAADw/FujE27Xd0aM/s1600/Grafico3b_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="252" src="https://lh5.googleusercontent.com/-_UxjEaAJ8cs/TY09HgMl2zI/AAAAAAAAADw/FujE27Xd0aM/s400/Grafico3b_Excel.gif" width="400" /> </a></div><div class="separator" style="clear: both; text-align: center;"></div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"> Las líneas de división son líneas horizontales o verticales que ayudan a clarificar la posición de los marcadores de datos respecto a las escalas de los ejes. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"></div><div class="padding-1" style="text-align: justify;">Las líneas de división principales parten de unas subdivisiones del eje denominadas marcas de graduación principales. Las líneas de división secundarias parten de subdivisiones menores denominadas marcas de graduación secundarias. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>24</b> Activa o desactiva cualquiera de los tipos de líneas del eje de categorías (X). </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>25</b> Activa o desactiva cualquiera de los tipos de líneas del eje de valores (Y). </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>26</b> Haz clic sobre la ficha <span style="color: green;"><b>Leyenda</b></span>, para seguir con las opciones del gráfico. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh3.googleusercontent.com/-YKu9eqmLv34/TY0905XCLcI/AAAAAAAAAD0/sdXuC_wsxew/s1600/Grafico3c_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="252" src="https://lh3.googleusercontent.com/-YKu9eqmLv34/TY0905XCLcI/AAAAAAAAAD0/sdXuC_wsxew/s400/Grafico3c_Excel.gif" width="400" /></a></div><div align="left" class="padding-1"><br />
</div><div style="text-align: justify;">Generalmente, Excel2000 presenta una leyenda en la parte derecha del gráfico para identificar cada una de las series de datos representadas en el gráfico. </div></div><div class="padding-1" style="text-align: justify;"><div align="left" class="padding-1"></div><div align="left" class="padding-1"><b>27</b> Si no queeres ver la leyenda, desactiva la casilla <span style="color: green;"> <b>Mostrar leyenda</b></span>.</div><div align="left" class="padding-1"><br />
</div><div align="left" class="padding-1"></div><div align="left" class="padding-1"><b>28</b> Si la casilla Mostrar leyenda se encuentra activada, nos dejará elegir entre distintos tipos de ubicaciones o posiciones: Abajo, Esquina, Arriba, Derecha, Izquierda. </div><div align="left" class="padding-1"><br />
</div><div align="left" class="padding-1">Haz clic sobre la ubicación o posición deseada. </div><div align="left" class="padding-1"><br />
</div><div align="left" class="padding-1"><b>29</b> Haz clic sobre la ficha <span style="color: green;"> <b>Rótulos de datos</b></span>, para seguir con las opciones del gráfico. </div></div><div align="left" class="padding-1"><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://lh4.googleusercontent.com/-qeOC6fnXdEY/TY0-CWOBLEI/AAAAAAAAAD4/YFv5VQhBBmE/s1600/Grafico3d_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="252" src="https://lh4.googleusercontent.com/-qeOC6fnXdEY/TY0-CWOBLEI/AAAAAAAAAD4/YFv5VQhBBmE/s400/Grafico3d_Excel.gif" width="400" /></a></div><br />
</div><div class="padding-1" style="text-align: justify;">El asistente para gráficos permite asociar distintos tipos de rótulos a los marcadores de datos. </div><div align="left" class="padding-1"><div class="padding-1" style="text-align: justify;"></div><div class="padding-1" style="text-align: justify;"><b>30</b> Selecciona el tipo de rótulo que deseas que aparezca junto con los datos en el gráfico. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>31</b> En caso de elegir cualquier opción distinta de <i>Ninguno</i>, nos permitirá activar la casilla <i>Clave de leyenda junto a rótulo</i> para que aparezca junto con el rótulo el color de la serie representada. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>32</b> Haz clic sobre la ficha <span style="color: green;"><b>Tabla de datos</b></span>, para completar las opciones del gráfico. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh6.googleusercontent.com/-WP9Ar-mjEmA/TY0-QieW3yI/AAAAAAAAAD8/WEleZOL-muU/s1600/Grafico3e_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="251" src="https://lh6.googleusercontent.com/-WP9Ar-mjEmA/TY0-QieW3yI/AAAAAAAAAD8/WEleZOL-muU/s400/Grafico3e_Excel.gif" width="400" /></a></div><div align="left" class="padding-1"><br />
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<div style="text-align: justify;">Dependiendo del tipo de gráfico que se esté creando, Excel2000 puede darte la opción de incluir una tabla de datos junto con los datos. Una tabla de datos es una tabla con los valores representados en el gráfico. </div></div><div align="left" class="padding-1"><div class="padding-1" style="text-align: justify;"></div><div class="padding-1" style="text-align: justify;"><b>33</b> Activar la casilla <span style="color: green;"> <b>Mostrar tabla de datos</b></span> si deseamos incluirla junto con el gráfico. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>34 </b>Cuando se active la casilla <span style="color: green;"> <b>Mostrar tabla de datos</b></span>, nos permitirá activar o desactivar la casilla <span style="color: green;"> <b>Mostrar clave de leyenda</b></span><b> </b>según si se desea visualizar o no el color de la serie de datos en la tabla. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>35 </b>Haz clic sobre el botón <b><span style="color: green;">Siguiente</span></b> para completar el asistente para gráficos. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh5.googleusercontent.com/-UU8bK7qgEo0/TY0-iuA1T2I/AAAAAAAAAEA/OETtvZ9v-QA/s1600/Grafico3f_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="251" src="https://lh5.googleusercontent.com/-UU8bK7qgEo0/TY0-iuA1T2I/AAAAAAAAAEA/OETtvZ9v-QA/s400/Grafico3f_Excel.gif" width="400" /></a></div><div align="left" class="padding-1"><br />
</div><div style="text-align: justify;">Aparecerá el cuarto y último paso del asistente para gráfico: <b><span style="color: navy;">UBICACIÓN DEL GRÁFICO</span></b>, que nos permitirá elegir si deseamos el gráfico junto con los datos de la hoja de cálculo, o como otra hoja independiente. </div></div><div align="left" class="padding-1"><div class="padding-1" style="text-align: justify;"></div><div class="padding-1" style="text-align: justify;"><b>36</b> Haz clic sobre la opción <span style="color: green;"> <b>En una hoja nueva</b></span> si deseamos que nuestro gráfico aparezca en una hoja del libro de trabajo distinta de la de los datos. A continuación podrás especificar cómo deseas que se llame la nueva hoja. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;">O bien, haz clic en la opción <span style="color: green;"> <b>Como objeto en</b></span> si deseas que nuestro gráfico aparezca junto con los datos de la hoja de cálculo. Se puede elegir en qué hoja situarlo. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>37</b> Haz clic sobre el botón <b><span style="color: green;">Finalizar</span></b> para terminar el gráfico. </div><div align="left" class="padding-1"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="https://lh6.googleusercontent.com/-pgO-B0pKpec/TY0-zgaiQnI/AAAAAAAAAEE/yF-7k019B5o/s1600/Grafico4a_Excel.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="162" src="https://lh6.googleusercontent.com/-pgO-B0pKpec/TY0-zgaiQnI/AAAAAAAAAEE/yF-7k019B5o/s400/Grafico4a_Excel.gif" width="400" /></a></div><div align="left" class="padding-1"><br />
</div><div class="padding-1" style="text-align: justify;">Si has elegido la opción de gráfico como objeto en una hoja de cálculo, Excel2000 crea el gráfico en una posición y con un tamaño predeterminados, no te preocupes ya que a continuación te explicamos cómo modificar dichas opciones. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div align="left" class="padding-1"><div style="text-align: justify;">Además el gráfico aparecerá remarcado con un cuadro y con unos indicadores en cada esquina y punto medio de cada borde. Esto nos indica que el gráfico está seleccionado. Si no lo estuviese, para seleccionar cualquier gráfico, basta con hacer clic sobre él. </div><div style="text-align: justify;"><br />
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</div><span style="color: red; font-size: large;">MODIFICAR LA POCISION Y EL TAMAÑO DEL GRAFICO</span><br />
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</span></div><div align="left" class="padding-1"></div><div align="left" class="padding-1">Para <b><span style="color: navy;"> cambiar de posición un gráfico</span></b> dentro de una hoja de cálculo:<br />
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<tr><td width="97%"><div class="padding-1" style="text-align: justify;"></div><div class="padding-1" style="text-align: justify;"><b>1</b> Selecciona el gráfico.<br />
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</div><div class="padding-1" style="text-align: justify;"><b>2 </b>Situa el puntero del ratón sobre el gráfico. (el puntero del ratón se convertirá en una flecha blanca que apunta hacia la izquierda).<br />
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</div><div class="padding-1" style="text-align: justify;"><b>3</b> Pulsa el botón del ratón y manteniéndolo pulsado, arrástralo hasta donde desees colocar el gráfico.<br />
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</div><div class="padding-1" style="text-align: justify;"><b>4</b> Suelta el botón del ratón.</div><div align="left" class="padding-1"> </div></td> </tr>
</tbody></table><table border="0" style="margin-left: 0px; margin-right: 0px; text-align: left;"><tbody>
<tr align="justify"> <td width="97%"><div align="left" class="padding-1">Para <b><span style="color: navy;"> cambiar el tamaño de un gráfico</span></b>: </div><div align="left" class="padding-1"><br />
</div><div class="padding-1" style="text-align: justify;"><b>1</b> Selecciona el gráfico. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>2</b> Situa el puntero del ratón sobre cualquiera de los indicadores alrededor del cuadro del gráfico (como si se deseara cambiar de tamaño una ventana). </div><div class="padding-1" style="text-align: justify;">El puntero del ratón se convertirá en una flecha de dos puntas. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>3</b> Pulsa el botón del ratón y manteniéndolo pulsado, arrástralo hasta la posición deseada. </div><div class="padding-1" style="text-align: justify;">Si deseas mantener la relación de aspecto, es decir, la proporción de su longitud y su altura, mantén pulsada la tecla <b><span style="color: green;">CTRL</span></b> o <b><span style="color: green;">MAYUS</span></b>. </div><div class="padding-1" style="text-align: justify;"><br />
</div><div class="padding-1" style="text-align: justify;"><b>4</b> Suelta el botón del ratón.<br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-7qf-gqVStXc/TZv2pXcGBUI/AAAAAAAAAIg/je2nV3jMSck/s1600/GRAFICAS.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="374" src="http://1.bp.blogspot.com/-7qf-gqVStXc/TZv2pXcGBUI/AAAAAAAAAIg/je2nV3jMSck/s640/GRAFICAS.jpg" width="640" /></a></div><br />
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<span class="Apple-style-span" style="color: red; font-size: large;"><i>Reflexion:</i></span><br />
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Los graficos de excel nos sirven para graficar datos matematicos o de problemas de nuestra vida cotidiana como edades, pesos, fechas,etc...</div></td></tr>
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</tbody></table>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-76446761964358585832011-02-21T23:35:00.003-06:002012-10-04T22:26:45.196-05:00LISTAS, ORDENAMIENTO y FILTROS<div style="color: red; font-family: Verdana,sans-serif; text-align: justify;"><span style="font-size: small;"><i><b>INTRODUCCION</b></i></span></div><br />
<div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;">Dedicaremos unos momentos para explicar y analizar como podemos ordenar rotulos, números, valores, etc.. de una forma tan sencilla como utilizar el simbolo ascendente y descendente.</span></span><br />
<span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
</span></span></div><div style="text-align: justify;"></div><div style="color: red; text-align: justify;"><i><span style="font-size: large;"><span style="font-family: Verdana, sans-serif;">Que es ordenar?</span></span></i><br />
<i><span style="font-size: large;"><span style="font-family: Verdana, sans-serif;"><br />
</span></span></i></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"> </span></span></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;">Diremos que ordenar es organizar las filas de una lista u hoja de cálculo en función del contenido de una o más columnas. En lenguaje de Hoja de cálculo diremos que esta será la columna base del ordenamiento, que en Excel se denomina la columna o campo Ordenar por.</span></span></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
El ordenamiento puede ser realizado de forma ascendente o descendente:</span></span></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
</span></span></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;">Orden ascendente:</span></span></div><div style="text-align: justify;"></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"> Para organizar una lista alfabéticamente en función de los datos de una columna, puede especificar un orden ascendente (0 a 9, espacios iniciales, puntuación, (A a Z). En el ejemplo siguiente, al clasificar la lista en orden ascendente en función de la columna "Vendido por", los nombres de los vendedores aparecen en orden alfabético.</span></span></div><div style="text-align: justify;"></div><table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><img alt="" height="356" 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" style="margin-left: auto; margin-right: auto;" width="640" /></td></tr>
<tr><td class="tr-caption" style="text-align: center;">Antes de ordenar los datos</td></tr>
</tbody></table><br />
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<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><img alt="" height="352" 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" style="margin-left: auto; margin-right: auto;" width="640" /></td></tr>
<tr><td class="tr-caption" style="text-align: center;">Después de ordenar por Apellidos</td></tr>
</tbody></table><div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><span style="font-size: small;">Orden descendente</span></div><div style="text-align: justify;"><span style="font-size: small;"><br />
</span><br />
<span style="font-size: small;">Para ordenar una lista en orden inverso, utilice el orden descendente (de la Z a la A, puntuación, espacios a la izquierda y 9 a 0). Por ejemplo, para ordenar una lista de ventas desde el valor más alto al más bajo, puede ordenar la columna Ventas en orden descendente.</span></div><div style="text-align: justify;"></div><div style="text-align: justify;"><br />
</div><table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><img alt="" height="357" 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" 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<tr><td class="tr-caption" style="text-align: center;">Resultado de Ordenar por Apellidos (descendente)</td></tr>
</tbody></table><div style="text-align: justify;"></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
</span></span></div><div style="text-align: justify;"><span style="font-size: small;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;">Ordenar texto</span></span></span></div><div style="text-align: justify;"><span style="font-size: small;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
1. Seleccione una columna de datos alfanuméricos en un rango de celdas o asegúrese de que la celda activa está en una columna de tabla que contiene datos alfanuméricos.</span></span></span></div><div style="text-align: justify;"><span style="font-size: small;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
2. En la ficha Inicio, en el grupo Modificar, haga clic en Ordenar y filtrar.</span></span></span></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"><br />
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" 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</div><div class="separator" style="clear: both; text-align: left;"><span style="font-size: small;">3. Siga uno de los procedimientos siguientes:</span></div><div class="separator" style="clear: both; text-align: left;"><span style="font-size: small;"><br />
· Para ordenar en orden alfanumérico ascendente, haga clic en Ordenar de A a Z.<br />
· Para ordenar en orden alfanumérico descendente, haga clic en Ordenar de Z a A. </span></div><div class="separator" style="clear: both; text-align: left;"><br />
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JaAx6GUyvk6vwhnCgBFiHaRGHRw1sWiwiswuscklNTkURrvSYFUZGI2BUhqsd6zrbkhNdx78uyFdSvhX50tRV2WOKnMtRV1aS8jkyUJhoHHlTCHQOm9gmaLLMH/2jqC+DOROwp4U7EnpbREF4dVaQnggh/oyOmtYTQeMjhjkTpqccbMrgfmzkDt583zEm65AeDKkJ0O40xVwVwp3pTBnEnMmKW/2y2C+EuQHGiZpdqYdkZI7kvVHUr5Q2OawB8MBfzjki4Q80YgrFnPE4vZY0hNOOp1Bu93vcoUCgUQwmHS7w1ar12LxBIPJL+MLJ92RJeAPh/x+u8fr8AS9tMtDeULueNmRAL4cwHwF3FsgvTnGk7W401Z30u6OW9zpO9Z1N0jvnQf/bpBLCf9j8vFADvNnYU/KYI/qrGG1NYZEgdadr/ixYIwsY4K5O2KPliyhPBPM0YEsZI+ocbee9hPeFGSP6CifnvbjnuTNE2yRIu5JEt4U4U2RvjQdyFZCrMG8NZi3BHKWQI7xZylvmvSkSE+KcCcrH94GGSxTcWBypCB7xBNORyIRGwGp+BPc0aaRppMjTSeHm08MtZzsbz3Z23a6u/1sf8v56e6a0daqiY6rCwMNs721g40XBhrOT3RcHWq6eEcGmpfASPOJxcFzM52nRtvPDHRWz82NLErEqN1tj2SpYI4KFqhg0RIo2Pw5hy/j8qXs/swd6/oK7jb+d2Sp4V+Rj3uSlYmzhguUPwPZI0rUyTMwWKKs92WhCGid180bg8sge+SOYO4E7IiirjjmTpisITXuNlqCdCBrtoV1lM/ABAhvig5kMXfCbAtD9gjsiN4K4owhzhjq+D2IPXorsC3yZYz2JBzIGmwJDeEhbD6SJFlTI/WXjtSe3dV6aVfrpV0tl3c2V+1quLKrrnrPjav7GqoOdF47UXtmz7UTOxrO72+8cOD6yZ03Tu9urz7WfOnQHWm8vARaL+/svryp6dzGG2c3V5/f295eW9/cpDCjhCdqskdM9pjJHodtMdQawS0h0hLArKE71vUV3G3878hSw78iX0N4zLYw5k5g7gTqilf8YGkIIgWMgXzFjzlDYBnmjN8RExM0UH6zJQTbIkY6oMHcZkvIGsxD1rCO8BrpAOFOUt40bIvoSZ+O8OKuBO5KYM54RQXYFoGsYcgaNtvCNwVCnLGKcJU+fRnIldHYc5AziVj9brfXa8EWx9tHa/Zrxi5js5eI2fPE3Gls7iw6fxaZP29mnYfmL6Hs64bpS5rxc6bZKoxTg3FqENY1eOEqNF/9ZZC5anR2CZCzZ6npQ9jMSdPsBdFYlXC+7fLFI0q9mnT7YXcUdiUhVwp2pVBnCnMmCUccc96hqK/gboP/Ffyp8k1MEHPGcVcCtkUwZ5zypiFrWARZyXTJGMxA0WLLvGpW715WmdcvgznjsC2COmKVLA3mNjFBxp810gEt7tGTPsKdZPzZSgOIPXrrReKmHDf9uPUaU7m0VCy5DdidVVrSZKBAuiJer99vI7jDzdONRyPGccdinWuxxiWsdgiv2UXXbKIaRlJjEdXZpa0BXV9A1+eQtbkUHRHTUNg46JC1WURNX8YmbLIvLgH34jW/8EJIWe/XdhKyXrNy4tiR7QqdCrW7EU8McadgdxpxpzFXGnelSGcCd92hqK/gboP/Ffyp8jFnnPFnCXfSSAfMlhDpSZmYIE9P4smCIZA2RwrNc8oZnWsZao3dEcKRxGxx3J4gHEmIDmsRj5kKWbw5iA7rUK8B9xOOpMWbI50p3J4gnSkzFYLoMMxEUGsMs8UJR5J0pgh3GvWkEXcKdiXNjrjJHjNYI3pLWMeETPbYlzHY0wprlgyWEavfbrV5SP1Uy+mRyxsyxh6A9wK8E+AtgGgBZBMgWwDVAqjOpKYB2EbLSJd5eJ+sbZOTe74EdxahDkD23wGiH2BLAW8DqrNlw40C1BoxDUQs/Asnt+GU2eoPmBwBoyNmcCSN9qTRnoRsSdgah2zxO9Z1N2DbnQf/bsC2JYR/dT7MRChXGrcn9JjPRAYJR1KP+aalRjSR0fnipnCuaVY2o3cuw2zxO2KmQkYiYKZCiCVqIoNaxAPRYZu/gFiiesynx3wVh2AmYiKDMBNBLNHKJ4wnaw8U3RHgjQFvErhSwJEAthigQ0Xcl4VdSZM9ZrRFzY74lzE6MjImjfuLJsptt9qiTozTWzVzYytgJjPG1oyxMWO8kTHdyJivZ8w3MtCNDNSYN7UB32xK2zh44uWqj38lqF+XNbQA22jG3H4HTO0Zw1Iw1gHsBkCa8uaWoL43Zls8fmCD3qTUYbjZGTQ540ZnyuRImRwp2J5CbAnYnrhjXXcDsd958O8GYl9C+FfnG3A/6UxV/rFxe8IRLMFMZE4BIfG01hszhrKf+yFHQmZ7DvOUDZa0EgtpyKiOjmrIMOJO65iw3hJG3Cm9JSg2W5WEkw6kzZaAzMQYaZ/Fl0KsQZj2k44oSgcMiDOaADDm2bn71I9/+sgv7nni/gef/Z9/96/f+/ED//XbP/j7n/z6O/9834krbYEsEBptsDOjZaJ6a1LDxFVUXOfIIgFgdBcUeMhARyFrkPD6zITJH0TnBqr4XUfisnag7QaaTqDpAIYuAPXm0P44NeS3dxL26lSW7Oli36he2L9r+OjeUz6rwKaryVnPlrDrZUNLTteTM0zlsOEU3ZnFu/NITwbuTcE9SbgvjvXH8ME4NZqkxoLGniw6UkRHc9q+grobGIcANAr000A6C6ChrOlSkqpj4KtXqrZKtQazNaGzAp09r3WHDM6A0emFrGmYBjBTgq3JW4jfhPHnTUxYR3hRR4zyphF71EgHDHTU7MgTfqDAIkeqerYdqxtiG2VIyGjLGqyZEa755PXBo1d6u6aUJnvOGgVyyEP7MqgjZqD8OsJroPwmJmykQ3oieEtbv+8AZEua7PG7oaGCZkcCdqV0TBhyJo22GEtBW8IAdgHcD9pnzHO66DJbFNBBgHsB6i59/tDNmYGdmZt+wK7kTT8of8rE+KVG2kB5b/UDofxOf1ZroFzejEQGP/DQc8uW/c0LL77f2D7a3D/dPy08eaXlxw88++meM9ZQEnallFjAYEsYbCmDPW2wZ/XOnNGdh/2ACgHaX7IEMtZwxIgZ7E79RNc5QffRnLavrOkqqzuApqOs7yybe3Jof4wc9Nk6nMFGgl5sqBurv87pbIFWv7t+qPN4wTuat50DZC1AuwE+XobnU1B/gmwv0v1FrC+H9mfQvjQ6kMAHEuRwgh5L0ePAtQAcC8A2D7DJsq4vKWsPi1vior6yZKZsHswYLybI2lv90FrKWltO4wrqHX6Dw2O2pCCqDNFFyJK4hdhNEHscskZNTLCy3ldu1MzWhJqMy9HgCNfM17nG+PCl5qkpEa7Eo2ZHvqabzVbZxvjw5ZbpeTmjInywPYXYo5A1bGKCla0D6kjAtpiZid7S1u87YLYmjLbYHTHZ42oyYLLHYVdKS4cqfizIqdv9QN0lGRxc1Lu1VAJ25nR0XIUH9Uys8jUdE7rphwJ3UP6M0RKUGi0Gyk9502ZLyEwFcHsMpoJGzEvaYmbcx9jiM/OKH//ksb/4P/7vA8eqcVcsCYDZEmobYk8J9JAtrmPCJltSb42ryIjWkjC7CipLkmfyiLEQ6ilLjR4D5Sd9QQOqtzl0Y+0nF7sOF/V9QNUGVG1A2QJ07cDYkYN7o3h/kBpwWQdgg6qpYXHvvomuvuiO3a0Hj53SqRf8lqkwupBFJYA25lFj0MAJIpM5qzBJ8hIEN0Zwwjg7RLDC1EKEnk/Qcy5Nj13U7JU2F4z9wDxYVHSUZK1AOwHEE8DYndGfS+I3GKi6+vIWmVoPWVJaC9Da8hpn+BY/AETn7+aHFvMjtgRsi6lRjwbzVh4SqokY4gEaOne1kyeGopMiZtOh+imxxWAr2RPgxPUxNZWdkdo2HqxrG1eLzJFAHugIv4EKmi0RxB5HHQnEloCt8VsbWqofkDOppUNmR8JgjS7IKSYEIGcZ84G2adOsNrLsUtPkiav91zrm52W0mohIIZ8U8kCOdOVrWjoIORM6JiAyWRS4g/SlDUxAYmD0pI/ypk1MsOIHRAbUJrs3XJaoCJWWKZTByKjgZz9/4tvf/dnGPScEKhXpSTmjwJ8BJktURfhNtiTiySnwkAwLapjkvMZ2tZd9vHaoqnWmsZczxdcYGJuZMHl80GTXGV77gYyqs6RoKcqbS/Kmkqa1pG/LmLvDaK+f6GPwzp72xr27Wz7b3Hv8tO7U2fG3319VffnAQOv23ivbBs/vmbp6eqr6Qu+F3T1XNo7X7eu/sr2valv35S3tFz9rufBpy8UNLRfXd1xcN9uye/DCRzPXPrHNVxUNfUDbCzTdAJovLo6W9J0p7ZkEVkObr1y5tLnih4Ypa6w5tSOks/v0dreJSZrJspnKmZn4LURvooI9qD0J22JK2KUj/Iw/D1mjc1KqpofbNq7edrzlcNXgrtMd63Zf7Z0zTQjp8UXNwUv97ROaK+2cD7de3HO262z99LWOXjXqMVBB2BaDbTETE9YTQQMZMtGRW9r6fQdMlrjBGr0jRltMRfiNtpjZkdBQQZM9brBG52UkHSybHSXUW26dMs5qI8ve3XBkzbazZ2tHOCqb0ZpSExGDJe6IA8iZ1FBBLR00O+Ja2i80MnLMjnlTWjoo0lu0hJ/0ZExM2EQGMVvcTAS9ESBRUigVweioWEH6goDF1f+3b/9w2X/6m5r2UcgalhisSsSNuzOEPy8yOi1RoKFjFT9mlMyxG4Mrtp56c93h1mHpnNgM2TwwBXn90ETnSW77npSyBchrgbQWSG8AeUNZ05w1tEfMnUHzMPBrj2w/uOWT+qnZ7Laj5s3HhA+8fOBkzagKomUSo3ReIZ+VamaliukF0fgAZ3RorLdvtLtrsKO5r6Wmq/Fid92pnrrDA7X72s6ur9r2YtO+V/W9h3KqtrK6LS+pA+IOwO8F2paU+lgcqaINF6svbpIpdTCd1FJAbcmq7EGtzauzufRMzEiWjXTGyET+LbEKGjwI21NGJqZEfJAtaQ0BBextHVFytDEFUZbjpd558nKb6Ew9Z9eZwY92N5yomZeiBaE5I4Kyc4rg+Sb+jlP9L7y3R2py6cgw4kgjjrSeiqixgI4Mm62JLxq6rfWI3nJnDNaoEvcZrFGzI1G5kOgtkTkpQQeB2VFCvaB1yjijCS+71DTZ0M+fl9GIq0gFgJ5JaMgw4opXvqahAmZHXEP5Fg20DLXd6gfhThvpkJEIoNaYmQji1qhITtjcuUgS6MxuqYI8dbZx2bK/vefexztHOY5IyUAFzdYo7S9oqKCWikCupIqMaJg4HgAmT3FKTtUM8C42TWvJFOpM2sJJiDTbnbqR1qPc9j1ZTXtJWlMS15TE10vSuqKqMaVtCRnb/cZBM7/z2M7DNVU8gQi8/MHkB9smX1hbtftMu9WfCPozQSZi1TGMHLWo9JCQzRsfmegfGO3uGmhv6m682nrjTPOVQ02Xd7Ze3Hz94HtV217sOPK2vvdQRtECdJ0leWNJ2FbkdJXUTQnlkSh0idJfuHJh47/PDx0ZNjIxPRWpzC7myvBUdH2f2BIDOiuAPWBWHqgb0By8PPHkG3vve3bjq2vPoD4ghnMyrCiGc0eqp3eeHnhp5f4RloavZoxMDHVmTJa4Bg/qqUjFvCX5obdEKn5UFhqjLaZjwnNSggqUTfYi4im3TBqm1aFlBku6sn/BvQB25rRUTI74JGZ35WsaKmCyx276gXrSaioo0FtUhB/1ZLR0SEcGYWvciAeFSgq3JlAmxriyesS37tPDf/3f/+Uffvjr/mmB1Ghxx4ECchqZMOnNzUphKlCWY34VGdHbUqgP4GGAhYDZWzI5SrgXkP4SE0rqEZ3VrhptPyzo2JFVNQDxZSC8DISXgKS6KK9JqxsiuuaoZuDG9vdPbdrSdHVw597uh16+8Mi7155c1/zLFw9NqaJMAMSTgCZCZjVGGnGjUvGLFL8AACAASURBVD4xutDbz+/qnm9pHqyrabp66fyV0wevHNt87dC66j1v9Z5aJWnabp8+l5HeAOpGoGoAshaw0AAU1SnZ7rjpHKM9d/Xcp3K5HiZTWgJo6JzSFlLZPBqbXceEDWTBQKV1TPhz6OgtxNVERE3EtFRCz6R0dFIKBWYlZO8scrFVfrJWsOlI/6Yj/RsOdL/xcfUz75746eOf3v/8jvPN0rON4jMNot3nJl9cdf6Nj6ufen3nvrOtdb1crtpusKQNlrQKj6rwsI6O/5vmbvbh7ugtEQXm1VsilYXGYI3qmPCsBCf9wGgrwG7QPKGfVoeWYZ4y5Mgrscii3i2D/WZ7BnZmdHTUZI+rCL+a9N/0Q4pYb/UDcae1dEhLBCBLzIgHcVvSiAVQJibTWj/efOwv/uvfP/z4G3wpag1mXTEA28If7zhx8Fw96kyxVYSOjqqpsMmR0dtSIsjP1lvFmF/nyEIusKh3S8xuHe1UGZUOl3aq54SgY0dCWlMWXQLCy+XFi2XxlYLsekpVH9Y2RdT9M1cPXt619/r5zo831p1rxR9fWfvbz7qf/ODy8Qa+HPJG4yUM9ioWtYgG0sulo0Ozvf38zq655qaBmqv1VefPnD+6+/yBDRd3f9Bycq2487CHVxMX10d4l6Pciwn+5RT3enm+viy/kpTuihnP/kf8UKBBJRbR0UmDJS2Dg3NSalqELyh8Khr4imCA4+qZtzWNooeuLByv4f38yU0d03TnDCPFgMYCBrnumj7DsevcDXvrX3x/x+5TTQPzOgUa1lIJORKSmL1SyPcf90NLh27zY0oVXKbEIrcQUmIhJRZQYgEtHZLCLjnq1jEhJe7maQkJbIHcSSnmY6koCewx2BJyzC+DvRoyrER8Qo3VFQIayPfxlpN/+d9+sGzZ//qr//6jv/vn+7/34we+/U/3/OX/+P63/+neDbtOSU0OJlwWm1wKPKDAQ3I8JMcjUuJz5FhSgeTUREyF2YyYwWqV9TfsUA7vC3BPF7lHgeIyWDhaWDiR4ZwB2iaA9sjqtk8eWq3pqxaONC5Mj08vKvaca33i3UMf7W188rWdCrMnlQcylVKuEpoRPWeRPTTG6u5fbG6ZqK/taqypv3Hh1MUDG6v2rGw4+B40foaZOhNkX0gLq0qSKiC6XOKfBwvnAftagX0wI94SlB+glSdbq3cK+UoISylgIMfSEtInpZxyilbgPiWaVGIRBeFV4D4F7lPggUqNCjykwCJqMq6l0/Nym47O65lC54S2a1I3JfFiIaC1A7653L3guNShPtMkXbe/+0ePfbL7woyUAGgQzCiTfRz35U7Nql1tr6w5/eZHx+57enX3lJ6lcGmotNDo5+tcMiT0eUOfN+pT4D4F4VXivruhJgMSyKkmAxoqKIGcKsIvRz1jPBMVABIobHKA7gV0QuH/k/khM7pwW0KPBgcmpFfqhpuaxutbp6vq+uu6xuq7J6sa+680DY1zNbg7g3oyHBW9VD+yCwezwjNg4SiQVAFxVZR/CZs4UvvxE03rf2serbNpWARsRByBjinF6n3NH+1tfHHlkbrOWZc/ksikccosU4pm2TPN7UOdvfz2jpmWpv66qzcuHN1/bu+GltObWM0H8JmL9rkLYe6l1OLlguhSWXipxD8PWBfKrKt51oG0aHNQfoBSnPh3+6HEo5CzJIHCsBNoqVzriLJ7Sj+nCAoR74zSPSWP97Ccx2sXNxzqe3V99T3Pbt9xdpJrTOsc6X6u52qv4cAV1gc7Wt7bdOWVDw/++vn1QyxEaAjpLTktndZb0nQI/Hn44UqJscCCihHDPr0tJcOCUsSvpqJyJKBAgyokqIIDWiyMOXLOIGDcJSMeNNK+yks+yBo1W6OQLa6hgiKj885+oFk5AtR4UoU5jJjBapX0N2xRDe8M8Y4VOfsA5wCY2gkUVUBc5Zo4LG/edOWtX7S8+wjevc8rOm1mn5RxL9Rd2vPyMy/c96P7lv/iqSfvv7+j/kwsgsAEe5Y/PCPmjk5ODHb3D7a39dRXN53bX73ng6YD7yw2bfFzL4ZYx5OsYznO0TL3OOCdBLyTgHsCsE6B+TOl+R1Z4YawdBcjO9x6ZZuIq4CRlNIM5GhWQgaklFNK03LCq8BiCjwgJ91ywisnvHLCJycClQLleGxGalHgKY7Gr8ByfF2kplvaMqIbF3tNPqCwgEUU9HJdx+oEG48PvvjRpX94cPVHB7pGJSGdC8yok3WjyJ7Ls29vrn1pzZnlL2+7/5kNPTMwWxXg6YJiKMrTeaVoRI5H5HhITgTkhO/zDpDur1Dk/2s/1ERECQdUcECDhlRwQGFwaOEgwsQUkFUJOzSYW0f4ZWaHUGeRIW6zPbVUP8Di4cL8nvTgxrTgdIZzxjl+iJ48zj+9ynxlR3jhckh+waa4asd69ZKx3pbOhssNbdVdx3fvHuutiUUQd0DNkUwOsaYmZ2f6Ono66+vqL56sOb6j6fgnU9e2IhOnUvLa5OK5HP90nnusxDlWZB8rso+VOccB61Rp9lR+ZmtasD4o3kFLD7VUbf33+WGwFSxRoMAzOgYosFz3NNwzgwzy7EprWkIWplXx6j794RrumRbphiN9//jQmp0Xpvp4bimVntdlmiaJQ9c5K7Y3Pvf+sVdWHX/+3QODLIKviwhNUToM9Na8mk79WfhhdqdEWGhObRUiAb0tI8PCUjioJuNyJKSjkyokrELCOiymNAeFaqfSHMQcKbMloMHcatSlI/wK2CXUWeSoB3Fl7+JHTg4DFZ5WYC4jZrRaJYMNm9XDW8O8gyXOjvL0tkzfesA6nJk9FJg6klM2hIYvgZG22PBB58iKKH9jGT6SUdb6WQNRHts+Ok9PDeonrpGa4VhCp8FUTZPzExMDo/XHui581njkvZ5jbwrr1tnGdyc5+7Os3WBxH+DtAewdYH4XmN0F5vaDuUNg7iiYPFSY3JDhfRBa3GIRH2y7uE3EVsJwRmkGcjT3uR8MKSfdCiwiJwJS0i0lvVLSKyV9UiIgJUJSIiLF41xDQGCK1g0q64fU7ZPw2Qb+kerZrSf7t58f+nBP/dtbql9af/axt/Y++uaeh17d8f2HV7647szKXbU7Lgzvvzq1+/LY9vNDq/Y2PPf+scde2f3DX69au6t+y/HOvRcG+cYIS+udVdqlRERKhKREQEr6vujAn5MfBktabg6I9R4dFsPsBdiSVcNhsc5qYvx60meg/JA1arJE1JhPhrgVqH+pfkTH1hcntxSGPgXsI7n5I5G5Exl5naX1iGjb2qH19/Vv+y77/H3saw8PHnq+feuHPTu2Hnz21aFje7tOrW+p2qzVD+kITfPUQm9va9v57S2nPm47+eFM9Tps9GBKfD63eCQ8vqnE31Pi7CqztpfndpZndpZm9han9xenD5XGD+TG16c47wcFmxnRgdYLW4UsBQSll+qH3lFWM8XWCUMfi1CSQEkCEZTv51ibp+FNJ3vWH27bdm7wiXcPfOtfnv/BY6ve2379X5/86N7fbV53qLVtDlvE8noP4ELp2kHdyRvsdzdWr91V/8bHZ9/65NyiOaZicjp74c/Ij1m1dREJaO0ZCR6WIEEVFZchISUelSMhscknM/n1ZMJEpWQG3+yiSWKgVIhTg7lViFuFejS4X4F577Z/kWI5KQJUeFaBeYyY0WoTDTZsUo9sjvD2R0fWgpmtpaENYGZvYe5Imn02wDrP3vn+tQcebH/ln8VHfkQ2Pmq+8XPVqWcVB9cJd2w69ouHFvZs1rYcnm44ODtxVaSWdbINVy8fr9n1zNCZ10WNa9H+jcG57UC4F/A/K02tBvMfgbn1YPZjML0JTG0GU9vB5E4wvhuM7sqNrk0uvBPgfcos7mu9uFnIUsBQWm0CCmQJfixCEa4+crl9sX5QqyAAGQJ4ALD0yfopw7qjLa99duGlT87846Mr/tP3Hv3BEx++vf3K/77/je/c+9qrm843zZoFRFbjAXPGyMkG3vHr7Lc/qX5p1elfPvXxDx56r2sWnpbbuQbfn7sfQqPXYEmbbFm5OSDUulRQyESljFRYR7gRe9RsCUkMVoGGUqFeHRNWE6Gl+pGf+wywdmV716aGNmemDuT5F13TJ7vef7rruee1h18HrHVl7iqi+X7t2d9K960Z+eDtK8uf4+zfFhW0I5zWvs4TAoVYSESb6y+dXv/AxKV38Yn9fvbh8MLOLHsb4H8GuBsL06uK02tL0+sqfpQnt5UndpRGd5ZHdmZH1lT8oAV7Wy589u/zQ2srKsjC1W7JtW45RxtX0xE5HuphW442zq872vL8R8d/9dKmh97Y/tnZnpoxTfWQonHGtOvKyNHG+Q4OPiixT+vcQ1LHiXruis9qHn9t/1NvHvj5E+u+f//bAxySo/fLiMTX5gcaV6JxJRr7PV+4IjF75YhPR0elsIulxIVGK+RKSYnArJwUmtyQI6/FEzJ9WAOnNVBWbkyqsYKaLInRLAeKs+E4h0jzSCB1AiENZDYgIQFXn1FgRS1VYCtclYYqikiJkIQMiaiAlLKrGEpL+JWmhNnocRKOsfr9huH1Mc7H8dHnwMxHYHhjuvNTMHMcKM5ZBt7p3vIt1pnvGJuf9c/sTXPrJvasG9u+0nBl78c/WDa06efM4CcewT4T50xv52EToWYZkI62C+c3P8KqW+PgHI0tHkmwthVZmwB7HZh5H8yvBAsfgPkPwdzq4tza7Oz65OwGMPoR6Hof9L4BFlY4h9akdLWtp3ZL2GYMKysgIMWTIsYupS1ymlDiPjWcVaMxJe5V4j4lFlBiISUWUaIxJRpXImnYDmSm7IVa3tUWmVhXgK1Ag4KeSdepOt2a3f0vrql6/K1D97+4qXVWP6d3TKktXNjHMYdONMxXdaskOFiEQPdc+HyTZtW25pdXXXzw+Z0/enjtr36zsWeO4BmiQiguxeNSPHabJQo88MX//O2oiYjE7FUTEQ0ZlZi9KjwsRwKjfAMeLMjIsMlbap03DCmcf8APBerX0VEZ4q74AbvTMjJ4qx9yQ0SLZLRwTg1nNXhRTZbkZFFCFySWotBaXGTAhN4/qY1wkKQQKy6aC1oaoG5gYApf7YfKnLzph35oXZS9PjL0m8LEqvLQp+nOT9PD++Kcg66xD0SXf4Z2P+CZXBllHzY37po/vGl6z5rmFU+deeYftVWv+Wd3BcSHKGl1b+dhsZo7JJQ31p88vv7eqeoV9Oz+AHtfZPaz3NwnpYW15ekVxZn3irMrijPvF6c/yE2vSk2tjU2tKw6tBv2rwcDbgL3SNbw2pattO71HzDKhaGmpfgh1AY48dPY6+0qTRKjJoXYAWcCUIHGqTrdqZ+9zK88/8OLOnz69tnlau4iHJHRMQsfEZOpsK/dih5xjSM8oEo0jzqNXRZuPDL63sfbRl/b94MFVP350beu4maMLS9DUf8QPKeRbsh8qPCyFfDf9YKsIkclW8WNOQYnMHthZ0BFJuSGkRVJaJGMgSgo4KzIlhXBaROaFVJ6Np2dNeWME6ANA4wEKC+AZ0yxlYFEfVmGJSiv/1o+QlHIqLbSGCirNaZPZ6yKd43X79IOrYgur8hO/AVPvgbFPwNBGMLQNzGzMs9ek51an5tdnOQcDY8fGt7/KObhhYssbe375Le7e3wT61sYXtsWEe/zqG5PdR9VKLkumG+u6eP7jny5cfcM5vzvB25NmbQTcTwB/HWB9AFgrAGslYL0P5leC+VXlubX5uXVgfDUY+gAMvw7YbzmGVqT019pO7xKzjAiS/9wP2imlbXKKVmIhNVRSI8kv5LjdD8QBTBbQ3K9t7NUuatI6HCjMoHvSfqxG8eGO7uc/OHf/77b98PH3a0elXNgnpqISOialU+c7uFXdChEKhDAY4MYutWpXbWt6be3lR17a/cNfr/rJY2taJ4x8Y0xFF273gwhISd9X+FHRQk1EtFSs8ocCDY4JjLf7ocISKiyhwuK/B4+q8KiaiMhgvxIL6JmYHPWwVYTYbEc8GTkVutUPhTGsQ9M6NCs3JqcXHd3TcMcM3MnGWxeQ65O6qiHTpvMNn51r3ni6Zfu5/v2XJ49emWgZVqmwRKUVJRFWEGEZGZZSYTEdltGuih8qKAPBfjflGqvdqxv4MDy7Mjf+dHrw1UzfajC0sTSwJT28JjP/IRBvTi98HJ7crr26tm31473rX6t57YHTj3/X0bopMbYxNr81ItjllF7pa9ilVfPFBmyk4/yFDT9jXXvTOb87zt2dnP+kyFpfYK8uzq0ozr1TmH23MPtOcea9wvT7+akP01OriyMf5HreyXS/kJl6iep+I6auaju9S8I2IUheCQMZkRIzLhljV9CMCg9r4LIGTakIvwoPqvCgCg+r8KgKi6uwhArNcJUujsJ79vrC+RtcljRiooGeAP2z7jONug0HR97aeOOpdw//8vl19ePyeYOTA3m5sI9jDhypnTzdJFiES1Ic9LEjx6+LVmyqff2jqmfeOXr/c5sf/O3mnnmMZ4hKsbSMSMiIuIyMysiwjAzKyKCM8iuJSjfugJaKyWC/hozq6LgM9t/VDzWeVONJNZ74PURMTcQqfqjwoMESV2BejpoUm+2oN6ugw/MqUgy5EVdeT8aU5qAeT+qxFOMDQl10kEX2LJDdHEvzLFE9arw8CLdxo42zntPtuiM3+IeqZ7YcabvcMgc7SmoioiYiKjKkJCNyKiKjYhI6IWP8cotNTUU1SB6FA17aNV6709D/bmzq9VjHz2M1v8pXLweNL5Vb3ow3PRXqfiQ58GGoY6elduvExhf6Vj918dl/3X/Pf+HsXB7t/Sg3tjIxsTqx8Klz/nDX6VWYdA7Smfovb7344f9mnXvSPro2NLE6OPhGcvCV3ODvMt1PFXqfLPQ+ne15Kt39m1jXb8KdzwY7n0u1PA1afhNrfCjS/7C5+ZmQ4nTr6a1SrhHDiioEyImsxOKX014l7VTjSS0MtFhWTQbUREhNhCovbNV4Qo0n1Xia9ALEAZoH1PXdShVSdMeBNQgmBcFLrdqNh/vf3HDlybf2/Oq5ta3TqkXUJ6XCRAxgYVA7JK0f1kAegAfBtDR16sbiJ3tbV2669tv3Dj/w7MYHn/u0exriagNiKKokkkoyoSRjSjKipEJKKqSkAiqy0o07UPFDS8V0dFyOBDRkVImFxhdNt/uhIVIaIqUhkr+HjGvIuIaMypGACg8arQkF5uVqKAnkqPixoKYksAd1FwxU/KYfPAXTNW6sbhde7ZFfHdCc7ZAeauQdapC8tKntzW2dv/v4xluf1a7Z3fjKqmM7T7ZA9qKGjGrIqJoKq6iogo7K6biUScotAbnFpqFjWrSAIUEf4x6v3anveycy8Wqg6Ufhq7/IXH6kUPvbYtPrieanvW0PuJteparXak6u7FjxcM+HTxy4/ztHH/wbR9PHnpYV0d43yIbnnYMrfNwTQ5c3WLV8J2Ofbzl6adXfsc8/ZR9dGxxfFRh4Pdb3Yrrv+WTH49mu5ZnOx5Mdy+PtT4Tbn/S3PuVtfTre+ESubrnv2i/dbfdoax/3S0+0nt4q45kwrKhGgYLMSa0BBeNTMS4NkdIhQIfnNFRQQ4Y1ZFhDRjVkXEMkNURKQ2TkUEBiDJ2+NrP7eF/bkIElNc0KobM3hDtPz7zwwblfPLXxH+5763v3vlw3IhZifqU1PqPGF3SWvZf6tp3q6ZnXjwhMVzoM63Z3vLTy5CMvbP+ne9/5nz/47T/f93bHhFEMxbVMXkWmVFRSRcVVVFRFh1V0WEUH1VSlG3egooWOjuuZhBwJaKmYCg9PCM1/rB9aKqZAg2oiZLQmlLiPq6GksBPz5ZRM5As/cgY6qoIDBjJmIFK4EyjglAzJIn5AJ4HJDxQuoPECXQAQKaD3A4MHSLDCmbqZc/Vj7hTQUEENFVRTQRUVVdBxOZ2S0hk5E5ZZHGo6oUZLKBrxMe7J2u3Gntej4y+Em/6+1HwPaFwOGp8CTc+CzuW5vnsSLe8a9q8XbXmvb8UT1c/+09kn/sfClvvjvR+G2l9K9z0v3P1d44UHCoLj7EsfItP1pJi1WP9Z/apvSc8/FB5dkZlckRx+OT/8Ehj+bbHvqXL/46W+J4q9j+d7nsh0P5nseiLW+WS+dTlo+rW/5seutn9V1z7gkx5qPbNRxtOhaO4WPwIqxqfBczoY6LDiF3LcnJjPFZGawzoqd6NTeOj8UEOvfEpg4yj8TQPaV9de+MljH33nJy9++8fP/+P9L7dOKoWIT4j4tPYUEQa1g6L9lwZv9CvqBnTnm0Tbj/f8/LEPv/ezl7/13eXf+u7ynz6yYpSLq8mUjsmqyaSajKupqJqKqqlwhbvJoSGjeiahQIM6Om6wJBVo8D/qB09L3/SDpaGliBfz5G/1Q2oI8FR+NVnyFoEfAB8AtjJwA0BmgRsADwB+AOgYOFs/u/t0s472fLUfGqyMYVG/xTNZu93Q/Vpk7Lfu698ut/wKtD5VqF2evvZYse2R4uB9mY6Vok3vzK19aWT1s3t/9n82vP4v0d7N4c4V+ZEVYObt0TX/ZWH7d9PsQwMHXmw7tLrp5P6rnzxa/c5f8E/c4+l7Iz7yVrT/hczAC6XB5wq9TxZ6Hs13P5brejTT+ViyY3ms/bFw2/JM0yOgfXmo7meejp9o6h70yw63ntko5WoRJLtUP3RUBnWBK82cN9ecfPaN3b95bedTr2z/x1+8+dSbh37w4Affv//tXz695sm3tsworHIqwtLZRKjf7MmeaZx6cdXh51YcfPjFHfc+s/mHD77/4LMbfvrIyn+5/+2fP/bhC+/t42v9MiTKVjn/g35UfsE0KYJu98NsK8qgCOYGlB8I9T6JKQg7C3IkpCYieiahJkIaMqxjwjwtzdNSRKCgtsYW1JTI7EDcaZMlosG8Biqow0OkB4ywUa4mHALAD8AiCq6N2I41mo42o5vP8Vlm4AcgBMCesx1n6wepYFEK282OuMjsEBhdWBBAPiDEMgZPTmZxqqi4Ei5AUNBDOSdrt5r7Xk9Ovxhp/vtC409Azb2g7tdg6BUw91K07fvCz/6Jv+6VvtceqHn2+13v/Uh56tnY4GqwsBbMvS/b+bctLyyT7vn75NgGuGkVr+oDceteybXX8IbHra1PB/peyIy9Vpp8HUy8CkZfKA09Ux54qtT/ZLF/eaH38Wzv8nT38mTXY4X2R0DzQ5HGn4UHfmlufTSoONxyZoOEq8bwrBoDCiojtfoUFo+KcWmIjA6p+HHbTMQrihgtOQUSYyscQwvmthF5fe/ijS5eTZegfkBW1y+tH5A0j8h65nSTYpxvcMqwoNaSkCDBOYW1f8HUMqqs65fe6BXX9gibByVNA+LmQUn7qGJgzjgrZkQGvwqL37wr+COpLCsaMmqwJNVExGhNqfDwKN9AhktKJoaGQDvLNCCzL2sdlh293L/1cO2uE3XnaseHWWYpFJBCgaX6AdtyE3xSZEoGy2UiEhkQeG6MO5tnw1eGPZ+d5XVxvY5s1p3N7r/QfepGn9mREJutEsgxyFadrhvafrp+07HaA1fHmybFt/kxVbcN6n8jOf1ipvuHoPNeUP9g4fr9kabHfR0Pkhf+enLl//XRXy5b+1fLPvvesnPL/7p39fcnN/5D18r/fPX5ZafvWXbgh8v4W78D2DuTrCPOmVM2zg24a62798XAwMvx0dfyk2+Wp96o+FEefhYMPl0eeKo08Hix74ls7/JMz+Op7uXFjkdBy6+jTT+PDN4DtT0WUh5pObNBytP8O/yAHSUDk1OicZEhwNd4eGq3QOsV6AICQ5ivD3G1Pq7WIzD6pGhIw8QN9rTJmdVaUnI8tmgMcLU+rjbA14cW9UGRISDU+wVar0DrFRkCCiSmpzNmW+Hr8kNkCDQNiD/ZU71h95XmQbEMCld+jnoXP0pqa2JBTYkgO+JOmKwBDeY0UF4dHpCbfWNcXEOVQwA482BMUrox5qsbjxxtIj89yevmRSvXjzP148eutctRJ+KJGG1hCeJsGOJ/tLd63f762hGdAPYrLC4NldDARRQOeWnXRN0O4+BbidlXoh3/XO56ALQ+Xm58AnS8AIaf8nb+i/H4L1S7npPve1p16jdE3cuewbciI2/6up9x1j6MnvyRavf3Qg3P/r/M3VdwHXe+J3Y9rO2HtR9s112X12v7wbsu19bsnbkzc++dPAojaZSoLJJiFElRojKDGMRMAiASEZgTSARGEARJEARB5AycnHP3OX1C53S6T+cTfn44Gu3sndG1dMfXvqhvobobp9BA9ae6//3v/v/+MLJF7F9L3luPj26JXvm9Nfi2Nfh2aeidysN3KoNvVgZeK91/udT/otX3fLHveev274xbT+s3nzKuP6lf+2256zdw6dfyxR9LvX8XuvyUYD/UUbtlftwZjemOKCwhynw6t4Rl7CnMmci7I+COmf/IIfnDjaHkQgrV135DuWJ1qJw7qTqRghOVXEnZnSp4MMWJSl9fLBKyEym4k6ovbQQyZhAz/EnNiyieRMEdlz2JgheRfWjBHc//2fylPlI82KOFc9enTnSOzAf4CA5LEcGZkL+vD1dMvP04POYUCMOICoXeKbPpGlbTgW6pXVi9835bL+ojCKZUOtB282D7lUA2b09kF8LZEKnOhuiW7tFTt5bmkUpCAhtGuFDFGSpFwwKdJO6f3ebvfVsZepW9+L+VOn8CnU9B1/Nw83UYehlGfmPdWq53buc7PsxcXIVdejPds4zvfd0YeBMeLIfHa6H3TehfVehfg199Sxz+0PIeMCY/hLE1MLIKHq+EoeVVH5UHy2BgWan/hXL/C6U7zxX7njV7n7FuPm3eeAp6noQrTyodPy30/SzS+YzoOHy57qOFCVcsbnxfH/NBeiHELYb5P3Q/5qsLixGh+naZPS7ZE2I1triwGOUWo1z13bOlqLgYERbC/EKIWwpythBvDwuOiPiH8PYwLHh3AgAAIABJREFU98/lYyks+VLWuAN/vJiOEhDOVWZ81Hf2QTtjGS+Ku+NUnDTujIavD0UfzBcu3CX2trv2ngo3dOOfN3p+v+HKK5sv7Ts5/tBOf3rw9MH2jrRsOdD0tD8eJOQwVRqy449dgjMDC4m8A8PdqOIKl8NhgUoS989/6b39rjj8Jn/tB9aNX8O1l0pXX1F7Xi3cfp4f+JV4+/dm37vFh2sqk+thfkNxYW1pek1pbBU8WmvdfAfurIah92F4jTn8Vnl+hel8W3r0MoyugpF3y4+Wl4beKT58uzT0TvnR8srwCvPB69bAa9a9V6z+l407v9f7ntduPwvXn4PO57XLv1Lv/Dba9XzeUXPl2McLE65YXHPEKkuoMJ9JLqUT9nTEiZLumO6OqX84z//p2V5wJgQXIroQ0ZkQ7DFuMUwvhChbjLbHOBciepKFatyoXO2W+GbVmRCWIsx8CJ/34/YQ7QgzrijniQvehOhNiO4Y746Jnnj+68Tkb+KOf+sV57v6WAzlwzmI4BBIF0PZkgfVnQk5RsH39bEUIu6ORx/OkyNO63h37P29j7YcmTt4LvHBkcVfvXPyxy8d3rz/xqhX/Kq5+6vmcx6MitC8A8m5UmwANz3ZSoAELwHzcdGZJjxJ1R2pRCIinSKrPvKP35Ju/ci68evK1RdLV1/Rrr4m9z4nPPh14e7Lyo231bvLjcfvmpOr1akV2uhybeht8/4KGNoEYx/D+Ccw9l5lfKU28Trx+GnyztOVkXcrj1dWhldUiVRxwOOVxYdvlgbfKA28Wrq3rHjvJbP/BePO83Dz99DzotH5G/3uU/GeFyRnbWf9J4uT7nhC/74+qjLcaN6TlNxovqrEEee9WN6bkr0p2ZtSPMmCC5EccdEW5d2o/EdE8s6E4EiwjijrR6Vv4kPynrjginKOMPfP5cMRU2wR2Y9ZvpQ55aYmXaQtKn77/csf+SAlf5pyxtJVH9Pu1O3HwVGH6MvCwGLlyNnw5gNzq3eMvPh+7ysfXN188OHFASSRhwNtV7cePe5OkQtRZDGKjXsS456sK11yZ2A2BrZkwZ3G/UnFEynFo3kGo+9f2O29s1ocXcHe+hup5zdG90vWreXmvff04ZXKzJuV6Xdg9HXz8Uv5x88yj35HPX5WGn3dmlgLEx/B4Ecw+CH0rS7ffxNm3oClF0r+pyGxAcZXwdhqGF8No6vLo6tKI6utx6us4XfNR8uLQ8utobetwTesgWXWvVfMey/CrVeg5zWr6xnj7nOJnmWyq6Gz/rPFSXccUR2x0lKSm88mljIRe8bvTGbc8erx+PM+vu5UTbDfxImw7gTrRXkvKrgTnCvOO6KsPczZQqwtxDqjgjMqOGOcK8674qw7wbkTrBfh/EnBj4reBO+Jc64o44ywjjDzz+gjmCnP+jg/ZiVoWArnvUkD5aDav/69fKBM8fqg51Kfd9RFj/vh8gP501rHc2uv/mr5pS1HpzqGuFF/yYsr67bWfnqwQQawJVIIr7oxbiHKRTlwZ2A8YPqIYtWHN1r+Bz7y/X9XuPak3vWiefMd4+565eE7/OjL2uNlpeFl1sjL+tTLxvwbhu3t4vyq4uQ6fWgDjHwBo5/Dg40wthbs72qTTxJjP2AWXoHpdTD9Hkyvh8n1MLG2PLrGHH7XGFphDa8oPVpRfPSONfhG8cGrxfvLrPsvQe8yuPp6sft35r3nkauvFtyNXQ2fL015/gk+/GnFhxU8KdGF8tW+HyfCehDOnWBdcdYVZ6sU3PF8tb3pTyo+tOBBRA8iehDeg/C+pBBIiT6U9yFC1Yc3wfuQfCApB1PqP5ePbxs/40J5X1pyobw7KXix/KQnNelJobzlwagRR2gulIpSqj8jOROCD1PdqGKLSENz6dvD0aFZfClkTNjzJ6/Mb9lzceNX56+PxgdtxKQ/Px3Kf3bw/IZtTZgIXkT2IXkfIgQSQgDhgwk+mGCd6cw0FXZmeF+skgiJQpwYuLjCP/wfhKkN8QufiXe+EPtXywMfFgY/zz/cooxtyfa+Jjx6szC2Qp9arU2uMqbXlObfKy9sKM6tryxuBOeH4P4IHB/A0qbK4sbK4kaYW2+NLS9NrwLPZnBvAtdGY3alubBSm3nbWlhhTr+lj78qPXgOpt6AideZnr+Xbr1dfrCTuPm2OPZm7P4bpGNXx7G1gbnFVEQMhcEXN11JwZVinRjpTCpOBFyoFsRFW4xYipJLEcYRF6c8xGJI9KVMP2ZVW3WPlxIx2pgPZRwI4cf4pXAWE4rzAcwWJiI5xRVnfUlxzpfDeFjwU+GMMesh57xUIKU/nkftEcad5KuDGhfCeITUQrgyG8g4Eow7yXtSgj8jjdhjLpTLFmAumF2MkN92fKsDoqrDbm0xujocv3fUgebBnpKjAnSOBG7Mp/9f8+FNGg9nsUu3bFf63EOzxILfmHLK96Yylx74p0LKIyfdP526ORbZUXvlUNstvvT/7AMJ54U48eDSSv/wfxCnN8LUKfHOF9SNt0tj28yRL7M3VytjWyB2EJY2aZOrCmMrrNl1YN8MS5vMmbX61Gprdl1+fGV+cpUxt740/x7Y3gfnh2DfDNhesG/KTy0vzKwwF9eAexO41oujy/TZt8vzK2B+uTm6zBx52Xj0Igy/DN59+etbEh0vMo+Wxe6/wXn3dTdvDM4vIUHu23y4U/RSFPdnpJQAmAgRohzKlkPZ8qSLdKNKhCh6UzLCFZei+HwY82N8OCcthjLjjmiCMlJc6eFMYHQpxpngTvBDM1EvIvuTWgwvYxzYwwLGQ1qCaskuR4JxImwIVyKklpZgIYwvRogYbSxFySilz4fS9jidYIv/f/tAOB9WcKOKB9VvPPRuP3x52aq9Ty374jcvffbz57b86Mn3fvX6J8+v3vXMiu3PLN/2wpqdL6/duevY5Rkf5UZlL/qffVTjTOfmiKg7LfpigIRlMc4OXFrvffyfuNmPA+d3sAN7Kwv7jOlD6kStNnuEn9iZu7epvLC9NL+tsrgDHHvAsdtc+FJf2FW074fsaX1xr7KwB3x1hvOwajuk2A/lp7dKE++X7VsBrQGkBhtchQ2ukm2fQ2ifMLNFmvnImPsM7Lsqc9vy998T+9fqA5+XB/fnrq/kRpbH7q/kfIe6Wz8ILtkTIT4UBl9cd6VYF0Y60zlnKu9Eiy5UCWRlW4x2xPlAxpz20NXHLoF0xZsshnOwFM4vRYRARg3h6kIYt8eZEUcipwJThDFXaiaA51QIk0VbLO9ECiG8kpZg2seOu8gICQvh/Lgza4uy80GyOixteDE+7c064l+/EjoXIFyI6MMKKAcD00FnQgjjxr8UH25Em3LT/WOx6w8CvY9iD2fwCYcw7ZNvjkevjYR6J+O9E7HuIU//VNQWyycY+C4+8gnuQcd7/tEfCvOfgv1a8tpnfTv+4yd/+8Snf/dE356fIXfeB28NO/heZXEHePZZCzvkiY+12W1F+96ifb93cPNU2+/8V5dXvLUQaiz76kv+enl2uzqzRRjdEHm4WvV/Zbm/BOyY4tiaGV4HuSbDtjXTv6Iw8TEsfgnTW2FmG3t9I9hOKENbCtNrY/dX0u79ncffD9udWFz+Nh+elODF8sGs5kaV/U3X1n1a//t3tv/8+U2d/Y7FUL76eo0jzkcpw4mwXiwfIjQHQjjR9Jgr5UCEEJEfdWIuVLHHJVtMtsepCTc15iRsMcmTMqNkxRZlAxk1kFHzAN6UHMioYdz4umRLVpvyZBJM2ZOUFkKUDyvM+vF/IT5klAOEgTgF4Rz4sbI7UXREjaWIEuXAh5cTIiAC2BHZnVT9WX3Kk3OjeS+a96KCD/lDUN6ZJuayCQ+mBCKAhiwxoTy4vMU3/gt2cU+op7F9w886t/9s/uIWe8/uW7VvH/vwb6bOrQHPCQhfBPdJaba+6D4NmTsQu5YZa1IDPffbNg6c3oJMn4lOnknMXMjH7unRbkhdAu523tVkRc9Rtvpy8jLjbIHMDe+9XexCu+a+CMgdafokOVAPob7SeLvctxftXk2ProkOrqX9NZ0tH4Xs7lRCDkbAl1BcGOlKZ5xZ1JWiXajiRhVnIu9Jqr6U6UoYn+29eOj43Y5e192x1Jvrj/aPoikOXAljKZz3JFUXIs2FuYEl1JU10AKEOUgqkFRgPlGYiyn2lJVSAFMhwoGPgCANyQLEWfBjVpKDh7NojIRJF+lGtAgObkQbd+BRAuYDPCbA9UF3jIRQtrwU4f6l+BhzJKfc2fkAY4vI9qjqiBruRNGTLI6400P2zHQItyP8QlTwYnqYLNpjwj/iw50qVH3kEXXwykf+iV9yS1/5rtRd3/VK6Oan8tIZ038jNdrUefjF6fNr8Ye7H7W8eeWzn9za+6Sne4vz7leDLe82bPxx05afb3z6r643rAFyjA/eHur48vjOVzY//98/PP0GEzmzeHXDjdpnt735P+xd/e8Ovvd/kPZWkIbt177Y8Iv/Zs0v/vXJjX8b6d6tOrr7P39meNtTj/b9HXr3dWR4gxht7Gr92L/oQKLit/nwJAvelOZKqG7E3LS1/cINWygDMkBN++DoEmML07Un7w3OIP604UKkunP9PY/d8Tyc6h362bL3fvn66rbr9zENIhx8cvjST19463crNw7akFsTkR89u+qHv3ttf0v3Ujjvxwof7T7RcPZu0/kHd8cj0x7ajWjHLz68Mxq0RaTFELG7rtMWEe1ROZQz/z/2UfJgzIg9MhdMRyn9ax9pyY3mo2QpSlYiRDmYKflSpgfVPajuTWkxphImi0HcDOQMX0ZxJfPulFQtIfHHlQi8qOBFBRdGLmZQT1INhgELlfMJY6DzC8/UM5S95tynq3sPv8cunvbcrXM9aKMDvb3nP75R/y4Erj9qfq9j+wuu6wc5W4/7TuO9k9vvnd0TmOjZ//Gbp+u2hm3Dj/o7Lp891n/zwkDXUc+Do0Xs/vEvn2368rm+sx/N9B3dufGX49drZm43icHHuYX+5OjNgaZ94yePKUvjvduW3/n0qaGDv8k+Wpua+JSJNJ1v+tC76MSSSiBa8SKyC8u50ilXNuLCcq6k4EZlR6wQylYSNKQ4eOGdPa+sPPjUK1/+6Feb+kcytlBxwiE8/9bO64M+X8ryJo3XNu2/POyZjOUPnLvbORKYQdS7tpybgu7R2LNr9w15BB8DI36lf4GajJijAfWDry5Me7gEDW+s33/weG/Pfbcjpi2FCwgD7VfGdhy5shiSO24vHWi+NeVm5wP5MF76l+KjWt/CEZdcCbWKw4PqnqS6GOVcSdkWFxxI3psuLETo+TCVYMrfxYeEmA+6tnqnf0c7als3vXll5zt6oItz9mSWrjHB2zfPbhnr+Dw/d/bGvtev73tDsvcovtt9TR/ebPqY8T1gw6PtBz/ovViX8k93nTu2fuULb77y22d/+m+6at/m/T3NO3536+QmIdanp4d3v//rgYt7xOhwYuraoQ0vrv/1f1z9t//ntb2fW+7ZKx+8HDj5QfjKWsO5PTuzNeutaTuyzrvopIjSt/kIpIuuhLYYYiM5fc1Hx093Ld4dzd4by6396MTgFEFrsOrDxjuj0UkXFUgX3/zgUNeo38/Buzuathy9NOSlAzxgFry06ci1CeS+nR5wYEkNBuzcs2sO/vD5Lf/pyfVXBzxRovT6un2ne6YC6QpfhMWQ7E0W5vziux/W2qNq3an7fSORQLrix8qBzF98/nAk2PkQXq33EiY0e5yZD+GOBOvF8sGcUi1U5UtL3/jwpYUxZ2whnI3RRjBXqFZC/vrDyertbiFKWjGqHMjorjjvQThHlJoP5RbCuAvlgjmlWirPFmfsCdaBcK6k4E6JHkz2pgueLOOhco6ImEhAwmsICX2ib59z/Ene23i3bse5HW9w7gu4qyvr6SUife3H3rl//tNSqO927drb9euN8H3ec/vMvlXdTZ+AGJYzjiNfbrje0Uym/JcvtNQc2Tk2ds89e4PwXTWyw3Xbf99/aQcZvV/ITh/a+tqdS4cwz8PjuzbM3joXGek7sPbNh231imvh9MYXZ+tWpvo/1nw7Cefu6NLeGx17/C5fLC5GEAhimi9H+fCsj0z4c5Q/I/vTWiBdjJFgj6q+JKz9uKXjlmcxUMQl2F3TNzhFeFF494OGzn6HHysmaHh1477zD+xzSXUWVbrHQj96ceM9Oz6d0D44dPnOQm4WKU7FjOlYcfWOM3cX6c7h+IqPm+5PIm7EXPlBze3H4cWQHMrCfCBfbfN9vv9C73Dos33nJ12MK2FMOOkoWfm24qfVgkHBnOLPyC6Uj5C6OyncHnMmhLIDK8RE6BwJXJ1JPoHy5RCu/nFZqhCuonz5+/oI4Wowq/nTij+tBDJqIKP705o/JbsTbIorERogXNGJsPMhfDFC2uNMmNSjtBlni3G2GKXNQE5zpyR7Ev/GB+Iz/9iH+9rJI2t/NdqxxUw/1LMTD6/v3bv1Sc+jJkAH7zVuvHbkXcV/B+j5yWs1F45uGuhuyPhHa3e/f/HEYffC48sXWi6ca45GnQbvw709Rnb45KG3H13bT8UG5MzU8QNrHl1vdI11nz740VJ/R/DRrZpNK+831/ALk72717naNuKDW3X/LtK1J2bbV/WRQKRv82GPysGM5UGtJAt76m7dfoTOevRQWnx9Te2F605b2DjSer9/LOaMq9Me/NWN+zpHfB4aAjwsZYpfNPY4CRjysu9ub/+8/voiBpE89C9Qr7x/bB6FATv3y2Wf9Q6HZn3Cyg9qbj0K2iJKnAJbRAlmyjESzl2f3d9089z1WVfCQFkIZcGfNv5SH0tRyp0UquXJvllYilL/qI/EQhj/L32I1ZLZwVwhkJV96bwXE/0ZKZyTwlkugNGOaNoRycZImdIgLVV86bwzyTlR3pHkHUnRnso7MMmVKbhyjIfJOiI8ggLi1/OIOtm/2znxc9F/BOITwyc37175P7/3zH+39rl/8+V7P7h/7UPgH+Q95wdPr7vR8CY2dwLwwcBo08W65TVbn/to1Y82r/ibBzcO67zNvXS1qXbjmhU/+/Vf/1exmRYm1NnR8NbIrS9R1wU8dPX0sRWjvQd0YrR971ufvPXXW9/68a53/n6q43B2oufKthdiVz9jJ3cY0S9x75cR51c3ruz2ebxoSgmhEMQMX4714YSPSPuzfBAzgpgRypmhXHHGy4ws4S+t2P3Ku/t+/tyWH/5q3ZHWgWAaZIDLfbY31n/122XvP//Ox3//wrqBJbRvJrJ5X/vza3b84OmVd2YT8TyEGNi898xzq3av29H+YIlc/+Wp1zfX/m7l7uUf1gxMxecD/BcHzj2YTrgSaoIGR6zgS5kIA4MzyC9f2HjlzuLDWdQWkcK5ykKI+Ut9OBEuQupxxgrhaghX44wVIXUnwn1fH06EdSf5KosqEXeSdyP0wORS993h1kvXWi5cvz44OeuL2+PkbCATpjR/tuDCREdSdGCSj9CjfAVVLA+TdUYFBAU0YEioNnV3j2vyF6L/SPTBWcgO0fZG78A+18Nawt8ByqPY4nEj0sU4TpO2k1r8JuCDcrw3Nnd66WFjJnAz7rxGxAdlai6XHAm4bnsdt2P2rgJyE7hHntG6rP+yig+UuNGF4YZc4IaGjyTmLydmOzLzPdhkpxUZheQsPtzKDh1SlvabsZ2Eb2fcs/9m5x6/15dKa9/mYyHEVHsLCQUGJlNzvsK4nR9ZZLwoJFlYCoVmvHzvsL9aV86VUsf8pJ8qP3JlJoLssBsny+AjtYVEfjIodj8K3plJEUW4M5Pum8buzKQnPOxiSIwScOXOYpVFOGfZIpIH1RdDzIPpxOvr9iwEhWCmlKCBVAHl4C/1ESG/LqU9F8zNBXPupBAmtAipf4uPsi+d/xMfohfj/RnRk+LcKdqX4QI5wZ2i50KpcXsgjrMZTs0Jui+BD0wu9Q7PLsWyfBn8OdmblV1ZyZmWbVjehslLKWkpjXs5zJFgkBQkQ7KUEmfubfNN/bgQ3MNNnoHIxfTYJ2akVY+fQ+f3lphzXOiYFm8DuhPEa5DrMLBzQHUDfwPoa0y4XUYvqJlOE79eZm9XuL4S3wdiH1A9kL8jx84AfQ34myDfYeOnLLI742kUIifLmSuAdRrhs2bgtOE9WVhsNJbqdd8+HdlKhXYiof23ru32+71oRgui4MeKvqzoz7L+HBVMK8EUBDEjTKjVphjKwXyA9yZNe1R1xvUUD3EKxh04yoE9xmF5mPKmpn3pGGORBjhR3oEICxHanSo8ticXI4ILVWI0RCnwZ0oP51O4CqQOcwHGm5IxEZYiTLUfzIWI1R6zL2vOfrK3ZVfd+WlvNkYVlyLMmCM548v9pT6qrcVAthBnrDhjfbP6fX3EaC1CKoGc4E2zTpScD2MTnti4PcBqJUYpyyVgVZhwBE/39Hc/GHcnsYUoYUc5D14IMcUwXw4wJQ9hOHKUj087ERbFIBmSZSw/e3+7f/onSugrw9FdDJzlFneBdAuUAcpbZxCndOyEGGhQkqfz2Bk50ibF2ou5y2q2g4+cBOshSP0mcZWPXSCCp9jYeSnTVch2qsnzLHJeSZyzcp0iek5IXxKT54TEGYARYG+IwXbG0aQFT0OqC9JXAe0EX7sZOKAlvmAiu9PxI7dvfOXzef4RH+4kb4vRM76cMyG4EmogXQqkKygLjxdj4VwRYUAGWAzT1UlORICZQNaXoX0ZGRUgLUOCA39Wx1VIiTDhzk16iLQEcQZcKLkUxXyY7kwIoZwSIcwEU64O1PMkpQhhjjtT1wYXo6QVzGqkBoGMao9xuPIXnz+SQqX6uBnhSghXqi4nhcp38yG5k+zX548sH6ULUVpyJYkpX2zSG3WieJItGACcWmK1kg6Q4pRbQ5O9w7MhXI5zRojSXFlpCRUWk4I9XXBTpl+QPELKidBoGlJhSU3z8wOfBWZ+oIe2l12XIH7G8HwpO/fI7kNa9AhwraVsA3CngT0F9AlgToJ4DuSLwJ8BvKWYbSokjgLdDmoHcKdAOAPS+XK6BYTLkDkB+SugdJfJE8CeAe1KEW9FFj8zkseg1ANmdyVeIy5uMz17IHEcIm1GaI+c2ELHt+dSR/t6v/L43AlMCaLgx8q+jOzPiP4sG8SMIApBzMKkYoI1fOm8DyvEqLILKcwHeG/SwAsQp2HSnZ0PkgthPMEariS1EExXp2zzoIwrztjCxJwv40F4lCm74rw/qUSypj+pBVJ6goQYXl4KUV5MtMWoCKkFsrI9TnsxMZgrBHMFUgcXyqUlmPKm5kO5KW9qNpCJUn9x+zSYUzrvTX3VeGF3/bnd9ee+arzQeW8qmFO+r4+5UMqf5aO0ZE9kh22+cXcYk0wVIK/r8SyTE9VCsThu9++ubWm7fCsllqKMNunHzt8d/6q185OjJ7c1XDxy6U7r7X6viDkROpn5L3wY4R2m7VzecQxiByHXDsQ5yDTn0UMmVldmTlpEa5lsq9AnNKJVSDdaVDsoHWB2mekG4E+D0Wngxw2yFeQLxVRzkbmgRutL/CVL7FCSDVrmeEW9LCN1YHbqaF0svD+L1gHWCNRJINvN0DGItuvB3VL8Qyaxg0jX3rm91+Nzx1OFb/NhT+BOhHYirA8r4AoEs5YrocZIWApnIkQpRpV9WMGTEhDORAUjnJOCGXEhmA5l80m2iNBmMC0jtBXOav6U7EML4YzhRRQfqrpiUjhjJagiwhUXI0SE1NxJ3oVyEVKLkJoL5WyxtCcl+DP5MKHGaCNGG9UnhX+pj+okYj13x5dv3Lp849aeu+ORrBRKi4EUX51irDp32LwvNetBU7wRyHFjrtBcCE3QcozMh7NcjBAjaTaAkpEUE0gQ04uBRVfMBDABJBOyYjnNF8kC+FC27kTnq6u2HD5+EaX16kx1rhh54frgik3b1mzZde3+ZJRRFrFcMAOROKBhSHoZ10yzd+m3EnIUiNHUzCHGvxvE84X0cRo5oPC1BfKOc+zunk9eaK9/xT3Vc/VE28zg+VJhrOvcuvGHu0r5hZqdq21TtTTRUFLvlORxKdtd5i4rmTNQGdTxDpD7CpkOjbxqMjdK4m0Zv0KnzvK58wXmosJdFOnTTPpmOjzEZW6A2inSe6KRF25d3RAPJMJxIkxpI05l3AchCkZdLjoPsZCBM7AUluIUeFAjmCnvrLlyZzQ8HxCiBMRIcCN6Jg+hbMUWkcfsuAww4sBnY1JGg0kvE87Bgo/HBbD7hB17zw2NxwOI6QjLsz6ONCDMwFRYiBJA8OBPGD7E8KBGToXJADcdEcMcTIWFGA+BXMWXsuI4+OJ6CDExBlC+7EmJVRMLYcIWo6OUkWCLMdpMChV/Ro5Sxjd9ZV0DMykZ3FktIcGVx/7uKeSJICZkxbIrRnbdGe26M+qKkVmxHMSE7+uDlIpL3sT4vNcdxLK0alQqeU1zhRJZsUwpMO9D9zecfX3Nx5/srusfWUoyRjiTj+GFNF90RPCuO6Pd/WO2UDaZt+xZMpCuBCOlZATwiORbaLNN/yxl35qP9JWxy0C18OgxNlZbEtvBbKeQ7jsdbU0HVvltLVBJxxbnMf8jsGbPHH9rqP8LmRi7dnb/1KN98chXAOMK8xCKIwAPy+wVKX9dQE5B+RHkb5eF2xp5VaWuanSPwnQrbKdEnc9TZyX2rMIOSMRC1H0yGTzIETul/IbJkd2ZRDaG0osxUgDATfDliqgohlEuEbHmbEk/VszJkKDBFpHf2rD/6oArSgDKAl8EW0T2Y2IEB1tETouQ4rikCPE8JETDny1zFpAyOII4r0AIMQNxPc0AIcF8QIhQog2VvUQlkLacAdwTVTM8LIbygZzgJyBrwlJSIsvw2JUKEZCgYdHPoQRkaLAH6aUohfLlKgWUL+cBsgVYCBPDS9FqFaFvfIRwtXfU8Q99uOJski1hfCWASQFMwvhKki254qw/lY/k1GBaDmUK4awy58vMeDBAlUpXAAAgAElEQVSUL/lwYcQdmQmnoowSpuRATgiTUjDD+zF2eM5rD2dUAB1ANEEqQgEgLYA7wZ2//ujDL+v21J0dng8nKDOUKQQwyZcUU1w5I0K1kjxCWyGKc5Fxf0b2hwFDgElqQfvZmZFfukc/Hzixl/NcI11tQx0fTPXuKWA3xXTn/P3ry36y9o1fvHb34gXSzXbVjI10TWtp6tTBmp7W9lvtN974+/Wv/Oyp+t3rmEjgwtHTN89dXP/Oy77FibBj/umf/s2vf/jXl9taSwLPJdHTx2pO1B683F4/+eAaFppFveMD11vqd3/c3drUtGv19RNrgvPbqPTnD3oPhp1kKCJgEpy45vrJC0d/+fqWvtnHS6Ekx8Phxhu/eOmDVZ/U33wcyqmw7eiVB3NYmIRhG75+6/FfL/tow/bWSS+XliGVh2Xr9v7y1Y9e+/DIqJedCUtrP218ccWXH25vn7bTH20/0fcw6E2YbsTcU3/t6Xe2/ubNz071LdAG+OLmiY7RY6cHlm8++taHR3c0XPUzEOJhe9O1p97Z+vL6vfuabnIWZHjY+ElTa8ej93c1DS0hEbr8yIa2dj38YM/xdVtrD7Zfu/bIMenD7Ug+zoEvqzuTcogs3pny/UMfXlQIpuVwVvkmwbTsRYV/mo8Ff5IuFHIcF0mTGCPQqhrKFGpP9LzwzgfrPz3Q1T/pirMJykyypThpVBVGcdWLCuGskqBMRzLjphIhXA3HIZP82sfCxG+D01+e37Mhu3AJmam91fau7cERkEfKYn98YbR9Z1dH7UU6FNSTxbNfDQx1jAMrdx8/sfjgYXQq3Lz1wo0TFzlkFizt7KETTXsPZKLukGMGC3lMljJZpv3okbtdnaAqrYcPXDh+7FFvFx5zQIWDMhN3D90427ht3apj21fM39/HJ5s4fPuD3oNYWCJpiNL6sQsz5/opW0q3pyNDs05/AD99eXTMRTdcGLr5OITw+pubDp26Nu3LWKNOasLDdg24Gy4MPbYTi1H88t2JTw9cGFzKziZURIKLd+1fNVzvuuuc8/A5Ht7deOTBWMKHWKd7plo6RtqvTbVdm/qivvvhnMMbM95Ys3dnTdeJronDp++99v6h27PRJUweclNBGgaXsi+v2v140RlOF37+9HunusdGXWlfVndjSpCwPGn10Inrr2/cdaDt6mNHqjpQL5mHMFXyZrQgYd0Y+ZPzR5Qt+XKqOy17MgVPpuBOy76cGmVL7rQcIHRvVvHlVD+uTQVyE75MTAA3XnjkRibDuRBrBmjdlysESc2XkWOMdXvUcfbGozsjDkeUplSgVLDHuJqzN1d8vG/TrvrBxShVhIQAdlQIUSaah+pOfTnVhvDerBLjyj4866W8CC2iacilynhM8iyecy6+SoXPXK074HnQsdhf9+jywZxzENQwyM4iZT979OO+i5+XhDsgOs4d3nu/44iY6q/Z8cxI7x4jZ+tuqrUPn8pnr7DxvhMH3u+5sieA3a5AMIHf/3zXc8+89G///X984uLlzyvg3rfvub7b2xKxSwx5NZs+m8POcPQFjZi70XzaO3gTqHlg+5jEoce32ogIJBArTFtb63s3Hrx7cWgxabEywOZPG3785KpfvvrRD55cdfBkf4SF9/ecujeXmgwIa7cd/7d//cLfv7T5r59eU3t+0IYaW/afa+2ZsGdKNrw8i2rrdrWf61ucCYiYCHEKlr9/5N5EIkrC6k8bbo5F8DIQAMs+OtI56IlT8Pw72y/fdQgAERFW72ztHAtOxGW/AD96ceP/8pNXfvPGp950GRPh5Xd3PZxPubOGjyhOBmkvblFluDcfr71w985MxEcUwyw4MDXMQpCu+MmSnyx1Diz8SfuDNHw51ZtVAoT+DYggafwTfIzY45f7J1ov3Tlx5V7f49n+0fmmC3dWfLxvV+PFBwsRqgg8QJA0PJlCWgE/rtgQ3o9rVYt+XIvzFR+e9dE+lMknM5BBi5mw4Fk8F/Qs13JXRztO3zt14Fbbh3O3m/nQOINNs8lhk1g6V/PJ7QufWdxtKHh6mutm754CY7Grff1I7x7g/RdrDkz01Qvpjnzq/tW2XZOjp4sQCARv1bWt7ry5K565X9+y6cHQsWLJUV//xvTUMUV+WDKHBK5bYDoN9TooftIZ0hMeoOap4GnEtW3q3lk6DnYHPR3EQxycG8y9/sn+rvF+WtNefWdbZ7/tsYt6aMv5CfDh5u9X7xqy406s+NqmgzfHIu5MueO+cy5aSKuw4pNjN0bDARbGonkXCe/tOdk7EZv2CymhEqdgxeajF28thPHy6xsOnL41N4ckFzHsl8s/f2jLEQq88/6RrgG3PZF47Eu/sHFf90R4Jqk9t2F730LKS8GyDfvP3JhFudKaj+sv3p4f95NUGagyBOlKTMhX54HMGhBmIUiXZyKcK6N5cmaAKgfpyp/xYUuKrkzBi2vfxJUp2JKiMy37CN2dVTw51YtrE4HcmC8TFcFJqA89yfEIEWSLftr05FQ/aXizSkqGCGXZE3zPwPwXB0+s//zIus8Ov7L2iyf+1V898a//3RP/479/4r/9X5/4V3/1xH/9P/3vP3122cYdnpw6H2fdWSVIWw5M8uTUIG05UmiECaJkPpaAVNzKRCWv85LX/zabvpBaGr7W/lnPidVJ56UKP23SD3W2H0T7/bP1j7r2mUSfmbY1f7bzasMBIfLoxN7VPc2fFiKBh2dujlw5VaEmwaRO7953vrkmSwTsjsetbQcW5h8IbHzzuldaarfrbOjol6sGe2rxwF2LHAd+AvhRBb2RnO8AIQD4OOB3JOS4iO31zXSZLGBZzYtTDMAYCu8dbu6ZHQyS2qc7Ok92ztpQzYmZaRXCDDy7ctvNsVCIhsbLjw6cuO3ETFfaEgA82dLabU2tPWOziQINYMtab3589OZYKM7CbIAPpEvrPq0fmkslWKg//+DKA+dMXJ5FlU/qL/dORNyI/u5HNfemE55syZkrvfHJ0Y7Hnoc+cv2+E34OBp25v31hQ/9kLEzAWxv2zwY4V0b34tZUiHmwhDowlSxBlIcHS6gnZ/qI4myUd2V0V0b35MwgXbn26E+uL860HKStEFP05FRPTg0xxSBtOdPy9/URIApLMdabLsSoohvN26LsQoh6MBe2u1P3x1x9k15biPCFiLGZwL35sC0pZnTw4ponp/oI3ZYUq7u2J5E4H0ngQiBkolGDQNSQr8vleQMLt+LuiVOH1pytey3tuVJkJjRiwOTvmfTcmX2f3mj/pETfBS15ta7l0aV2oJZutG2dvNkARGb++vD7L/62dc9rVMZ3dPNHs0P9OBUqldma2u2/e+Zvtn+xbv3K5x/fu8ynHUe/XDXe15JPjhj4qIj2K5l7wAwCNcUj04z3po5eKxJn8+l9j3sb0gEykZQS+cK6HTue2lDzwpYdfc5x3IAFl/nGuiM//f17v1ux9UzvYFqFTbvbz/XNLyHyhJ99Yc3OZ1du+/Fz6zrv349ysJhQPth76ofPr3t6xYqUCWNBbs3Wxidff3/Fh0eiBKzYfPjGQ28IN6d87Jb9Z3784oa/fXXzgQv3UAkC6dLyDw73joY82VJMgpc37z//0LGUs3614rOnVn22bPOBF9fu6p+MTfuYdZ/Wd9xZmI+LDkzFVEhrsJDITwTCXlxHJLCnlCBdcWX0EAPurOFMawGqfHPE/Q99+HJyjLMijOHCBE8mH+eLiFgOkmqQVN1pMUAoMc5ypvgRV2IqkA6xpp/Wh1yJsUA6xJphzgqSWoQxQ4Tmy8jVBzeRnBrKFCI5NYprYUILUd8jMYoNpSMZ3GBIwFMQ9XA+35Vwam062eqbu9p5ek3PpZdIrBXggS6fIrK7Vf6SStxV6Q5NaNbpXj03Z1APDfaayd3U6Zs6Pq5nfDoxorNdOjmo5xYUYloVpiRqnM08opABKnFfTD7QssNlcljH+ovYrUr6GmS7IHcJ8AtAnAX6fIE8WWRPFtkmPrUN8S8PLJ5MeNNpgvaQkfk0PoEosxhhJ+K+lBUIgjME82FmIcIuxXgHknenCt606s/qgZwx7Sfmw4wTlbxp1ZtWnag0H2YmAsRcUlxERFtCtCdER1x0x0RvVPRGxXjGDCQVe0yYDzNzYWYhIdiyShA3w0k1mFJ9mOpNq5606sqo9pxqz6lTcXY2yi5EuaUYb48J7pjoi+Xd8XyYNP9sfBnFg8lBXK++1Bdny9504daIM6eDAytgGtyYjl8Zjz3hxwshSoswRpjWq3Fhwmw4F2EMP14I0zoilr1ZadKPzUeJqFAKMMZjb3IynIvwxaqPKGuFST2IqxFSj9FmnDRihJ6gTIS24ozlzUrfPcEsEcnGUKyQQhQsbqFBKRy+6o2tcDv2vffWT5sO/d45v8MqdNN0B5bYT+b2QOl2kXtYyl8tKSfK4r0yY68IoyD3gdwP8n0QFoCNgzgLSi/kx4H3lEV7WVuypAWNn1GoCYUct+iJCjsFwiRQQ0DeA6oP6BvAdANzBZiLwHfo7NkSd8qkGwRsezqyOuY6j/qzGE5FxJSbERbxspMWA2I2RgKCQigJ3rTqy2j+rB7EzTBZjNLlGFOJs+BEJQ+mBHEzQpUiVCmImx5MsSUlF2l4ccOfMwI5I5g1IhkjljZiaQOjIEGUglmj6sCLGz62FGchkbViOSuMWyHCChKWn7Q8tOWhLVtWcWVUT1r1ZbRARq/+nkjWrE7//qeJMaUwacaYUhDXXcl8mDSdqHj9kQ0rFOdiXJhTu8dCnRPxJ+KkGMAof4qMkyLGqygjR3E+nGUTVD6S4+KkmGQLwTS9EEg4Y2mEKQRJYdwbmYsko7QUJsVQlvumlyyeExK4iOL5JCF9HUqOk+J3T5IkSD6by+hYHPAk0BnAyeEgtml+cZ978XaeGQIYAug3lW5TO2sazWqhRZHaFPWAYnyqKvVa/qpWOKXrtbp+rFhsKuqdxcJg0bhYLB8pmqeL6o2S1l02LpW1S0XlQlE6Z+XPlqRzIJ0H6XyFbwe+BfhjwNcAvx/4r4DfaQq1NNXMEo1MuiaH7Mogn6XCt9NRPk2SiUIinCe9fCEkUIiUzNJAJiGNAUoWkpSSpJQUrWKMhjFamtXTrJ7AJYSQv/kpShYQQo7hUoxRErSCUEqKVDBCyeBKFleyuEJQeo7U0qSaJAoJsoAwaoLTMoyezspYVk7mZBSX44QcI+UIJUcoOUxKUUKKEzKKyym8kM4VsriCEQpCyH82GKMlcClFqwghB5NM9fvdMSdhwhKaD9CVrtHg9TnsCRUgmzeiOI/QEsarGK/mJJO3AGXkOCkitJTilEiOc8UzviSBskqEkeajKWeKQHg1QuWjhIiyShQX0oKOkhJC5NO0kmHUFCmjeD5JyRlR/+4hRCGvcSxdITBgcyAxkJdns+L2cPQ4h9uy6K3Z2a9GRz8Kevbn+RaeOxQOfi6wjYK4Wyx8KApH8sxlSWiVpIOSdFhVa1Xpgsr3q/JpVd+nFlpVsUvLX1LzpzTxtCaeNoTThnBa504azAmNarPo4xbVYFFHTPKASe4yiO0G8blMHsBz9bnU0VziAI7uZvFdfO4xlzVInkcUJFZggpIelVhUTuUYoDHAc5DhjD9OFUea1atWUrT6TTBGSzIawutJTk+xeobRs7SOUzrxh+CUnmOMHGemeTPFGwivZxg9iysZXMEIJUUqCKUkaCXGKDFGibMqwqgorWKUmqG0HKnhpJahtJxg/dmkaDWey6dZPcMZCCHjYjHN6rNejK1AiCknJLg6EemzE09cuXnjVMelxpMnjrW11hxvPtRQf6SpseFEe83x5qPNTbUtx2tbjh+sP7bnyOH9dbU1LW01rSd3Hq490HC84cTZw42tRxvbGtrOHK1vaTt9sa6h7Uhtc3PzqZaWM/X1bTU1zbX1x480NX731Dbtb2rb1lB/vO7Q1bpD3XWHu441bT526v+qa3jr6P6DtQc/b6x7r71py9mWzy+0f3jpxLpLrQea9jc2Hd7dXLe5+dCh4/sutRxuaqn5qrV2X2vtvtbDba0HuluPNLTWf9Zac6T10MmWo01NRw8dP3qkpeZoa21dy9Fjx4/UNx6sbThQc/xIXfORw81HDzQf2dN4aEfDoa0Nhz6vO/JBXf3GuiPr6g6823D4jRMNy07W17UdfVzfdHn/iYP7T9btPd186OT+mpOfNNW3njg00FrX09TcXk1jU1tjU1tDY2tDY2t9Q0tTc3t1oe5Yc92x5vqGlobG1vrj7TUtbbXH2441tzU2tTU1tjU3tLU0tLU0tDUfa2mqb21uam8+fqKh5URdS/vR4631DS3H61ub6lsbG1obGlvrmlprmluPHv86Nc2tdU2tDY2tDfUtjcdamo+1NB5rOVZ//M+msantaE1DU3N7a9vp+oaWltZTx1tOfvFVTYjSw2wlpULXaPCOg3xiweOOYClc4AlRyHJsjucyLJMkiepydTVFkSiBYzSV5cWcWIjjdFaQmYKB0UKWydN5LUPyQsFM51gUI1m2IEkmTUs4ztOclGGZ7x6cRQnWRVM8kwMyDRm0nKNmOfO4os/InCDSMVVyghU18z4y+ZBEewtESM5JMpUq8K4CSSpZUClZZdMqmynQWAFXChkoEHyB8xcoopDTZVKUaEKmyAJNFWhGJlmJ4MQcI2RpmWRlipTpnEylZAqRqJhERUTWW1C9St6lcEsKN64LD2QSZ5OQwQ1ESqIFAtH4tJLMyg6a4KUUiAQwbP6b0Iz4TaqrFC2QFE9SPEULNCOSXB4XJUKQKF5iOYljJZ6RREYSGYkjBZYSWSbPchLFSzifz/IiRQsiI/GMxLFSdTshSLgo4aKUE/I4nye5PM2IDC0ypMCRAk3w1d39acS8ihMsx8vVBYLkCJJzRzM3Rmz2lJxUKmfu2W4uZJ7o7bsRDPukgsCLDM0Sqi4blsqLjJBnRYkTJY4TaIYjWZ7iRYYVBaYg4ywrKIqk6zjLMoKYV1SSYvJSAcMyySQmiXLJKhsFXZPUomlpRuG7Ry9mtJLTsoSiDqYKmgSqFTfgZhnSYIDGg4gLFluB6jMeE8CEogxFTS4VU2W9WJahokHFEqGYLxl8SYGSBCXNKBXRki6VFDAMQwNBLQtKSVSKBalYyJuKaGmipQmWJhQVoSiLJZmvCALwAnCyVTY0KCkACkChBDJjMlDIgSAAaQh0WWIhn4eEXJ415BywAAUwlMIfx1SVav7B9mpUtaCYqmaouq5amlpU1bKiVhS1oqgluVCUC2bhDx/TCrJeMJRCRVHLilpUVUtTdV3VjD/swFQ1Q9U0xVQVs1CwJNnKS2a+YGn6n03FKsqCaGk6FEtKXiqIeVWSU0T+yOmri4iIF+FE33zPNPrE+OQILzIVKPIik0ojosRpRoFmCSHP5mVelDiWpxiOrIphRYGS8lUfoqpmKIpkOUEu4ATFsHwslojFEpIoQxnKRqmkF6EChqV+95jlXBF85bJUsQCKABaUIG3ATd1MaKIG1Y0KaJymcIqW11RRrahQMVWoZMAsgwpgApRlKMtQzIMOoACYRahgYCmgQ7FYLELBgoIBBa2sKhVNKRsKFBUoikU9X9byZUWqKHmQJMjLkNcBJNGw5DJoAAaAkQcJygIUi8BXFBF0CTQdMgbYyjoNeQALSoZeNo2yaVQsE4oWFC0oFaFU/M9bSkUoFaFoVSzTsgwLiqVKsVyubiyC9UcxLTDNsmlYlmGVTLNiQam60QLLgqJVKlnFsmVWLLNiFaFUhlK5XISiBaYJugGaDppZMv58oFRWJbliFaECUCxBsQQVkE34sv6sO6vxAKf6F3um0Sce91wDE0gUz+Xygg6sBV6iTAKkS+AhNLoMCC1lSKZYLFI4pigyzXN5pYDTlF60sFxWLMg4TQmyJMiSNxiIIgm9aFmVsmLoetEyDIAyFKQKQxU0tQwVKJUqpqmXyoZpKTk8JckMgFEsKTST0XQRwICyBhUdwGCpNIChSEz1yAAYUFJlkTI1sbpaNCSAMgDouslxnGEYAOVKpaRqklwQyhXTsgzD0EzTNAxD0wzDsKySWQKjBJZWVBmOVTUDKqBrpUoZWCZfNCtQAahAyVAtXS4aUtEoWKYKZZBFA0qgSgAlyPMalCvFYsGyZNOULKNYMqCkgSmDKYOS56t/VbEEZgV4xWIKVvUfUIqQV03dKAEAQLlsarqmFP8lfaklONDSsRhl3JjSPey5POx7YvTaDTBBIkWKUjBaysq6M2P6Gebm7ELPiB3Jy5wJJCfm8/kUEiGIHM1zx9vb9h8+RPOcYuiMwMeTqGLo3+aDY7iSBVAGqICu6Rwn8DwrFwQAC8CqHukK6BXQrWJBlllFZgsyW6noApur+tD1fKHAYVgMyhqAUTJlXc9rmiiLlCBwoiiqqg4AAGBZhiSJqiYBFAGKAOVSybIsq1gslssAABUoE3SGoHNG+f9m572j6zrOs1/4Jk5WHCWxI1uOu+O4xHJJYktW7EiRLVuOZFu2im31RkmUSIoUq0ix995AEgQ7QJAgSLCAJECAJMBOECB6bwcHp5fde52Z/dw/DkRLTnSv+V1/V/qy8q5nYW1s7DMYYH57yjvvO04AUAZN1bis7HsEATyH8hxv6AYC8nbdfMtUiUfAIHKipcHSLVCYukGpOUptAEOxFU73dIDAs3TLMkRR1A2bAB5gAxalaUmSTNcmIBSO45imThwTAX2/kXiXWRSzV28/3x673JPdXnFt56m2vJMlpfBgKZ6iBYMpS2QIG7gWsV6cmz/mrTVnW0MGoLjMcHzLMgKAAs+NefGxx3+rGDpBkOa5UGRE0tT/mg+PIQDxoSqWwKuOTRDkmhKyLPu+r6pyJpOybZMxZlmWZZi5ju6GLE1nnk9d7503A5/83mOey3TNNk2b0uDt8lXDsFzXz/XoxIdjU8uwc9zkaJBEXRQMMICBEaiKoyoWo2AIZFXihLRuCI4nOK7KGHEcj1G4rk+oY7uSakRVI2rYCUJNAGDwLGiyh4AEjDiOY9m+F8BmEC2alEyDwmZwGRyXWpbl2GbgOx9APmYs23LySu/JqwPr99cWnmjKqz5wyDd9U3Y1A/0JQwPCBsou9r0wZ+Oj4+YUlp8ezmaHEtneweFodCQSjVJg/KSJ02a+SRBkBJ6TRN220jz3Xnxoqua5LNeKjk0kUTJNE2+b41iOYwHMcRxd13OPKbKiKqqqqI7tMM9HAFPVECCZSIaGQrqmU9czVc00TEqo67iMMt8LdM02DIsQ5nmeqqqeRxhDEMD3At9jAUPAQDwqillNUxhlhmZ7buA6AMNg/6DnEOK/zR/gEddydNtRAui2o8iymOt/ACiqANiAQgLBoxxlVo4PEAQE2UzSc+3cs2lBTIny26MjPMBwfU23fd8HGALyARxfpi/dfOhsS2lN8/JdlQUVjXlnT9V6LrK8zSnoixmCjyv9yrz8Q/O3HH71rXXLth7oikoage6BALrtSJr64isvT58102M0HItKmkqBrCj813z4HgDDMHiez/1/XYdpqk0JshklYKPtQQkM3Vdk29IAAt+Ao45ejA4UHkCgch4x375DAAJTDfisEVDk+gAwEA++C9ce/daxwGctLqNbRkB9BDZgB7BGJ7/wkRiWQQAKSkAYJI1FEnJGNr3cjMHTSSBYDm/ZajgcUlXdMDTAdX3RY2lABETdzCST8WRCsPTcMEoY9QkhLIAXIFeOYJKhBM9rjk3g+QFjLMeH59rvNxLvMovizeUFpdWNRSfql+44UVDRmFdVccp1gnhSFTSkNcgM1U3xORvKZq0vfWnGqodfnFKw73g4I2QVS1CUUCRKgd88+cRTzz1LEGiWKSiyouvv2X/4nqZpqqrmeouhwaFFC5ff8d3v3/q3t23cUFhXe87QjYAFumaNdjAGEpGEo1IQMI/t23VwX9G+ztZOS7Fc083BQRwS6g/psg4CTSJgUCQ1FomlEilN0RyLuDbzHIi8yAi7wQ0YfJdJKdlVHIMzhIxgKqalWm9NXVpTWeOYjiLrNBgFT9BdUddVx9Ed1bATlsMH8BYunH/lSv3AQB/gprNDqhnWtBHHSQJmbsAChW3a0ciw7zkAmltaf/Lgz/7yYx/7uy984ROf/8qW3ftbugcJEACe51mWQYkLsPcbiXeZRTFrZWGOj2U7TxZUNOYVlx21GUbSGm9A9hETUXzk8qJ1+xI6WgbFaQs3riksjYu24oLTnUgyQ4EXXn7p6eefowBBkMxmIol4RuDfgw+H45O5Ib+h4fqM6bOnvDG77mwDGIp2HV2zcmdrUxgUfMbl0g4YfGvUqxFYyEb8JbMLSnfVqJnRm7EBw5ZGfR6BBXjwzLebn47KVGGqAEGuKwKFoWL0zWa5mHrk1r0uB7iYN3n10f0XuFTg+8jySPDUZLAAhUJm8ADb0x3PHRyKLFmyrrjo6OBgIgBUXQvgBnAD2LbryLIrCTBUUBcIiChw2WxW0+2spGlu0NI7PGnm/NJjpwYiqRwflmVZph74Tq6n+eDYDT6KT15bsbtq05H6vH3lxz0gzltJyRvhlepLPeNmrHlu/MKL7cPHatu+c++vvn//Y8dOX+6LpDOqZbhEM81XJ4wfP2mi4/uSpsZSyWQ2Yzj2e/Hh+SZAZFk8ffrsqaqzmZQKBlVWFZFNfWPx1s0HNFk7cezC+FdnrVqx6tD+Y8Qim9dt/tG/3vfL+1/45f0vXKjudGRogrZuxbpvf+WHTz48ZqBrIBsRDxWXL5y98PVXp9728dumT52eTqRBUbSr6I5/vvc7375n8uuTLQ3hwfDB0oMzpy+ZM2tZ5YlKWZThg0gksIPlc5Z/9ZPfmjh24i/ufbKuss01QSlmz83/yjf//eWJbzT39hqASJhsmgF8wui+/Yc6Ooa2bN6rqv5IJBIAkpwJ4KpatqBw63e/e8/t/3j32lXbbN1j1JNEPjf/EFQzI5utfeG5y8oQrHcAACAASURBVNaqXm6QhGXbtm0DDMxXZPH9RuJdZlHMXLG1tLpxb2XDit1VGw5dzis/XSvYNJQWJRspwTEdpDNed086y5F40pA01jOQyMi2TnC9Z8Ckge17r70+YcIbkyjQ1tVpeW7OEfJefBimDDBFUebMXrhjW2lAIGQZCCQOp6taj5VfiYXN5Uu2zpqxvPFaD3wMtIvbNx7tbEzFBqynHpn05sTVcNDbwtVVdsQH7Z2bKi7W9MDD5FeXvvTUzLOnrkfC2aeffLVwSykoMgkqZCBmsGD2ttOVnY6BWdPXvfXmmv6eVEChyh58wEDflf6DW49cPN4kRbxH73+xZHu1b+P8+YFjxxuGE/a2vSdrrrSrDJwLi4EGyHIsP/+waeBgWUN1dRel8AkooBpU0QllSKeRiOG1lwuvXhy0NJn4rud5ASDpdiwrry3Y1dI7bFDoHhwKFsB1XU2VPUv/AI4vc9fuzI0vq4trCk805R2qOSu5QVTQVA+RlDYS487WthZuK99TdGLbjkMLlmzYsm1ffUtPXFBEhwiGlRtfHnv8txSIpZKiqsTTqfeefziAr+uqaZrbt+3ZtHE39RgobN0GQfmBC9Unm5mH1St2bMkvcW3Ax8KZW/JXllID8DB7yvqS7dXMYktmF37qo9/6+hfvufUjX1u3dG/gBpNfXbp0zjYQ+C6mT124e8dhUKTj5Lmnpn7pc3d+7Jbby0uvgGDh3IIt+QdcC2DQVRJ4QXIguXnhluL1+2EALp5/dFLZnlpVtN56a/PXvv7Dr3zz3o9+6vZVBXstQAcSguQRerV+8NixRtdBd5deUnJ+ZCSWzgguIT4DBTo6u++++zd3/+CJT33igYt1vQiIJPK+7xNKHYqSQxXnG9pkJ+ANW3WYy8ACMMYo8Zhnux+8+enMFVvLTjeVVDUu31W56Uh93t6q44LnJSTZ8mg2LYgpqfVS8+E9B7OhVPmeg2OfefnEkZOSqAmK7gGDkQgF5i5cMHb8OMtzZV2zfS8j8A7x32t+GovFcnPP2bOWL1tcaCgg9uh84tUxi9eu3AeCNSu3r1+7HQGIg+35B4sKjzkKLAlzpq0+cegifMyYuHThrA1wQU0MdXFqFoUbDpSXnBkeSIeHYxvWb91bdOT0qcadhcfam9PREJny+tqt+ScCH29OXbVr+5Gcd840XGIE8LFg6pLNK7fDAxw88+vXa040g2Dq5JXLV+xKpL3OnlQ8a3Kqn1EdDyABXhu/6Lt3PPqJT9z1hS/8+K//5tsHD9UTBssDAa40dC9dvvv8hZFYFP965+stjYncqoQxRiiuNLbMWrAsxmuiRd3RRRh0w1FVlVEfAaHEe7+ReJdZFNOWbDpc13bgdMuiwmNrSs/nlZ6uUhhLSLKkmYlY2jeIxRnJ/pgY4RbNWPDsY083XG50bDI0EusZGjp9/vz6/PxHfvPr+356f8mB0nOXLmZFIZnNcJL4/7C+FQURARrqu194durhshrmwpCM+gv161cdamlMgGDJwvx1a7bllgBb15fmryrmYpqrYsJLs9+ctExIC/XneirKzo/0j8hpLbcuXTBz/baNZaBAgEkTZ1QcPavJWLl0Z9XxZoXHM4/PzF97xDHcca/M3ZK/37Vd0zBtyw9swMfujXt35ZckR5Lh3vCYp6bu210j8/KWTeXbth/LCoHl5uiFZDNB09o6uxYs2tbaJoZCTJZRdrCh7tygICmS5hCgZyC5ZNmuSBTExz9986Wjh65GI8O6priu65Ng0fLVh0+edgHNx2A0ahFCAMN0FUVBQD+w/o9jFzrLzrTO21y+sqQ273DdSReE13iZz8T6eiBJ4CUnHC1bvX7OmFfOlB4w02n4LgKim4rtWg8+9Iu/+Ktb8j6U9/Jrr546c1oxdFFV3tP/4TFG4VgABQiuXoj88oHX//JPv/Xvd73wxrgNnS0iCEwNb81cXLRnv2EYqmSCYvb0hd/91vd/9pOH77/355vWbgNFcoQf//Lkr37xm//yjbtKiw7LWXPum4vXrdhMvMCytWefff7E8WowTJ64+Hvf+fm4lxd/51s/P3aoAQQrl+04duSsobu6brqeyUgAhpbrXZMnzvrpfY888Zux//GTx3dtPwYKS8f0KUu/9uU7P/13X924cUcsxuWcxWevXN5Tejgr+6YPTsb19vDegycvNjZ7YKFkJJyOPffKhL/4m889+tspP39o2tkzzQiIbRm+71edOvOx2z79tW/f8fe3/0veX3y0sLispXswt8NDKQUYiCtLwvuNxLsst345cq5936nr8zaXryk9n1d8oswkjmiIjqHKiRgMQw2NdJ+pe+3nvzqwbiMcNzM42HD5oqEr6WyCF7mC7ds+8am/y/tQ3tKVK0RVoYCkqaKqvBcftuV2tA34jg+CwEPgAi5625z4MODDNV1Q5DYdbdv2bKZKanw4GxlMGZIXH84qnJVbuOqim43LfFKNDqVBEbgIXCiS7nqmKMq2RVRZ7e3KDA9opgJNxHC/BYLmxnAmZQQMAHxi+y5RJAUMquS2NPaLnJ9JOvGIGZAAFJFhJRqWoyNiECAIEACKrqueK5l+rkfJSoEHhOKiB6i2GeNTHpgH9IY4y0N7p5NJu65j1l+9DEBWjFA0GYpnBZPYwMXrHXFOIYDn+5qm2bYJ4n4A17ezV2/fe/JqQVntgoIjW49fz9tzvER2pQwfoZYEOQNLC9ee2fXWzB3Tp/GNDZD43ovn2i7V+oZEqSlK2Wgy8djjv/3xf/z0zLk6j9GsKIQiI4Ph4ffcv6UAxZoVxX/zkdtv+bNvfvULD375cw9+7rYf3vntxz91651/8eHPb8kvSSV527ZVTQCYazhgILYfeL/zbvEpDgzUIbnIAfiBlBWpQzzXDuAAjOdFVfZyvVRs2DcV+BZA4NkAg2naAPN83fHsrCh5DBSwLBACMPgOXAuGCksD85AjUsrKzKUZPhaV+yWfU4hmg8iu44JlDM6FmdAGXEg2hN5YtwvmArGsGwRAQHL+Mcv2CRBO8iMZObeFm5t/GKYrSZKmyoHvfADXL2+t2rah+OTSreWLt1XsP9+fV3GpUiNqONqrZKN2akRORivzNzx1151vPvyr7TPffPrBn8566YULJ48kw/2AK4gZ3ba2bCssOVCaFQXTdZLZTM6L+l58aLJmamZ02JI5eAbCfRjuhZzBYBcxJGQSFBSG7ub2XzVN0SUNDEKa10QVDKZuqrIKBurTbCIDBlMxQEBsHwy6pkhyOggoAEOjqqQGfgAfngn4EDICKMAwOBgCmGXLhPkUiCRSHqVBAEFQiEdAYai+IpJRD5vsByRQeBUMJLBsSC5MjRk6cVxAdSzeFp3AcCDqXkbz0zZMF0xzXZtBkuTh0ADAEomEZft+EHiAyWAFUGybV1XVNN/eoGSOoaqq/H4j8S7L+deXbDkwa/WeJduPH2uM5R0+esQjflYUbN/jVZlX5cF4JMZnhlPxaDoZy6RiqWQ0mUimUxkum5VFF2ju6RyMR0zfjWfTgiK7lIQjI6qudXd3h0Ih3/cZY67tEM/3XY+QmxLLhdT8oSI39/75BG5OFD4lPnUItQnTc6LEpsQJfJIbBwMX1CeEqaMPUJNQk1CbUIeMrjv+q9r+n2wOwcJVO+at3LVmR8XOo/UHzw3knag86XjucDSSEfhYJsWr8kgmmVbElCykBC4lcLm1iWlbpm2ptjmcSAyn4oprSYbWNzyUEXg/YBku+z98/PfgY8e+qjVby1dtO7rzaP3Ry+G8U2dOEwSxVJKXpYwk6K6dkQRelTlFSglcPJtOcVlOEjlJTGYz4UQsrUmSbRjUU20zyWeT2QwvS7KqvDcfN2XsJkVulr/R4D1KfOr5zCbUJEzNiVKTEpsSj/qE+qAeqE9Ggbih0XL+U23/l3j9oJlDMGP+hpcmLX70xTdffnP9lOV788qPHaWAoMiGYwuaYnhOks8m+aygKYKmiLoq65qkqYIic5KYFnmdeTE+0x8Ni7pKgIzAD0cjlmP/Dx//PfiY/NbqyXM2vDh52aSF256dui5vZ9Eey3OzoiApcjyZUDQ1y3OSIkdi0VQmLUgiLwqJTDrnROdVOZxNhtOJgdhIgstojpXrV2zX+SPxQW6uvXMDxB+u0aa98UGTMP0GH28PIv+vIwh7Bwc3quG841P/p5pDsGTt7v0VV0pOXCuv65m8rDiv5ECpH7CMwGe4bCQWtRzbsEzX90zbshzbtC1ZVZLZTDSZiKdTKYGLChkXgQeIujocj2ZFQTH0LM/9Dx//Pfh4a/HmirNtVVcGaltTY+dszTt8oiIXACaKosDxgU+4VHqgp5c4ribJmVQ6m83m9lks4qmebYF2Dw+GkjHdtdMin+KykqYmUsn34IP87x0vbpIPSpzA/50osSmx3554moTaPrN96rhsVD4B8d6h358X3yDDHqWNOu9j6/5/N4dg7rKtlee7jl/oOdeeGTtna97+8oOO78fTKVmWNUV1DPPKhYvbthQU7dyVv2796pWrioqKrjY2xNMpTpFifEb1nSmzZ06fNzvBZQiQ5rmsKGiG/j98/PfgY9HqnRVn24orrlZdG3lldkHesZoqy3NjibipG7qsiIn0xVNnDhfv1zNCXWX1bx99LH/DRt00Ulw2LmR5Q3UQPDv2pRfGjbWpLxlaVhQERRYk8b34kEQtF18+msfjBbmtVNvyDd1BAFUxEUCRjdw2ryjKAARBAkBp4PvUtl3TtAEwBsOwAGiakXtG0zSAiSKvaQqlvu+7OYerqsqEeJ7nAMyyDIAxRhRFAqNqNg3K4PumrI6GQ0uy7/s+JQHASSIFOEVwA98MbAroChwTjgWRd8DgexB4NReonHOTy7IIEFUTAR9gvu/n4ik5jgPgeR4ASZIYY4wxSikhxPf9XFaO67rvNxLvModg/optB07Ul1Zdr6wPT1qyJ6/40AHb9zJc1tB0U9VA4cm6LSjdjS0zJ0159smnGuqvBYCsa5yu6MS9WT5ybeA61DRcWdJFQWV0NJxdUy1FVrIZMUeM7/mU5HKHwHGC53mpVCb3LSGst7f3RtS7LKuu63KcgNHI8VFZlsHz2VxAfBBQ17UZI7kQec9zHMdCwMCI77hgDAymYUZGItl0BoAgiSwIcnxojkHAzMDmJYn5AIWpUzAMDQwhgKpYCMDzvOd5ALPt0ZhpxtxUKqHrOoDc11xsNgDXdXNwvJOPHCLvNxLvshwfpcev7q9sPHl1eNKSPXmlx48QQFaVVCw+1NmjpThpOM4NjBzZuXfSmLGHS0pd0zIsMyMJUSETziZvkg+W+4dKop6LVg8YDN01dFeWRjuM3P10ShB41bGD0GDSMgLbBBhk0ck1va6S0RQV2QODwJlgcG0MDSRkyUKAyEh6aDCGAIwiHuNyMfGeC0ZzkR+juQvUYkx3fcWhmifGJZ13cj71ZFwRRTcXn+wBaVUzA2Q0lRMNMMSjkqmzXHA8I0CAZEK4wT0l8FxGCQhhN8jQNC3Hx9WrVwFYlnUDDkKI7/s3EHl/gfg9y/Gxv+LK3uP1FZcGJy7enbfzQEmODz6d4WNJ+IEeyww0tE58Zsy2tRt9zeRS6aaWZtN3NepKrnmzfHBZ7gYKPd09C+Yv/Mbt//yJj3961sx5ly9ddh3XMm3f83+X7MRyKZlUU7RNG3ce2H+Az/KGRiVBGh4aybWTodHcNqwk2AigqVrus6Zhuo6PAOHhMPEDRiFLKgKkkqJt+Qjgah58UG00FlRK6QvnLTyw7wAYggCyqmUEIcFxWd3IZaxQoPl68z3/9sA3vn7HrR+79Wtf+cZTTzyjazoCuI5LCTV0x7F903ARwPOIruuMsVyCj6ZppmmuWbOmu7ub47h3NoP/Dnu/UPgvLcdHydFLu49cOnyud8LCnXm7Du4nAC8KmiA5ggLDa6k5v2ne0lXT54SaOkBwtqq6+nSNZGgDyWhC5v8X+o+czp+rX7Z0bf7GbWdOX0SAkr2HSvYeunql2XVu5MBBlaksQBFHd32XLCxYNH+zyAU3wtPDQ0oq7oBCyLJ0ws2Fp4PC1JBJWjceA4UsUFCoUvDOmybnEcEdzVWyAQ9vvr5szbIi6iKgGA7rlg83d/6zj9bQCCfrCCDwSiyaSia4CeMnHyyryKRlywjAYBlBjtdcoo1rjyZQJZNJAJTSpqamgoKCgoICSZI+sEy803J8FJWf31ZWV3amc/yCHXlllRUEyHBZlRfVZDY9FC3dWDju108/9+DD816fOmXilMnjXz9VU53gMn3xERe4WT4s09JUzff86lPnDpefzKRlUTAQIBbNLl60av26gshIes/uPW9MemPRwhWHD9WAYsnCzd/5p+88/cTT99376/KyOlAkY8lJEyZ96Qtfeurx16NhfSQ0UrjlUPHuk3d//+4P5f3ViqUrElFZ4klNVc39993/6U9++vlnnrd0WLo1eeL8yRMnT31j6pnqM5qswQc8uJo7440Zn/nbz4x7adzzv5l0prLVt1lAMXXayrt/9NMf/+xndVevOhjNohL40aGkualjx/aibEZBgIAiOhK1jOBc7bVPffJTn//s55cuXiuLVjQSBWCaZm5aWlJS0tPTs3z5clEUc6PJO/l454jzAbEcH7sP1hXsP7O/uu21edvydh3cr7t2hsv6ph3oNiwidQ+HLjXBhjQUvXTqTCIcCQBRVxOKkNakm+PDCcBgm8ik1NUrN5cUH869bbkJxPbCkqqT58Cwbs3WGdPm119pA8XZ6s6yfeev10dD/frjj01au3KfqaKlMXH+bK8uY8fWE0cPXQXB2DHzHv3luP5u0TFw7789unnDARCk414sbAY+NqwpOX7kisxj0bwtx49c6WxNehZkHp4EmLh8/FpFcc1IB58Zcu/5zq+3rKtwdVysC+8tvtA7qB+tamjuSSQkb0QwCAAw27aj0eiqVWva27pzi5fhoRQYYhEJFK4FXcGMqSvqzrSBwbIsALZtZzKZ0tJS0zRPnDhx4cIF13VvIELehoOxD5Y/PsfHrrLaTXur91Y2vzq3MG9fxWE3oJzAG5KSHY4KsYwf5WCyUFfobNnRw0X7DElRVLU3NOgAQ6nYzfLBZbhc/uP8uSvemrnYd30w5DL69xaVn6o8r6v6zBkLd+0ozYUhLpq3be/u07oMEEyZuHLv7tN82lq7ct+XPv/9T3zsSx//6DfWry4Vs+LsN/MP7r/ApyHz9rJF23J8KALGPDfjo7d87JO33r6/uEYVMfn1JfuLa0L98mjGlAdHdJZNW7V306FcUuyTv5x8uTZsKXT65PzPffbfPvvF7+fl3bpo9fZc/5EVRUp913VPnTp17VpjJi0gQCadyaXwgMGzva99+du33foPn/m7b10815VNZ0VRzM1My8rKLl26lEqlUqnUsmXLcqvZd/KRW/G+30i8y3J87DxwdmNRVfHJplfnFubVVp/TBMeUmKNAEzDS73IJ8Bl0dgqz52wYN3FWde150ZZkj0ubYcnoB2LjJz009a0nKLKD6Za4ElKYGMqEeEvq6OkOhcKBE8AFtAA6YEBOW/ChZtyt64o3r94txB34MDjAw/TxS4oKjslJ7Nh4uGDNAU8BPCydXbB64U44gIM5U9aW7qwW42zxrM2F6w5mwm6sX889Nn/6hqKC47qMIMDrr886drQ2k3bnzt547PA118LM6fmlJRcCgpkz1uRvLAkYggDptBwEUBU2YfysrQX7chnbP3vw8XN1TaaBV16eeqC0Mh5TTAO6BsdGwOAzOMCZy52LVm8/39DnAAZF97DgAKKFSNZ5/rWZfRHZAX7w40dPnW/1KFSFBQyS6D/z9Lgv/8O//O3HvvD1f/zen3341u6uqOsgYKOFMwrPze0Ueh8cWRRzVm5bs+PonuNX1+07+8qCbXknj1ZpgmMrsCRmqzAlwENAsGZN6ZNPTfr1Ey+VlJWLtqT4fGvo6qWGw/n50+76t0/f/4tvbCqYX3e9ojfeJlNhIDnwXnzABXzAwcWaphXz8zevLgr1heDhYMnB7RsOSgkamNi0ct/O/CMG5/FJ/tj+Czvzj/BxPhPJTB+/bNPKfdkRr+5ka8GaA6Nx5R7krDxnytpTh68RB75PZsxYtGN7WXPT8LatR4b6dVmwfnjPU5s2HElEk9OmrNiUv09VtCAAz+uUMtfBiePni4uOtrW2RyOxx3/7clXlJdPAls17T1VdjseUHDeGTgRe5CUllEhMmL5kV2mVA1iMOYADZBRFsiHZmLN089krXSPp9CNPjau52J7hpYBB4MXrjX3r1+28fKld4F1NDY5XnDty+Ew0kvE94rkIGCgJTMO3HfK+M/F7fMxdtX15wcGtB+tWF9eMW7Ir71jdYS0wZd8eSnH9Mak/Yo6kcK1FLDveWbDn3PhpG6fPL7zaGdeApE4SKW3MU6/81Z9/7KN/ddsjDz/R0T00kuAUjyRFRTCsjp7+oVCYeD4IYaYFx2Y2EznTd0ZTZC/WNT36y2c/eeuXPv7Rv39rxvLqE/UgkDksW7h1R8FhzwQIXAMzp668757HfnT3o3ff9dCmdfscHa6BN6es+Ohf/v2f5H38+OFLvoUJY+euWLzNUALPDRYvXHOq8qJtYN7sdf/45X/76X1P3/+jp46VX0nF3F3bj9RU1WsKBQPxR8e1REyeMO7Nf/j7bz/79Gt33XlfWelJMGgKHf/ajA/l3fL1r91xqKwqN0+iAToGUrd/596Pf/brX/7m9/M+9NcPPvJcQnBFEy4Q550nXph4x90P/uLXL9517y8qaxsdD2BQZTLQl6g728BnrVw5QwOpA/tPhAbTvgviIaDwXRha4HsfrHgii2L+mp2LNu7bsPfUyj2nXl9elFd0dBfvSKJrjnCSYMEBNBeXGjJ3/fDFWYuKx0xY+eOHxhaUVEqEGICkkNLdB//2lts+lPfn8+Yu9Rkk3U3KqmDY78UHGFyLSYIkCzJxAApbRzKqWRoM+XcnNbgGfAuapIEg1CemYw4IPBOODhCYClF4gMDSIXOgzuinYmHRdVhLU68kuKBIxszwoAoC5iGbZCAIDQjZlO27oD5FAMtwM6kMGCwD3Z0jYIiEeT5rqbIaUBhaoCrE1KEpNJVIJWIJThDTMhmKK9GsJduwHUgW7AAuwKmqC/A6YpytuohmLdGE7QaGZlgGbBNcxhQ4WxIk13ZdG10dYUMLqA9Td13bcyxqm0DwgeNj4brdOT5WF9dMXFGct7VqfZyNxGmiX4llA6IC3Ulz/e6qtTtqVIKWPu/FCevnrijri0H2wKchDeNXP5zwwzueGeowfAuagmjCTPO2pLsdPf0DwyGPuCxwXVclRPM8RxBVFiAAHJe5XpBLHRBFO3cxMJBcuGDdZz/z9by8W27/+l3r1+0czS0IEASwLNg2CIHvQxAcWfY9D0EAQXBCoUwQjPobci5aywgYGXWvKRIZ7QB8UB++B9NwAciS7nvIuVlzXjvHpgjguYFl+qbhKbKZc5/npOs+J5s5hhXTz130DkUNd/QAPZtAtYhmUwJ4uWoz2BbRVPudxxvlfkXuKKXc8SeMjp57dvMhUf8bleNjwfq964oqVxVVj1uyK2/fpZ0cUskg1cUP94lcWzhcXtv8yvQ1L0xac7z2Qv7O89/+16d/cP8ru8rqB5O8IsBJ4/Cuhop9zXAxMphQJCapSHHWe/ERAJ5PbMdxXKbpTjbLybJCKXheyEFgW7AtWBY0NSA+NE3XNJ3nhUwm6/ujoEiSHgRgDJJkBAFk2acUhmGKgqjrejaTNXQ3B0QilpAECQzEI7klhu8ySkb58FwWMKSSKc8lCGDohml4CCDwqiiMOmF9D7qmE5/4ni8IhhfAY0zW9axkqKZpeZ7lwwugWpaoqrpDCGB6IEBGlGzbye0Y5PiwLduxnXQqLQpijkvb8i3Tf9vb61mm/b4z8Xt8LFi7a8bSwnkb9s3fcnjswu15xae2cDQqIZM2E6KnyJ7Fm3ZDW09734huwyOIxYTBwZggapbtmxJT4oESpzoXOCrSCVlXXNvyRUmRDaWjt3Mg3O9Q24dnepZDXZs4PryslOEVjoJRMAq4lFAgHIvnvJqa6cmabXuB48MhgeX5Nxye0WRqJJ7QLJsCWVFyCDVdjwKJTJYCmmUDkKVR/xWfFQzNzF3HInFGApGXEMAybASwjBtHhRDTUBD4ANE1yfcsgGC0OyCUOIrMC3zayp0iAhYAmqG/uy8ADVjuwnLst48Dget7nufIEkeJ49g6QDRVZNTNnYpkGgoljm1puR8BxNBlz7WpTz44cgjmrd4xZsrSF6YuH7+w8OX5hXlldTsVpA1IKSMeEeNRIaMRxqm2B4zEhVgiQwgsi6XSQpaTDJEaacCAlmVNV7rAIAtmOsVnOeG9+CDwKQgF0S1DkEVZ02zf8xmjgM+Youua6XkUPkOOD48FyUwmw/MuITdA0S2LABSwPN9nTFQ1CqQ4PneQhqEbiqzkkrBVRb2xHaNIKgJIghywQOQFyzIsy/A8i1EXIIQ4lDgAkWU+12C6LuualLt2bF1VRcexKGMB4Liupuue78uKkuU4nxLX8wJAVpUASGXSo7hYBiVOwDwum8zxBxDLVF3XdB0DIK5jmIZCqWvbumkoAHvfmfg9Puas3PbYmBkPPDXpyTeWvzy/MO/YkWIEliLEDSUtZEY8ndf4qKUkDClsSkOW0m9rPY7e5RgdrtluGUOCHDathGnHBKlflPsMK6xog/FkGyf0DQw2D4Y6VF2igMfgUFAwj8keU34nqnlU86jhUcOjlkctj9gesT3iesT1qPX2A3+QCDGYbzHfYr7BfIP52n+l3I/efowoNyFfI8T4w8V87WbLf7t6/38LcHMnydqGGBAzGRsC3BQvL83fe/b6cElVY1VT7Mlpa/MqT5QisCQumuPD1TiVizhaypRHLDlkKf2W2m2pHZbWZmktutofS3ZnuX5eakOV3wAAIABJREFU7BekfkUbdLyYT5Oun5TVUCTaFY70qLrkM2Y4nmq5LvH+h48PJh+EmLYhAq6lC4BrqBzgEmDstCVFxy7trWyovB59cc6WvJMl+9wsF25tTfR0DjTXD7c3dFw7O9B5qav1TFdrTUd7ZUf7ifaOY+2dR9o7y693VXZEr7WGLrUM1rYNVDd3H7vWVHa9+UB7+9GB3uqma0evXTne3Vnf39fZ3tbS1NTS3l7f2VH7tuo6O+o6O853dpzvbL/Y2X6xs/1yZ/vlzvYrne1XOtvqO9vqO9svv/3YH6SutstdbfVdbVe62i53tV/saj/f1V7X1VE7qva6rvbzXe0Xu9oud7Vd6Wqr72q73NVedzM639V+8WZ0/ubLf9/U1FDd23Wpsb6qt+tSe0ttItoeSSTX7Sjfd7K++OS1snM9k1fvy2s6WwufGIkELD3QBJiiLUbBJEAEeCANJIEYEAHCFGmJJTgnLJOwjzhFxCEDhA0AMSCBIBWQLGACPgLqeYQxI2DZt8UFjAuYEDAhoBICBYGGQEOgI9DBTDATgQYINyGmgZlgOpiGQEEgIRAAflSBgEBCoIBpYLlfoSEQbka5ev7hkm6+/JsUFf44CiTiZgDFNuLM5zw7pUrDFJgyf/1zExf+6sUZY2ZtGLtwe96BPZtTw9197fWOwRNiUObojuYBvG1zjp92grSLtI8UQYoiRSEBKqADDkByx+WzLFgKZAT2YGANwIuCJJmd8MwYsSLwo6Py4vDi8JLwknDTIBwID8KDiO8QB5a4CVEeVAWVQUUwDkEKQQKIjipIIEiBcaAiqAyqgvEIUjchlgHlbkIsc3Pl5yp8UyLRP45YHCQKpKkbZt6Ib4e62ioFlZ++KP+FNxY/8tLMV+Zsem3xzrzayoOmEE9HegEbcAN4GTFtU5rbwNQBDVABGZAACYgZRkxVwzwf4zjN0gATEF17BDQCGgGLIkgBWTAejAfLIEiOiqXB0mBZsCwoj0B8+5145/snAumbkQQYgAYogAhkgTSQeFtpIAuIgAJogAFIQPZmxOcOwf2Dxd9k+dmb/Htz3fkfQywOJN9Z8vX6csPVNxVVHKxpKq1pPnJ5cPr6sryyo/lD8abr3bUq4dNm5nJX+87jlftrr68vv7iq7Pri0va5xT3Td/a9sbV//Kb+iev6Xph5Zfy8SxPmVM9acry8opXnPDBGtAyMEOxBeH3wuuF1wG2H1w67m2q9VO17hwaoOkDVIegR6LF3KA49DiMMc+APV2BEiJEmZpKYMWKFiT1I7AHi9IzKHiD2ILHCxIwRM0mMNDFjxB78w0WtEDXDNyErdFPlv6u2f5hcs/OPIktrc4wO5vW5ZqdndQEjp6vyLVd5dfrS4orLJVWNo/PTIye3RjLtXcNXPRgW7Nbw0N7qMwcvtB5uCJdeSe26wG2q5lcc4xYcyMwqTs3ekVhYmFi+PTxzxeVp8w+XljfKEgNjjpSAPQIygiAE0gu/E34n/A44PXBCsIffoRHYI7Cj8NLwsu8QB4+DnwSJ3IT8NHwJRADJgibBomARBKFRsQhYFDQJkgUR4EsgWbDoTYjGQZI3IRq/ufLfWds/TIHf/0cU6KBndXlWFxA5XZUfwF20fk/NtcGiE/XHr4V/O3lVXsepPrF/eKitGpAEKXK+Pr69VCk+hu2HsXQjNm8ny2a275x9ffNz1UdeqZ/12L5nn94xbdKBWVNLnnzkzWP76+AiOdhLlAgz+5nVQZxG3633/Euef9Eh54l33pFPmdIZ+E3EbgNijMTjyXZAE6UIYGhCGIEEmoWflKPXgIgqXQWGLa0FdBhIUGeIWCFT7okOXQSSQMKQ24CwxF0BhgJ3wJV7QUMIejKxE0CrIZ2B1wAMACEhfgU0Aqfb068B7QguWdpVIC5zzaAjQMLWuhW+BUGU2APUGYQ/bGvdvtUPJBIjFw25w7GHPJIQ+c7AjwAJ0JCavgIM6umLsNsCq41ZbfD7gIhldYdj54Ek1GHoIzBG7EwXVQeAdHTwQuCOAElN7fL8ISChGB2S1uYh5LgtxL9K/SagV5OafHOImDFAgZvVhRAgKlw72BCCbkaagTYuexJoz6YrgU6gXeBOe841z7kW0BbqN1GvhXot1Gu7IeJ1OG6HZ3f7Vj8zBqAPQOuG3ga9Eep5uI2wGpjUDD0EV710ospzsH7PscKDdXsrr++oaJpfeCrv0oGGVEdvjg/NSHX0mxea0Z9CP4d9FTheDXEEEIEusGq0HfKOHubbrqOrha5YsP9IyVn48BUBVPS1Hl9vdc16x7psO+dt55zp1rp2LdBEzItABzB04cLeaVOe+Kd/+WxeXt6MN1/r7b0euLwih7s76hBk4Y6k09eAIZ5vYF5PInpx5synt+ZPB9IgMSBtWUMjI5fFTAMQNpTrhtFmqx1AWuKv21YzvOtAq5g+mYlVhEJVntfra11gUSAcD1UIQi3QODxwWNd7TaVTFlo5rpXYA/CHTaNXyjaBhEFHXKNXyjb199fmZjDxWL1uDoMlh/pqOa6VS9cDYc/rBoaI3iSnzgOD1OnWtE5FaQViljUEmp304kONdWWwolNeeej48cJc/TmuTVU6E8mrlEYpwgwjabHRJ+2yVAP0GMZ1BCEgHTjJhx665/SJvYAyPHwdSGfTVwT+gmVcyWZrgHZRrANr8v0WTbtEvEag3bXrqd/kOQ2efd2zr3t28w25dqtptdpGh6P3+GovVXqp3EGVZqrUU6mWmFeJdsXNXvOlPt8Q6o5UmLo/fvbqV2etHTcnf/yCHS/N3ZF3/viC1Mj64dAkYBfvrmqN7WhON/BAAqgZ6i65XJ7U24BusJ7speKSDatK9p3u6hgReSV/9eK1Syeq6cu+XOfxJ6DnVAGtElp1oJ1leh2000Q4Ko2UBlpdpKt0/oxfblwxlpgDQHbT6hmbV06tP7MXLOGkG2H1wu6G0m5nmmAOgSWhDpdvX7F2zoTBhjOBOCKFWkEEEE4MNRChy0w2IYj52Q4n3u6nW8GG1ZHqRNd+KFcRDMAZhNAHwkeu10KPgCaU4VonXYsgDC8OloY2RMVeJvXBT8COwIkaiRZYI3q8GV4c1ghYOtJ+Gm7K4AfgJBBkmdQHlpCHLqih88bIFdgh0IQZb2qtOwjGw8u4yog61JKqP73ytafPFW+CnSWxLrhZrq/eTHSDib4SRiACYsPlY7n5rCY0I+iK91TA7IbWn+69BCK9+Kv7uy/VwFPCzeeYOOBkWqF1AENmptbKVnFDRcA1j69QoqXwz8E5S6TjvlgBo/o/qQpmFTMrA70a2lkodZDPQT4L+RSUCkhlME9Aq/CyVVS6BmPw3NE9pmnPWrnttbfWPT9lxatzC6etLc+7XLUkNbJ+oH+86xYktMUNoS310UtpQqKUHu24XlhTpAZDlHbYZnPrgWWbFrw19tW527bu7+ro3bJu2abV0zylGeQ6laoC7XigHQ+0Y4F6MlBPMfUM1WoDtQbqSTlyAH5907mNOzdNCHWdULItPT3n4MRnv/Hk8tljuEzrwcK3Xh9z3+wpv9y3eRrIyPol4774+Q/f/70vTRvz8N6NC+1kH4i0Z+38P/+TvIcevEsOX5fCV7evemNT/vRH7v3anV/8qxcfumN46Az8LsLXQW/gspdfevqe47tW3P+jf/7Bl29bOee13q4zYMNMvLR505SPfiTvmad+PNRyigg9C9544tGHvrds7ivVxwrjXbX//NW/+cHtt56p3JUYvJxKtGxcOO6rX7jlk3+dV1a0hst2eVzX2Jd/VrNv5auP3vmZP8ubO+2JpoZjoMnOi0du+Ujeh/PytqyZ7Sf74PCPfucrl/ZvhctP/u1/VFcUiYOND9z1tU/c+n995qN5Y195rLn5dFXFzttu+5MPfzhv5pRHdK0+PVDJ9M4pLz34jU//2SMP3fvLu7/jpEKZWD98cd7rT3zvq7f8/a15hw4tBXoGmguh1wRBvcdXwDqL4BI1axBcgn6KaVX/SSeZfpLoJ6haxZTTTDrLxFomnmZiJZOOQj4I6+Tv+LBCFyqKHcebv37PuNnrn31j2SuzC6avO5x35fDpeEdd17VNzL3ECyc6Bi41DibiPoY8lDcmy+rbTSCAEevrKFm5atWcWU89/dibM148WbF+w6rHiwsfhbUXTkEgLIUwH9xSZFcgtQnJnYiXIH4IiX2glRAPQa1cMelfCxc9jKCbZC5DbYXavnf1axfKloC7vGXmQ7vm/UrtKILeErpYWrRkwsjlI2SkZcYTD8x/8TF3qL21Yv+pwrWQo3VFG3bMmwCpf8f8sZN/8wOj95zcdmbiL79zYOXLQewMjKtQGmB27F864Td3fGWw5ljiYt34B+49U7gGZuzszgVVW+c6w5eO5L/ZXrUdYufGGU8d2zzLDl30I1cLZj9ft3e5HboIawh+5MrBdaWr35C6z0Lqnfn8f4SvlCPdVjDjmfEP/FN3RQHSbb/+50+3lhfGLp5AOoRUWOxoWTB2TPuhPWg9u+6Zn3ftyzfqTy158sHmA1sR60CyB+n+6c/86lTJFivRD6rZ/IinJN585cFkSzGc9vP7FxXOfZ7Frqs9F3769U9tmzMB2YHKwsVbZ48h0SuR+pJXfvHloctbwerhHLd715OhzTAPByOb7b5VkPcgvhGpTUhtQnoj0uuRXov0WmTWILsCmcVIrUByNeLrEd+I+FokViG5DNllUPMhbnDjWylfDvPy5eOrfUeetXLbuNnrx0xfPX7Bjmlry/Maj59Ldp1vv7LB1s5GogcuXT9ZebWtKZ7Zeqp2x+mezSdqi8rLjxzdO9R+vfFYxeLpUxYueit/49yj5atmT78vf+WPU6EVoe4p6e7XjchUIzzLGJ5jDC43BjYYfVuNvt1Gf2Ht6TeEgQJoVUsn3Ll6+o/jser22q3cUA3M7qNbp9cfXSUPnJj7/J0Fbz6Qadgaaju48JWfbZz+TLqpSu68sPiV3xzLX4Lk4OYZ4//j65+/7cN5X/tI3q4FE/Vo07wXH5z2xD3hC2XQhmc+cfeehc8oXeVC5Dg3eCIdqlny0s9qd6xRWq9CEeY8+fC6Cc9r6e4tM5789y/+2Y+++pff/Fje1jkv6JGr4391x7qpj2daTtDYtcMbZyx+9ReV2+aFu083XC5749ffr9o+X+w603vl8KTf/vvxrfMg9tz3pb+4Xrbe6T4zcKFsykN3Xdi1CpmBntrjD3/v2z/79u2f+9O8E2sWutcql//mJ6EjOzDStviJB4pmj++pLnWGW6p3rz9asNKIdqW6G6orD/7wjn/80t/d8jd5eUcLxsUGT4x/+FsXS1fybdVc6+mXfvq9xLXqZOu5SY/e03O6OHK1LEheeulnX7pcPr+7c7ucLopdfAsjhUK0UGheaPasSHYvISNr9YFl+sAyfXCJPrhIH1ygDy7Qh+brodlG6E1jcI4xMN/oW2z0LTX6Fhr984yBt4zht/TEUj2yWOpfo0eLHfHsucPLbIOftXLbxPmbJszbPH3V/rkFlXnXTlale890N6w2xcO9XetOVW+tqDnbMmy9MOvAy/OLnpy19oFnXi3cuw8UcFBVduZQSflAe2Os//zK2T/fvfYnVnSJ0DPGD7/ihZ6kA88G/S+gZwK6ZqBjPtpX0I4ViG/BcEH6yoJ9i35SvOhn6catLHbS6CtPXNs199l/KVrwsNO9t2j2j4+v+qXdthEjh5e/eFd90SykLqrXDy577t6CSY8Mndy2Y+oTRTOfjZzeSXpOWW1HzbZDe2Y9cmnXVMRO64171o+98+rusXrzRrlxlde1HaGDS5787tbxj6D7otd8fvGvf9K0e6XfVrn6+XsOLnqKu1oYPr1GbNiBbO3GCf9+btsE7mqh33tQby3uPLLgue/fcrbgNahXdsx4oGj2Q3rnfmiXx//8cw1lszB0dMGTtzfsmYp4DXqOrnr2X89ueKP/6JapD97ZfWxX5sqpn3/9c8NHNyNz7tVv/mnDulcwcHLm/V9s2D4D4vXkuV1LX/rJhb3LoPQ0VBQ888A/XTha4GTaZj3/vY6j0/iGDeN++tHwmRV8/TazvfT1n36heuM4xGvH3/+ZE2ufT1/eiOEDr9z3kfM7X5SvLUrVjPNb5kMrTta8TNpnQS4YqngMqeWs+w3WPZH1jGc9r7Hesax3LOt9Oeh7lvb+mnU/xbqeZ11jWOdY1vky63qR9Dzv9D5Fhl81Bl/juyZrw6sgHLhwZLpjxibNX//ClGVPvb745be2TF5Vlnd6/4Foe2Xv9bWOcqy/Z8P5C0UN7V0aUFSTuv/5hfc+N3XB5j2i7WqyNtg5uHfLgY2r8rn/u733jo4jO+9EcRS8ycdytta7fl77PR9Juys/yV4/a2VbK1larbQKlqwwwaNJ1ATNaAIncmY4wxlmEgABEJEIBEjkSBAEiJwbjdRoAI1G59xd3V055+r+3h+XbNEakh7JM8vhmL9zD0+xuroKfe+vvnjvd2N+mXQdevGrtUe/oCaOULt78vGfWJH7IPggBPaA92nY3Qc7b4HrJOycJJ1vQrxe2CyOTr/5+v2f2HfvJ43IBTUwsNp38Myr394afAvSw9XP/vfW/V/iV4sh2rczcPjYQ59fGTihuy4+/b8+WfnTv4PMxsUTz5x75YHUdAsEJk33JWWrt+rp/9V58O7gdBXQi0d+9F87DnxNdlZC/Ly122h62+qf/d8nfvQVdX0s2N+y/9tfmK86ADtjs1XPnX/t+/GpMmDmTU932H7m5COfW2p5PjxWDNgYvdIA2nrl01/yXDwc2mgZKd9jP/eCf6w45mp94QefGK19HNLjL3z7D1dbXtgdK4XI6OG7/7ztlXsgtvzTL/+/7NqYvL34nT/94+EjT8rhS2/+zz+Itr+uu/pe+sof7rS/FVrteOXvP+voLTHD8xnvlG+u46WHv04HF+2Xm/72U0VDZT8AcfLMS1+sevYLurszNVv9rU8U2VteiS402JpfbH3juyDOO7qf/8lXfw23l+jbJcfv/dXwhYciWwfKHv6Yu+u7uO9A6cO/sjN+L+zuhd1nwPNT8DwB3sfB+zh4HwXfA3nvD2H3PnA/BO4fw87jsPMouPfkPA8p7nuM4KOC7zHC9awQPglM9+LgPktPv1Vx7sn95fc/e/Sx/bUvlw8UzV7sSPv7/RtvGWyLf/vN+Yny1aUFVgRvEn78/Nk/++pP2ofcBAs8DkwAqg5eLnuzW0kDE8YOPnXf2WP/YMUbFf9r1PqD+eAeCOyBwEPgexy8T8Pu8+DeB+63IFRmuIvlrZOGp843dmD/jz7xF79X9JnfKHrprk+6ht4CfDg1d7T3yFcHjn0leOkp012Wsb3Z8vpf3fuXRd/6VNGL3/29weLvY3PFEO9reOlLn/l3RX/5W0XTZ36E24827/988/7PWZ7qnKe65tlPXTr1Bct7VHDug1g5BE+37PurEw98+skv/s7/92+Lzr34bfD2Wa4Wynai6ulP//lvFH3ud4sWWu7WPKcq936qv/jLQLdrnlPHHvmDH/x50YNfKLK33QfKgO4tK3vqT/7qD4o+87tFA6e/DvEzvsvPnNv/F6Pl3xDXjwLZ+8p3fnO8/G5hrabuuS9/+Y+KvvuZf/XC9z89V30/bJ+ovP/jm0136ytHyvf8p/63/na3/5m//9Oib/7Xoj/6SNEL//B/T3c8+8KD/+Wrf1b0o29+/P7/+eHgxE/wlVfItdcO/Oi3/vr3ix74m6K3Hvj4eO13IFyTtr1e8sQff/ZjRV/7RNF43dfz4RJr59Dxe/5NeOD+nHN/2UO/6u74NnheK33wQ6mxu2D3Gdh9CjxPgOdx8DwKnkfB+wh47wf/D8B7L3geAM8e2H0EPHvA8xD4HoDoQ4D91Ig+wXmfy2y/BjDWWXk3ALX3rYo9Lxx//NXypw+dffLw+aKhtjNE+GI2VA5Su9P+4qW+gyu2eT0HhAINPbuvlQ2t+wyCBTyuilEYanGXvtFJBETcFzv+/MMNh+8WvKchcRjogxB9DCKPQeQRCP0Ugs+B/2Xw7QffEd1zAuJ1EKmDcDOk+41gO+EY4V3zkdlyfrtFS/RDqgdCTTlPZd5TDv4qIDuVnYr0Ygm7fj4faIFIJwQ7VH+b6DwjOhelrWnDUw/JViC6INWS99VCup1cegPCpZCp0dxvgNIBwdNv/PDfz1bvYW1n0hODkJiEzJS60QD0kOQstQKrjOMy0O2gXmAch8XtE3mqzfCV50NVjOOMsHUaMs0S2Wr6KxR3CSSWwov9sr8cEvWap0zbKYFQLYTrUlvlEG6GYCvgI5n509HpRohe5rd78juNsH0C1o/k1o/CVil4q8B3Rt+uJOx1lKNlfaBHCraCYYs5an2203ysD986pewehmg5aN3C1tHUQheEW4StE4avgnEcsQKVmudU1j7Kb3UD0QBYFb+yLz36mOnYD9xZbPRhy/kSMJXBge8Adhj8z4N/LwSehsBPIfAEBJ6A4E8g+DCE74Hg/RDYA4HHwP8TCDwGgUcgtEfc+YHof1D07aF2ns669gOMDdQ/AEC9Wd7y2L6Sx18tf+FE23PF3UWLkwOZ0MDW0vMiVop5Xgk6qiPOGREXsDgs2mIT8+5IVNzZSm7OY5lNWBgMLE/40l5iZXzu0N7H+ute0+MXeU8ltfmW5n/D8L9q+l80/S+b/pdN36umb7/hPWIFTlPrxxv2//UX/rDoj36l6E9/u+gv/7Dob/6k6H98ouhPf7voa58uanz9K6mlI/lwPSQagDonB07IgWIzVgnZZsicM8JnuJ0KZrtM8dcC3g5UhxmtkfwleqRMDRUzW8dUfyUkakA4a8aO0TsvgNyoBI6W7f3kTPMDEO3Ih7sg1Su4qhOLbwJxlncfhUwN4HXE5hvY2iuA1wFZr4aKIVUJeB2kq/PJ03qklNk5iDtfV4IngTkLapeeqhZDJYBVAV6Ti5TovmP58ClI1iieUitSx+1UaNFmEC7L0XY9WM059oHelQ+ewFdeBrkVsOrs+utgXQC2LZ9uBOKcHK9Pu0vMbCuoF9V4tRI6Ru+8YcZLpMBRwCpAOW/GS5XQccCr86lyK3EqnyrXoydF/2EjVgx4PZAt5NKrkKoBrFbeejPnO2b5DkOyVN99Xffs1z2v6p5Xdc8+3bNP976k+/bq/icM7zOG93lr96Wce19u98WcZ6/lfQrCz0D8ZTP2ihQ4xHhKQJsaPvuUqeFPvV769Xuf/saPnn/89bq9J7uKLnY3JrzdYdebAF0Geco28sYLP/7+Vz7/5a/+7YN/++UHvvZ3D3/r2w9/7i++9sU/++E9X9r79b986Kv//a5v/s13vv75L331v/3n+iOPi8FeOVCrBUshXQzpY5A+COnDkD4M2DHATkDqNMTqQLkEifOh6bNR24zgs7HeMXy7T4mMRpcuxpbqINULwhBEG1lXMR0og2wtpKrNWKUYqhSD1Va0AfBOEAataFPWdYryVwLTDkQT6z4i+o4B2wGZc2bkNB0rgXQpZE9IRAVgFYK7mNoohVSvtHPWiHYA1gXJFlB79dApMXgShHOQqlSCJ4FrNtLVvOcIUA1iuESNlBrRU5CqBLoRuGYzVhZ27E9HyvhQqZmqArpRS5Txrjfz4RLQeyRfsRGogOx5SLfJocakp572NkHmHMRKkuESSFZArCziPsjuHrGiFViimolUAtGiJeszOyVsuDpHtFOps+TuCeAaIF0B6QozXioHjyUDR+XgMchWqfFSKXBUi5yEbJUZLyG39zPuA1qiEtg2ceMgs3MEyCbTc1R0vg7p00rgMCROQvIEJI9B8hgkj0DyCKQOAfYGpF+G1H5IvQmJQxA/AomDkHwDUq9CdG8+9lI+uV+LHBMC5Ro/Mt/7qiKmHnv52Oe/8cBffWvPnn2Ve092FU3PlrJsdTB4j0Q/kAl/kY49qKQPg9EVDtSGYxUYUxGMH3B7n83GjwmJaizUGo2O49iswi8nAn14uB/oSTXRC+K4Gj2nRpvVWKMaa5Tj9XK8XkrUq7EmYrsCMr1AXQJ2GnKboDrU7LyanZfT0yYxA+wsMONGqksON+mxJiA7LLI1R3VYZIdF9FhEn4UPaFivEG0XYx3ADgM3JCdb5VQzCH3Ad0uxVhBn5Wg746+xss0WXk/6SvhwDRiTQI4AM2WlhoGfBvIi7as2s43AdHORRj3TDvIlkIbk5Dk23KCl2yyii482AdMH4kUj2yHGm7V0G9C9OfoCj3XxyTYu3iInWsx0K2TbjESjGKwGsT+XPs8Gao10Z54ZlNO9QrpPTLVaZGtk45iabgH5QsZTrmDNkBvlomfYSF2e7NDT5zTsHEiDebKTDdXp6fN0qFaIN6rpFpAGgO1mwrVctFZONZKB01z0jJpuyVEdOapDy5znYw2Mv0YI1gHeQeyUy5GGXLpVDJ3Jpc/zgRo5Uv/2JsaqhHiZGKuSI3VauF4P1RuhGitUYYWLJc8b9Pbrgv8Y76vmg+cBn3VPnzVk9mhNxw8effXvf/zq88dbX628WDQw+AZFncawPQB7LeEHBv1U2vPCjnM/R/cQ9FlOb4ylD2eIQ6A3y1gdm+7H8UUsPmkqDpGcZpOXVOxSxtWA+ZuNRJuROG8km41ks5Zq0lJNKtZkJFuA7DUSHantutjW2UhoIOTuTnsHQdpIunv52DAXG8TczYS7zkich2y7mjzLx+rk1FkFa1GxdovoA+qikuzO7jYI0XaTHFSzPaT/DBetB6HPYjpIbz2XGsxnB4DqBvK8kakzMg15olWgB4AeZcK9QqBHxUfMTD/lrWJD5RbZoaTOx5wl2UijhHfi3moVawVzPEd2a+m2PN2rUT1C7CzuraYCdSrWalEDYqYH+CHgLujpNiA6QRoEqoPznVbJdsi2ZVxlSqLVogaEZJfJjoipVj3bkqM6tMw5EW8F+QJIAxTRZhJtUrJJTjTxkTNGptXk+sTBkscVAAAgAElEQVRYIxOsBb5fSp6VkmeTrhIhcw6EPi1zziJbycBpEHqA61GwZipYLcQbgO8D5SIwvcROOZhjRrKF89eAOAhsXy593ky1aPGmtzclWSunTivJWi3eYMaarGhTLnoGolUQOwVMDSTLIFtjJpq1RLeWGIuv9So8eay286Hnjj6w99i+0q7XqoaKZi/xbEz0LvVLoUFItoKxAaIfSD/QMYNcg/yKiPfmhS7IzeiRbtC6AM5j9ElRq9fUNshdAlgEadIixkCyg7gC0grIK6DYQbWDZgNlHqQJMJfAXAHYAfCBusOkF3R+AywvgAf09Tw/DfIUwCJYU8ANgzwJ6hyIMzo5kefmIbcF4AZwg7ah4lNyZgxUO+RWQJgEcRxyLg1btggbaGugLFjMRbAWAdZy1AwYLouwmfgSsDbIbwCsgDkB2jzANsAW6GugrgC/AKINpCUlOw7WBgiLFjMLsh2sDdDXcuycTEyTqQlQ1gHcoK3mmUngpkCdBX3ezA4ArIA8A7kVUOZ54jLANhh2RZwC2FCFSTY7BPnlnDRNxrosdgyMOeBGgR0GeRKUKeBGQRgFzQawDbAtYsMWMw2aDaQ5AEeen5IyQxo5CsIM6CtgrYO2ajGzYvqiRg2COgnGjE5fAmkCjMUcNw7SLEizIM39rIkLIC6APJtTJ0GeBXEBBBvwNuBngR8DYQjMS5BtB6rbTA3oiTEhMEO6bTIvvHC46r6n3nrwuePPHmnZe7KrqP9c1CDzUmIth41HFg6uLNZs2XriG5OBlUnfaheWGvBvViQ8JeFgo2fyKIVV7+7uW91+OoUXB/xHlxZfWVs7FdisoQJdgc1zAWdrYLM1sNUa2D4XcJ0L7DQHths96xX+3ebN9brFxdrNzS7/dr93szcRuLzt7HY62z1b56Ous8Htuo2NCud6cWC9zOesinpbEp5z3tU6l63a6Wje2mp3Ols9m23xnY6Yq3V3o3FjvcbvqA5uVjsd5yj/5M58g3ujOeFv966WbG1U+XytgdWGVVsjttMvJ2fDG+eXbJUuV4N7q8yzWTc3d9rn6/a5Wnc3zhKh/oirddNWnfJ0bjubPav1AUdTxN2+s3XOYa/1rzemgwMx/4Wgq3Nj47zf1ZrcaYlsNnicNd7tM8GVU9Fo1/ZyudvVFPWcc2+cCQT65qeOe91NdnuV390U9rSsr1X6t86kg61xd1NgtyHoqIxtVYdcdf6tmrT3bNLTsDxXMjFREgoNBBwNCXerZ7Nh01YeDvd416rxUGd4qzGwcSa427brOudcrgs4mohwFxE5vzx7KBE+h/mbnYsndrfOhLfORN3Ngc36wGbDz5qzKeBsCmzV+1w1ga36gLMpsNEccDQHHPUBR2VgozTsr4iuHEltn8JdjULwIuebMpI7kIdXT9Y/8VrZUweqnz3S8sShc0Vdfb2KoaeyGUbgMTxLcWwqm2FFgWDotzecpdM8neHoDEfjLI2zV85TDH3d+jC6bjKCHItjG06XbXFlaWl5ZWVtZWVlaWlpwba4YFucW5qfXZqfts9P2+enlmfnlmYWbVOLtplr2uyibXZxcf6adgfvApaXl1dXV1dXV5eXl+12u8Ph8Pl84RTx3KHSvYcqfnKg9JED5fuqut9zfmgW8IKSxelshqJpludFlmVJktRNQzcN1dIUS5NympTTxLyiWrJhioYpX9MUw1QMQ7um3cG7AJZlOY7jOI6maZIkGYZRFEUD2Hei8scvHf72j5+75/nD++v633N+mBboWk5TLVSKFK24NwwLtSssMQ3VNBTL0E3tCiEK7Q4z3hvANUDF0ADABNj7+on7n3ztG//w5D1PHnjktdPvOT90I6drOV3LWWYe8pDP5TVNEwTpDj9uLQrFFA3D0DRNURRZlnlZPlLRVFrfU9Z8obpz8qGXT723/ED1tfMWWAaYV+uva6qlyObPFcS90vJwB/9noKqqqqqaphlX621qmibLuZKys+c7J4YmNqZXIg8+ffw954dpmIZmaoqpKaamWoaeR4pGluQrTbymSfId/J+BcbXAN9IsAJDP5w0DXnuj9Gjx2cqGgaHpne899Np7yw9LzamcpvG6Jhq6ZKqSqStgGpC3IGcCqlZ7pWCxitZnQc6EnHmlVMgNW+7adge/DEzTVFVVlmVVVU3TRGc0FcpLz1ad7mxovDi/FLlvz4H3nB+GaOaUPCoXljPA1EDXcoZm6qppKqYpm6Z0dfm7YJqSqaumrpq6dtOmX9vu4JdBPp/XdV2SJFmWdV03TVPXdVmyykvPnqntO3d+dH4p8pVvPFZ0vqNdNY0MSZAsk0hjnCSSLCMosmaZjMAnM+kMSbCigOHZUCyaxDMBLC6YmjscIHlWNnV/OJQhiXQ2c11+gJwDDTRKAxN4XGFIBXLAsqZlgMjmwYC0jwUFQALAAHjIkSDxYOkAFmQxBXKgq5AzAZVyU+Tc1bpNBseiGvjiLark9sGEpcPJo7W1Vd2N9YOT05677nulqG/wggl5tIlpJBEPx2MzC/ODw5fml2wXLg2NTU0Oj402t57v6OkuLjv1+S9+obyhltVkDfIEx2AkTjC0BXCj/edAzsmMbLImmNDbOviZT3/uox/+6Mc+9h/2PvNCOsEPdA/0N1/2bfpeevKlnvIeKkI1nGjqaL0Y8IbBgpwBkINYJE0RjK6CLMmWecWkVWRD13IAoCjvr/1Tbndchx+Dw5dMyCczaYpjMTwbjsd6LwyUlJf5QkELgBWFje2tkfGxhx995K+/+D9eP/SWNxHhdMUXjwRiEZylMyRB89yN9kdG8iPPmESEqDhRU3O6ReDyknilTKWchTwJIELX0d6hE5fYBbrujXMVpR0uZwZMEBgAC1QJ0B7pqgy6CqYBqmJJoqYqpizpHCfc6i79YMGAE0dra6q66xsGx6c9P/zRK0Xd/X2KoSczaUGReVkSFHl1w3FxZLitq1PRdQtg1+/rGeh/8Md7nn5uL87SGYERTI2UeMnQDMinCTwcj92EH0yGQRqk5lRDdUUz5CCfA7CAJWCwdaL2cJ133TtSObZwZnGucuaTv/bZX/3Xf3SmeiAVSx06UH7X9+96dM/TM5MzJE6ea+7+vd/5g49+5N+UnapCUiSNEQDvr/qhtz3ezo/Wzg7F0DE8y0kiI/B6zspSZDKTrm2ob+vqjKWSlyfGf3jvPTX1Z9w+76tvvlH0kaKij36o6MNFRR/50DMvPk9xrAWQSCWvzw8ph7wS0KHiaM3/9fuf+nf/+t//1m/+P/ff/WxehlcePz5QMwE8HLz76Lm9rZCCk09Wlxf3SiwYMhx4raa2so9I58CC9ZXg66+dSMYZXYWS4srK03WIIqr6/tp/6XaHYcDR47WVNd01TYOjs57vPfBKUUdPN9r/FtkfFMdmKZKTxDiWujR6eXhstKzy9KNP/GR5fU3WtQNHDv36b/960YeLij5cVPShomdfeoHiWNUwaJa5ET9MwaQwisTIrqb+lsZeIqPp2hXPdv+TxcXP1xqU0fxi68ypOcCh/ejggVfrTQXAgFdfqig+1hILiRROHT1UMzQ4I/J5STCOHC4529SKIigUxdzqLv1A4Tr86OztMSGfpcgsRYZiUSQ8CIbG8OzFkeEnnn7qnh/dV9tQH8dSvCyFk3GHdyeEJXQA2dRlUxdVxRPwa4Z+Q/nBX4ltHH7lxJv7iy0d8hZk4mYyoLZXXb5YOwMZ6H6tr2NvpzQuDlcudJ23GxLQGXjlhapLF9ZQbdJXXiouK2ni2RzkYN/LB4pPliMr9Y59+u5CM+HQidry2u7qpsHhOc93HnylqK2rU7PMLEUyAp8hCUGRkSzRc1b/xcEnnn7qe3f98OjJE5wkcpJ44Mihf/Wbv1b04aKioqKiDxU9/vRPNcuUde1G+yODlDMoA4W/6suay0saFFHPW1fkx9EXa+vf7DQSRsWeKlvZEmTg2KPVJUd7BEq1FDj4elNt5UAqlgIT7Iu+3q5xvxeLR+OHDp4cvDCCtv26Y3+8u7gOP7qHLsr5XJzASUnEGJJWxBSdJSU2y1OXZye+ffd3fvc/ffyZV/ayOp+gki+/+VrRv/0VpF8+9ju/tfflFyOJ+E3sD0O9UhM9EsrUVrdUVjR63NFCtuX5vfsH+kZNHcpK66orz8pifnsz8L+/9r1X9x1aWnSWldY1nGkzdVBlgBwcPlj6Xz713/7j7/9J8YkqtLulrkLOusOPdxUGHD9+uqqmtbapd2zW9f37X74hP3CBHhwf/v79P/zEZz/11MvPxIiEDgYpsZyh5CGv6Eo8g2VoEtU3JijyRvwgshRiA0XIaHdSyEE6lY5FYhyjWwZoiiXylqn/bOdKtPsfTSpYkoEccIxmGRbkgGN0kbeu7lBG0qT4ftv/4LbHjfmRISX+Kj8IUuKlnJbhSG8s6A77EmSaVvisQASSEVfYn2Yp3lApgYulU6FYNJKIx5OJm+xfGQljhw8V/+dPffajH/nV3/j1j/+H3//j3/nt/3hh4DLyQWLRDDogCQHtUoulKMiDLFmopj1NSWgP20LKV1Xy6KM7/HiX8c75kaQyGY7kdEkDSzAVjMHjZBJj8IzAJMhsksJpkRd1VdJUxdBzkL/5/qa6BpoKaF8LSTTxLJdJMxzLod0OBF4QBdHQQZZ0tPuwJEqyZCG6ZDNszsrJkiVLMkVS2UxW166QgyKpW92jHyxcjx8X5Lz5dn7EiUyCzIbTyd1I0BMNoQs4XdEACJGLZjGMxDM0GcdS4XjsJvJD1/KSqIuCJkuGIpuyZKBRhzxkMzQSAywjiYJW2I0F7ahdOEA7p1zbTAN0La9reV17f+3vd9vjnfNDMDUFLNHSSYmnZIHTFYwhd0L+QDwew9OEyAmaQot8hiQIhlY09Ub8EHhVU3+2S7Iimxwr8RwviVLOAknUSYJEDNBUjWWkTDojibJpmJIoCbxomdaVzRgYliRIlmF1Tde1nChoiEy3ukc/WLgeP/r/MT/kFE2RokyKchwnvdG4JxIPY9k0wzOKLln5ABbPcDSjSpTApSkCw7NpAr9RfN3QTMtESRNT4BVJ1EwD8jnIWUCRHBp4hhau6qBcQbQUznCsJIkax0qFzJymWletEJOm2Vvdox8svHN+MIqG0SwpyjqAkoc4ToVSGZwXeUtjVClBZoPxaJoiFEMXFPmG/q1mou0gNdWSJR3NHMtZeZpi0fZNSDyIgsixnGmAoed1TRcFkcCJAiEK8qNAC4EXclYO8mAY76/9p297vJ0f7QPdvCHTCp+kcE5XcIEnBClJMhjNYZSQpmWcMygxR4k5nDMwmsuKLC6whMhRApdlqDSBkywjKfKN+KGqOmqGYaEZX7puKor27u2KdQfvHt7Oj97hC1JOo2QunE7iApuiqQzLx3FKzoFoAKvkcc7AKCVNq5SY43UrzdMYQ2IMSfIsIwmMwN9s/2zN/LlpsfmrM5Dv8OP9iLfzo3/0gpzXSYkNpuJZnsEYmhTlLCv7Y9lYhs+yOs6aSVwNJ8VgnA8mCEaXcYFNUjhG4pTA8bJE8xxOEjfghy4IAprkKMsyz/OCIOi6ficu/j7F2/nRNdQjmAolczE8zagSKYmcZpCClqblLKtTYo5TgFeBV4GVgZFzlCpSspDh6CSewUic5jlG4G+UvzW0ny2yKPwNaOv5W9gJd3BDvJ0frf3tnC4xqpCiCU5XMiyfZvhwihJ0SFOaL0K5A0QgKiSzVpYGnDOWthzBVJwQOYJj0hRBMDTJMjeMr2tXRIV+zTx6VVVZ9o7f8b7E2/nRNtDBGzKriUkKJyU+ks56o4m1bb99Y2d1M+h0J3b8+LYHX1qLDI2utvWOtPR2rmw7C/EPmueyFHnj+JjOcRzLsjzPa5pWsELuyI/3Kd7Oj47BTsGSGI2LExghctEMHkymt32x4cmljZ04yYNsAEbkl9ZiHb3zVQ3tI3NTu5EgJQuUwOEszYoCxbE3yu8bmm5ezbyZpi4IHM+zhqGh/74b7Q7eVVyXH7wpUgoTJzBGlXBepCQVo6SJ+fUtTyqJq+FEZmE52Hdxuat/8cLluazISjmD1eQolgwn44zAi6py4/Vzumnq+bwly6LH4x4cHDh7trGrq2N8fPQOP96PeDs/evq6DcvESUKUlCzFMryG4QIj5DFS9wSZ1a2k3ZGYsgVHpjwzK/HdCKsA4Jy2G0o4d/yeYDSNMyQr4ATD8eLOzu4/4oehIfuUYRiO4xwOx87ODgDIsry0tBQIBFiWRWu5dF3XNE2WZVEUc7kcAOi6zjCMqqpIH2WzWUEQ0HctyzIMQ5ZlAOB5XhRF0zTz+TwygfP5vGVZkiTd6p6+PfHO+aFYQAvgjfCzS8ELo87B0e3Lc/5puzeSyTh3wwurm84dfwqnOVGjODGdIW/Ej4LN4fV6p6enY7EYhmHRaJQgCMQDu93e3t7e1ta2sbEBACzLLi0tTU1NhUKheDy+sLAwPj7udDrj8fj29nZPT093d/f09HQ6nc7lcjabbWRkxOFwJJNJnueNq2ULNO3OvMNfCu+YH7lYWkji+spmvLljvLpp6MKoc9IeGpnZmLStj8+tLDlcMYxkRJVkxAzJ0IxwI34gb0VRlMXFxcbGxqGhoYmJiZmZGSQn/H7/8vKyIAgMw9jtdrvdDgBLS0vT09OiKGqatrCwMDExkclkCmPPcdzMzIzH4wGA9fX1sbGxnZ0dmqbRUnTLskzTVBTlVvf07Yl3zo9EVqJFcO5m6pqHTtdfmF2O7MaUdXeyfWDk8vSSN5KSdGAlLRRNxbGsbuT/SfkRCAScTqeqqhRFbW5uejweQRDW1tZmZ2cty9I0bX193ev15vP5ra0th8OhKIplWR6Px+VyiaIoSdLm5ubExMTw8PCZM2eWl5ctyxoZGYnFYkjXAAAqYnFtzYI7+MVwPX70GmYOJyhR0rIUy/AKRnCMYOKcwcrgcMfLazsPHD/T2jszbvMMz6wNjM4MTy6ubXvTJE8LCpalMZwSRPVG/KAoiuM4VVWXl5dXVlaQc+twOJaWlhBR7HZ7LpeTJGl1dTUQCFiWtbGxsbq6imSAy+Xa3NxUFCWXy7lcLpfLxXGc1+tNpVIAYLfbfT4fTdPIYZYkCbHqTnz2l8Q750c8K8Qz/MpWuLH10sHixuLKjsbO8a6hmQ1PeGTK1tF/aXLOnsxSZh4ERY/FsX9Sfmxvb4+OjuI4TpLk5uZmNBo1TTOZTLrdblEUM5mMzWZzOBwAsLq6urS0hL5ls9nm5+cty0omk7u7u4lEwjTN9fX1y5cv+/3+xcXFjY2NVCqFFqSjOkmmaaKaBXfwC+M6/Ojtvy4/GDlH8Gaa1fxxanxxo6XncvfI/IorREqmYyfY1nuxpb131enSTNBzcBN+IPvDMIyNjY2urq6JiYnJycnJyclMJoNqkqyvr3d1dXV0dGxubiLp4nQ6HQ6HpmmqqqICe8h5cblcDQ0N58+fv3z5ss/nAwAcx5PJpCiK16YADcMQhDvrcn8pvHN+4JyWwEVCtDgNVlyhyqbuiqbu8cUNDYDg9bnljbOt3ReGxxIYrpo5hhVvIj8wDDNNE7mjgiDgOI6shCs1STQtn88jZoiiaFkWKlCBDNh8Po8+RRRBKNRTS6VSqHyFpmmiKMqyjC7O5/O3uqdvT7ydHwMXLhompDMkx8tZiuVELU2ytKClSB6jBFoxKdnaCsaHZ5cmV5z+FJFmlQyjZBgJZyScEQhaIBieovmb8INhGKfTefHixZaWlubm5s7OzgsXLvT09DidzkLQXVEUFO241T30LxvvnB+UqKdpERdU3oA0r3riGR9GUmrul+AHGnVN0zRNKyTqCqEw9Kksy4qi3PE7bjGux49L/4gfkpomGVqQCUEKY5kgls4KIq3raUFI8jylmr8oP3ieR0HPa5Nz1waykNOh6zqqmHare+hfNt45P3BeDGMZXyIZJ6mMKCZZNkySMZL95eQHCqIriiKKoiAIiDQcxzEMgwLkSIrciWvdYvwC8kMU0iyDsQwuChmRTbJknCMzgvTL8QMlTdBHBS/Dsqz81fmGKER2hx+3GO+cHwmSSLMMLgqEJGI8nWTJtMwx+i+sXxiG4Xke2RbI70B6pEAO0zSRcYqoc6t76F82rseP4Z/nB0XRohjNZpIUiXFUiiUTbDbJ4SmRyojiL8qPgsC41jstVFZEEXHkoxZs1Tu4ZXjn/CAlkZTErMimeTotUlmZSYlUnKZ/UX6YVwo3y4IgiKJYECQos1/QL/l8HsUwbnUP/cvGdeavXxgwzFwKyzCsSHGibkEqy4diJCXkMVJPkWaWhSSVCyaVCG7SKsQJPk3LOKdQvIozQpbkcJq7CT84jjNNE7kqqKwzMjUKbq2maYWkKwqC5fN5SZKQy2NZFsuy6CSaBI/uhm6i67qqquiJKL5eqDyPuIjibCjIhp6C/oZCGeGC7Yweh/wpdKYQj0EMFgQBZYnR003TlCSpMEMFXX/bx+Wuyw/TyqczOM0IGE7hFOvY8s8uOhdW3Jen1i5ctl8cW+kdXqo/P3KiquNYxZl1d3AnkAiniDTJ44xAMiLFiRwv34gfaPhRx6ERRUDHBflRAM/zpmki78Y0zVwuh3SQqqpo+FGcFI0usmcLOxAgnYUmfyAvGsktnufRWBb8akQvFMMteNo/95egJ6KZswX7upDfQZRFXER/wwdBP15nfWVvj2HmsjjJclIyQyQwan7JeXFkLpGVMrRJiYBRecduenBsvXVgrmtoxp/A41kO5xRWMtD8D5zmCJK9if+C4uioZ9GomKZJ07QkSei1kyRJkiQ0DIVkCuIBOkYxEnSMnOTCW5vP59H9CwXn0SPgSsF5A+VxUGQFkQbdged5FO9HlELuN8uyKOGMZA/qNPRpQQ8ioqB7yrLMsizDMIh/t73/dZ31lZ0dmm5mcVIQ1SzFUqyyvRtZXveMTq96wyQjQzAhDYyu1DYP9YwsO30pUjJZJS/oIKg5WlAIWshSLElxN+EHeo+vndN1rdGay+XQRz/3+iKFggQM6nqkAtAIoRe3kKwxry6rMQxDkqTCAF8rnxCN0L/XnkS3QsfoDgWtURAJSK/lcrkCCa69pvCU235e43XmJ3d1arqZyRIsJ+E0J6n5VJaPY9zEnGPbi4WS4upWond4qX9kxRVmVYA4wadIEaOENMmnSRaneEaQZcW4CT80TWNZlqbpgjzQdZ2iKJSZQ38Y6mUkJBKJBI7jiBZI3Zimqes6x3GFOwiCwLIs0lzIG0IGB5IWSN4g2hWWYyFZhS7+OWmkaZogCIUUoCiK6MpoNGpZFlJwpmkiKiNlJ4ritQRFB7e9fX3d+R/I/iApLpkheMnMkBLB6J5QdnkjeOGy/Xz3ZN+IfXU7FcFNQhBStIT8lwwlYASTJTmal0RJuxE/0NtJ03QkEkGjDgAURS0uLkaj0YJsR0TheR4A1tfX3W438miuTduid7fwTl9rMSA74+02BJIH18oYNPwF2hVsTF3X0aotiqKWl5d3d3dpmvb5fARBvP22iBDI4inopg/CutHr8sPKQSZLkBQXx7JofiFOazqAN0z2XVo81zUxs+xLELkUC944HckwKVJE/gvBilmSu7l+QSPKsuzm5mYwGERywu/37+zsIGGgaVo6naYoyrwq9peXl51OJ/IX0NcpikKxNYZhIpFIJpNBIp1lWaT+r52crCgKSZLZbBbtuVdwUpBvIknStZLMNE1FURA7ERd5nl9YWEDzSziOwzCs8CwMw0RRRJIMPeVaSwgd3+IB/mfi7fzo7O5C8z8YVkxlSSQ/SNaIpdO2NV9T23BZTVdr3/TcSnB2LTA4YR9fWF1yuHdDiRTOIv+FZIWbzE9GA8zzvN1u397eRj24vr7u9/vR/lZra2vnz5/v7u52Op0EQViWtby8vLa2Fg6Hd3d3GYbRNG1lZSUWi6GZhb29vWNjYwzDyLK8sbExNja2vLwci8UQPyRJ2tnZGRsbGxoastvtyWTSNE0AMAwDx/FgMNjV1dXX12e329PpNI7jTqdzbGzs8uXLfX1909PTyMpZX1/f2dnBcXxpaSmRSBiGwbLs3NzcwMDA6upqJBIJBAIDAwMdHR1zc3MURbEsu7KyMjQ0NDU1datH+J+Ht/Ojb6Af+S+8oKQJGskPVsxzCtgdgeLT519583T30GKCyPmSct/lhZ5LE71DE+Nzdn8kxUqapFo0L91EfiCVgXR5KBRCu2l6PB6/36/rejwed7lckiQRBLG6uurz+RBjtre3I5HI8vKy1+vFMGxmZiabzXq93mAwSNP09va2x+MRRXFmZmZ2dpYkSaT+C7oGaYr19fVoNJrP5wmCQLIBcciyrJmZGbfbDQALCwvDw8OKoiiK0tXVFQqFAGBychJReXp6OhAIAMD4+DiaEU3TNGIhiqMMDQ2hiXADAwOLi4sfQP/lRvzI0Mq2FzvbPvLawaqznWNx3OJM8MQo+6bHvrE7ubByaWxm1rYSiacZQWY56Ub8KNj2yWRya2trZ2fH6/Wiscnlcqurq4W31uVyra2tAYDD4XC73SRJut1ut9udTCY3NzdlWV5ZWeno6Ojr62ttbV1aWlJVdXNzc2NjQ5IkpKeQ5A8Gg9vb22NjY7W1tXNzc9cuDQ+Hw83NzRMTE+fPn9/c3Mzlcna73WazoU9nZmYSiYSmaWNjY7u7uwAwNTW1tbUFAIuLi+gMQiKRQHMly8vL/X4/AMzOzqILbvUI//PwzvmRxGVRB5yDte3kynYilFKdfrJ/dNG+6VnZ9A6OTlfWnW1u69p2+zlJ5QXlRvzAcRwZATzPBwKBra2tYDBIUZSu64IgrKys2Gw29Orv7OzMz88DgN1u39zclCQpEomsrKx4vd5oNMowzO7u7sbGBs/zhfGenZ11Op1I8SNvguM4n8/ndDolSVpfX0cWD5IZJEnOzs5SFIXmyqMJ0ktLS/Pz8yhMgpQOx3FodSQqhicAAAjPSURBVJZpmiMjIzabTRCE6enppaUltMKPIIjp6WkUkZuZmcEwTNf16elpl8uFYjy3Md45PwIxKpTIbvsyU4u7FyfWJxc9q+60O0JcGJvtuzTZ3NHXeK5zeHw6FE1xknoT+WFeE2wgCGJ9fX1lZQUpFwAQBCEUCiWTyWg06vF44vG4ruvz8/Nra2uKoiSTyZmZmfX1deT4pNPplZWVUChEURTSFMvLy5ubm2j+MwqvsSzr8Xg2Nzcjkcjc3Nza2hpBEGj5TDabXV1dJQgimUxeunTJ4XBwHLe2tra4uBiPxx0Ox/z8PEmSgiCsrq4mEglJki5fvozW+YXD4Y2NDbTMUxAEh8ORzWbj8fjo6OjOzk4qlZqbm/P5fLd9XYJ3zg9KyO8G8dWt2OpWYtK22z+yMrcezgr5Sdt6e99wS2f/rG0tmsqSjHjz/JyiKDRNowhjNpt1uVzb29uJRAJlVXieX11dHRgYQKYfSZKGYWxtbXk8HhTbXl9fd7lcBS9mampqfHzcZrN5PB6e530+XywWQ4FzFJZIp9NOp3N1dXVycnJqasrj8aDvWpZFUZTP5xscHFxcXBwfH49Go6qqbmxsLCwsbG5u2my2nZ0dFCPx+XzZbFZVVZfL5fP5BEHwer0zMzPz8/NOp9Pn8y0uLl66dGl8fHxycjKRSMiyHI1GMQz7AMbHbsSPzd34+OzG8OT65IK7rX/mwLH6t0rOtg1MpFnFtr4ztbgaSeKykac5OZUl/8n5QSgJwvM8y7IonIAMPYRrMyPoI4ZhCiIHvcHIzkWuKXJWAQDHcYZhCpk5dCvkmBQ824J+QTG0dDpdOCmK4vz8PNI1OI6jexqGkclkOI5DAZiCJ2wYBs/zSOyhyNu10xJQchGF0W5jvHN+yCakKcO5i12e3mzrn+kbXt4OMSqAaEGSEEJJnGBlQTUpVspS7E3WN6Du3tzcnJycHBgY6Orq6uzs7OnpmZiYcDgcFEUVwt7oyoKLUWAMOii4ryi1e+3AIP+ocH0hJI8WTCDnpRDjQqRBOZRMJrOxsUFRFFyDQgbRNE10f0TNAo/Nq3E2dI2iKAzDfGDzczfihz+apARIEsbY7HbduaGzHeMXJhwTCwuRDIFzGiObJKfgjMAKKi9rN8nfFl7iXC537SzlwgAAAApmIFoguWKaJtI16FgQBDSKKN6Khs00zUJ4Cvm0SMug0Sq89+ihuVyO4zjk6ViWVSAiugx5v7lc7lomcRyHjhmGQTdBT0cnNU0jSRKJLkEQUITtAyg/enp6ULohFouZppnL5TAM43mepmmWZUmSDIVCS0tL/f39TU1NNTU1Y2NjGxsb6XSaZVmCIFDoEwUlw+FwNBotvNCSJBXmFL4dcM2cCZSKQyLhRtff7rglvzdnGYYuA+Qgb8mSIEtCzrR0VaNJxjLAUPOqZGqyZah5UwNNzvMyvHGy/kh5W3XL5enlxHfve7Woq6uLYRhBEAKBAEmSNE0nk0lVVUmSRFMf0EijBBtN06FQKJvNogARwzAEQaDyDZlMxu/3h0Ih9C6iYLZxY6A+ura/0PFNvnJb45b8XtPQBJ5WVdk0NMvU87mf7ZGSM8HUADED7SCbN0E14a3SpqMV7dUtl6fs8b+7d1/R0NAQSlYhSZDJZCKRiCiKgUAA2eTZbBYtqkZpjgJomsZxPJvNogAzhmGBQCAcDnMcZ1kWsuzMqxM+3g7TNFF8HfUXyrve5PrbHbfq9yqKJMuiqsqmaeq6LoqyKMqaaulaTlUsWTIUOaepoKkgiSbFWYfLW45XdlY1j0zYot+6+6Wi0dFRpIxREFOWZRQwkGUZGfw8zzMMg3wKZCggclAUhRgjiqIoiizLZjIZHMdROtSyLPPqqpbr4ooA/MfWiXW7x5dujFv1ewFyuq5qmoI8AJ4XRVG+WggfTAMMHQwdFDnHsWqGVI9XtZ2s7q5uuTy+GPnmXS8WjY+POxwOr9cbDoez2Wwmk4nH48lkEsfxTCaDYRiGYel0OpvNIlczlUrF4/FoNJpIJBAhMplMMplMJBLhcDgcDqdSqUwmk0qlkslkOp1O3hjozoVHYBh2k4s/ALglvxfDktFoNBKJpNNZgqAInKEpXuBVPMtkM2wmzWTTPJ4R0ik2FsE9/uzJmo6S2t6ac6MTtug373qxaGRkpLOzs7Gx8cyZM1VVVWVlZSUlJSdPnjx+/PiRI0cOHTp0+PDh48ePFxcXFxcXnzx5suwqKioqKisrKyoqSktLT5w4cerUqdLS0pKSEvQvur5wcF2cOnWqpKTk2LFjx44dKykpOXXq1E0u/gDglvze0tJiNEDHj58sLS0rO1V58K2je5996c0DR948cOzQwZPHjpQXn6g6ebzyyKFT+w+cOlnTUVrXV9c6Pr2c+Lt79xUVPHue5/1+v91un5ubm5ycREVa5ufn5+fnbTabzWZD51HKdH5+fm5ubmZmZnp6empqampqamZmZm5ubm5uDp2Znp6evSlmZmYWFhZmZmaGh4eHh4cL/735t25f3KrfOz07Y19eXVhcGh2bGp+YGRufqaw68/DDT3R2XujqGurpGe7vHx8cnOrvH+/oGGo4d+F4VVtpXV99++TcGvbd+14tMk0TTdQDAJIkt7e319bWbDbbwsLC7Ozs9PT03Nzc0tKS3W5fWFiYnp5GPFhYWJifn5+dnZ2bm7Pb7evr65OTk+gPmpqaQjSan59fuDHm5+eXlpZmZ2eHhoaGhoZmZ2cRHW/yldsat+r3XhoZti+vrq45ZmYXbUur9mVHVXX9d75z96VLk0NDUxcvTl68OH3hwmRX13BTU3dFbfuxytbSur7GzukFR+Z79+8vutZiQsZpNBpFKfj3FLu7uy6XKxAIIBEVCARcLtfu7u57/dxbhe3tbZ/P5/F4Ll265Ha7t7a2AoHAe/3QHbdny+3d3PG4PP5Nl3fb7d/1Rdu7Lnz/rgdHJxbHJ5enZ9fnF7fmF7fGJ1f6Biab20fOtI+c65sbnNzeDir3PnLo/wefF9N9Ky739AAAAABJRU5ErkJggg==" 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" 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" 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</div><div class="separator" style="clear: both; color: blue; text-align: left;"><i><span style="font-size: large;">Notas Importantes sobre Ordenar Datos:</span></i></div><div class="separator" style="clear: both; text-align: left;"><br />
</div>Comprobar si todos los datos están almacenados como texto Si la columna que desea ordenar contiene números almacenados como números y números almacenados como texto, será necesario que les aplique formato de texto. Si no lo hace, los números almacenados como números se ordenarán antes que los números almacenados como texto. Para aplicar formato de texto a todos los datos seleccionados, en la ficha Inicio, en el grupo Fuente, haga clic en el botón Formato de fuente de celda, haga clic en la ficha Número y, en Categoría, haga clic en Texto.<br />
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</div>Eliminar los espacios a la izquierda En algunos casos, los datos que se hayan importado de otra aplicación pueden tener insertados espacios a la izquierda delante de los mismos. Antes de ordenar los datos, quite estos espacios.<br />
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</div><div style="color: red; text-align: justify;"><span style="font-size: large;"><b><i><span style="font-family: Verdana, sans-serif;">FILTROS</span></i></b></span></div><div style="color: red; text-align: justify;"></div><span style="color: #3d85c6;"><span style="color: black; font-family: Verdana, sans-serif;">Aplicar filtros es una forma rápida y fácil de buscar un subconjunto de datos de un rango y trabajar con el mismo. Un rango filtrado muestra sólo las filas que cumplen el </span><span style="color: black;"><span style="font-family: Verdana, sans-serif;">criterio<span class="AsstInlineDefText" style="color: black;"><span class="ACICollapsed" id="divInlineDef_751246745_1"> (criterios: condiciones que se especifican para limitar los registros que se incluyen en el conjunto de resultados de una consulta o un filtro.)</span></span></span></span><span style="color: black; font-family: Verdana, sans-serif;"> que se especifique para una columna. Microsoft Excel proporciona dos comandos para aplicar filtros a los rangos:</span></span><span style="color: black;"> </span><br />
<div style="text-align: justify;"><ul class="cntIndent36" type="disc"><li><span style="color: black; font-family: Verdana, sans-serif;"><b>Autofiltro</b>, que incluye filtrar por selección, para criterios simples </span></li>
<li><span style="color: black; font-family: Verdana, sans-serif;"><b>Filtro avanzado</b>, para criterios más complejos</span></li>
</ul></div><span style="color: black; font-family: Verdana, sans-serif;">A diferencia de la ordenación, el filtrado no reorganiza los rangos. El filtrado oculta temporalmente las filas que no se desea mostrar.</span><br />
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<span style="font-size: small;"><b style="color: blue;"><span style="font-family: Verdana, sans-serif;">AUTOFILTRO</span></b></span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-7-hUT73ylMQ/TZFQ41bgkYI/AAAAAAAAAHI/FX09JAG8ue0/s1600/ZA006052018.GIF" style="clear: right; cssfloat: right; float: right; margin-bottom: 1em; margin-left: 1em;"><br />
</a></div><div><span style="font-family: Verdana, sans-serif;">Cuando utilice el comando <b class="ui">Autofiltro</b>, aparecerán las flechas de Autofiltro <img alt="Flecha de campo " border="0" src="http://officeimg.vo.msecnd.net/es-hn/files/044/440/ZA006045813.gif" style="visibility: visible;" title="Flecha de campo " /> a la derecha de los rótulos de columna del rango filtrado.</span></div><div></div><div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Microsoft Excel indica los elementos filtrados en azul.</span></div><div style="text-align: justify;"></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Puede utilizar Autofiltro personalizado para mostrar filas que contengan un valor u otro. También puede utilizar <b class="ui">Autofiltro personalizado</b> para mostrar las filas que cumplan más de una condición en una columna; por ejemplo, las filas que contengan valores comprendidos en un rango específico (como un valor de Davolio).</span></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"><div style="color: blue; text-align: justify;"><span style="font-size: small;"><span style="font-family: Verdana;"><b>FILTRO AVANZADO</b></span></span></div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><span style="color: black; font-family: Verdana, sans-serif;">El Filtro avanzado es utilizado para realizar filtros con criterios más complejos. Se diferencia del Autofiltro al tener que escribir los criterios según los cuales desea filtrar los datos en un rango de criterios independiente situado sobre el rango.</span></div><div style="text-align: justify;"><span style="color: black; font-family: Verdana, sans-serif;"><br />
Puede utilizar el comando Filtro avanzado para aplicar varios criterios a una sola columna, aplicar varios criterios a varias columnas o crear criterios que resulten de una fórmula.</span></div><div style="text-align: justify;"><span style="color: black; font-family: Verdana, sans-serif;"><br />
Cuando se usa un filtro avanzado, las flechas desplegables de Autofiltro no aparecen. En su lugar, se especifica el criterio en un rango de criterios en la hoja de cálculo. Para cambiar la forma en que se filtran los datos, cambie los valores del rango de criterios y vuelva a aplicar el filtro a los datos.</span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-qz5zuWTOQCs/TZv8FrlS2QI/AAAAAAAAAIk/hnzw1pRTGAc/s1600/LISTAS.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="524" src="http://3.bp.blogspot.com/-qz5zuWTOQCs/TZv8FrlS2QI/AAAAAAAAAIk/hnzw1pRTGAc/s640/LISTAS.jpg" width="640" /></a></div><br />
</div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"><span style="color: red; font-family: Verdana;"><b><i><br />
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<span style="color: red; font-family: Verdana;"><b><i>REFLEXIÓN</i></b></span><br />
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<span style="font-family: Verdana, sans-serif;">En esta entrada explicamos como podemos ordenar los los datos de una tabla, stos pueden ser rotulos, números, etc. <span style="color: black;"><span class="cap">L</span>os datos se ingresan con frecuencia en la hoja de cálculos en un orden que es complicado o inhadecuado para el trabajo y para poder contestar ciertas preguntas. <span class="term">Ordenar los datos nos puede</span> ayudar a reconfigurarlos de tal manera que podamos usarlos más eficasmente.</span></span></div><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"> Por último, los filtros nos sirven para facilitarnos la búesqueda de datos dentro de un rango.<span style="font-family: Verdana, sans-serif;"> Al utilizar el filtro este no reorganiza el resultado monstrado pero sí permite aplicar formato, representar en gráficos e imprimir dicho rango.</span></span></span><span style="color: black; font-family: Verdana, sans-serif;"> </span><span style="color: black; font-family: Verdana, sans-serif;"></span></div></div></div><br />
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<div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="color: black;"></span></span></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-14730031853058205092011-02-20T11:26:00.003-06:002012-10-04T22:26:45.175-05:00TABLAS DINAMICAS<b style="color: red;"><span style="font-size: large;">Que es una tabla dinamica?</span></b><br />
<br />
Una tabla dinámica en Excel permite hacer resúmenes de una Base de Datos, utilizándose para,<br />
promediar, o totalizar datos.Para que su uso esté justificado, la cantidad de información con la que<br />
se trabaja en la tabla debe ser relativamente grande.<br />
<br />
El Excel incluye un asistente-guía que facilita la creación de Tablas Dinámicas.Para su utilización<br />
se debe recurrir a Menú- Datos- Informe de Tablas y gráficos dinámicos.<br />
<br />
Partiendo de una tabla ya confeccionada, en nuestro caso la que viene representada a<br />
continuación, se explicarán sobre la misma los principios básicos de las Tablas Dinámicas en<br />
Excel.<br />
<br />
<div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-0HCv14cuLEI/TZS3pASedUI/AAAAAAAAAHI/eDjwwZperGc/s1600/ej_tabla_dinamica.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="281" src="http://4.bp.blogspot.com/-0HCv14cuLEI/TZS3pASedUI/AAAAAAAAAHI/eDjwwZperGc/s400/ej_tabla_dinamica.gif" width="400" /></a></div><br />
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<div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><b><span style="font-family: 'Times New Roman', serif;"><span class="Apple-style-span" style="color: red; font-size: large;">CREAR UNA TABLA DINÁMICA</span></span></b></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><b><span style="font-family: 'Times New Roman', serif;"><span class="Apple-style-span" style="color: red; font-size: large;"><br />
</span></span></b></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><b><span style="font-family: 'Times New Roman', serif;"><span class="Apple-style-span" style="color: red; font-size: large;"><br />
</span></span></b></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span class="Apple-style-span" style="color: #666666; font-size: xx-small;"><b><span style="color: black; font-family: Verdana, sans-serif;"><br />
</span></b></span></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span class="Apple-style-span" style="font-size: x-small;"><b><span style="font-family: 'Times New Roman', serif;"><span class="Apple-style-span" style="color: red;"></span></span></b><span class="Apple-style-span" style="color: #666666;"><b><span style="color: black; font-family: Verdana, sans-serif;">Iniciaremos el Asistente para tablas y gráficos dinámicos</span></b></span></span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span class="Apple-style-span" style="font-family: Verdana, sans-serif; font-size: x-small;"><b><br />
</b></span></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">1.-</span><span class="Apple-style-span" style="color: blue;"> </span>En la hoja de cálculo de Excel, seleccione la celda de la tabla a partir de la que desea crear un informe de tabla dinámica.</span></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">2.-</span> </span><span style="font-family: Verdana, sans-serif;">Para iniciar el Asistente para tablas y gráficos dinámicos, en el menú Datos, haga clic en Informe de tablas y gráficos dinámicos.</span><span class="Apple-style-span" style="color: #666666; font-size: x-small;"><span style="font-family: 'Times New Roman', serif;"></span></span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: 18px; text-align: center;"><a href="http://4.bp.blogspot.com/-HZmGriH33o0/TZURfbgy1fI/AAAAAAAAAHs/Cs_fMOhK7Oc/s1600/ZA001089852.GIF" imageanchor="1" style="color: #2198a6; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" r6="true" src="http://4.bp.blogspot.com/-HZmGriH33o0/TZURfbgy1fI/AAAAAAAAAHs/Cs_fMOhK7Oc/s1600/ZA001089852.GIF" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" /></a></div><div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: 18px; text-align: center;"><br />
</div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">3.-</span> En el Asistente para tablas y gráficos dinámicos - Paso 1 de 3, en ¿Dónde están los datos que desea analizar?, haga clic en Lista o base de datos de Microsoft Office Excel.</span></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">4.-</span> En ¿Qué tipo de informe desea crear?, haga clic en Tabla dinámica.</span></div><div class="MsoNormal" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">5.-</span> Haga clic en Finalizar.</span></div><span style="color: #666666; font-family: Verdana, sans-serif; font-size: 13px; line-height: 18px;"><span style="font-size: x-small;"></span></span><br />
<div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: 18px; text-align: center;"><a href="http://2.bp.blogspot.com/-Zdozte7zWNc/TZUR1EiX3vI/AAAAAAAAAHw/MJ7uJsAriLg/s1600/ZA001091125.GIF" imageanchor="1" style="color: #2198a6; margin-left: 1em; margin-right: 1em; text-decoration: underline;"><img border="0" r6="true" src="http://2.bp.blogspot.com/-Zdozte7zWNc/TZUR1EiX3vI/AAAAAAAAAHw/MJ7uJsAriLg/s1600/ZA001091125.GIF" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" /></a></div><div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: 18px; text-align: center;"><span class="Apple-style-span" style="color: black; font-size: small; line-height: normal;"><b><span style="font-family: 'Times New Roman', serif;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red; font-size: large;"><br />
</span></span></span></b></span></div><div class="separator" style="clear: both; color: #666666; font-size: 13px; line-height: 18px; text-align: left;"><span class="Apple-style-span" style="color: black; font-size: small; line-height: normal;"><b><span class="Apple-style-span" style="color: red; font-family: Times, 'Times New Roman', serif; font-size: large;">AGREGAR DATOS A LA TABLA</span></b></span></div><div class="separator" style="clear: both; line-height: 18px; text-align: left;"></div><div class="MsoNormal" style="color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: center;"><span class="Apple-style-span" style="color: black; font-family: Verdana, sans-serif; font-size: 16px;"><br />
</span></div><div class="MsoNormal" style="color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: left;"><span class="Apple-style-span" style="color: black; font-family: Verdana, sans-serif; font-size: 16px;">Arrastre el campo que contiene los datos que desea resumir, por ejemplo el campo Cantidad, de la Lista de campos de tabla dinámica al área Coloque datos aquí del informe de tabla dinámica.</span></div><div class="MsoNormal" style="color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 36pt; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="color: black; font-family: Verdana, sans-serif; font-size: 12pt;"></span></div><div class="MsoNormal" style="color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="color: black; font-family: 'Times New Roman', serif;"><span style="font-family: Verdana, sans-serif;">El informe de tabla dinámica mostrará ahora los gastos totales de cada categoría.</span></span></div><div class="MsoNormal" style="color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><br />
</div><div class="MsoNormal" style="color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: center;"><span style="color: black; font-family: 'Times New Roman', serif;"><span style="font-family: Verdana, sans-serif;">Tabla dinámica con categorías y gastos totales</span></span></div><div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; text-align: center;"><a href="http://3.bp.blogspot.com/-WY-OX67a-VY/TZUShlNQ5oI/AAAAAAAAAH0/kXUW9Um2toc/s1600/ZA001091126.GIF" imageanchor="1" style="color: #2198a6; margin-left: 1em; margin-right: 1em; text-decoration: underline;"><img border="0" r6="true" src="http://3.bp.blogspot.com/-WY-OX67a-VY/TZUShlNQ5oI/AAAAAAAAAH0/kXUW9Um2toc/s1600/ZA001091126.GIF" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" /></a></div><div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; text-align: center;"><br />
</div><div class="separator" style="clear: both; color: #666666; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; text-align: center;"><br />
</div><div class="separator" style="clear: both; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; text-align: left;"></div><div class="separator" style="clear: both; text-align: left;"><span style="font-family: Verdana, sans-serif;"><strong><span class="Apple-style-span" style="color: red;">Agregar un campo de página de ordenación al informe</span></strong></span></div><div class="separator" style="clear: both; color: #666666; font-size: 13px; text-align: center;"><br />
</div><div class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm;"><span style="color: black; font-family: 'Times New Roman', serif; font-size: 12pt;"><span style="font-family: Verdana, sans-serif;"><span style="font-family: Verdana, sans-serif;">Para filtrar los datos por clase</span>, se puede crear una flecha desplegable en la parte superior de la página.</span></span></div><div class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm;"><br />
</div><div class="MsoNormal" style="color: #666666; line-height: normal; margin-bottom: 0pt; margin-left: 32.2pt; margin-right: 0cm; margin-top: 0cm; text-align: justify; text-indent: -18pt;"><span style="color: black; font-family: Verdana, sans-serif;">1.<span style="font-family: 'Times New Roman';"> </span></span><span style="font-family: Verdana, sans-serif;"><span style="color: black; font-family: '', sans-serif, '', serif;">Arrastre el campo Clase desde la Lista de campos de tabla dinámica hasta el área Coloque campos de página aquí.</span><span style="color: black; font-family: Verdana, sans-serif;"></span></span></div><div class="MsoNormal" style="color: #666666; line-height: normal; margin-bottom: 0pt; margin-left: 32.2pt; margin-right: 0cm; margin-top: 0cm; text-align: justify; text-indent: -18pt;"><span style="font-family: Verdana, sans-serif;"><span style="color: black; font-family: '', sans-serif, '', serif;"><br />
</span></span></div><div class="MsoNormal" style="color: #666666; line-height: normal; margin-bottom: 0pt; margin-left: 32.2pt; margin-right: 0cm; margin-top: 0cm; text-align: justify; text-indent: -18pt;"><span style="font-family: Verdana, sans-serif;"><span style="color: black; font-family: Verdana, sans-serif;">2.<span style="font-family: 'Times New Roman'; font-style: normal; font-variant: normal; line-height: normal;"> </span></span><span style="color: black; font-family: '', sans-serif, '', serif;">Haga clic en la flecha desplegable Clase y seleccione una clase.</span><span class="Apple-style-span" style="font-size: x-small;"><span style="color: black; font-family: Verdana, sans-serif;"></span></span></span></div><div class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><br />
</div><div class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><br />
</div><div class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 10pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: justify;"><span style="font-family: Calibri;"><span style="color: black; font-family: '', sans-serif, '', serif; font-size: 12pt;"><span style="font-family: Verdana, sans-serif;">De este modo, podrá ver las categorías de los gastos correspondientes a las clases, una a una.</span></span><span style="color: black; font-family: Verdana, sans-serif; font-size: 12pt;"></span></span></div><span style="color: blue; font-family: Verdana, sans-serif; font-size: 12pt; text-decoration: none;"><shapetype coordsize="21600,21600" filled="f" id="_x0000_t75" o:preferrelative="t" o:spt="75" path="m@4@5l@4@11@9@11@9@5xe" stroked="f"><stroke joinstyle="miter"></stroke><formulas><f eqn="if lineDrawn pixelLineWidth 0"></f><f eqn="sum @0 1 0"></f><f eqn="sum 0 0 @1"></f><f eqn="prod @2 1 2"></f><f eqn="prod @3 21600 pixelWidth"></f><f eqn="prod @3 21600 pixelHeight"></f><f eqn="sum @0 0 1"></f><f eqn="prod @6 1 2"></f><f eqn="prod @7 21600 pixelWidth"></f><f eqn="sum @8 21600 0"></f><f eqn="prod @7 21600 pixelHeight"></f><f eqn="sum @10 21600 0"></f></formulas><path gradientshapeok="t" o:connecttype="rect" o:extrusionok="f"></path><lock aspectratio="t" v:ext="edit"></lock></shapetype></span><span class="Apple-style-span" style="color: #666666; font-size: small;"><span style="color: black; font-family: Verdana, sans-serif; font-size: 12pt;"></span></span><br />
<div class="separator" style="clear: both; color: #666666; font-size: 13px; text-align: center;"><a href="http://2.bp.blogspot.com/-byFNUDIJ2Hc/TZUqrF3AKCI/AAAAAAAAAIk/bdzBIkNxNYk/s1600/YYYYY.GIF" imageanchor="1" style="color: #2198a6; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" r6="true" src="http://2.bp.blogspot.com/-byFNUDIJ2Hc/TZUqrF3AKCI/AAAAAAAAAIk/bdzBIkNxNYk/s1600/YYYYY.GIF" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" /></a></div><div align="center" class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: center;"></div><div align="center" class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: center;"><span style="color: black; font-family: Verdana, sans-serif; font-size: 12pt;"><br />
</span></div><div align="center" class="MsoNormal" style="color: #666666; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: center;"><span style="color: black; font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="font-size: x-small;">Resultados Filtrados por clase</span></span></div><div align="center" class="MsoNormal" style="color: #666666; font-size: 13px; line-height: normal; margin-bottom: 0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; text-align: center;"><span style="color: black; font-family: Verdana, sans-serif; font-size: 12pt;"></span><span style="color: black; font-family: Verdana, sans-serif; font-size: 12pt;"></span></div><div class="separator" style="clear: both; color: #666666; font-size: 13px; text-align: center;"><a href="http://4.bp.blogspot.com/-QgNqeVtrbgs/TZUq083KNsI/AAAAAAAAAIo/bRYBYDL1xYM/s1600/ZZZZ.GIF" imageanchor="1" style="color: #2198a6; margin-left: 1em; margin-right: 1em; text-decoration: none;"><img border="0" r6="true" src="http://4.bp.blogspot.com/-QgNqeVtrbgs/TZUq083KNsI/AAAAAAAAAIo/bRYBYDL1xYM/s1600/ZZZZ.GIF" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" /></a></div><div class="separator" style="clear: both; color: #666666; font-size: 13px; text-align: center;"><br />
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</div><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-63vOJX-c4Iw/TZwBqNqNuGI/AAAAAAAAAIo/hyNRQl-eq2M/s1600/TABLAS+DINAMICAS+MEE.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="326" src="http://4.bp.blogspot.com/-63vOJX-c4Iw/TZwBqNqNuGI/AAAAAAAAAIo/hyNRQl-eq2M/s640/TABLAS+DINAMICAS+MEE.jpg" width="640" /></a></div><div class="separator" style="clear: both; color: #666666; font-size: 13px; text-align: left;"><br />
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</div><div class="separator" style="clear: both; text-align: left;">Reflexion:</div><div class="separator" style="clear: both; text-align: left;"><br />
</div><div class="separator" style="clear: both; text-align: left;">Una tabla dinamica de excel la utilizamos para resumir una base de datos con grandes cantidades de informacion, con estas podemos separar la informacion dividendola en sectores desplegables y organizandolas a nuestra peferencia, creando asi diferentes maneras de ver la nformacion y haciendo mas sencilla su interpretacion.</div></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-66828560430836390812011-02-19T22:05:00.002-06:002012-10-04T22:26:45.193-05:00SUBTOTALES<span class="Apple-style-span" style="color: red; font-family: Verdana, sans-serif; font-size: large; line-height: 18px;">QUÉ SON LOS SUBTOTALES?</span><br />
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<div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">Los subtotales constituyen una manera rápida y sencilla de resumir datos en listado. Excel crea la fórmula, inserta las filas correspondientes al subtotal y al total y efectúa un esquema de los datos, automáticamente. Así, los datos resultantes son fáciles de formatear, colocar en un gráfico e imprimir.</span></span></small></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;"><br />
</span></span></small></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">En Excel, los subtotales se utilizan cuando trabaja con listas de datos ordenadas. Sirven para realizar cálculos totales y parciales de dichas listas.</span></span></small></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;"><br />
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</span></span></small></div><div class="separator" style="clear: both; text-align: center;"><span style="font-family: Verdana; margin-left: 1em; margin-right: 1em;"><img height="320" src="http://2.bp.blogspot.com/-Yiv_BboKNwo/TZo2LLOxpqI/AAAAAAAAAI8/fK30veA5T-U/s640/subtotal.png" width="640" /></span></div><div class="separator" style="clear: both; text-align: center;"><span style="font-family: Verdana; margin-left: 1em; margin-right: 1em;"><br />
</span></div><div class="separator" style="clear: both; text-align: left;"><span style="font-family: Verdana; margin-left: 1em; margin-right: 1em;"><span class="Apple-style-span" style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px;"></span></span></div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;"><br />
</span></span></small></div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">Debe crear una lista, con los subtotales por empresas acumulando las ganancias debajo de la columna de Beneficios, de forma que pueda ver los totales parciales:</span></span></small></div><div align="justify"><br />
</div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">- Seleccione todo el rango de datos (A1:E11)</span></span></small></div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">- Active la opción <strong>Subtotales</strong> del <strong>Menú Datos</strong></span></span></small></div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">- Active las opciones necesarias:</span></span></small></div><div align="justify"><br />
</div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">Para cada cambio en EMPRESA (con esto agrupara por empresas):</span></span></small></div><ul style="line-height: 1.4; list-style-image: initial; list-style-position: initial; list-style-type: disc; margin-bottom: 0.5em; margin-left: 0px; margin-right: 0px; margin-top: 0.5em; padding-bottom: 0px; padding-left: 2.5em; padding-right: 2.5em; padding-top: 0px;"><li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div align="justify"><small><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="font-size: small;">Usa función SUMA</span></span></small></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div align="justify"><small><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="font-size: small;">Agregue subtotal a BENEFICIOS</span></span></small></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div align="justify"><small><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="font-size: small;">Active la opción aceptar</span></span></small></div></li>
</ul><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-Mb2itW4Hmd0/TZo3EzfmaMI/AAAAAAAAAJA/9WiLTRZBFlU/s1600/sub.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em; text-decoration: none;"><span class="Apple-style-span" style="color: black;"><img border="0" height="346" r6="true" src="http://1.bp.blogspot.com/-Mb2itW4Hmd0/TZo3EzfmaMI/AAAAAAAAAJA/9WiLTRZBFlU/s400/sub.jpg" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" width="400" /></span></a></div><div class="separator" style="clear: both; text-align: center;"><br />
</div><div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;">Observe que han aparecido los subtotales bajo la columna de Beneficios agrupados por países. A la izquierda, aparecen unos signos que controlan el nivel de desglose del subtotal. Puede aumentar o disminuir el nivel del subtotal pulsando en los signos <strong>+</strong> y <strong>–</strong> o, bien, en los números que aparecen sobre estos signos.</span></span></small></div><div class="separator" style="clear: both; text-align: center;"><br />
</div><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-5WsqOrgApqU/TZo3f967NqI/AAAAAAAAAJE/BqRK9Ej622s/s1600/subtres.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em; text-decoration: none;"><span class="Apple-style-span" style="color: black;"><img border="0" height="393" r6="true" src="http://1.bp.blogspot.com/-5WsqOrgApqU/TZo3f967NqI/AAAAAAAAAJE/BqRK9Ej622s/s640/subtres.jpg" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" width="640" /></span></a></div><div class="separator" style="clear: both; text-align: center;"><br />
</div><div align="justify"><small><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="font-size: small;">Para añadir los promedios de gastos, aparte de los subtotales anteriores de los Beneficios, realiza las siguientes instrucciones:</span></span></small></div><ul style="line-height: 1.4; list-style-image: initial; list-style-position: initial; list-style-type: disc; margin-bottom: 0.5em; margin-left: 0px; margin-right: 0px; margin-top: 0.5em; padding-bottom: 0px; padding-left: 2.5em; padding-right: 2.5em; padding-top: 0px;"><li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><span style="font-family: Verdana, sans-serif;"><small>Vuelva a seleccionar la lista de datos y active la opción <strong>Subtotales</strong> del <strong>Menú Datos</strong></small></span></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><span style="font-family: Verdana, sans-serif;"><small>Cambia la opción <strong>Usar función</strong> y escoja la función <strong>Promedio</strong>.</small></span></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><span style="font-family: Verdana, sans-serif;"><small>Active la casilla <strong>Agregar subtotal a GASTOS</strong></small></span></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><span style="font-family: Verdana, sans-serif;"><small>Desactive la casilla <strong>Reemplazar subtotales actuales</strong> (si no la desactiva, perderá los subtotales conseguidos).</small></span></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><span style="font-family: Verdana, sans-serif;"><small>Active la opción Aceptar.</small></span></li>
</ul><div align="justify"><small><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="font-size: small;">Si quiere desaparecer los subtotales, debe activar la opción Subtotales del Menú Datos, y seleccionar Quitar todos.</span></span></small></div><br />
<div align="justify"><small><span style="font-family: Verdana;"><span class="Apple-style-span" style="font-size: small;"><strong>Nota: </strong>Para realizar subtotales de otro campo, por ejemplo, por países, deberá primero ordenar la tabla por esa columna.</span></span></small></div><div style="color: #666666; font-size: 13px;"><small><span style="font-family: Verdana;"><span style="font-size: x-small;"><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-CrHkLwS50Ks/TZwEWOgeKbI/AAAAAAAAAIs/xN9Hu06t8o8/s1600/SUBTOTALES+MEE.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="264" src="http://4.bp.blogspot.com/-CrHkLwS50Ks/TZwEWOgeKbI/AAAAAAAAAIs/xN9Hu06t8o8/s640/SUBTOTALES+MEE.jpg" width="640" /></a></div><br />
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Reflexion:<br />
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La funcion de subtotales es unamanera sencilla de resumir datos en un listado para asi poder trabajar con ellos mas ficilmente, tambien sirven para realizar calculos totales o parciles de dichas listas, en ellos podemos utilizar fromulas como SUMA, MAX, PROMEDIO, etc.<br />
<div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: 18px; text-align: justify;"><small></small></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0tag:blogger.com,1999:blog-5539959740437217345.post-19198418656757862792011-02-18T22:17:00.002-06:002012-10-04T22:26:45.177-05:00CONSOLIDAR DATOS<div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><em><span class="Apple-style-span" style="color: red; font-size: large;">CÓMO CONSOLIDAR DATOS?</span></em></span></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><em><span class="Apple-style-span" style="color: red; font-size: large;"><br />
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</div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: red;">1.-</span> En primer lugar, examina los datos y decide si deseas consolidarlos por posición o por categoría.</span></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana;">Posición Si vas a combinar datos que están en la misma celda en varios rangos, puedes consolidar por posición.</span></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana;">Categoría Si tienes varios rangos con diseños diferentes y vas a combinar datos de filas o columnas que tengan rótulos (nombres de fila y/o columna) coincidentes, puedes consolidar por categoría.</span></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><br />
</div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">2.-</span> Configura los datos que va a consolidar.</span></div><ul style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 1.4; list-style-image: initial; list-style-position: initial; list-style-type: disc; margin-bottom: 0.5em; margin-left: 0px; margin-right: 0px; margin-top: 0.5em; padding-bottom: 0px; padding-left: 2.5em; padding-right: 2.5em; padding-top: 0px;"><li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Asegúrate de que cada rango de datos está en formato de lista: <i>cada columna tiene un rótulo en la primera fila, contiene datos similares y no tiene filas o columnas en blanco.</i></span></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Coloca cada rango en una hoja de cálculo diferente. Ej: una hoja de cálculo diferente para cada vendedor.</span></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">No pongas ningún dato en la hoja de cálculo donde vayas a colocar la consolidación.</span></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Si realizas la consolidación por posición, asegúrate de que cada rango tiene el mismo diseño.</span></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Si realizas la consolidación por categoría, asegúrate de que los rótulos de las columnas o filas que deseas combinar tienen idéntica ortografía y coincidencia de mayúsculas y minúsculas.</span></div></li>
<li style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; list-style-image: initial; list-style-position: initial; list-style-type: none; margin-bottom: 0.25em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0.25em; padding-left: 0px; padding-right: 0px; padding-top: 0.25em; text-indent: 0px;"><div style="text-align: justify;"><span style="font-family: Verdana, sans-serif;">Si deseas, puedes asignar un nombre a cada rango.</span></div></li>
</ul><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">3.-</span> Haz clic en la celda superior izquierda del área donde desees que aparezcan los datos consolidados.</span><br />
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</span></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">4.-</span> En el menú <span class="UI" name="data">Datos</span>, haz clic en <span class="UI" name="consolidate">Consolidar</span>. Aparece el siguiente cuadro:</span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-cxI5qRYPwE0/TZpF--kmaSI/AAAAAAAAAJI/pB9KCHzETJQ/s1600/consol.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em; text-decoration: none;"><span class="Apple-style-span" style="color: black;"><img border="0" height="300" r6="true" src="http://1.bp.blogspot.com/-cxI5qRYPwE0/TZpF--kmaSI/AAAAAAAAAJI/pB9KCHzETJQ/s400/consol.jpg" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" width="400" /></span></a></div><div class="separator" style="clear: both; text-align: center;"><br />
</div><div align="justify"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">5.- </span>En el cuadro <span class="UI" name="function">Función</span>, haz clic en la <i>función de resumen</i> que deseas que utilice Microsoft Excel para consolidar los datos. Ej: sumar, contar o promediar.</span><br />
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</span></div><div align="justify"></div><div align="justify"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">6.-</span> Haz clic en el cuadro <span class="UI" name="reference">Referencia</span>, elige la etiqueta de hoja del primer rango que vas a consolidar, escribe el nombre que asignaste al rango o selecciona el rango y, a continuación, haz clic en <span class="UI" name="add">Agregar</span>. Repite este paso para cada rango.</span><br />
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</span></div><div align="justify"></div><div align="justify"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">7.-</span> Si deseas actualizar la tabla de consolidación automáticamente cada vez que cambien los datos en cualquiera de los rangos de origen y no estás seguro de si más tarde desearás incluir rangos diferentes o adicionales en la consolidación, activa la casilla de verificación <span class="UI" name="createlinkstosourcedata">Crear vínculos con los datos de origen</span>.</span><br />
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</span></div><div align="justify"></div><div align="justify"><span style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="color: red;">8.-</span> Activa las casillas de verificación bajo <span class="UI" name="uselabelsin">Usar rótulos en</span> que indican dónde están localizados los rótulos en los rangos de origen: en la fila superior, la columna izquierda o ambas. Los rótulos que no coincidan con los de las otras áreas de origen producirán filas o columnas independientes en la consolidación.</span><br />
<span style="font-family: Verdana, sans-serif;"><br />
</span></div><div align="justify"></div><span style="font-family: Verdana, sans-serif;">En el ejemplo, el cuadro quedará más o menos así:</span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-J900cVef_W4/TZpGh6n-SZI/AAAAAAAAAJM/ninJ_d7kJzk/s1600/consol1.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em; text-decoration: none;"><span class="Apple-style-span" style="color: black;"><img border="0" height="302" r6="true" src="http://3.bp.blogspot.com/-J900cVef_W4/TZpGh6n-SZI/AAAAAAAAAJM/ninJ_d7kJzk/s400/consol1.jpg" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" width="400" /></span></a></div></div><div style="font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; line-height: 18px; text-align: justify;"><span style="font-family: Verdana;"><span class="Apple-style-span" style="color: red;">9.-</span> Haz clic en aceptar. La hoja de consolidación quedará así:</span><br />
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<div class="separator" style="clear: both; text-align: center;"><span class="Apple-style-span" style="color: black; margin-left: 1em; margin-right: 1em; text-decoration: underline;"><a href="http://4.bp.blogspot.com/-IPbQ1OFtLYk/TZpG17GnU2I/AAAAAAAAAJQ/vQu0wHIDK9k/s1600/consol2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em; text-decoration: underline;"><img border="0" height="135" r6="true" src="http://4.bp.blogspot.com/-IPbQ1OFtLYk/TZpG17GnU2I/AAAAAAAAAJQ/vQu0wHIDK9k/s640/consol2.jpg" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; padding-bottom: 8px; padding-left: 8px; padding-right: 8px; padding-top: 8px; position: relative;" width="640" /></a></span></div><div class="separator" style="clear: both; text-align: center;"><br />
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</div><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-4JL6TWDeNpA/TZwIHgkWDWI/AAAAAAAAAIw/q1TpklHtyuE/s1600/CONSOLIDACION.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="352" src="http://1.bp.blogspot.com/-4JL6TWDeNpA/TZwIHgkWDWI/AAAAAAAAAIw/q1TpklHtyuE/s640/CONSOLIDACION.jpg" width="640" /></a></div><div class="separator" style="clear: both; text-align: left;"><br />
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</div><div class="separator" style="clear: both; text-align: left;">Reflexion:</div><div class="separator" style="clear: both; text-align: left;"><br />
</div><div class="separator" style="clear: both; text-align: left;">La funcion de consolidacion nos permite convinar datos de diferentes rangos, tambien pueden ser de diferentes hojas de calculo del mismo libro, con ellas se pueden resumir datos, aplicar formulas que se encuentran en diferentes rangos o para convinar los datos de celdas de diferentes rangos en una misma.</div></div>mhuletahttp://www.blogger.com/profile/12612975827869405664noreply@blogger.com0