tag:blogger.com,1999:blog-60679171095717979422024-03-05T17:46:00.721-06:00Aprendizaje Mediado por TIC
La intención de este blog es generar conversaciones con quienes compartan el interés en la educación, la educación matemática (cualquier nivel educativo) y el uso de recursos tecnológicos como apoyo del aprendizaje. Se trata de aprender de sus experiencias y compartir algunas de las mías.Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.comBlogger123125tag:blogger.com,1999:blog-6067917109571797942.post-62685419602674608252022-10-21T09:20:00.003-05:002022-10-21T09:30:56.876-05:00La escuela pública según sus maestros<p> Facebook trajo hoy el recuerdo de la publicación de este texto compuesto por los testimonios de algunos docentes que fuimos invitados a participar y que somos productos de las escuelas públicas mexicanas, en los tiempos en que eran garantía de calidad educativa, de docentes con una excelente cultura y que animaban a los escolares a aprender en serio, a preocuparnos por la redacción correcta y por el autoaprendizaje a través de la lectura, por ejemplo. Tiempos en los que el respeto a todos y el civismo se aprendían en casa y se reforzaban en la escuela.</p><p>Mi testimonio inicia en la página 153. Aparecen los testimonios de amigos docentes muy reconocidos y hasta el de un indecente también muy reconocido, que de todo hay en la viña del señor.</p><p>El libro no llegó a estar en librerías aunque hubo una edición impresa limitada, de la cual tengo la fortuna de haber recibido un ejemplar.</p><p>Actualmente se encuentra <a href="https://www.scribd.com/document/329463821/La-Escuela-Publica-Segun-Sus-Maestros" target="_blank">disponible en Scribd</a>, pero se accede al texto completo a través de este enlace: <i><a href="https://adobe.ly/3CR3blZ" target="_blank">La escuela pública según sus maestros</a></i>.</p><p>El maestro Oliva ha seguido con su labor editorial; <i><a href="https://www.instagram.com/p/Ce_asIkrGVs/" target="_blank">Ser maestro ayer y hoy</a> </i>es una de sus publicaciones más recientes.<br /><br />Adendum: refiriéndose a la edición impresa, el maestro Oliva acaba de comunicarme que "<span style="background-color: #f0f2f5; color: #050505; font-family: "Segoe UI Historic", "Segoe UI", Helvetica, Arial, sans-serif; font-size: 15px;">libro club de Tijuana Mexicali lo vende maestra saludos".</span> <br /><br /></p>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859605-7.1852261361788443 -136.8422105 49.43524153617885 -66.5297105tag:blogger.com,1999:blog-6067917109571797942.post-13370890338849820102022-10-20T17:02:00.001-05:002022-10-20T17:02:40.736-05:00Día Mundial de la Estadística 2022<p><br /></p><div class="xdj266r x11i5rnm xat24cr x1mh8g0r x1vvkbs x126k92a" style="background-color: white; color: #050505; font-family: "Segoe UI Historic", "Segoe UI", Helvetica, Arial, sans-serif; font-size: 15px; margin: 0px; overflow-wrap: break-word; white-space: pre-wrap;"><div dir="auto" style="font-family: inherit;">Hoy, 20 de octubre, es el día Mundial de la Estadística (World Statistics Day) creado en 2010 por la United Nations Statistical Commission; la celebración formal solamente ocurre cada cinco años, s<span style="font-family: inherit;">in embargo el día de hoy está dedicado a "</span><a href="https://newsonair.com/2022/10/20/world-statistics-day-2022/?fbclid=IwAR1OEUYKikhdo6orctGadgCiDgftiYKPPIPJdxK1frsK_aVGEd02To1SfG4#:~:text=World%20Statistics%20Day%20falls%20on,for%20the%20times%20to%20come" style="font-family: inherit;" target="_blank">Exploring the language of numbers: World Statistics Day 2022!</a><span style="font-family: inherit;">"</span></div><div dir="auto" style="font-family: inherit;">
En 2013 la Universidad Iberoamericana León ofreció un ciclo de conferencias sobre estadística. El ciclo lo abrió <a href="https://www.researchgate.net/profile/Fernando-Avila-5" target="_blank">Fernando Ávila</a>, a quien tuve el gusto de conocer en la Universidad de Sonora cuando impartí un curso de sociología aplicada a la educación para los docentes de matemáticas; casi simultáneamente trabajamos en la traducción de <a href="https://revue-rdm.com/1981/epistemologie-des-nombres-relatifs/" target="_blank"><i>Epistémologie des nombres rélatifs</i></a>, de Georges Glaeser; la traducción fue publicada por Matemática Educativa en 1983. En aquella ocasión Fernando nos compartió las aplicaciones estadísticas que hacía para <i>Tequila Sauza, </i>como Gerente de Aseguramiento de Calidad. </div><div dir="auto" style="font-family: inherit;"><span style="font-family: inherit;"><br /></span></div><div dir="auto" style="font-family: inherit;"><span style="font-family: inherit;">A mí me tocó cerrar el ciclo con una presentación titulada </span><a href="https://prezi.com/view/5KY6J5oLDysTeBpAh3OF/" style="font-family: inherit;" target="_blank"><i>Leyendo las noticias, nacionales y locales</i></a><span style="font-family: inherit;">, en </span><i style="font-family: inherit;">Prezi</i><span style="font-family: inherit;">, la cual </span><a href="https://www.evernote.com/shard/s215/nl/28620651/62b5e46a-1e17-4975-a3c9-44d159617500/" style="font-family: inherit;" target="_blank">también compartí vía <i>Evernote</i></a><span style="font-family: inherit;">, como texto con enlaces.</span></div></div><div class="x11i5rnm xat24cr x1mh8g0r x1vvkbs xtlvy1s x126k92a" style="background-color: white; color: #050505; font-family: "Segoe UI Historic", "Segoe UI", Helvetica, Arial, sans-serif; font-size: 15px; margin: 0.5em 0px 0px; overflow-wrap: break-word; white-space: pre-wrap;"><div dir="auto" style="font-family: inherit;"><br /></div><div dir="auto" style="font-family: inherit;">El problema sigue siendo el mismo, aunque los indicadores hayan cambiado. Creemos todo lo que nos cuentan sin cuestionar. Sería muy recomendable volver a leer, y hasta hacerlo leer a los estudiantes y hacerlos analizar críticamente un texto que contenga datos estadísticos, el texto de John Allen Paulos, <i>A Mathematician Reads the Newspaper, </i>del cual <a href="https://www.ams.org/notices/199603/comm-kolata.pdf" target="_blank">la American Mathematical Society hizo una reseña</a> en 1996. </div><div dir="auto" style="font-family: inherit;"><br /></div><div dir="auto" style="font-family: inherit;">El libro, traducido al español (acabo de descubrir), está disponible en <i><a href="http://www.librosmaravillosos.com/" target="_blank">Libros Maravillosos</a></i> con el título <i><a href="https://bit.ly/3seaKyd" target="_blank">Un matemático lee el periódico</a></i>.
¡Disfruten!</div></div>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859605-7.1852261361788443 -136.8422105 49.43524153617885 -66.5297105tag:blogger.com,1999:blog-6067917109571797942.post-88181620841026645352021-10-06T10:34:00.002-05:002022-06-17T11:36:51.613-05:00Lenguajes para aprender y comprender el mundo: español y matemáticas<p> <span style="background-color: white; color: #050505; font-family: inherit; font-size: 15px; white-space: pre-wrap;">¿A dónde van que no me hallen?</span></p><div class="o9v6fnle cxmmr5t8 oygrvhab hcukyx3x c1et5uql ii04i59q" style="background-color: white; color: #050505; font-family: "Segoe UI Historic", "Segoe UI", Helvetica, Arial, sans-serif; font-size: 15px; margin: 0.5em 0px 0px; overflow-wrap: break-word; white-space: pre-wrap;"><div dir="auto" style="font-family: inherit;">"Las competencias lingüísticas como pilar para el desarrollo del</div><div dir="auto" style="font-family: inherit;">pensamiento lógico matemático" (renombrado por las autoridades educativas a partir del título original).</div><div dir="auto" style="font-family: inherit;">Info:</div><div dir="auto" style="font-family: inherit;"><span class="pq6dq46d tbxw36s4 knj5qynh kvgmc6g5 ditlmg2l oygrvhab nvdbi5me sf5mxxl7 gl3lb2sf hhz5lgdu" style="display: inline-flex; font-family: inherit; height: 16px; margin: 0px 1px; vertical-align: middle; width: 16px;"><img alt="👉" height="16" referrerpolicy="origin-when-cross-origin" src="https://static.xx.fbcdn.net/images/emoji.php/v9/taa/1.5/16/1f449.png" style="border: 0px;" width="16" /></span> <span style="font-family: inherit;"><a class="oajrlxb2 g5ia77u1 qu0x051f esr5mh6w e9989ue4 r7d6kgcz rq0escxv nhd2j8a9 nc684nl6 p7hjln8o kvgmc6g5 cxmmr5t8 oygrvhab hcukyx3x jb3vyjys rz4wbd8a qt6c0cv9 a8nywdso i1ao9s8h esuyzwwr f1sip0of lzcic4wl py34i1dx gpro0wi8" href="https://bit.ly/3ac1wtl?fbclid=IwAR3LNvLDAoHaTS6Ocb8XxCkEt97AU7HFv54_-KMhi3nyt4u6zjMQ8Nz04h8" original_target="https://bit.ly/3ac1wtl?fbclid=iwar3lnvldaohats6ocb8xxcket97au7hfv54_-kmhi3nyt4u6zjmq8nz04h8" rel="nofollow noopener" role="link" style="-webkit-tap-highlight-color: transparent; background-color: transparent; border-color: initial; border-style: initial; border-width: 0px; box-sizing: border-box; cursor: pointer; display: inline-block; font-family: inherit; list-style: none; margin: 0px; outline: none; padding: 0px; text-align: inherit; text-decoration-line: none; touch-action: manipulation;" tabindex="0" target="_blank" waprocessedanchor="true" waprocessedid="y9bjdj">https://bit.ly/3ac1wtl</a></span></div><div dir="auto" style="font-family: inherit;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-gxJTiTrYU5Q/YV28xmJ_5TI/AAAAAAAARQg/ShPOJEPu06Iw6690cx6pG8VHSot524kqQCLcBGAsYHQ/s801/Foto%2Bpromocion%2B1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="800" data-original-width="801" height="320" src="https://1.bp.blogspot.com/-gxJTiTrYU5Q/YV28xmJ_5TI/AAAAAAAARQg/ShPOJEPu06Iw6690cx6pG8VHSot524kqQCLcBGAsYHQ/s320/Foto%2Bpromocion%2B1.jpg" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-NMKskyW6VbE/YV28xq7X6PI/AAAAAAAARQc/s0bJShzlZ2Mz-TDByhqCl0AvMXnXchQ8gCLcBGAsYHQ/s655/Foto%2Bpromocion%2B2.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="655" data-original-width="503" height="320" src="https://1.bp.blogspot.com/-NMKskyW6VbE/YV28xq7X6PI/AAAAAAAARQc/s0bJShzlZ2Mz-TDByhqCl0AvMXnXchQ8gCLcBGAsYHQ/s320/Foto%2Bpromocion%2B2.jpg" width="246" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: left;">Los datos para el registro están en el enlace.
Adicionalmente, les comparto el <a href="https://drive.google.com/file/d/1kuW8wFCXaup2LFJ4XUKIOwVKiNYz2oKD/view?usp=sharing" target="_blank">texto que redacté para incluir una bibliografía breve</a>, con algunas traducciones que hice libremente, de modo que los docentes no tengan dificultades para acceder a esos contenidos.
Bienvenidos.</div><br /><div dir="auto" style="font-family: inherit;"><br /></div></div>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859605-7.1852261361788443 -136.8422105 49.43524153617885 -66.5297105tag:blogger.com,1999:blog-6067917109571797942.post-90082301054957790892021-09-16T18:27:00.001-05:002021-10-08T16:02:28.370-05:00III Encuentro Matemático del Caribe. Septiembre 2021<p> Del 14 al 17 de septiembre se está celebrando el <a href="https://sites.google.com/view/iiiencuentromatematicocaribe/conferencistas?authuser=0" target="_blank">III Encuentro Matemático del Caribe</a>, desde la Universidad Tecnológica de Bolíva, en Colombia.</p><p>Este año fui invitada a participar como miembro del Comité Científico del evento y a ser parte de una <a href="https://www.youtube.com/watch?v=pMhsMBhX2B4" target="_blank">mesa redonda sobre el tema "Mujeres líderes de proyectos en matemáticas</a>", la cual tuvo lugar hoy, vía Zoom.<br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://lh3.googleusercontent.com/-6bQCVEtamfs/YUPOUQDXV_I/AAAAAAAARP0/WdxYLhLEcD0dZPclT1oPhsCwv-UeaiXhwCLcBGAsYHQ/image.png" style="margin-left: 1em; margin-right: 1em;"><img alt="" data-original-height="1599" data-original-width="900" height="356" src="https://lh3.googleusercontent.com/-6bQCVEtamfs/YUPOUQDXV_I/AAAAAAAARP0/WdxYLhLEcD0dZPclT1oPhsCwv-UeaiXhwCLcBGAsYHQ/w200-h356/image.png" width="200" /></a></div><div class="separator" style="clear: both; text-align: right;"><br /></div><div class="separator" style="clear: both; text-align: right;"><span style="text-align: left;"><br /></span></div>Siempre es un gusto colaborar con el grupo de profesores que organizan estos eventos y, en esta ocasión, con las profesoras investigadoras que participaron en esta actividad. <p></p><p>Con anterioridad nos hicieron llegar las preguntas, recolectadas de las que iban proponiendo quienes se inscribieron para participar. Respondí las que estaban dirigidas a mí en <a href="https://drive.google.com/file/d/1PtqLsJGQYInL5rewBt6lxYsZVix21HHQ/view?usp=sharing" target="_blank">el texto que les comparto</a>. Por supuesto que hubo que improvisar algunas cosas y que los tiempos siempre hay que ajustarlos en función de todos los imprevistos que, inevitablemente, surgen. Sin embargo, la respuesta de los participantes fue muy positiva.</p><p>Como siempre, cualquier comentario es bienvenido.<br /><br /></p>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com2León, Guanajuato, Mexico21.1250077 -101.6859605-7.1852261361788443 -136.8422105 49.43524153617885 -66.5297105tag:blogger.com,1999:blog-6067917109571797942.post-75132494385029631872020-09-10T14:30:00.001-05:002020-12-04T17:32:37.688-06:00Segunda sesión del minicurso en el II Encuentro Matemático del Caribe<p>La segunda sesión del mini curso iniciará el 10 de septiembre a las 3 pm, con una duración de dos horas.</p><p>Los participantes inscritos se conectarán vía la plataforma Zoom en el aula prevista para el encuentro.<br /></p><p>La <a href="https://drive.google.com/file/d/1rAuUcgN9R239jVPSOoiAlh-f_dxOxxuO/view?usp=sharing" target="_blank">presentación que guía esa segunda sesión</a> está disponible para consulta a partir de este momento.</p><p><br /></p><p><span face="Arial, Helvetica, sans-serif" style="background-color: white; color: #222222; font-size: small;">Hay dos presentaciones adicionales, derivadas de las respuestas a los cuestionarios de la primera sesión:</span></p><p class="MsoNormal" style="background-color: white; color: #222222; font-family: Calibri, sans-serif; font-size: 11pt; line-height: 15.6933px; margin: 0in 0in 8pt;">1. p<a href="https://drive.google.com/file/d/1iqBZhkMHPRIpdL7_8qLLSUjY07Tm439A/view?usp=sharing" target="_blank">ara responder a algunas inquietudes</a>: </p><p class="MsoNormal" style="background-color: white; color: #222222; font-family: Calibri, sans-serif; font-size: 11pt; line-height: 15.6933px; margin: 0in 0in 8pt;">2. para compartir <a href="https://drive.google.com/file/d/1euficwjvKpr4tg3JtSCLnHKdjwIuGfzh/view?usp=sharing" target="_blank">una brillante exposición de cómo un concepto/instrumento, se enriquece al irse adecuando a nuevas situaciones</a>.<br /><br /> Y hay un <a href="https://drive.google.com/file/d/1dHFlLYiqNLsvsdYIkFsbc3ARkilK9Qbx/view?usp=sharing" target="_blank">análisis muy somero de las respuestas que dieron los docentes</a> a cada uno de los cinco cuestionarios que se les propusieron durante y al final del taller.</p>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859605-7.1852261361788443 -136.8422105 49.43524153617885 -66.5297105tag:blogger.com,1999:blog-6067917109571797942.post-22011455232454589912020-09-09T14:30:00.000-05:002020-09-09T14:59:11.930-05:00Mini curso en el II Encuentro Matemático del Caribe<p>En octubre pasado, al terminar mi conferencia en el Congreso de la SMM, en Monterrey, el profesor Eber Lenes Puello, de la Universidad del Sinú en Cartagena, Colombia, se acercó a mí para proponerme la impartición de un curso durante la Semana Pedagógica que se desarrolla en mayo de cada año en su universidad. Acepté sorprendida por su gentileza y confianza. Sin embargo, la pandemia no nos permitió cumplir con el plan.<br /></p><p>A cambio, el pasado 4 de marzo ofrecí una conferencia virtual para sus docentes: <a href="https://www.researchgate.net/publication/341215690_Un_cambio_necesario_en_la_ensenanza_de_las_matematicas" target="_blank">Un cambio necesario en la enseñanza de las matemáticas</a>, acompañada de una propuesta de <a href="https://www.academia.edu/42971458/Actividades_para_una_unidad_de_aprendizaje_la_circunferencia" target="_blank">Actividades para una unidad de aprendizaje</a>. </p><p>Luego vino la propuesta para participar impartiendo un mini curso de 4 horas, repartido en dos sesiones en el <i><a href="http://ii-encuentro-matematico-del-caribe.mozello.com/cronograma/?fbclid=IwAR12woQNx-If-tY8TFkmdxSLvEpLrgBqupK3claRynSzC0vxIETrC1l04ak" target="_blank">II Encuentro Matemático del Caribe</a></i>, virtual y sin costo para los interesados, a desarrollarse del 9 al 12 de septiembre. Adicionalmente, participar en la Mesa redonda 1.</p><p><img alt="" height="288" src="data:image/png;base64,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" width="477" /></p><p>Llegó el día. La mesa redonda dará inicio a las 10 am, hora del centro de México; la primera sesión del mini curso iniciará este mismo día, a las 3 pm, con una duración de dos horas.<br /></p><p>Quienes se hayan inscrito, se conectarán vía la plataforma Zoom en el aula prevista para el encuentro.<br /></p><p>La <a href="https://drive.google.com/file/d/1OOiAKOCQSCIin9vywYUfUPey45xo2Bqc/view?usp=sharing" target="_blank">presentación que guía esa primera sesión</a> está disponible para consulta a partir de este momento.</p>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com2León, Guanajuato, Mexico21.1250077 -101.6859605-7.1852261361788443 -136.8422105 49.43524153617885 -66.5297105tag:blogger.com,1999:blog-6067917109571797942.post-79231867067616612062020-05-01T11:00:00.000-05:002020-05-01T11:00:08.114-05:00Conferencia de didáctica de las matemáticas.Durante el Congreso de la Sociedad Matemática Mexicana, en octubre 2019, en Monterrey, el Dr. Eber Lenes Puello, de la Universidad del Sinú, en Colombia, me extendió una invitación para ofrecer un curso a sus docentes, en la tercera semana de mayo.<br />
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Llegó el Covid-19 y fue haciéndose evidente que sería imposible hacer el curso presencial. Hace una semana, exactamente, el 26 de abril, me pidieron que, a cambio, ofreciera una conferencia virtual, vía Webex, para el viernes 1 de mayo. Hora de inicio: 11 am hora del centro.<br />
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Lamento no poder compartir el enlace, porque se hará a través del canal de la universidad. Pero <a href="https://drive.google.com/file/d/1pTq4VvyCYsOsq2G_8knUSouXzT7_knO5/view?usp=sharing" target="_blank">aquí está la presentación completa</a>, la cual tiene el enlace a las actividades para desarrollar una pequeña propuesta didáctica, elaborada como ejemplo.<br />
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Sus comentarios son siempre bienvenidos.Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0tag:blogger.com,1999:blog-6067917109571797942.post-26508027209452171472020-02-08T09:45:00.000-06:002020-02-08T09:45:31.854-06:00Disrupción en educación. Origen y prácticas.<span style="background-color: white; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13.2px;">Finalmente, las conferencias virtuales dentro del</span><span style="background-color: white; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13.2px;"><span style="color: blue;"> <i><a href="https://events.floridaglobal.university/innovacioneducativa/" target="_blank">I</a></i></span></span><span style="background-color: white; color: blue; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13.2px; text-decoration-line: none;"><i><a href="https://events.floridaglobal.university/innovacioneducativa/" target="_blank">Congreso de Innovación Educativa: Educación Disruptiva, de la Florida Global University</a></i></span> <span style="background-color: white; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13.2px;">se llevaron a cabo los días 7 y 8 de febrero. Las grabaciones de ellas estarán disponibles proximamente y, entonces, podré compartirles el enlace. Mi conferencia tuvo lugar ayer, 7 de febrero.</span><br />
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<span style="background-color: white; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13.2px;">Aquí el enlace a la presentación:</span><span style="background-color: white; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13.2px;"><span style="color: #484848;"> </span><i style="color: #484848;"><a href="https://drive.google.com/file/d/1FsJJ7JHeOAfMUc4pR-u6Ce0DvHDZpUYG/view?usp=sharing" target="_blank">Disrupción en educación. Origen y prácticas</a></i><span style="color: #484848;">.</span><br /><br /><br />Como siempre, sus comentarios y observaciones son más que bienvenidos.</span>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-7122558329812099542019-12-11T08:47:00.000-06:002019-12-11T08:47:59.597-06:00Recuento 2019Termina un año que ha sido generoso en muchos sentidos, con algún detalle no muy grato (la estafa de parte de Oscar O'Farrill, en febrero).<br />
<br />El balance es muy positivo. Además de los congresos, conferencias y otro tipo de invitaciones para participar en eventos diversos (previamente compartidos), el año termina con la recalendarización de algunos, para realizarse al iniciar 2020:<br />
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<ul>
<li>Mi curso/taller sobre evaluación, en Durango (enero)</li>
<li>Mi conferencia virtual dentro del <a href="https://events.floridaglobal.university/innovacioneducativa/" target="_blank">Congreso de Innovación Educativa: Educación Disruptiva de la Florida Global University</a> (todas las conferencias virtuales se pospusieron para febrero)</li>
</ul>
<br />Pero tambén llegaron otras invitaciones:<br /><ul>
<li><a href="https://www.facebook.com/edtechsummitseries/posts/2360773150850874" style="font-style: italic;" target="_blank">Ed Tech Summit</a><i>, </i><a href="https://www.facebook.com/MahattattvaIndia/photos/a.841871762674664/1197501467111690/?type=3&theater" style="font-style: italic;" target="_blank">Design Thinking for Social Change</a><i>, by </i><a href="https://mahattattva.in/" style="font-style: italic;" target="_blank">Mahattattva</a><i>, </i>en los primeros días de febrero. Participaré en línea porque me resulta imposible viajar a Delhi.</li>
<li>Curso/taller sobre didáctica en la Universidad del Sinú, Colombia, en mayo</li>
<li>La inclusión de mi trabajo en el proyecto de Adriana Martínez Martínez, <a href="https://www.researchgate.net/project/Implementacion-del-aprendizaje-invertido" target="_blank">Implementación del aprendizaje invertido</a>.</li>
<li>Posibilidad de otro taller en Durango, dicen</li>
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Y la cereza del pastel, llegada hace un par de días: el libro en el que colaboré (dos capítulos), fue ya publicado por la UNAM. Está disponible en <i>ResearchGate</i> y en <i>Academia</i>, pero nos autorizaron a compartir el documento completo: <a href="https://drive.google.com/open?id=1AphxnGhZOCqzCK4IczBITy5JPuzHjKtS" target="_blank">Estrategias y prácticas innovadoras. La educación ante el siglo XXI</a>.</div>
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Si lo académico fue muy satisfactorio, en lo personal, como madre, no lo ha sido menos.<br /><br />Y doy gracias una vez más.<br /><br />Tengan muy felices fiestas navideñas y un muy merecido período vacacional.Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-61581094606874610992019-10-27T18:12:00.003-06:002021-10-11T14:40:38.542-05:00Recuento de mi estancia en Monterrey, acudiendo al 52 Congreso Nacional de la SMMLa experiencia completa en la ciudad, desde mi llegada y hasta mi regreso a León, Guanajuato, está narrada en mi otro blog bajo el título <i><a href="https://bparramosqueda.wordpress.com/2019/10/27/27-de-octubre-comptes-rendus/" target="_blank">Comptes rendus</a></i>. De todo, incluyendo experiencias y fotos del taller que impartí.<br />
<br />
De esa publicación retomo, y pongo enseguida, el enlace (varios documentos) al libro <i><a href="https://www.dropbox.com/home/100%20horas%20de%20matematicas" target="_blank">Matemáticas 100 horas</a></i> (para estudiantes de primer grado de secundaria) el cual diseñamos, redactamos, imprimimos, fotocopiamos, compaginamos, armamos, pusimos a prueba y corregimos antes de llegar a esta versión, entre 1975 y 1977. Las gracias reiteradas para Dulce Karina Rodríguez, quien se dio a la tarea de rescatar ese documento, poniéndolo en formato PDF, hace unos 10 años.<br />
<br />
Si los materiales y las experiencias compartidas les son de utilidad, se habrá logrado el objetivo.<br /><br />Como siempre, sus comentarios son bienvenidos.Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-72043397587434316312019-10-27T17:54:00.000-06:002019-10-27T17:56:25.023-06:00<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin: 0px auto 28px; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
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<span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Hace un par de años, al descubrirse y hacerse público el
plagio de la tesis de EPN, escribí esta nota en Facebook. El problema del
plagio no comienza con una tesis o un artículo del que alguien se apropia. Se
las comparto.<br />
<br />
La reacción frente a la nota (que para nada es novedosa) sobre la deshonestidad
académica del señor ex presidente (y pareciera que no escucharon a su virrey
educativo, que plagiaba citas y datos en sus rollos) exige recordar que la
deshonestidad de cualquier tipo no se genera en la universidad. Es triste, es
grave, es un delito … en el que todos (excepciones honrosas) participamos de
diferentes maneras. <br /></span></div>
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<span style="background-color: transparent; font-size: 10pt;">Va una larga lista recogida en 44 años de docencia</span><span style="background-color: transparent;"> </span><span style="background-color: transparent; font-size: 10pt;">en cada uno de los niveles educativos que van de secundaria a doctorado como </span><span style="background-color: transparent; font-size: 10pt;">investigadora, docente y coordinadora de docentes, y en los 34 años como madre </span><span style="background-color: transparent; font-size: 10pt;">de un escuincle que no entendía que sus maquetas hechas con materiales de reúso </span><span style="background-color: transparent; font-size: 10pt;">recibieran una calificación muy inferior a las de los alumnos que habían pagado </span><span style="background-color: transparent; font-size: 10pt;">porque se las hicieran, por ejemplo.</span></div>
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Cada cosa citada es una experiencia vivida. Y si quieren detalles de una
institución o empresa particular, pues me la solicitan: guardo TODAS las
evidencias por escrito.<br />
<br />
</span><b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los padres de familia:</span></b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "courier new"; font-size: 14.0pt;"><o:p></o:p></span></div>
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<ul>
<li>Desde jardín de niños la expectativa y la exigencia
de los padres sobre sus hijos (todos genios y artistas en potencia, por
supuesto) para que obtengan medallas, diplomas y todo tipo de reconocimientos.</li>
<li>El valor de los indicadores para las escuelas y el
sistema educativo propicia que cada uno se valga de todo para obtener lo que
quiere o le exigen. ·</li>
<li>Las medallas que se suelen colgar en las paredes
para impresionar y convencer a otros, los títulos sin los cuales nuestro nombre
está incompleto.</li>
<li>Las becas y estímulos económicos que se otorgan por
la cantidad de publicaciones, y no por su calidad, o por el grado de complicidad
con quienes tienen el poder de otorgarlas.</li>
</ul>
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<!--[if !supportLists]--><span style="font-family: "wingdings"; font-size: 12.0pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><b><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt;">De parte de los alumnos:</span></b><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;"> </span><span style="font-family: "times new roman" , serif; font-size: 12.0pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l4 level1 lfo2; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">asumir que no tienen responsabilidad alguna, que
todo es culpa del docente porque les tiene envidia, no los quiere, les tiene
tirria, no les llama con palabras cariñosas, usa lenguaje que el alumno no
entiende, califica con demasiado rigor </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l4 level1 lfo2; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">aplicar todas las cosas aprendidas en su casa y de
las experiencias de sus compañeros para sobornar al profe y, si no funciona,
buscar maneras de extorsionarlo, amenazarlo e, incluso, asesinarlo (sí, es una
tristísima experiencia) </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l4 level1 lfo2; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">ir a la escuela (así la llaman sin importar el
nivel educativo) porque tienen que y no porque quieren aprender </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">copiar tareas, copiar en exámenes, y cualquier cosa
que funcione para evitar el reto de aprender</span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">acudir a cualquier instancia para obligar (tratar
de) que el docente asigne una nota alta, porque sí, porque soy muy inteligente,
porque en mi casa me van a quitar el carro, porque mis padres se van a
decepcionar, … </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los maestros:</span></b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "courier new"; font-size: 12.0pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l1 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Malas prácticas de enseñanza y desconocimiento de
lo formativo que incluyen: </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Dejar como tarea 50 o 100 ejercicios que por
supuesto que no van a revisar y que solamente cuentan como entregadas </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Pedir ensayos de x páginas, que tampoco revisan,
propiciando (de verdad) que el alumno incorpore lo que sea para cumplir con la
cuota </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Desconocer las herramientas para revisar y detectar
plagio e, incluso, no considerarlo como un delito sino como un errorcito </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Asumir que tendrán tiempo y oportunidad de que en
el futuro y “en su momento” se les exigirá a los alumnos hacerlo bien </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l1 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Aceptar las presiones de los padres de familia y de
los directivos de las escuelas (en todos los grados): </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Buscando, sobre todas las cosas, una buena
evaluación por parte de los alumnos, formal o informalmente, para que no se
quejen o lo acusen y, como consecuencia, lo cuestionen formalmente, condicionen
su permanencia laboral, o de plano lo descalifiquen </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Buscando los premios, distintivos y reconocimientos
que pueden recibir en forma de diplomas, medallas, dinero en efectivo o
cualquier otra cosa. El ego es canijo </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Desconocimiento de lo que significa </span><b><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt;">evidencias de desempeño</span></b><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;"> y la importancia de los portafolios de los alumnos
para validar su practica </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoListParagraphCxSpMiddle" style="background: white; line-height: normal; margin-bottom: 9.0pt; mso-add-space: auto; mso-list: l1 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Asumir sin protestar que no tiene maneras de darle
la vuelta a las imbecilidades de la burocracia escolar, perdiendo su libertad
de catedra </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoListParagraphCxSpLast" style="background: white; line-height: normal; margin-bottom: 9.0pt; mso-add-space: auto; mso-list: l1 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Aceptar que una persona decente no protesta, no se
indigna, que eso es de chairos y salir a la defensa del sistema </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt;">
<br /></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt;">
<b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los directivos escolares y las propias instituciones (todos
los grados):</span></b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="color: #1d2129; font-family: "courier new"; font-size: 14.0pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Admitir sin cuestionar que el cliente (padres y/o
alumnos) tiene la razón, siempre, contra lo que el docente diga o demuestre </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Pasar por alto los documentos fundacionales de la
institución para buscar clientes </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Presionar por altos puntajes en la evaluación del
docente por parte de los alumnos, a costa de lo que sea </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Presionar por alto índice de aprobación de cada
curso y por alto promedio en las calificaciones de los alumnos </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Preferir la enseñanza por repetición, tradicional,
al aprendizaje verdadero. Por ejemplo, validar que el alumno: </span><i><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt;">tiene que decir lo que es el color exactamente como
está escrito en el libro de texto</span></i><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">
·</span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Descalificar a los docentes, quitarles toda la
autoridad dentro del aula y frente a los clientes </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Sobornar (tratar de) al docente para que “se
cuadre” y actúe como se espera</span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">· Castigar al docente que no acepta involucrarse en
semejantes prácticas </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoListParagraph" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; mso-add-space: auto; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "wingdings"; font-size: 12.0pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><b><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt;">De parte de las autoridades educativas estatales y
nacionales:</span></b><span style="font-family: "times new roman" , serif; font-size: 12.0pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Apuntar a indicadores y no a formación (ni técnica,
ni profesional ni integral) para cumplir con cuotas basadas en criterios
establecidos por instancias de control tipo OCDE y similares </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Apostar por la obediencia en todos los niveles,
comenzando por la de los directivos de las escuelas y la de los docentes,
utilizando todo tipo de recursos </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Desvirtuar el trabajo docente y de investigación a
través del otorgamiento de estímulos y recompensas al trabajo que realmente
reconocen cantidad y no calidad. Gabriel Zaid tiene mucho escrito al respecto </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Llevar a cabo licitaciones amañadas, entre cuates,
para lograr sus propósitos </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .5in; margin-right: 0in; margin-top: 0in; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Otorgar estímulos a investigadores y docentes por
recomendaciones y para acallar voces y no por méritos válidos</span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;"><br />
</span><b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los investigadores:</span></b><span style="color: #1d2129; font-family: "courier new"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "courier new"; font-size: 14.0pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Buscar los estímulos y recompensas a costa de lo
que sea </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Trucando datos para satisfacer las hipótesis
preestablecidas </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Estableciendo resultados a partir de una
selección de datos recogidos previamente y sin una base metodológica </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
</div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Manipulando la información recabada en su estudio
para que las conclusiones quepan en el marco teórico establecido </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
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<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Validando estudios y tesis sin revisar a fondo
metodologías, bibliografías, etc. </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Aceptando que hay que hacer </span><i><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt;">papers</span></i><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">
de lo que sea pero que se publiquen, mejor en el extranjero, para incrementar
puntos frente a instancias evaluadoras </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Participar en esos grupos de intercambio de citas
</span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="background-color: white; box-sizing: border-box; color: #1d2129; direction: ltr; font-family: Georgia, serif; margin-bottom: 28px; margin-left: auto; margin-right: auto; white-space: pre-wrap; width: 700px; word-wrap: break-word;">
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">o Auto plagiarse para producir muchos </span><i><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt;">papers</span></i><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">
en diferentes idiomas y con títulos ligeramente modificados en este afán de
generar puntos </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 9.0pt; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-list: l3 level1 lfo5; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #1d2129; font-family: "wingdings"; font-size: 13.5pt;">Ø<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt;">Apropiarse del trabajo de sus estudiantes y
publicarlo como propio </span><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 13.5pt;"><o:p></o:p></span></div>
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<span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt; line-height: 115%;">Probablemente sea
redundante, como redundante ha sido la constatación de estos puntos.<br />
<br />
A raíz del plagio de mi texto sobre los logaritmos de los números negativos
-presentado en París en 1980 y en proceso de revisión para ser publicado en la </span><i><span style="color: #1d2129; font-family: "inherit" , serif; font-size: 10.0pt; line-height: 115%;">Enciclopedia Universalis</span></i><span style="color: #1d2129; font-family: "georgia" , serif; font-size: 10.0pt; line-height: 115%;"> en el apartado de Historia de las
matemáticas, a cargo de mi profesor Jean-Luc Verley- , plagio a cargo de un
grupo de alumnos (ahora flamantes investigadores multireconocidos y premiados)
y el jefe del posgrado en el que trabajaba, me presenté ante el jefe, primera
instancia, para hacer el reclamo: los alumnos habían asistido a un coloquio
organizado por la Maestría en Educación Matemática del CCH-UNAM, donde presenté
el trabajo y del cual entregué copias. En el documento que publicaron me daban
crédito por la traducción de la memoria de D’Alambert sobre los logaritmos de
los números negativos, documento que me había sido proporcionado por el Prof.
Verley. Les dejo la respuesta de Fernando Hitt -el jefe mencionado: “Las ideas
están en el aire; cualquiera las puede tomar”</span><span style="font-family: "courier new";"><o:p></o:p></span></div>
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Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0tag:blogger.com,1999:blog-6067917109571797942.post-49999817801016956242019-10-23T10:00:00.000-05:002019-10-23T10:00:07.950-05:00Mi conferencia en el 52 Congreso Nacional de la SMMAl terminar mayo recibí la honrosa invitación para participar como conferenciasta en este evento, dentro del área de Matemática Educativa. El tema se describe en el título: <i>Planteamiento y resolución de problemas en el desarrollo del pensamiento matemático</i>, y está programada para el miércoles 23 de octubre 2019 de 12 a 13 horas.<br />
<br />
La presentación que desarrollé para la conferencia está en <a href="https://drive.google.com/file/d/1OMNIwj222pslIUqmYJCQ80uT4_W787cy/view?usp=sharing" target="_blank">este enlace</a> y en el título se incluye el enlace al texto que la originó.<br />
<br />
Adicionalmente propuse un taller para profesores de educación básica, con 8 horas de duración, distribuidas en cuatro sesiones programadas del martes 22 al viernes 25 en horario de 9 a 11 a.m. El título del taller: <span style="background-color: white; font-family: "arial" , "arial narrow" , "arial" , sans-serif; font-size: 14px;"><span style="color: #828282;">"</span><i>Todo lo que usted siempre quiso saber de matemáticas pero temía preguntar. Reflexiones en torno al planteamiento y resolución de problemas<span style="color: #828282;">. </span></i></span><br />
<br />
El taller no puede ser descrito en su totalidad, pero aquí va el resumen:<br />
<span style="background-color: white; color: #565656; font-family: "arial narrow" , "arial" , sans-serif; font-size: 18px;"><br /></span>
<span style="background-color: white; color: #565656; font-family: "arial narrow" , "arial" , sans-serif; font-size: 18px;"><i>Una de las limitaciones que los docentes de nivel básico han manifestado, en cursos y talleres ofrecidos anteriormente, es su falta de experiencia para crear/diseñar problemas significativos que reamente involucren a sus alumnos en la construcción y aplicación del conocimiento matemático. En este taller se tratará de ayudarlos a desarrollar habilidades en esa dirección, haciendo uso de elementos de diseño curricular utilizando estrategias como Aprendizaje Basado en Proyectos (101 años de su creación), Aprendizaje Basado en Problemas (a 60 años de su implementación) y SOLE (a 20 años de su inicio). En torno a esta problemática, se trabajarán y clarificarán los conceptos matemáticos involucrados, los cuales dependerán de las situaciones didácticas que se desarrollen durante el taller. </i></span><br />
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Como siempre, sus comentarios son bienvenidos.Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-63306711751175424492019-10-22T07:30:00.000-05:002019-10-22T07:30:00.704-05:00Todo lo que usted siempre quiso saber sobre matemáticas pero ...En la entrada anterior compartí el enlace a la conferencia que impartiré, por invitación, en el marco del 52 Congreso de la Sociedad Matemática Mexicana a celebrarse en Monterrey, Nuevo León, del 21 al 25 de octubre.<br />
<br />
Comenté también que, adicionalmente, propuse un taller para profesores de educación básica, con 8 horas de duración, distribuidas en cuatro sesiones programadas del martes 22 al viernes 25 en horario de 9 a 11 a.m. El título del taller: <span style="background-color: white; font-family: "arial" , "arial narrow" , "arial" , sans-serif; font-size: 14px;"><span style="color: #828282;">"</span><i>Todo lo que usted siempre quiso saber de matemáticas pero temía preguntar. Reflexiones en torno al planteamiento y resolución de problemas<span style="color: #828282;">. </span></i></span><br />
<br />
Compartí entonces el resumen del taller:<br />
<br />
<div class="MsoNormal">
<i><span lang="ES-MX" style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 115%;">Una de las
limitaciones que los docentes de nivel básico han manifestado, en cursos y
talleres ofrecidos anteriormente, es su falta de experiencia para crear/diseñar
problemas significativos que reamente involucren a sus alumnos en la
construcción y aplicación del conocimiento matemático. En este taller se
tratará de ayudarlos a desarrollar habilidades en esa dirección, haciendo uso
de elementos de diseño curricular utilizando estrategias como Aprendizaje
Basado en Proyectos (101 años de su creación), Aprendizaje Basado en Problemas
(a 60 años de su implementación) y SOLE (a 20 años de su inicio). En torno a
esta problemática, se trabajarán y clarificarán los conceptos matemáticos
involucrados, los cuales dependerán de las situaciones didácticas que se desarrollen
durante el taller. </span></i><span lang="ES-MX" style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 115%;"><o:p></o:p></span></div>
<div class="MsoNormal">
<i><span lang="ES-MX" style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 115%;"><br /></span></i></div>
Lo que ocurra dentro de él, las preguntas y los procesos de quienes se animen a participar no pueden ser descritos aquí. Me conformaría con poder hacer un recuento posterior.<br />
<br />
El diseño del taller se muestra a continuación:<br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://1.bp.blogspot.com/-Nrt73Fsp-ew/XajXBWjSLtI/AAAAAAAAQIY/AUZxAErlnlU6uIqlKgjS6CxQNDdEHMCyACLcBGAsYHQ/s1600/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_1.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="1600" data-original-width="1237" height="320" src="https://1.bp.blogspot.com/-Nrt73Fsp-ew/XajXBWjSLtI/AAAAAAAAQIY/AUZxAErlnlU6uIqlKgjS6CxQNDdEHMCyACLcBGAsYHQ/s320/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_1.jpg" width="246" /></a></div>
<a href="https://1.bp.blogspot.com/-oLftii3Hrms/XajXBer1naI/AAAAAAAAQIc/rNPANHeenmUuA5Hxcuzvl_R6U5-51RLEACLcBGAsYHQ/s1600/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_2.jpg" imageanchor="1" style="clear: left; display: inline !important; margin-bottom: 1em; margin-right: 1em; text-align: center;"><img border="0" data-original-height="1600" data-original-width="1237" height="320" src="https://1.bp.blogspot.com/-oLftii3Hrms/XajXBer1naI/AAAAAAAAQIc/rNPANHeenmUuA5Hxcuzvl_R6U5-51RLEACLcBGAsYHQ/s320/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_2.jpg" width="246" /></a><br />
<a href="https://1.bp.blogspot.com/-YLp_VClvudQ/XajXBU5kQcI/AAAAAAAAQIU/uFNo9Fu6CGUZsSg-JbjZ1NM9chyblbY_ACLcBGAsYHQ/s1600/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_3.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em; text-align: center;"><img border="0" data-original-height="1600" data-original-width="1237" height="320" src="https://1.bp.blogspot.com/-YLp_VClvudQ/XajXBU5kQcI/AAAAAAAAQIU/uFNo9Fu6CGUZsSg-JbjZ1NM9chyblbY_ACLcBGAsYHQ/s320/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_3.jpg" width="246" /></a><br />
<a href="https://1.bp.blogspot.com/-fkpIxTyrpc8/XajXCCz337I/AAAAAAAAQIg/r79mZhKJ3W8ipKyaIsPwKNVYDb-4IjJuACLcBGAsYHQ/s1600/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_4.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em; text-align: center;"><img border="0" data-original-height="1600" data-original-width="1237" height="320" src="https://1.bp.blogspot.com/-fkpIxTyrpc8/XajXCCz337I/AAAAAAAAQIg/r79mZhKJ3W8ipKyaIsPwKNVYDb-4IjJuACLcBGAsYHQ/s320/Taller%2Btodo%2Blo%2Bque%2Bsimpre%2Bquiso_Page_4.jpg" width="246" /></a><br />
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El enlace al documento completo está <a href="https://drive.google.com/file/d/1euuuEEcC0StsIinLHA7Qd3cHHrqmd6Fl/view?usp=sharing" target="_blank">aquí</a>.<br />
<br />
Una actividad extra, en la que llevaba ya unas semanas buscando redondearla, resultó de una epifanía durante una conferencia sobre arte. <a href="https://drive.google.com/file/d/1rN4oFk2X_VVybUVUKwGNKzNZ6y9NRcDp/view?usp=sharing" target="_blank">Aquí la historia</a>.<br />
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Como siempre, sus comentarios serán bien recibidos.<br />
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<span style="background-color: white; color: #565656; font-family: "arial narrow" , "arial" , sans-serif; font-size: 18px;"><br /></span>
Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-80821158175201011522019-06-18T17:06:00.000-05:002019-06-18T17:09:24.664-05:00Nota escrita para Tachas, sobre los taches o tachas.<div class="MsoNormal" style="line-height: normal;">
<span style="font-family: "arial" , sans-serif; font-size: 12.0pt;"><br />
<br />
<i>Tachas </i>es un semanario del periódico en línea <i><a href="http://www.eslocotidiano.com/opinion/autor/14/blanca-parra" target="_blank">Es lo cotidiano</a></i>, en el que solía escribir algunos artículos sobre opinión en
el rubro de educación, particularmente.<br />
<br />
El tema de las <i>Tachas </i>fue proporcionado por el editor, Leopoldo Navarro, en abril
de 2016. Va:<o:p></o:p></span></div>
<i><span style="background: white; color: #3c3c3c; font-family: "arial" , sans-serif;"><br /></span></i><a href="http://www.eslocotidiano.com/articulo/tachas-151/tachas-tachas/20160430003050029375.html" style="font-family: arial, sans-serif; font-size: 16px;" target="_blank">Tachas para Tachas</a><br />
<i><span style="background: white; color: #3c3c3c; font-family: "arial" , sans-serif;"><br /></span></i>
<div style="margin-bottom: .0001pt; margin: 0in;">
<i><span style="background: white; color: #3c3c3c; font-family: "Arial",sans-serif;">Tachas</span></i><span style="background: white; color: #3c3c3c; font-family: "Arial",sans-serif;"> llega a su número 151, lo que implica un
trabajo constante de casi tres años.</span><span style="font-family: Arial, sans-serif;"><o:p></o:p></span></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "Arial",sans-serif;">En
el <a href="http://bit.ly/26vwK6v" style="box-sizing: border-box; outline: none; text-decoration-line: none;"><span style="color: #1d70b7;">número 1</span></a>,
publicado el 9 de junio de 2013, Alejandro García nos explicaba <a href="http://bit.ly/26vwtR5" style="box-sizing: border-box; outline: none; text-decoration-line: none;"><em style="box-sizing: border-box;"><span style="color: #1d70b7;">¿Por
qué Tachas?</span></em></a> , y reproducía un párrafo del <a href="https://www.letraslibres.com/mexico-espana/tachas" target="_blank">cuento
de Efrén Hernández</a>. Yo, que no tengo mucha capacidad de
almacenamiento en mi memoria, comencé a divagar e indagar sobre las acepciones
de la palabra hasta que me topé con este extraordinario cuento y regresé a leer
el inicio de este Semanario.<o:p></o:p></span></div>
<div style="margin-bottom: .0001pt; margin: 0in;">
<span style="font-family: "Arial",sans-serif;">Sin
embargo Efrén Hernández no registra todos los usos de la palabra tachas,
particularmente porque su acepción más conocida en estos tiempos, como
sinónimo de la droga sintética llamada éxtasis, no estaba en uso hacia mediados
del siglo pasado. Sí hace referencia al acto de poner una línea sobre una
palabra, renglón o número mal escrito, pero no menciona el horror que
provoca en los alumnos el recibir la tarea o el examen entregado, con los
tachones o tachas que los maestros acostumbran marcar para señalar los errores.<o:p></o:p></span></div>
<div style="margin-bottom: .0001pt; margin: 0in;">
<span style="font-family: "Arial",sans-serif;"><br />
Stella Baruk en su libro <em style="box-sizing: border-box;">Echec et maths</em> discute,
entre otras cosas, la agresividad con que los docentes, especialmente en el
área de matemáticas, tienden/tendemos a mostrar el desagrado que se experimenta
ante un trabajo mal hecho utilizando, además, un color rojo que impacta.
Explicita la manera en que este tipo de agresiones causa en los estudiantes un
trauma que los previene de intentar resolver ejercicios y problemas, por el
miedo a equivocarse. En este libro de 1973 cuestiona, además, la
pertinencia y valor de las notas escolares.<o:p></o:p></span></div>
<div style="margin-bottom: .0001pt; margin: 0in;">
<br /></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "Arial",sans-serif;">Al
respecto, recuerdo una anécdota con una alumna en un curso introductorio de
matemáticas, en una universidad privada local, hace un par de años. Para mi
horror, dijo que “en la escuela nos enseñan a no equivocarnos”, y que los
errores se pagan caros. Desde las tachas rojas en los trabajos, hasta su
materialización en términos de hacer sentar en las filas al fondo del salón a
los alumnos que más se equivocan y obtienen las notas más bajas, a los reglazos
u otro tipo de agresiones físicas –y siempre recuerdo al escuincle en <a href="https://www.youtube.com/watch?v=g28viONLuZ8" style="box-sizing: border-box; outline: none; text-decoration-line: none;"><em style="box-sizing: border-box;"><span style="color: #1d70b7;">Cinema Paradiso,</span></em><span style="color: #1d70b7;"> que
no puede calcular en el pizarrón el resultado de una multiplicación</span></a>.<o:p></o:p></span></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "Arial",sans-serif;"><a href="https://drive.google.com/file/d/0B33nni72fr_Yb3NLN2hvc2JlcnM/view?usp=sharing" style="box-sizing: border-box; outline: none; text-decoration-line: none;"><span style="color: #1d70b7;">La didáctica, en el sentido de la escuela de Brousseau</span></a> y
los trabajos de <a href="http://www.cahiers-pedagogiques.com/-Articles-en-ligne-" style="box-sizing: border-box; outline: none; text-decoration-line: none;"><span style="color: #1d70b7;">Jacques Nimier sobre la docimología</span></a> o la
ciencia de calificar los exámenes, han ayudado a entender el rol de los errores
en el aprendizaje y la falta de objetividad de las calificaciones en cualquier
examen o tarea, respectivamente, aun cuando se trate de ciencias como
matemáticas. Y sin embargo, esta misma semana tuvimos la desagradable evidencia
de que las prácticas tradicionales de humillar al estudiante están vigentes,
aunque en este caso el mal llamado docente simplemente imprime frases
irrespetuosas, sin siquiera marcar el lugar en que se encuentra el error
en el trabajo del alumno.<o:p></o:p></span></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "Arial",sans-serif;">Se
asume, entonces, que todo lo que el estudiante ha escrito es erróneo, pero lo
que se afirma en realidad es que es <strong style="box-sizing: border-box;">el estudiante</strong> el
que está mal. Las tachas se imprimen sobre la persona, desde su infancia, y la
descalifican de por vida, a menos que tenga una muy buena resiliencia y/o que
la autoestima esté sólidamente construida.<o:p></o:p></span></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "Arial",sans-serif;">El
resultado de estas prácticas es palpable en cada uno de los que declaran que no
son buenos para matemáticas, deportes, dibujo, o cualquier otra cosa que los
“maestros” hayan decidido, ya sea porque el estudiante no realiza los cálculos
o no resuelve ejercicios como el profe lo hace, o porque su dibujo o ejecución
no se ajusta a la expectativa siempre corta y torpe del docente. La capacidad
de innovar, de crear y de definirse, es negada a través de este tipo de
ejercicio.<o:p></o:p></span></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "Arial",sans-serif;">En
otro nivel se encuentran, por supuesto, las tachas que hacemos sobre lo que
nosotros mismos producimos, cuando releemos o examinamos nuestra obra unas
horas o días después de haber puesto el punto final. Sabemos que podemos
cometer errores, y creo que es un signo de salud mental el recurrir al amigo o
al editor profesional (mejor si reunidos en una misma persona), quien es capaz
de leer y analizar lo que sometemos a su juicio, y el aceptar los cambios y
adecuaciones que le parecen pertinentes y que, incluso, pueden ser discutidos.<o:p></o:p></span></div>
<div style="background: white; box-sizing: border-box; margin: 0in 0in 12pt;">
<span style="color: #3c3c3c; font-family: "arial" , sans-serif;"><span style="font-family: Arial, sans-serif;">Y
en una categoría de hechos imperdonables se encuentra algún tache que hicimos a
un poema que alguien escribió para nosotros con amor. Mea culpa.</span>.<o:p></o:p></span></div>
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Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0León, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-91197088723306537102019-02-03T10:35:00.000-06:002019-02-03T10:35:27.761-06:00Trabajo con docentes de escuelas primariasEntre septiembre y octubre de 2018 estuve a cargo de la capacitación a un grupo de docentes en la ciudad de Santa Cruz de Juventino Rosas, Guanajuato, contratada por el CIFE como facilitadora para un grupo de 36 docentes de primaria y coordinadora de los facilitadores (dos, aparte de mí) en esa sede. De buenas a primeras me encontré conociendo desde adentro el proceso de capacitación con vías a la evaluación docente de la SEP/INEE. Nada supe cuando fui contactada y contratada, excepto que era una capacitación sobre diseño curricular. Hay mucho que elaborar respecto a lo que fui encontrando sobre los problemas que tienen los docentes en un municipio tan cercano (y lo complicado de llegar a él, pese a la cercanía y las características de la zona) y con carencias que no hubiera imaginado. Muchos aprendizajes y muchas ricas experiencias.<br />A reserva de detallar mi análisis del proceso, <a href="https://drive.google.com/file/d/1lUbProY19NE38e6dvCIsrDEKdYa6z48K/view?usp=sharing" target="_blank">aquí se encuentra mi reporte final</a>, entregado a la institución contratante.<br /><br />Ahora tengo ocasión de colaborar en otro proyecto, también con docentes de primaria. Se trata de dos grupos de profesores, en Campeche, para introducirlos a la estrategia de Aprendizaje Basado en Proyectos y, necesariamente, su relación con el Aprendizaje Basado en Problemas. La parte presencial de estos talleres se desarrollará los días 7 y 8 de febrero.<br />
<br />Por lo pronto, aquí está el material que diseñé para ellos, como lectura previa, dadas las limitaciones de tiempo (10 horas presenciales seguidas de 10 horas virtuales, para cada grupo): P<a href="http://online.fliphtml5.com/bwpr/gycj/" target="_blank">BL o ABP: Problemas y Proyectos</a>.Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-652205493917148882018-11-27T16:03:00.001-06:002020-10-10T08:51:06.291-05:002 de octubre de 1968. 50 años después.Puesta a compartirles parte de lo que he hecho en los meses de septiembre y octubre pasados, va la conferencia que impartí en la Alianza Francesa de Guanajuato, el 2 de octubre pasado, y de la cual hubo una segunda exposición, con ligeras modificaciones, en la ENES-UNAM León, el 9 del mismo mes.<div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-7tjP3FHydlA/X4G8AWrNpTI/AAAAAAAAQ7g/Bfg28MwYe0I4p_bCaf8m0YySvWZIVMYWACLcBGAsYHQ/s960/la%2Bmirada%2Bdesde%2Bel%2Bpoli%2Ba%2B50%2Ba%25C3%25B1os.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="960" data-original-width="366" height="320" src="https://1.bp.blogspot.com/-7tjP3FHydlA/X4G8AWrNpTI/AAAAAAAAQ7g/Bfg28MwYe0I4p_bCaf8m0YySvWZIVMYWACLcBGAsYHQ/s320/la%2Bmirada%2Bdesde%2Bel%2Bpoli%2Ba%2B50%2Ba%25C3%25B1os.jpg" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-fh9ASfkftls/X4G8COhmbNI/AAAAAAAAQ7k/x2XdNsuuEY8hatzV5iZjPCyQIh_lpXb2ACLcBGAsYHQ/s940/conferencia%2Ben%2BLa%2BAlianza%2BFrancesa.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="788" data-original-width="940" src="https://1.bp.blogspot.com/-fh9ASfkftls/X4G8COhmbNI/AAAAAAAAQ7k/x2XdNsuuEY8hatzV5iZjPCyQIh_lpXb2ACLcBGAsYHQ/s320/conferencia%2Ben%2BLa%2BAlianza%2BFrancesa.png" width="320" /></a></div><br /><div><br /><br /><br />
<ul>
<li>Las <a href="https://drive.google.com/file/d/1C7E6LwzLZrfhyOKRWiOkXn9R3Dh5BEZH/view?usp=sharing" target="_blank">imágenes</a> de la presentación</li>
<li>Las<a href="https://drive.google.com/file/d/1LQz7w62tbfC1VkfFwv9KpWN5mtjb_0d7/view?usp=sharing" target="_blank"> notas que acompañan cada una de esas imágenes</a></li>
</ul>
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A esas experiencias, que siempre reviven algunos dolores, no necesariamente vividos en esos momentos pero sí que fueron consecuencias, siguió <a href="https://l.facebook.com/l.php?u=https%3A%2F%2Fscreencast-o-matic.com%2Fwatch%2FcFXQ0ZYSSK%3Ffbclid%3DIwAR0Tc-J4qST0eVwuG4IkI3RW7Ad88xy76TYWsl1xvEWNCa5Nji3_2ShU8qQ&h=AT2FWfdeTDcpXTIc5GBaVDvBiacDznUP8UF_uJNXPAKUlRF6wVqKSQomSgQCWU0I61Zu5AoGdgVL5S8nyX4BK1gdIWrSjEO58DTvjkz-otsIZ4bLujijWvJFXfwVGivBP9s" target="_blank">una entrevista video grabada </a>de la que se tomaron fragmentos para integrar en un video que estuvo disponible en diciembre. Se titula <a href="https://youtu.be/_M6AbhHuOus" target="_blank">Las mujeres de 68</a>, y es un honor haber sido incliuida.<br />
Eso, y la participación en un grupo cerrado, creado en Facebook por periodistas de <i>El Universal</i>, en el cual compartimos experiencias, testimonios, etc.<br />
Resultaron algunas nuevas amistades con gente muy joven, sorprendentemente. Y eso ha dado pie a otras reflexiones.<br />
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La parte que se refiere a trabajo de docencia está en proceso de organización.<div class="separator" style="clear: both; text-align: center;"><br /></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /></div>Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-9040111365670295332018-11-27T09:00:00.000-06:002018-11-27T14:25:02.425-06:00Estrategias para la Innovación de la práctica docente.La Universidad de Guanajuato me hizo el honor de invitarme a abrir sus jornadas académicas, tituladas "Foro de Innovación de la Práctica Docente", a celebrarse el 27 de noviembre de 2018 en sus instalaciones del campus León.<br />
Agradezco enormemente a las autoridades de esta emblemática Institución la deferencia hacia mi persona.<br />
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<img alt="Image may contain: 1 person, text" height="320" src="https://scontent.fcyw1-1.fna.fbcdn.net/v/t1.0-9/45089320_1718900024886915_844981609433137152_n.jpg?_nc_cat=104&_nc_eui2=AeFE0N8Pck8AlQoZUVTZUNPEnet6sdcXfcBP6FDp_sgFLs8LK3hLfJmK1ETvDH6iRy6csffHpyFG-78Dm0Uo5MNwWgtnc02ixEOFW8BxJMVEPw&_nc_ht=scontent.fcyw1-1.fna&oh=86666137dc31627e1e282f28ed527d9f&oe=5CA55802" width="248" /><br />
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Mi conferencia se titula "Estrategias para la Innovación de la práctica docente", como puede leerse en el cartel.<br />
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Aquí comparto <a href="https://drive.google.com/file/d/1KTyT6dP_SjWlxUdzxezGi64scispjsR3/view?usp=sharing" target="_blank">la presentación </a>propiamente dicha, en PDF, que consiste de imágenes y muy poco texto. <a href="https://drive.google.com/file/d/1ZtWFEtXTsm_lcQsNo5BXGsR5_sGl5Wzc/view?usp=sharing" target="_blank">El texto </a>que me sirve de mapa de navegación, y que no pretendo leer a la audiencia, se encuentra también enlazado en el título de la presentación. La idea es que nadie sienta necesidad de tomar notas durante la breve presentación y que esté disponible para cualquiera que se interese en el tema.<br />
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Como siempre, sus comentarios son más que bienvenidos.<br />
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El <a href="https://www.facebook.com/UGCampusLeon/videos/1181834341992889/?fref=mentions&__xts__%5B0%5D=68.ARAS9zG6IW4qIN8_JeBPqr2ZNn7pHR6z1YL_93WgbGy1K59Y79AJALcSIAx_NmQ9M6Gmd5xcn89M_I4fITd89G8_ZP3Kq7JDce5sfXycnmu8zMycVCP73eNjgIF7a3TxrLmGeAk2DouGDx5X4zy9SyqV-8qpzGA5AQCJfdv-WvNw5Y5LOawl9CzpXVL_kuIC9PHWqUU7k_G_mKmUn-P8PIqZ1Vg4Kbbc28dM3yJWzUAOav578CwLSn4iUVDYOBce2d_BD60MQzQNWSoB_8kkTnhlzh_upWcN1eG0HMc-B1E5cvoCfAVMBl14fAg6ygS1uHKzivoskfzPhtKWAggBOQWQb8QMdIw2cyfpTxknMojFR0T2JQW8ekB--43DM674dh-PNSdH3SdN4Xo95WzUh1hoVKFV9vWIL48jqE1nSPGXbRK35x3riL336kXebIItJEwjkrtZrqz0axwJYwmkUqZ_NegmjW9XgH11brEfPz4T0XrFhbsPynPArQyQ9DX1&__tn__=K-R" target="_blank">enlace al streaming del evento</a>, del que no tuve idea previa.<br />
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<br />Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-73425392634955928952018-05-19T09:16:00.002-05:002018-05-21T08:23:59.030-05:00Mi colaboración en Placement ProkriyaHace unos días, Moumita Dey me invitó a colaborar en el blog de <a href="http://www.placementpro.co.in/" id="id_32c0_4c7f_3b9_54f" target="_blank">Placement Prokriya </a> (www.placementpro.co.in). Se trataba de un texto en inglés, de un máximo de 400 palabras, y mis datos y foto (por si es de su interés, Moumita busca a otros educadores que quieran contribuir de manera similar).<br />
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Hace un momento me etiquetó en una publicación, en Facebook, sobre la imagen de <a href="http://placementpro.co.in/contentad/BlnckaPrra.png" target="_blank">la publicación de mi nota,</a> la cual les comparto:y<br />
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<img alt="Chania" height="400" id="id_cc47_30aa_db25_ea68" src="https://www.placementpro.co.in/contentad/BlnckaPrra.png" style="height: auto; width: 283px;" width="283" /><br />
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El texto completo, en español, se encuentra en <i><a href="http://www.eslocotidiano.com/opinion/blanca-parra/queremos-nos-lea-conceptos-libro-texto/20150414211542018968.html" target="_blank">Es lo cotidiano</a></i>, y es de hace tres años.<br />
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El texto completo, en (mi) inglés, a continuación:<br />
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<b><span lang="EN">"We want you to read the concepts in the textbook "</span></b><b><span lang="EN-US"><o:p></o:p></span></b></div>
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<span lang="EN">Although the group had demonstrated a tremendous resistance to work as set out in the document given to them on the first day of class, detailing the design of the course, the exigence -because they were not asking for help- was a surprise to me. These were college students in a private institution.</span></div>
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<span lang="EN"><span style="text-indent: 19.2px;">About 43 years ago, while I walked the ranks observing the work of the students, in a math group at its first year at a junior high school in Mexico City, one of the students consulted me on what he was supposed to do. I had written the lesson in which he was working (each one was working at his own pace, consulting the doubts that arose as he advanced, first with someone who was at the same point and then, if needed, with me); it was in the materials on logic and sets for </span><i style="text-indent: 19.2px;">Matemáticas 100 Horas.</i><span style="text-indent: 19.2px;"> A couple of years later, Eugenio Filloy published the whole series under his name. </span></span></div>
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<span lang="EN">Part of work that I had to do </span><span style="text-indent: 19.2px;">as a student</span><span style="text-indent: 0.2in;"> since I started my master’s degree,</span><span style="text-indent: 0.2in;"> was to write lessons and to design activities for students at the same level as this boy, put the materials to the test with my students and to supervise other teachers using the material we made.</span></div>
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<a href="https://1.bp.blogspot.com/-rfTVmD154W8/WwAs9dVUlfI/AAAAAAAAPg8/FV9WNHmFNHwwU6nIYzq50YWojAb6CicFgCLcBGAs/s1600/del%2Bprimer%2Brollo%2B2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="555" data-original-width="555" height="320" id="id_ede0_b1cd_7647_816b" src="https://1.bp.blogspot.com/-rfTVmD154W8/WwAs9dVUlfI/AAAAAAAAPg8/FV9WNHmFNHwwU6nIYzq50YWojAb6CicFgCLcBGAs/s320/del%2Bprimer%2Brollo%2B2.jpg" style="height: auto; width: 320px;" width="320" /></a></div>
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<span lang="EN"><span style="text-indent: 19.2px;">When the student asked me for support, he was in the last paragraph on page 202 (in the first image, above). I tried to assure me that he understood the instruction by asking him some questions – that's what I keep doing every time a student is in a similar situation.-. He was able to draw the line requested, on the grid on page 203 (the second image). He called me one more time: "What do I do now?". I asked him: what does it say you have to do? "Paint in blue the region above the line", he read. Well, you do that, I pointed. "It doesn't say anything about what to do". Read it again, I told him, and he repeated the reading with the same result: "It says nothing." After the third attempt I began to read: Paint in blue... and there he interrupted me: "Ah! I have to paint it in blue! " Then he continued his work to finish the exercise.</span></span></div>
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<span lang="EN">The doubt that came to me was whether the wording should be modified or whether there was any other factor that was interfering (I clarified that I did not have training as a teacher before). I did some testing with the whole group: The problem was in reading difficulties, whatever the material was. Then I asked them to write down what they did on a regular day, since they woke up until they went to sleep. Most notable: six hours of daily television, on average.</span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">True, the students who were the children of the engineers at the Petroleum Institute (which was on the other side of the street) and those from upper medium class at the neighborhood, at the time, attended lessons of English, karate, swimming, ballet, etc. by the afternoons, every day. But the boys whose parents worked all day, lower medium class or lesser, woke up with the TV on, and it remains on all the time when they were at home, even when the whole family gathered to eat; they did not have cultural or sporting activities outside their streets and they had to help in domestic chores or working in a family business. The TV always was turned on as background noise. Mostly, they were used to the spoken word, not to writings. <o:p></o:p></span></div>
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<span lang="EN">I took the problem to the school’s principal (a technical public junior high School): "Take a week of your course to teach them to read", I was told by the assistant director, an engineer with less knowledge than I had about what reading is and what its processes mean. I tried to; for instance, I asked them to draw something after hearing from a text read in class, selected by themselves. The parents protested: I was demanding that their children read and I was wasting the time with silly things; they “remembered” me that my class was math, so reading and writing was out of consideration.</span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">The good thing about basic school is that the cycle lasts a whole year. The good thing about the kids being freshmen was that they could still be interested (I do not say the 100%) and that they were willing to learn in these dynamics of mine in which the student is the center of the process and have to work to learn since I started 43 years ago. The best reward to this is the boy's gratitude (now a man who must exceed 50 years) who was one of these students, and that gave me some candies and flowers in the parade of the “Day of the Crazies” in San Miguel de Allende, Guanajuato, last June, when he recognized me in the crowd... 43 years later.</span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">And now I go back to the starting point. In the 43 years since I quit working in that school, the problem behind all kinds of misunderstanding in mathematics, physics, statistics or any other subject, at higher education, it's still in reading and all that it entails. From the belief that all truths are in the textbook and that nothing has changed in the last 50 years emerges such a demand for reading the definition in some book, whichever, and to refuse to test what is known and build the concepts from it. </span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">The students are not the only ones responsible, of course. As a society we have abandoned the interest in our young people (children, families, students) learnings, to focus on the grades and medals that mean nothing; because it is well known that the exams are designed so that the student proves that he is able to repeat, even if he only remembers it while passing the exam, which the teacher or the official program says he should be able to repeat. Of course, better grades from our children generate the idea that we are better parents, and better ratings from our students generate the idea that we are very good as teachers, and the administrative authorities even give us recognition. </span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">The Government, for its part, strives to reduce education to boxscores that show what international agencies demand, and to create a false idea of democratic education. The reality can be read in the many publications of the last few days about the quality, coverage, and inequality of education in Mexico. In <i>Educación Futura</i>, </span><a href="http://www.educacionfutura.org/una-reforma-sin-modelo-educativo-manuel-gil/"><span lang="EN">Manuel Gil Anton</span></a><span lang="EN"> has been realizing of many of the real situations relating to it. In </span><a href="http://www.eluniversal.com.mx/notas/734432.html"><i><span lang="EN">El Universal</span></i></a><span lang="EN"> we find the actual size of the educational lag. </span><a href="http://noticias.univision.com/article/2242147/2015-02-12/mexico/noticias/la-sombria-realidad-de-la-educacion-en-mexico"><i><span lang="EN">Univision</span></i></a><span lang="EN"> reports on the bleak panorama of our educational system. The newspaper <i>Vanguardia </i>reproduces a note taken from the newspaper<i> El País</i> about </span><a href="http://www.vanguardia.com.mx/mexicotienemalaeducacionsegunestudio-1842206.html"><span lang="EN-US">the b</span><span lang="EN">ad education in Mexico</span></a><span lang="EN">. The </span><a href="http://www.oecd.org/edu/school/43058076.pdf"><i><span lang="EN">OECD</span></i></a><span lang="EN">, to whom government efforts are intended, says that "when Mexican teachers were asked the question ‘In general, am I satisfied with my work? ‘, they responded in a more negative way compared to the teachers in the participating countries ", and one intuits or knows that the teacher's satisfaction with his work is a factor in the pupil's performance, and one cannot infect what one does not have. The same <i>OECD</i> notes that "Mexico ranks among the five nations with the highest percentage of students with low qualification, since 52 percent have failed to complete their upper secondary education", according to reports at <span class="MsoHyperlink"><i>La Jornada</i></span>. And there is much more in other national and international publications, although we try to cover the sun with a finger.<o:p></o:p></span></div>
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<span lang="EN">Teachers have contributed to lack of critical thinking among students by not developing or encouraging it, the same goes for creativity (although we adorn ourselves by making congresses to invite the experts), and to let them become actors in their own development. Just the opposite: we encourage their dependence on teachers and authorities of all kind, of course; on the textbook we love most or with which we were instructed; we prohibit the use of technology for fear, among other things, and we keep them, in general, in a state of lethargy that does not allow them to understand how to use the concepts to pose and solve real problems maybe because if they are out of the textbook exercises, we don't know how to do that either. </span><span lang="EN-US"><o:p></o:p></span></div>
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<a href="http://en.wikipedia.org/wiki/Howard_Eves"><span lang="EN">Howard Eves</span></a><span lang="EN">, in his book <i>Return to Mathematical Circles</i>, presents <u>Some Bits and Tips on Teaching Mathematics</u>. He quotes E. Kim Nebeuts “Teach to the problems, not to the text”, and points “Don’t be a 2 x 4 mathematics teacher, one who always stays between the 2 covers of the textbook and within the 4 walls of the classroom”. </span>These recommendations apply to every subject, of course.<o:p></o:p></div>
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<span lang="EN-US">So, at a section of a class, at the university, we find students who demand to: <o:p></o:p></span></div>
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<!--[if !supportLists]--><span lang="EN-US" style="font-family: "symbol"; mso-ansi-language: EN-US; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span lang="EN">the teacher reads to them the definitions and concepts as they appear in a textbook </span><span lang="EN-US"><o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: 53.4pt; margin-right: 0in; margin-top: 0in; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="EN-US" style="font-family: "symbol"; mso-ansi-language: EN-US; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span lang="EN">Do not relate concepts in a class session (and do not ask for conceptual maps)</span><span lang="EN-US"><o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: 53.4pt; margin-right: 0in; margin-top: 0in; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="EN-US" style="font-family: "symbol"; mso-ansi-language: EN-US; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span lang="EN">For each concept the teacher must provide only stereotyped exercises, without mixing several concepts</span><span lang="EN-US"><o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: 53.4pt; margin-right: 0in; margin-top: 0in; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="EN-US" style="font-family: "symbol"; mso-ansi-language: EN-US; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span lang="EN">be given a sheet whit all the formulae they are supposed to apply </span><span lang="EN-US"><o:p></o:p></span></div>
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<!--[if !supportLists]--><span lang="EN-US" style="font-family: "symbol"; mso-ansi-language: EN-US; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;"> </span></span><!--[endif]--><span lang="EN">the course level must be the same as the high school level because they are accustomed to that</span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">Sadly, for them, "An expert problem solver must be endowed with two incompatible qualities, a restless imagination and a patient pertinacity.”, as the same Eves points out in <br />
<i>In Mathematical Circles</i> (1969). In current times – when the approach and resolution of problems require constantly updating the knowledge one has, and the incursion into domains that seemed far away- It is not possible to continue to see education such as Evariste Galois denounced almost 200 years ago.</span><span lang="EN-US"><o:p></o:p></span></div>
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<span lang="EN">We all have a part of the problem, and we all must look for a way to solve it.</span><span lang="EN-US"><o:p></o:p></span></div>
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<br />Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com1Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-47698836739627455462018-05-18T18:10:00.000-05:002018-05-18T18:10:38.239-05:00La educación matemática hoy en los niveles medio superior y superiorEste texto lo escribí hace tres años, y lo acabo de reencontrar. ¿Qué ha cambiado?<br /><br />
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<b><span style="font-size: 16.0pt; line-height: 115%; mso-bidi-font-size: 11.0pt;">La educación matemática hoy en los niveles medio superior y superior<o:p></o:p></span></b></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Durante
siglos, el modelo de educación matemática en los bachilleratos y las
universidades, ha permanecido sin alteraciones en la mayor parte de los
sistemas educativos. Generalmente, las propuestas se han centrado en la
transmisión de conceptos, procedimientos y reglas, desarrollándose de manera
lineal, conforme las tablas de contenido
de los libros de texto. Este documento cuestiona ese modelo y su pertinencia en
los tiempos que corren, apoyándonos en los resultados de la didáctica de las
matemáticas que se han venido recopilando y replanteando desde las década de
los 70’s y con vistas al desempeño profesional y en la vida de los alumnos que
dejan el bachillerato o terminan una licenciatura, con todas las opciones
intermedias. ¿Dónde estamos y hacia dónde quisiéramos avanzar?<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Este
modelo sigue los pasos de la propuesta contenida en los </span><a href="http://www.euclides.org/menu/elements_esp/indiceeuclides.htm"><i><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Elementos</span></i><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">
de Euclides</span></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">, pensado como libro de texto. Sin embargo
hay que recordar que en esos libros se trata de construir lógicamente, de
manera deductiva, el conocimiento desarrollado hasta la época de su
publicación. La aritmética y la geometría eran dos de los componentes del
quadrivium, parte del programa de estudios delineado por Platón en </span><a href="https://licenciaturaenlenguayliteratura.files.wordpress.com/2011/08/platon-dialogos-iv-republica-gredos.pdf"><i><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">La República</span></i></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">.
Se trataba de vehicular el pensamiento lógico deductivo a través de esa
instrucción. En la época medieval el conocimiento de estos temas permitía
acceder al grado de bachiller, prerrequisito para estudiar Medicina, Leyes o
Teología. <o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">En
tanto los conocimientos requeridos de un alumno no variaran, no aparecieran
nuevos tópicos, nuevas metodologías, nuevas herramientas, el modelo seguía
siendo válido. Lo que actualmente se denomina “educación clásica” es un esquema
que recupera e incluye estos temas pero que incorpora elementos de los siglos XV
al XX, como son el álgebra, la geometría
analítica y el cálculo, necesarios para el desarrollo industrial en los siglos
XIX y XX, tomando en cuenta que lo que se denomina la Primera Revolución
Industrial se podría situar a finales del siglo XVIII concluyendo hacia
mediados del siglo XIX, mientras que lo que se puede llamar </span><a href="http://es.wikipedia.org/wiki/Segunda_Revoluci%C3%B3n_Industrial" title="Segunda Revolución Industrial"><span style="color: windowtext; font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-decoration-line: none;">Segunda Revolución Industrial</span></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">
partiría desde mediados del siglo XIX hasta principios del siglo XX (hacia
1914). Algunos sistemas educativos, como el nuestro, siguen anclados en ese
esquema. <o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">En
una entrevista para ABC<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn1" name="_ftnref1" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-size: 12pt; line-height: 115%;">[1]</span></span><!--[endif]--></span></a>, en España, Richard Gerver<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn2" name="_ftnref2" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-size: 12pt; line-height: 115%;">[2]</span></span><!--[endif]--></span></a>, menciona algunas de las
características de la educación que deberían de estar presentes en las escuelas
modernas. Lo que comenta respecto al sistema educativo español puede aplicarse
de manera pertinente a nuestro propio sistema educativo. En particular, señala
que el sistema educativo español:<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><br />
</span><span class="apple-converted-space"><i><span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;"> </span></i></span><i><span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;">Está caduco. De hecho, está anclado en la era
industrial. No es efectivo para el mundo de hoy, donde se necesitan empleados
creativos y capaces de pensar por ellos mismos. El sistema español, donde solo
se enseña y se controla, no tiene sentido. <o:p></o:p></span></i></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Los
cuestionamientos a los sistemas educativos, a los métodos de enseñanza y a los
contenidos de los programas no son nuevos. A mediados del siglo pasado, los
matemáticos europeos de renombre incursionaron en el análisis y reformulación
de los programas de estudio de matemáticas a niveles medio y superior. Durante el coloquio de Royaumont en 1959, organizado
por lo que ahora es la OCDE, Dieudonné lanzó el famoso grito de guerra de: <i>à bas Euclide!</i> (abajo Euclides). Lo que
cuestionaba y fustigaba era la enseñanza excesiva de la geometría del triángulo
en el bachillerato y en la universidad. Aducía
que no tendría que haber habido lugar para la jerga, el dogmatismo, la
introducción temprana de la axiomática:<o:p></o:p></span></div>
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<i><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Solamente
se puede desarrollar fructíferamente una teoría matemática bajo la forma
axiomática cuando el estudiante ya está
familiarizado con el asunto al que se aplica, trabajando durante un cierto
tiempo sobre una base experimental, o semi-experimental, es decir recurriendo
constantemente a la intuición</span></i><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">.<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn3" name="_ftnref3" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-size: 12pt; line-height: 115%;">[3]</span></span><!--[endif]--></span></a><o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Se
desencadenó una necesidad de reformar la enseñanza de las matemáticas,
encabezada por el grupo <u>Bourbaki</u> del que Dieudonné formaba parte. Pero
ya en 1974, "siendo uno de los padres de la reforma, Dieudonné tuvo que
denunciar públicamente una nueva escolástica, "<i>forma aún más agresiva y estúpida colocada bajo la bandera del
'modernismo'</i>." Así pueden ser las reformas cuando se sacan con fórceps,
esencialmente, y sin tiempos de experimentación real en las clases (como
ocurrió en la década de 1970)".<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn4" name="_ftnref4" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-size: 12pt; line-height: 115%;">[4]</span></span></span></a><o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Matemáticos
como Borel se unieron a los reclamos:<o:p></o:p></span></div>
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<i>Todos los cambios de los programas deben
necesariamente fracasar, o al menos tener apariencias de fallar, por la
sencilla razón de que la masa de los maestros no puede obtener de golpe una
técnica pedagógica tan buena para los nuevos materiales como la técnica
tradicional lo era para los anteriores. Pero la contraparte de esta
constatación pesimista no es menos precisa: si bien es cierto que lo esencial
en la enseñanza es menos el programa que el método, todo cambio de programas
debe, en definitiva, dar buenos resultados después de que hemos sido capaces de
crear nuevos métodos adecuados para el nuevo material</i>.<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn5" name="_ftnref5" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-size: 12pt; line-height: 115%;">[5]</span></span><!--[endif]--></span></a> <o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Es
en esa época que surge la Didáctica de las matemáticas (y de otras disciplinas)
como campo de investigación formal, en la búsqueda de propuestas para acercar a
los jóvenes al conocimiento y disfrute de las matemáticas como actividad, no
como doctrina. Sin embargo, a pesar de los resultados de investigaciones en ese
campo, acumulados en los últimos 45 años, no parece que tengamos avances
sustanciales, al menos en este país.<o:p></o:p></span></div>
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Veamos, por ejemplo, un <i>Curso de matemáticas</i> fechado, por el
alumno que lo utilizó, en 1850. Lamentablemente lo que queda del libro no
permite conocer el nombre de autor ni del editor. Tampoco puede verse la tabla
de contenidos, pero ésta puede
reconstruirse hojeando el ejemplar:</span><br />
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</span></span><!--[endif]--><b><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Aritmética</span></b><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;"> <o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Números decimales y fraccionarios, con
cuidadosas explicaciones y ejemplos para el desarrollo de cada una de las
operaciones.<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Razones y proporciones<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Sistemas de medidas<o:p></o:p></span></div>
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</span></span><!--[endif]--><b><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Algebra<o:p></o:p></span></b></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Terminología y el uso de símbolos <o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Operaciones con expresiones algebraicas <o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">MCD<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Ecuaciones<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Primer
grado con una incógnita <o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Primer
grado con dos incógnitas (sistemas 2 x 2)<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Primer
grado con más de dos incógnitas (sistemas 3x3)<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Aplicaciones
a la resolución de problemas<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Análisis
de los casos en los que la resolución de un sistema de ecuaciones lineales
conduce a fracciones cuyo denominador es cero. <o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Ecuaciones de segundo grado con una
incógnita<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">El
cálculo de la raíz cuadrada<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Aplicaciones<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Potencias fraccionarias de números y
términos algebraicos<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Aplicaciones<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Proporciones, ahora con términos
algebraicos<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Logaritmos<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Suplemento a los elementos de algebra.<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Progresiones <o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Regla de interés <o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Compuesto<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Combinaciones y permutaciones<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Binomio de Newton<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Geometría euclidiana<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Geometría plana<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Congruencia <o:p></o:p></span></div>
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perpendiculares y paralelas<o:p></o:p></span></div>
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y rectas en el círculo<o:p></o:p></span></div>
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y sus propiedades<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Proporciones
y semejanza<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Comparación
de áreas de figuras semejantes<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Problemas
de aplicación<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Geometría del espacio<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Planos
y sus intersecciones<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Ángulos
poliedros<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Poliedros<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Secciones
de poliedros<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Volúmenes
de prismas y pirámides <o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Semejanza
de poliedros<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Cuerpos
redondos y sus propiedades<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Área<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Volumen<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Symbol; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Semejanza<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Aplicaciones<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Volúmenes
de los cuerpos que constituyen las obras de fortificación <o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Nivelación<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Aplicación
de todo lo precedente<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Trigonometría y levantamiento de planos<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Teoremas y formulas de la trigonometría <o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Resolución
de triángulos<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Rectángulos<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Oblicuos<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Symbol; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Esféricos<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Instrumentos
para medir ángulos y líneas<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Grafómetro<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Circulo repetidor<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Cadena métrica<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Ejemplos
de cálculos trigonométricos<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Symbol; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Frentes de fortificación<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Línea de defensa<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Ángulo flanqueado<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: "Courier New"; font-size: 10.0pt; line-height: 115%; mso-fareast-font-family: "Courier New";">o<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Levantamiento de planos<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Determinación
de los principales puntos de un país<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 2.0in; mso-add-space: auto; mso-list: l0 level4 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: Symbol; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Operación de detal<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.5in; mso-add-space: auto; mso-list: l0 level3 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Planos
levantados con la plancheta<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 2.0in; mso-add-space: auto; mso-list: l0 level4 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: Symbol; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;">·<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;">
</span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Declinatorio<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.5in; mso-add-space: auto; mso-list: l0 level3 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Planos
levantados con la brújula<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.5in; mso-add-space: auto; mso-list: l0 level3 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Planos
levantados con la espada de agrimensor<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="margin-left: 1.5in; mso-add-space: auto; mso-list: l0 level3 lfo1; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: Wingdings; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: Wingdings; mso-fareast-font-family: Wingdings;">§<span style="font-family: "Times New Roman"; font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><!--[endif]--><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;">Resumen
de estos métodos <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="margin-left: 1.5in; mso-add-space: auto; mso-list: l0 level3 lfo1; text-indent: -.25in;">
<span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoListParagraphCxSpLast" style="margin-left: 1.5in; mso-add-space: auto; mso-list: l0 level3 lfo1; text-indent: -.25in;">
<span style="font-family: "Times New Roman",serif; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">El nivel de los desarrollos no es trivial, como puede
verse en estas fotos:<o:p></o:p></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjYFvEDJrrW3K-7JHPwxuKJ_eDORLNEPbCxXxLMHAkzf-EhwH5l4dHhZx0X4ZHgyFNEZ7Y5rOBJeBCtwZK_2yptowlT_Cx6qO6tXArcUCUOMkaGMIZbaHAQo8MhJ0u79C8mVE_XqHaHNqMw/s1600/fotos+para+un+post+en+mayo+2018+2.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="480" data-original-width="640" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjYFvEDJrrW3K-7JHPwxuKJ_eDORLNEPbCxXxLMHAkzf-EhwH5l4dHhZx0X4ZHgyFNEZ7Y5rOBJeBCtwZK_2yptowlT_Cx6qO6tXArcUCUOMkaGMIZbaHAQo8MhJ0u79C8mVE_XqHaHNqMw/s320/fotos+para+un+post+en+mayo+2018+2.jpg" width="320" /></a><a href="https://2.bp.blogspot.com/-v8FP9dg8Ll8/Wv9bfg_BXyI/AAAAAAAAPgU/s5iyg3FAd8ctR8JaT7xZDhfj4H5Q3CORwCLcBGAs/s1600/fotos%2Bpara%2Bun%2Bpost%2Ben%2Bmayo%2B2018.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="640" data-original-width="480" height="320" src="https://2.bp.blogspot.com/-v8FP9dg8Ll8/Wv9bfg_BXyI/AAAAAAAAPgU/s5iyg3FAd8ctR8JaT7xZDhfj4H5Q3CORwCLcBGAs/s320/fotos%2Bpara%2Bun%2Bpost%2Ben%2Bmayo%2B2018.jpg" width="240" /></a></div>
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<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">La tipografía y la distribución del espacio no
respetan ninguna de las características de orden pedagógico que se suelen sugerir
(tipo de letra, ilustraciones, aire) esencialmente porque, en la época, no se
disponía de las ventajas actuales para la edición. A cambio, quien esto
escribió se preocupó por ser muy claro en cada una de las discusiones y cada
uno de los ejemplos desarrollados, en aras de lograr de los estudiantes la
mayor comprensión y de incrementar las posibilidades de éxito al poner en uso
algunos de los conceptos o metodologías.<o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">El asunto es que un curso actual de Precálculo no es muy diferente de este texto, en cuanto
a programa de estudios. Desde el sucinto <i>Precalculus
Mathematics in a Nutshell</i>, de Simmons,
hasta el voluminoso <i>Precálculo</i>,
de Stewart, los contenidos básicos son los mismos. Lo que nos venden son
ediciones mejoradas en cuanto a la presentación y el diseño, y con muchos temas
que nunca serán tocados en el curso ni utilizados por la mayor parte de los
alumnos, en su vida.<br />
<br />
Seguimos insistiendo en que el alumno aprenda cada uno de los métodos que la
tradición juzga valiosos, sin importar si eso es pertinente para la mayoría que
simplemente utilizará las matemáticas como recurso necesario, pero de lo que
prefieren prescindir, y para la minoría formada por los que quisieran ir más
allá y se empantanan en un cálculo numérico que, en realidad, no les importa.<o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">¿Cuál es o debiera ser la esencia de la educación
matemática? Yo lo pondría en dos niveles: <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpFirst" style="mso-list: l2 level1 lfo2; text-indent: -.25in;">
</div>
<ul>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">el de los alumnos que van a utilizar el
conocimiento matemático como herramienta y lenguaje en sus tareas
profesionales: albañiles y arquitectos, ingenieros de todo tipo, comerciantes y
licenciados en comercio, mercadólogos, médicos, etc.</span></li>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">el de los alumnos que irán a una área de
ciencias, para desarrollar nuevos conocimientos o nuevas tecnologías, para los
que la investigación será un quehacer disfrutable</span></li>
</ul>
<!--[if !supportLists]--><br />
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Sin embargo, hacemos cursos estándares para responder
a preguntas estándares que, de ninguna manera, benefician ni a unos ni a otros.
Para ambos grupos, el conocimiento y la comprensión profunda de los conceptos
serviría para ayudarlos a determinar las variables en un problema y establecer
las relaciones entre ellas, dando lugar al planteamiento simbólico. Para los
primeros, llegados a este punto, el uso de recursos tecnológicos y aplicaciones
debería llevarlos a encontrar una solución para el problema planteado. Para los
segundos, el descubrimiento de patrones, de clasificaciones de tipos de
problemas, los ayudaría a buscar soluciones generales, creando así nuevo
conocimiento.<o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Desde mi punto de vista lo que hay que construir
dentro de un curso de matemáticas es ese conjunto de actitudes, habilidades y
conocimientos que definen lo que se llama <b>la
competencia matemática</b> y que
deberíamos desarrollar en los alumnos. Apoyarlos para adquirir una disposición
hacia las matemáticas, la cual depende de los siguientes componentes:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpFirst" style="mso-list: l1 level1 lfo3; text-indent: -.25in;">
</div>
<ul>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">Conocimiento bien organizado y
flexiblemente accesible</span></li>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">Métodos heurísticos, traducidos en estrategias de búsqueda para
analizar problemas</span></li>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">Meta conocimiento, que involucra el
conocimiento acerca del propio funcionamiento cognitivo y el conocimiento
acerca de las propias motivaciones y
emociones</span></li>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">Convicciones positivas relacionadas con
matemáticas</span></li>
<li><span style="font-size: 7pt; font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span><span style="font-family: "Times New Roman", serif; font-size: 12pt; line-height: 115%; text-indent: -0.25in;">Habilidades de autorregulación de los
propios procesos cognitivos y habilidades para regular los procesos y
actividades volitivas<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn6" name="_ftnref6" title=""><span class="MsoFootnoteReference"><span class="MsoFootnoteReference"><span style="font-size: 12pt; line-height: 115%;">[6]</span></span></span></a> </span></li>
</ul>
<!--[if !supportLists]--><br />
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">El dominio integrado de las cinco componentes, dice De
Corte, debería resultar en el desarrollo
de esta disposición para el aprendizaje y el pensamiento experto, la cual
involucra el desarrollo de una sensibilidad para identificar situaciones donde
es relevante y apropiado utilizar el conocimiento y las habilidades, y una
inclinación para hacerlo. </span><span style="font-family: "Times New Roman", serif; font-size: 12pt;">De Corte habla también de una </span><b style="font-family: "Times New Roman", serif; font-size: 12pt;">competencia adaptativa</b><span style="font-family: "Times New Roman", serif; font-size: 12pt;"> que tendrían que adquirir los estudiantes,
la cual se traduce en una habilidad para aplicar procedimientos aprendidos
significativamente de manera flexible y creativa y es opuesta a la </span><b style="font-family: "Times New Roman", serif; font-size: 12pt;">competencia rutinaria</b><span style="font-family: "Times New Roman", serif; font-size: 12pt;"> que consiste, principalmente, en la habilidad
para resolver ejercicios de clase de manera precisa y rápida sin entender mucho
lo que se trata, y que es justamente donde se centran los esfuerzos de muchos
de los docentes.</span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman", serif; font-size: 12pt;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">La competencia adaptativa se considera ahora como el fin último de la educación matemática,
precisa De Corte. Es importante, si no necesaria, con vistas a la adquisición
de <u>la habilidad para transferir las habilidades y conocimientos </u>propios
a nuevas tareas y nuevos contextos de aprendizaje. Y en este momento, esa es
una tarea urgente.<o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">A pesar de todo lo anterior, la enseñanza de las
matemáticas, en México, sigue respondiendo a ese afán de saturar de hechos, de
fórmulas, de procedimientos, de mnemotecnias y de recetas a los alumnos. <o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<a href="https://4.bp.blogspot.com/-M7bQSh2uCe8/Wv9cYPleHlI/AAAAAAAAPgs/hRcyS9L_LqoDg6AAb3QLCSPu1cYoUOlWgCLcBGAs/s1600/fotos%2Bpara%2Bun%2Bpost%2Ben%2Bmayo%2B2018%2B3%2B%25282%2529.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" data-original-height="769" data-original-width="1029" height="239" src="https://4.bp.blogspot.com/-M7bQSh2uCe8/Wv9cYPleHlI/AAAAAAAAPgs/hRcyS9L_LqoDg6AAb3QLCSPu1cYoUOlWgCLcBGAs/s320/fotos%2Bpara%2Bun%2Bpost%2Ben%2Bmayo%2B2018%2B3%2B%25282%2529.jpg" width="320" /></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Nos sigue pareciendo un objetivo importante que el alumno
sea capaz de utilizar series de Riemann para calcular integrales definidas, por
ejemplo, en lugar de que sepa cuándo y para qué necesita el concepto de
integral, saber plantear una integral cuando se requiera, y ser capaz de
resolverla utilizando una aplicación o algún software. Al final no saben ni
para qué sirven ni cómo calcularlas. La foto muestra la secuencia de
preguntas que fui creando para ayudar a los alumnos de un curso de Física para
Ingeniería en nanotecnología y en ingeniería biomédica a establecer los
elementos conceptuales y procedimentales para calcular un centroide:<br /><br /><br /><o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman", serif; font-size: 12pt;">En la década de los 70, el surgimiento de los CCH hizo
suponer que llegarían vientos de cambio a nivel medio superior. En la
actualidad, los profesores que participaron en su fundación lamentan que se
haya convertido en una prepa más, sin diferencias ni de forma ni de fondo. Las
pocas habilidades de lectura y de razonamiento de los egresados de las
secundarias producen programas de estudio de nivel remedial en los
bachilleratos, un alto índice de deserción y, para los que llegan a las
universidades, con honrosas excepciones, limitantes serias para una formación
de calidad.</span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Hace casi 200 años, en 1829, </span><a href="http://www.matemticasparatodos.com/sobre-la-ensentildeanza-y-sus-resultados.html"><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Evaristo
Galois había denunciado la pésima calidad de la enseñanza a nivel bachillerato</span></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">,
en su país. <i>Se enseña a los jóvenes a
pasar exámenes</i>, dijo, señalando el contubernio entre los profesores y los
editores de los libros de texto, en Francia, en su época. Seguimos en eso:
ENLACE, PISA, CENEVAL, etc. dictan lo que los alumnos deben aprender con el
triste resultado de que al terminar los estudios, particularmente los que
abandonan la escuela en algún momento, no pueden ni saben cómo hacer uso de lo
que supuestamente aprendieron. El mismo Gerver, al que nos referimos al
principio menciona, en la entrevista para ABC que: </span><span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;"><o:p></o:p></span></div>
<div class="MsoNormal">
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<i><span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;">Si las escuelas tienen<span class="apple-converted-space"> </span><b>pasión y confianza<span class="apple-converted-space"> </span></b>por lo que hacen, pueden
desarrollar el sistema que más se ajuste a sus necesidades. No hay un único
método. Aunque compartan algunas características, cada país es único y
diferente y debe encontrar lo que funciona para él. <u>Lo que ya no funciona es
el sistema educativo que entrena para aprobar exámenes</u>.<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn7" name="_ftnref7" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><b><span style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; color: #080808; font-size: 11.5pt; line-height: 115%;">[7]</span></b></span><!--[endif]--></span></a>
</span></i><span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;">(El subrayado es mío).<o:p></o:p></span></div>
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<span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;">Y añade:</span><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><o:p></o:p></span></div>
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<i><span style="background: white; color: #080808; font-family: "Georgia",serif; font-size: 11.5pt; line-height: 115%;">No se trata solo de adquirir conocimientos. Es
absolutamente necesario que aprendan a<span class="apple-converted-space"><b> </b></span><b>resolver
problemas,</b><span class="apple-converted-space"> </span>a pensar por sí
mismos, a colaborar, a<span class="apple-converted-space"> </span><b>trabajar
en equipo,</b><span class="apple-converted-space"> </span>a saber adaptarse
a los cambios de forma permanente. Y, sobre todo, a no sentarse a escuchar,
sino a<span class="apple-converted-space"><b> </b></span><b>seguir
aprendiendo conceptos por su cuenta.</b><span class="apple-converted-space"> </span>Las
capacidades más importantes que un joven puede tener son las habilidades
personales.<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftn8" name="_ftnref8" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><b><span style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; color: #080808; font-size: 11.5pt; line-height: 115%;">[8]</span></b></span><!--[endif]--></span></a></span></i><i><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"><o:p></o:p></span></i></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Pero para los alumnos, en general, un curso es bueno
si “lo pasa”, de preferencia con altas notas. Los profesores, particularmente
en instituciones privadas, se someten a la evaluación que hacen de ellos los
alumnos, sacrificando en ocasiones la calidad de los aprendizajes por los
puntos de la encuesta de satisfacción, so pena de no ser recontratados. Los
padres de familia siguen creyendo que las notas obtenidas hablan de: 1) la
calidad de la institución educativa y 2) la inteligencia y buena preparación de
sus hijos. Las instituciones utilizan esos puntajes que obtienen los alumnos
para 1) conservar la matrícula y 2) generar los indicadores que significan
acreditaciones y fondos. En apariencia, todos ganan.<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Sin embargo el desarrollo tecnológico ha hecho que ese
tipo de conocimiento enciclopédico sea obsoleto y que las altas notas en esos
cursos no sean significativas en un mundo laboral que exige muchos <i>know how</i>. Yo dudo de que,
profesionalmente, alguien realmente se ponga a imitar a Newton haciendo tablas
detalladas para calcular algo que en Excel se hace de manera muy sencilla y
rápida. </span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">De la misma manera, dedicar un curso de Ecuaciones Diferenciales
Ordinarias a que un alumno aprenda a
calcular a mano menos de lo que el Wolfram Alpha hace en minutos, me parece una
pérdida de tiempo que podría emplearse en habilitarlo para utilizar las
herramientas en la solución de problemas reales, generando pensamiento crítico
y creativo.<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Por supuesto, el rol del docente tendría que cambiar.
Y terminaría el papel preponderante de los libros de texto en lo que llamamos
educación. Nuestras seguridades al dar clase y hacer que los alumnos aprendan a
contestar de manera preestablecida tendrían que dar paso a un quehacer de
colaboración e investigación activa, lleno tal vez de incertidumbres. La
pérdida del control, que a veces no es tan caro, sería una consecuencia. Y tal
vez por eso seguimos haciendo lo mismo que aprendimos de nuestros profesores
(los míos eran otra cosa, aclaro).<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Pero hay otras maneras de hacer las cosas. Perrenoud
dice que el uso de la estrategia didáctica del Aprendizaje Basado en Problemas
(ABP o PBL), a nivel universitario, ni siquiera debería cuestionarse. El
acercamiento a ese tipo de trabajo puede comenzar desde la escuela primaria,
por supuesto. Y hay que aclarar que lo que define a un problema depende del
grado y el desarrollo de los alumnos. <o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">En ese sentido voy a comentar brevemente acerca del
uso de <i>Desmos</i> para generar
aprendizajes sobre las cónicas, como lo plantee y desarrollé en un curso de Geometría Analítica (Matemáticas
IV) en el Colegio del Bosque, en León:<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Una vez que habíamos construido la ecuación ordinaria
de la circunferencia, a partir de un problema propuesto, se les pidió hacer un dibujo creativo en</span><a href="http://www.matemticasparatodos.com/desmos-calculator.html" target="_blank"><i><span style="color: blue; font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"> Desmos</span></i></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;"> utilizando
rectas y circunferencias, como tarea. Las preguntas (vía <i>Edmodo</i>) comenzaron a llegar: "¿podemos usar otro tipo de
curvas?". No solamente aprendieron a graficar otras curvas y a establecer
las ecuaciones ordinarias correspondientes (viendo la galería de dibujos en <i>Desmos</i> o los videos en el canal de
Desmos en YouTube) sino que, además, aprendieron a colorear utilizando
desigualdades y a limitar dominios y rangos. Al terminar cada etapa de dibujos
teníamos una sesión de institucionalización de los aprendizajes generados, muy
en el estilo de las dialécticas de Brousseau.<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Hablando solamente de cursos de/que requieren de
matemáticas, una de las experiencias más ricas la tuve con los alumnos de
Análisis Numérico en la Ibero Tijuana, en 2011. Alumnos muy interesados,
participativos y colaborativos. El curso tuvo como soporte un </span><a href="https://www.facebook.com/groups/analisisnumerico/"><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">grupo
cerrado en Facebook</span></a><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">. Las discusiones, las aportaciones, los
problemas que se les propusieron para generar los aprendizajes requeridos,
están en las publicaciones del grupo. Todos los alumnos de ese curso son
exitosos ingenieros graduados. El grupo está ahora abierto para que sea visible
públicamente y puedan ser reutilizados los materiales.<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Tal vez lo que hace falta es integrarnos a grupos de
discusión sobre los programas de estudio actuales, en todos los niveles, para
colaborar en una investigación seria, no pensada para solamente hacer puntitos
para el SNI, acerca de los conocimientos, habilidades y actitudes que el estudiante mexicano debiera generar y
poner a prueba al terminar cada ciclo escolar. A nivel superior, determinar las
competencias profesionales que son requeridas del egresado de cada carrera, y
replantear los planes de estudio y las metodologías de aprendizaje que ayuden a
desarrollar esas características en ellos.<o:p></o:p></span></div>
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<span style="font-family: "Times New Roman",serif; font-size: 12.0pt; line-height: 115%;">Es una invitación.<o:p></o:p></span></div>
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<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref1" name="_ftn1" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "Calibri",sans-serif; font-size: 10.0pt; line-height: 115%; mso-ansi-language: ES-MX; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-language: AR-SA; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;">[1]</span></span><!--[endif]--></span></a> <span class="selectable">Pérez-Barco, C. “</span><a href="http://www.abc.es/familia-educacion/20140313/abci-richard-gerver-educacion-201403112038.html">El
Sistema Educativo Español Está Anclado
En La Era Industrial</a><span class="selectable"><span style="font-family: "Tahoma",sans-serif;">”</span>.
<i>ABC.es</i>., 2014. Web. 24 May 2015.</span><span style="font-family: "Times New Roman",serif;"><o:p></o:p></span></div>
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<h2 style="background: white; line-height: 13.2pt; margin-top: 0in;">
<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref2" name="_ftn2" title=""><span class="MsoFootnoteReference"><span style="color: windowtext; font-family: "Calibri",sans-serif; font-weight: normal; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-size: 13pt; line-height: 115%;">[2]</span></span><!--[endif]--></span></span></a>
<span style="color: windowtext; font-family: "Times New Roman",serif; font-size: 10.0pt; font-weight: normal; mso-bidi-font-weight: bold; mso-fareast-font-family: Calibri; mso-fareast-theme-font: minor-latin;">Richard Gerver. </span><a href="http://innovacioneducativa-sm.aprenderapensar.net/files/2012/05/139934_Crear-hoy-la-escuela-del-ma%C3%B1ana2.pdf"><i><span style="font-family: "Times New Roman",serif; font-size: 10.0pt; font-weight: normal; mso-bidi-font-weight: bold; mso-fareast-font-family: Calibri; mso-fareast-theme-font: minor-latin;">Crear hoy la escuela
del mañana: la educación y el futuro de nuestros hijos</span></i></a><span class="apple-converted-space"><span style="color: windowtext; font-family: "Times New Roman",serif; font-size: 10.0pt; font-weight: normal; text-transform: uppercase;">. </span></span><span style="color: windowtext; font-family: "Times New Roman",serif; font-size: 10.0pt; font-weight: normal; mso-bidi-font-weight: bold; mso-fareast-font-family: Calibri; mso-fareast-theme-font: minor-latin;">Ediciones SM, 2012.<o:p></o:p></span></h2>
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<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref3" name="_ftn3" title=""></a><b>Nota bene</b>:
Las traducciones libres son mías, a partir de los textos citados.<o:p></o:p></div>
<div class="MsoFootnoteText">
<span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "Calibri",sans-serif; font-size: 10.0pt; line-height: 115%; mso-ansi-language: ES-MX; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-language: AR-SA; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;">[3]</span></span><!--[endif]--></span>
<span class="selectable">Claude Lelièvre. <i>L’Express.fr</i>.""</span><a href="http://www.lexpress.fr/actualite/dieudonne-a-bas-euclide_1313461.html"><span lang="FR">Dieudonné: "A Bas Euclide!</span></a><span class="selectable"><span lang="FR">"'. </span>2009.
Web. 22 May 2015.</span> <o:p></o:p></div>
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<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref4" name="_ftn4" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "Calibri",sans-serif; font-size: 10.0pt; line-height: 115%; mso-ansi-language: ES-MX; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-language: AR-SA; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;">[4]</span></span><!--[endif]--></span></a> <span class="selectable"><span lang="FR">Claude Lelièvre.
Op. Cit.</span></span><span lang="FR"><o:p></o:p></span></div>
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<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref5" name="_ftn5" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "Calibri",sans-serif; font-size: 10.0pt; line-height: 115%; mso-ansi-language: ES-MX; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-language: AR-SA; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;">[5]</span></span><!--[endif]--></span></a> <span class="selectable"><span lang="FR">Claude Lelièvre.
'</span></span><a href="http://blog.educpros.fr/claudelelievre/2009/12/10/a-bas-euclide/"><i><span lang="FR">Le
Blog De Claude Lelievre</span></i></a><span class="selectable"><i><span lang="FR"> </span></i></span><span class="selectable"><span lang="FR">. </span></span><span class="selectable"><span lang="EN-US">Blog Archive.
« A Bas Euclide! ». 2009. Web. 22 May 2015.</span></span><span lang="EN-US"><o:p></o:p></span></div>
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<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref6" name="_ftn6" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "Calibri",sans-serif; font-size: 11.0pt; line-height: 115%; mso-ansi-language: ES-MX; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-language: AR-SA; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;">[6]</span></span><!--[endif]--></span></a> <span lang="EN-US" style="background: white; color: #222222; font-size: 10.0pt; line-height: 115%; mso-ansi-language: EN-US;">Erik
De Corte.<i> </i><u>Learning from
instruction: the case of mathematics</u>. <i>Learning
Inquiry</i>, (2007) 1:19–30. Springer.</span><span lang="EN-US"><o:p></o:p></span></div>
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<a href="file:///C:/Users/Blanca/Documents/Rollos/guadalajara/Resumen%20de%20Los%20retos%20actuales%20de%20la%20educaci%C3%B3n%20matem%C3%A1tica.docx#_ftnref7" name="_ftn7" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "Calibri",sans-serif; font-size: 10.0pt; line-height: 115%; mso-ansi-language: ES-MX; mso-ascii-theme-font: minor-latin; mso-bidi-font-family: "Times New Roman"; mso-bidi-language: AR-SA; mso-bidi-theme-font: minor-bidi; mso-fareast-font-family: Calibri; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin; mso-hansi-theme-font: minor-latin;">[7]</span></span><!--[endif]--></span></a> <span class="selectable">Pérez-Barco, C. Artículo citado.</span><o:p></o:p></div>
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Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-47336604524546945422018-05-17T11:56:00.000-05:002018-05-17T11:56:09.954-05:00Avances en lo que va del año2017 terminó con una semana de ser madre de tiempo completo, deliciosamente, en las primeras vacaciones de mi hijo trabajando para <a href="https://outplay.com/" target="_blank">Outplay</a>, en Dundee, Escocia. Siguieron las visitas a esta ciudad, con el privilegio de alojarlos en mi casa, de la Dra. Milagros Huamán Castro, de la <a href="http://www.usmp.edu.pe/" target="_blank">USMP</a>, (ella me acaba de recordar hoy, en la celebración de aniversario de la universidad, que soy parte de su planta docente), y de mis primos que viven en California y con quienes no había compartido en décadas. Luego vino Celeste, ex alumna de la Ibero Tijuana, a Aguascalientes, a un torneo de artes marciales, y aprovechamos para pasear. Siguió la visita de Janeth, ex alumna también de la Ibero TJ y con quien me une una amistad especial; con su familia, vino a entregarme la invitación para su boda, en agosto, en los viñedos cercanos a Ensenada.<br />
<br />Yo fui a Tepic, a celebrar mi cumpleaños, y me reuní con excompañeras de la secundaria, a quienes no había visto en 53 años; hubo momento en los que reí, internamente, a carcajadas. Y fui a San Blas, donde la señal del camino compartido apareció nuevamente, esta vez en una estrella roja, semejante en forma, tamaño y material, a la que encontré hace un año en el mismo lugar. Solamente una, solamente en mi camino. Solamente para mí.<br /><br />
A partir de ahí, surgió trabajo de otro estilo: un taller de poesía, personalizado, con <a href="http://www.elem.mx/autor/datos/2371" target="_blank">Jair Cortés</a> como maestro. El proceso y sus resultados los di a conocer en <a href="https://bparramosqueda.wordpress.com/" target="_blank">mi blog de WordPress</a>. La segunda parte, a petición mía, espera a que me desocupe de otros compromisos. Mientras, hice seis vestidos (el de prueba y el de mi proyecto especial, descritos en las publicaciones del taller, dos para mi hermana Nidia y uno para mi madre); también aprendí a hacer chololos (pan tradicional de mis familiares panaderos) y, por primera vez, decidí hacer croissants de mantequilla. Necesitaba reconectarme, concentrarme, sacarme los rastros de depresión que comenzaban a aparecer, y el trabajo manual es la mejor terapia, para mí.<br />
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Y comenzó la parte más académica:<br />
<br />
<ul>
<li>en abril, la Dra. Deepti Sawhney me hizo llegar el <a href="https://drive.google.com/file/d/1RbIPhushNna2gsbQIp3sYwcebpJ5JFOL/view?usp=sharing" target="_blank">folleto de abril del Mahattattva Educational Advisory Pvt. Ltd.</a> en el cual se consigna que soy miembro de su Advisory Board, </li>
<li>recibí la petición de escribir dos capítulos para un libro sobre <i>innovación educativa</i>, de los cuales ya terminé uno y estoy a la mitad del otro ... si no fuera porque tengo que terminar de ponerlos en formato APA, que detesto;</li>
<li>al mismo tiempo, desempeño mi función de árbitro para <i><a href="http://revistas.unam.mx/index.php/entreciencias" target="_blank">Entreciencias</a>, </i>revisando un par de artículos;</li>
<li>a petición de Moumita Dey, traduje al inglés y resumí en 400 palabras, para ser publicado en <a href="http://www.placementpro.co.in/" target="_blank"><i>Placement Prokiya</i></a>, el texto que hace tres años publicó <a href="http://www.eslocotidiano.com/opinion/blanca-parra/queremos-nos-lea-conceptos-libro-texto/20150414211542018968.html" target="_blank"><i>Es lo Cotidiano</i></a> y que sigue siendo actual aunque la situación parece haberse agravado, a juzgar por lo que estoy revisando.</li>
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Ayer tuve una muy agradable sorpresa: mi profesor de Álgebra I (Teoría de ecuaciones), en el primer semestre de la carrera en la Escuela Superior de Física y Matemáticas del I.P.N., apareció en una <a href="https://www.facebook.com/cecilia.rudoy/videos/10156461698129169/UzpfSTExMDYzNDgzNTM6MTAyMTUyNTE0MzU4MTQ5Njg/" target="_blank">publicación de uno de mis amigos, en Facebook</a>. Un cincuentenario que recuerdo con mucho aprecio, porque ese curso definió mi permanencia en esa Escuela (estaba de paso, porque en realidad iba a estudiar Arquitectura) y el tema central de mis estudios ahí: el álgebra moderna. Al mismo tiempo, el recordatorio de nuestra participación en el Movimiento del 68. Un maestro cool, nada convencional, que transmitía contagiosamente su amor por el saber matemático. Y por eso estoy muy agradecida con Ángel Verdugo. Después del 2 de octubre (llegamos juntos a Tlatelolco) no volví a saber de él, excepto por una conversación dentro de mi Taller de Comunicación en la Ibero Tijuana, en 2011, pero entonces asumí que se trataba de un homónimo.</div>
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Hace una semana fui a Amatlán de Cañas, Nayarit, para festejar a mi madre en casa de mi hermano. El martes iré a Tepic, para celebrar mis cincuentenarios felices, en la Alameda de mi pueblo.</div>
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Si no lo pongo por escrito, no me doy mucha cuenta de si he aprovechado el tiempo o no.</div>
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<br />Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-47985423317884158102017-11-10T10:50:00.000-06:002017-11-10T21:24:43.665-06:00Congreso EduTicInnova 2017. Virtual desde Perú.<div class="separator" style="clear: both; text-align: center;">
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Suponiendo que les pueda interesar mi plática, que tendrá lugar el día de hoy, viernes 10 de noviembre de 2017, a las 5 P.M. hora de Lima, y previendo que no puedan establecer conexión con el sitio, les dejo el texto del que parte mi presentación.<br />
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<span style="font-size: 14.0pt; line-height: 115%; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;"><b>Desarrollo de competencias docentes mediante el uso de TIC en
profesores universitarios. Recuento de una experiencia.</b><o:p></o:p></span></div>
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Esta es la tercera
vez que tengo el honor de ser invitada a participar en estos Congresos EduTicInnova.
La experiencia ha sido más que gratificante tanto por la oportunidad de conocer
experiencias de aprendizaje que incorporan las TIC, en modalidades de
E-learning total o en híbridos, en países de habla hispana como por permitirme
compartir mis experiencias.<o:p></o:p></div>
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Mi participación en
esta ocasión da cuenta de mi experiencia más reciente, en la primera semana de
agosto de este 2017, impartiendo un par de talleres para docentes en una
universidad pública, en México.<o:p></o:p></div>
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<b><span style="font-size: 14.0pt; line-height: 115%; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;">Preámbulo<o:p></o:p></span></b></div>
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De las competencias docentes, las que menciona la SEP para
profesores de nivel medio superior, y deseables para los que se desempeñan
en las universidades por supuesto, y las que de manera más sintética describe
Perrenoud, me centro en la colaboración que considero fundamental para el
desarrollo de cualquiera de las otras.<o:p></o:p></div>
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Nadie podría cumplir con todo lo que la SEP demanda
trabajando de manera aislada. Se requiere el concurso de todos los docentes,
los directivos, los estudiantes y los padres de familia.</div>
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Pero, más importante aún, desarrollar alumnos competentes, que no competitivos,
requiere que aprendan a trabajar de manera colaborativa, aprendiendo de todos y
con todos. No es nuevo que el aprendizaje se construye socialmente, es parte de
lo que aprendimos con Vygotsky (citado por Juan Delval en <a href="http://www.eafranco.com/docencia/ingeticaysociedad/files/lecturas/unidad01/Como_se_construye_el_conocimiento_humano.pdf">“¿Cómo
se construye el conocimiento?</a><span class="MsoHyperlink">”</span>), por ejemplo.<o:p></o:p></div>
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Por otro lado, “el proceso de socialización aparte de
dedicarse a la construcción de conocimientos y habilidades busca que las
personas asuman el compromiso de ser mejores, de alcanzar desarrollo humano
sostenible, esto es, progresar personal y socialmente en armonía con su
contexto o entorno social.”, dicen Carlos Augusto Puerta Gil y Lina María
Sánchez Ceballos en “<a href="http://revistavirtual.ucn.edu.co/index.php/RevistaRyS/article/view/516/1064">Socialización
del conocimiento en los procesos de enseñanza-aprendizaje desde una reflexión
semántica</a>”. Es decir: el desarrollo de las competencias que declaran en sus
planes de formación la mayor parte de las instituciones educativas dependería
de estos procesos de socialización.<o:p></o:p></div>
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El trabajo colaborativo está en la base de la construcción
de los perfiles profesionales deseados para los egresados de las instituciones superiores y
también es la base de las estrategias de aprendizaje recomendadas para desarrollarlos, tales como ABP -sea a través de problemas (que NO son
ejercicios del tipo de los encontrados en los libros de texto) o de Proyectos
(que NO es un simple desarrollo realizado en un par de horas), Análisis de
casos, y cualquiera otra de las estrategias que de repente se vuelven moda.</div>
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Sin embargo, asumimos que colaborar es una disposición “natural” en
los estudiantes, aunque muchas veces como docente no tengamos esa disposición
ni sepamos muy bien lo que significa colaborar en un equipo. Suponemos que el
interés por construir juntos y por aprender de los otros es algo que se da al
influjo de la voz del docente que los convoca a realizar una tarea. <o:p></o:p></div>
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Para colaborar es necesario conocer nuestras fortalezas y
nuestras debilidades para saber lo que uno puede ofrecer al equipo de trabajo y
aquello en lo que necesitamos apoyo. De ahí el interés del autodiagnóstico al
que me referiré en esta charla.<o:p></o:p></div>
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Esas son las razones por las cuales la colaboración, en tareas presenciales o virtuales, es el centro de esta charla.</div>
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<b><span style="font-size: 14.0pt; line-height: 115%; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;">Primera parte: Descripción de la experiencia</span></b></div>
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</span></b>Se trataba de dos talleres
(Básico y Avanzado, siendo el primero prerrequisito para el segundo) cada uno
diseñado para 20 horas presenciales, con un mínimo de 10 horas de trabajo
independiente de los participantes. En realidad, resultó en la compactación de
los dos talleres en uno solo: lunes y martes para el primero, un break el
miércoles para permitirles hacer las primeras tareas, y jueves y viernes para
el segundo, 5 horas para cada sesión. Para cada uno de estos talleres se creó
un grupo en <a href="http://www.xarxatic.com/por-que-vuelvo-a-usar-edmodo/">Edmodo</a>, de manera de los participantes tuvieran
acceso oportuno a las actividades preliminares y a las guías y materiales para
cada taller.<o:p></o:p></div>
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Se registraron 16
participantes para el primer taller, de los cuales 7 eran remotos; las
transmisiones se llevaron a cabo vía Webex; solamente uno de los siete remotos
participó en el proceso completo de los dos talleres y entregó los trabajos
asignados; no se trataba de un problema de conexión, aun cuando la transmisión
de las sesiones tuvo que esperar a ser establecida después de los primeros
incidentes de la primera sesión, cuando Murphy produjo una serie de eventos
desafortunados pero no insolubles. </div>
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Ante una sucesión de hechos como los que
acontecieron (el cañón no funcionaba, no había conexión a Internet y hubo corte
de energía eléctrica) se hizo evidente que:<br />
1) hay que tener siempre un plan B para sesiones presenciales<br />
2) tener el taller completamente detallado en una plataforma (Edmodo) resuelve
muchos de los inconvenientes, para todos.<o:p></o:p></div>
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Por supuesto, al
trabajar en estas modalidades mezcladas se pierden las discusiones entre los participantes
presenciales y remotos, pero eso se resuelve al agregar algunos tópicos en la
misma plataforma (Edmodo) y
poniendo en práctica lo que constituía el eje del primer taller: la
colaboración y el uso de las herramientas tecnológicas. Para facilitar esta
colaboración se abrió un wiki en <a href="http://www.pbworks.com/education.html">PbWorks</a> como espacio para discusiones y para entrega de los trabajos de cada
taller, de manera que estos estuvieran disponibles para todos y cuyo acceso no
estuviera sometido al recorrido por todo el “timeline” en Edmodo; al mismo
tiempo se creó así un portafolio virtual para cada estudiante. <o:p></o:p></div>
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Los nueve docentes presenciales
activos desde el inicio participaron y aportaron en cada una de las sesiones de
los dos talleres. El participante remoto entregó muy oportunamente sus trabajos
y sus aportaciones a las discusiones, aunque sin colaborar con sus compañeros. La
colaboración, presencial o virtual, es algo que hace falta desarrollar y hablaremos
de ello en la segunda parte.<span style="font-family: "segoe ui symbol" , sans-serif; mso-bidi-font-family: Arial; mso-bidi-font-style: italic; mso-fareast-language: JA;"><o:p></o:p></span></div>
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Una de las
características de mi trabajo con grupos grandes en los que es necesario, útil
y recomendable el uso de las herramientas tecnológicas para favorecer la
colaboración, la creación de contenidos y el desarrollo del pensamiento
crítico, es hacer que las mismas actividades del curso, incluidas las tareas,
incorporen las herramientas que espero que el estudiante adopte. Una
experiencia al respecto <a href="https://drive.google.com/file/d/0B33nni72fr_Yc3Z1RmtIelRTam8/view?usp=sharing">la
relaté en el Congreso</a> CIAMTE 2012 y
comencé a retomarla a petición de una editorial española, en este<a href="http://aprendizajemediadoportics.blogspot.mx/2017/01/acerca-de-entornos-personales-de.html"> blog</a>. <o:p></o:p></div>
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Los talleres
desarrollados en esta ocasión se diseñaron bajo esta misma perspectiva, aunque
desconocía por completo el uso de las TIC que pudieran estar haciendo los
docentes hasta ese momento. Los objetivos de cada taller se detallan en el
Anexo 1, al final del documento; los programas de los talleres se encuentran en
los enlaces siguientes, cuyos textos reenvían a los documentos y recursos
sugeridos y empleados; el <u>Taller básico</u> fue, por supuesto, prerrequisito
para el avanzado:<o:p></o:p></div>
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</span></span><!--[endif]--><a href="https://drive.google.com/file/d/0B33nni72fr_YakRzWkNDMHo3dGM/view?usp=sharing">Taller
básico</a>: “El Desarrollo de las
Habilidades Docentes Universitarias”.<o:p></o:p></div>
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</span></span><!--[endif]--><a href="https://drive.google.com/file/d/0B33nni72fr_YZXBWT1F1S2lSdWM/view?usp=sharing">Taller
avanzado</a>: “Competencias Docentes.
Desarrollo de Competencias en los Alumnos”.<br />
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Adicionalmente, después del
ejercicio del mini <i>EduCamp</i> en el Taller Básico, compartí con ellos uno de los <a href="https://www.symbaloo.com/mix/favoritos2703">webmix en Symbaloo</a> que tengo creados, como vía para acercarlos a los recursos que
utilizo más frecuentemente; se agregó también el enlace a una <a href="https://prezi.com/p/xjtj-qqdlivj/">presentación en Prezi diseñada
específicamente para estos talleres</a>
acerca de la correspondencia entre los métodos de evaluación y los paradigmas
de aprendizaje. Varios de los participantes presenciales y el participante
remoto comenzaron a incorporar los recursos, creando sus propios webmix o agregando
los recursos en las pestañas de su navegador.<o:p></o:p></div>
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A partir del momento de la realización del mini <i>EduCamp</i> fue claro que
había (espero que sea realmente pasado) docentes que confesaban utilizar “el
Internet” sin precisar claramente de lo que hablaban, aunque esencialmente se
referían al uso del correo electrónico para asuntos profesionales/académicos y
que nunca habían pensado en el uso de las redes sociales como recursos
educativos, entre otras cosas. No puedo decir que todos modificaron su postura
o práctica pero sí que, al menos, contemplaron otras posibilidades tanto de
recursos tecnológicos como de actividades didácticas que pueden llevarse a cabo
con o sin uso de tecnología, como es el caso del “<a href="http://bit.ly/2yIPnHt"><i>Cadáver
exquisito</i></a>” que suelo utilizar
para introducir a mis estudiantes a la creación colaborativa en línea,
asíncronamente, etc. y que resultó de utilidad para la profesora de Inglés,
particularmente.<o:p></o:p></div>
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<u>Acreditación</u>. Para
acreditar cada uno de los talleres los participantes debían entregar
oportunamente los trabajos que se especifican al final de cada uno de los programas,
los cuales estuvieron disponibles a través de la plataforma Edmodo desde antes
del inicio de los trabajos. Hay, además, rúbricas para la evaluación de las
actividades y los documentos que les fueron requeridos. Dispusieron de cuatro
semanas para las entregas finales, tomando en cuenta que estaban a punto de
iniciar un semestre y venían regresando de sus vacaciones.<u><o:p></o:p></u></div>
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Sin embargo, a medida que el taller avanzaba, y tomando en cuenta los
recortes de tiempo no imputables ni a los participantes ni a la institución,
más el hecho de que los docentes en el grupo no parecían haber estado expuestos
a actividades de tipo colaborativo, se hizo necesario flexibilizar un poco las
rúbricas aunque manteniéndolas como parte integral de la discusión en torno a
la evaluación de los aprendizajes de sus estudiantes; además, hacerlos pensar
en sus producciones con base en una rúbrica entregada junto con la tarea a
desarrollar hizo que revisaran y actualizaran sus entregas, adaptándolas a lo
solicitado, mientras reconocían las ventajas que eso tiene a la hora de
discutir con los estudiantes sobre las notas asignadas.<o:p></o:p></div>
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En lo que sigue nos
centraremos en uno los resultados esperados del primer taller: <i>desarrollar
una</i> <i>propuesta de trabajo colaborativo, elaborada por el grupo completo,
para auxiliar a otros docentes como academia y ayudar a desarrollar un trabajo
docente de calidad, reconocible en el desempeño de sus estudiantes y la
satisfacción de los mismos, de los padres y de las autoridades, en concordancia
con la propuesta contenida en el Modelo Educativo de la institución. <o:p></o:p></i></div>
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<b><span style="font-size: 14.0pt; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;">Segunda parte: Reflexión sobre la experiencia colaborativa<o:p></o:p></span></b></div>
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Como anticipamos al iniciar la descripción de la experiencia, la
colaboración entre los participantes no se dio, particularmente cuando el
trabajo debía desarrollarse virtualmente a través de las plataformas Edmodo y
PbWorks. <o:p></o:p></div>
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En las sesiones presenciales fueron obligados a trabajar en equipos
conformados según sus propios criterios, excepto para la actividad de Aprendizaje
Basado en Problemas (ABP) en la que uno de ellos fungía como observador y el
resto actuaba como equipo de alumnos que lleva a cabo la primera parte de un
trabajo en ABP: la lluvia de ideas y primeros acuerdos. En esa actividad fue
notable la escasa voluntad para colaborar.<o:p></o:p></div>
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<br /></div>
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Sabemos que la colaboración no se da de manera espontánea a menos que
concurran una serie de factores entre los cuales está, para comenzar, el
sentirse realmente involucrados en la tarea y ser responsables de proponer una
solución<a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftn1" name="_ftnref1" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 11.0pt; line-height: 115%;">[1]</span></span><!--[endif]--></span></a>.
Por otro lado, es necesario haber desarrollado previamente algunas
características que predispongan al trabajo colaborativo.<o:p></o:p></div>
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En su artículo “Interpersonal Traits, Complementarity, and Trust in
Virtual Collaboration”<a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftn2" name="_ftnref2" title=""><sup><!--[if !supportFootnotes]--><sup><span style="font-family: "calibri" , sans-serif; font-size: 11.0pt; line-height: 115%;">[2]</span></sup><!--[endif]--></sup></a>, Poole y sus colaboradores hacen énfasis en
la disposición para confiar como elemento inherente para el trabajo colaborativo
y para hacer uso de los recursos tecnológicos que facilitan esa colaboración.<o:p></o:p></div>
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En este trabajo hacen uso de una especie de cartografía<a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftn3" name="_ftnref3" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 11.0pt; line-height: 115%;">[3]</span></span><!--[endif]--></span></a>
para describir/ubicar los tipos de personalidad y su asociación con esta
capacidad de confiar, el círculo de Leary<i><span style="background: white; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> (Interpersonal
Circle Model of Personality)</span></i>:<o:p></o:p></div>
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<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://2.bp.blogspot.com/-aC_KcCA6S5g/WgXW-ZbxSXI/AAAAAAAAPQE/RSukhOMTOq4wxx_LifxrgTi0lCzmmr2rACLcBGAs/s1600/circulo%2Bde%2Bleery.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="519" data-original-width="564" height="294" src="https://2.bp.blogspot.com/-aC_KcCA6S5g/WgXW-ZbxSXI/AAAAAAAAPQE/RSukhOMTOq4wxx_LifxrgTi0lCzmmr2rACLcBGAs/s320/circulo%2Bde%2Bleery.gif" width="320" /></a></div>
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<br /></div>
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Existe, además, un <a href="https://therearenosunglasses.wordpress.com/2010/01/23/the-leary-personality-test/">test
asociado</a><a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftn4" name="_ftnref4" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 11.0pt; line-height: 115%;">[4]</span></span><!--[endif]--></span></a> que permite determinar las características
personales respecto de esta descripción, lo cual sería un muy buen añadido a
los test de autoconocimiento que se propusieron a los participantes en las
actividades preliminares. El test, junto con el número de marcas que obtuvo
cada descriptor se encuentra en el <u>Anexo 2</u>.<o:p></o:p></div>
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¿Podemos detectar algunas de las características de los participantes
en estos talleres, a partir de sus autoanálisis desarrollados en las
actividades preliminares? En lo que sigue, sobre la tabla propuesta en el test
mencionado, agruparemos los descriptores empleados por el grupo de participantes
en su autoevaluación diagnóstica.<o:p></o:p></div>
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<br /></div>
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De los diez participantes solamente hay ocho que entregaron su
autoevaluación. Algunos son muy parcos en su descripción y se limitan a dar un
par de descriptores. <b>Como grupo</b>, los participantes se describen de la siguiente manera:<o:p></o:p></div>
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<br />
P: Autocrático 7<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
B: Narcisista 5<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
A: Gerencial 4 <o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
C: Competitivo 4 <o:p></o:p></div>
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D: Sádico 3<o:p></o:p></div>
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E: Agresivo 3<o:p></o:p></div>
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G: Desconfiado 3<o:p></o:p></div>
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<br /></div>
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Es decir: dominantes (C, B, A y P; van de lo hostil (B, C, D y E) a lo amistoso (P y A), con la excepción de uno que
corresponde enteramente a la categoría M: cooperativo y un poco orientado a la
sumisión.</div>
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<o:p></o:p></div>
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<br /></div>
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Es importante notar que las
personas que dicen ser francas y honestas lo condicionan de alguna manera al
añadir “compartir y darse a conocer con cautela”, “cuando siento confianza me
expreso libremente” y “sé quedarme callada para evitar conflictos”.<o:p></o:p></div>
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¿Cómo se relacionan estas características con la disposición para el
trabajo colaborativo virtual y con el uso de nuevas herramientas tecnológicas?<o:p></o:p></div>
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<br /></div>
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En el documento de Poole et al<a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftn5" name="_ftnref5" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 11.0pt; line-height: 115%;">[5]</span></span><!--[endif]--></span></a>,
se establece una serie de proposiciones que relacionan la ubicación de la
personalidad en el círculo de Leary con la disposición para colaborar
virtualmente y para utilizar recursos tecnológicos. Cada uno de los diámetros,
vertical y horizontal, separan dos tipos de conductas: lo hostil (hate) de lo
amistoso (love), definidos por el eje vertical (en rojo); lo dominante
(dominant) de lo sumiso (submissive), por el eje horizontal (en azul). Estos diámetros definen cuatro cuadrantes, nombrados en la figura, que
se leen en el sentido contrario a las manecillas del reloj, comenzando con el
que se encuentra en el extremo superior izquierdo (Cuadrante I: dominante y
hostil). </div>
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<u><br /></u></div>
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<a href="https://3.bp.blogspot.com/-sjnnbyeMKwQ/WgXXGioz9jI/AAAAAAAAPQI/fd3iTmKwGOsPboJeTtN2_k6oaC-0JVTvQCEwYBhgL/s1600/cuadrantes.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="538" data-original-width="574" height="299" src="https://3.bp.blogspot.com/-sjnnbyeMKwQ/WgXXGioz9jI/AAAAAAAAPQI/fd3iTmKwGOsPboJeTtN2_k6oaC-0JVTvQCEwYBhgL/s320/cuadrantes.png" width="320" /></a></div>
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<u><br /></u></div>
<div class="MsoNormal" style="line-height: normal;">
<u>Las proposiciones que establecen los autores</u> hacen referencia a esos
cuadrantes. Aquí detallamos las que nos parecen más relevantes para la
experiencia que compartimos:<o:p></o:p></div>
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<br /></div>
<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0in 5.4pt 0in 5.4pt; mso-yfti-tbllook: 1184; width: 636px;">
<tbody>
<tr>
<td style="background: #D9D9D9; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Proposición<o:p></o:p></b></div>
</td>
<td style="background: #D9D9D9; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 2.0in;" valign="top" width="192"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Cuadrante<o:p></o:p></b></div>
</td>
<td style="background: #D9D9D9; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Disposición para la colaboración virtual<o:p></o:p></b></div>
</td>
</tr>
<tr>
<td colspan="3" style="background: #F2F2F2; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 242; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 476.75pt;" width="636"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Confianza y colaboración<o:p></o:p></b></div>
</td>
</tr>
<tr>
<td style="background: #DBE5F1; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
1a<o:p></o:p></div>
</td>
<td rowspan="3" style="background: #DBE5F1; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 2.0in;" width="192"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<br /></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Cuadrantes
I y II<o:p></o:p></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Baja
afiliación = Hostilidad<o:p></o:p></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<br /></div>
</td>
<td style="background: #DBE5F1; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Bajos niveles de confianza
hacia colaboradores virtuales potenciales<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #DBE5F1; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
2a<o:p></o:p></div>
</td>
<td style="background: #DBE5F1; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Bajos niveles de intención
de iniciar o participar en colaboración virtual<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #DBE5F1; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3a<o:p></o:p></div>
</td>
<td style="background: #DBE5F1; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent1; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Ineficientes en la
colaboración virtual<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #F2DBDB; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
1b<o:p></o:p></div>
</td>
<td rowspan="3" style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 2.0in;" width="192"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Cuadrantes
III y IV<o:p></o:p></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Alta
afiliación = amistoso<o:p></o:p></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<br /></div>
</td>
<td style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Altos niveles de confianza
hacia colaboradores virtuales potenciales<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #F2DBDB; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
2b<o:p></o:p></div>
</td>
<td style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Altos niveles de intención
de iniciar o participar en colaboración virtual<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #F2DBDB; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3b<o:p></o:p></div>
</td>
<td style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Altamente eficientes en
colaboración virtual<o:p></o:p></div>
</td>
</tr>
<tr>
<td colspan="3" style="background: #D9D9D9; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 476.75pt;" width="636"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Respecto a la tecnología<o:p></o:p></b></div>
</td>
</tr>
<tr>
<td style="background: #F2DBDB; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
7a<o:p></o:p></div>
</td>
<td rowspan="2" style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 2.0in;" width="192"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Cuadrantes
III y IV<o:p></o:p></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Alta
afiliación<o:p></o:p></div>
</td>
<td style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Mayor nivel de percepción de
la facilidad de uso y de la utilidad de las TIC<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #F2DBDB; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
7b<o:p></o:p></div>
</td>
<td style="background: #F2DBDB; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Mayor nivel de intención de
uso de las TIC<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #DDD9C3; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: background2; mso-background-themeshade: 230; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
7c<o:p></o:p></div>
</td>
<td style="background: #DDD9C3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: background2; mso-background-themeshade: 230; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 2.0in;" width="192"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Cuadrante
II<o:p></o:p></div>
</td>
<td style="background: #DDD9C3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: background2; mso-background-themeshade: 230; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
El nivel más bajo de
percepción de la facilidad de uso y de la utilidad de las TIC<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="background: #E5DFEC; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent4; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 85.25pt;" width="114"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
8c<o:p></o:p></div>
</td>
<td style="background: #E5DFEC; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent4; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 2.0in;" width="192"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Cuadrante
IV<o:p></o:p></div>
</td>
<td style="background: #E5DFEC; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent4; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 247.5pt;" valign="top" width="330"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Exhiben las actitudes más
positivas hacia el uso de nuevas herramientas tecnológicas<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal" style="line-height: normal;">
<br />
Aun cuando no podemos extraer conclusiones válidas a partir de las
descripciones de los participantes, es interesante tomar en cuenta las
proposiciones previas a la luz de las conductas de los docentes en los
talleres. Observamos, por ejemplo, que el grupo no mostró rechazo al uso de las
TIC, lo cual se verá reflejado en la tabla que seguirá y en la que se muestran
sus intenciones de adoptar algunos de los recursos tecnológicos que utilizamos
en los talleres.<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
Respecto a la confianza y la colaboración virtual, observamos que a
pesar de que se abrieron dos grupos de discusión en PbWorks, uno para comentar
sobre sus autoevaluaciones diagnósticas y otro para comentar sobre el artículo
que cada uno propuso a sus compañeros, no hubo comentarios a las aportaciones de
los otros participantes en ninguno de los dos foros. En un par de casos el interés estuvo centrado en compartir con el
docente a cargo de los talleres, exclusivamente, interactuando de manera
frecuente a través de Edmodo y sometiendo a su consideración un buen número de documentos
adicionales a lo que se les habían pedido en las tareas. </div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
Cierto, Edmodo
funciona mucho como el de muro de Facebook del instructor, pero, a diferencia
de lo que ocurre en la red social, ningún otro integrante del grupo retomó los
comentarios y propuestas hechas por sus compañeros. Cierto también que, en este
caso y otros similares en otros espacios, la confianza viene dada por las
credenciales del instructor y, de ahí, su consideración como un posible colega.</div>
<div class="MsoNormal" style="line-height: normal;">
<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
Cierto también que dentro de los grupos de “amigos” en Facebook se va
generando confianza de manera gradual; uno va aprendiendo el lenguaje y los
modos de comunicarse de cada uno de los que participan en una discusión y a
partir de ahí decide aventurar un comentario. Eso no ocurre en un taller de
corta duración y esa confianza no se genera de manera espontánea, a menos que
los participantes hayan aprendido a confiar en los demás de manera previa, en
sus interacciones regulares. </div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
Podría agregar que cuando se trata de trabajo virtual - generalmente entre
individuos con diferentes intereses y niveles de lenguaje, diferentes modos de
uso (regionalismos, acentos regionales, referentes sociales, etc.)- es alta la cantidad de
malentendidos que pueden generarse, y que buena parte de la voluntad de seguir
participando y resolviendo los conflictos que puedan surgir resulta de la
autoconfianza y de la resiliencia de cada individuo. Los rasgos de personalidad, la
capacidad de socializar y la perseverancia son moldeables, pero están determinadas por las
circunstancias de cada uno, según estudio de <span style="background: white; color: #222222;">Raymundo
Campos-Vázquez</span><span style="background: white; color: #222222; font-family: "arial" , sans-serif; font-size: 15pt;"> </span>detallado
en <i>Nexos</i><a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftn6" name="_ftnref6" title=""><span class="MsoFootnoteReference"><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 11.0pt; line-height: 115%;">[6]</span></span></span></a>.</div>
<div class="MsoNormal" style="line-height: normal;">
<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
<b><u>Preguntas que surgen de estas consideraciones</u></b><o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal;">
<b><u><br /></u></b></div>
<div class="MsoNormal" style="line-height: normal;">
Como docentes, en general, <o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-left: 35.4pt;">
¿compartimos las características de este
grupo de docentes más de lo que creemos -y habría que pedir a los alumnos que
nos ayudaran a descubrir lo que no vemos?<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal;">
Es decir: <o:p></o:p></div>
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->¿Somos
más dominantes, entre hostiles y amistosos, de lo que reconocemos?<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->¿Estamos
abiertos a aprender junto con y de los estudiantes?<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; mso-list: l0 level1 lfo4; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->¿Apoyamos
el desarrollo de actitudes positivas hacia la socialización y la colaboración?<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-left: 0in; mso-add-space: auto;">
<br /></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-left: 0in; mso-add-space: auto;">
<br /></div>
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-left: 0in; mso-add-space: auto;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
<b><span style="font-size: 14.0pt; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;">Tercera parte: las experiencias compartidas a través de las tareas
finales<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: normal;">
<b><span style="font-size: 14.0pt; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;"><br /></span></b></div>
<div class="MsoNormal" style="line-height: normal;">
En lo que sigue presentaré parte de lo que los docentes participantes
comentaron en los trabajos finales de cada uno de los talleres acerca de sus
perspectivas en cuanto a la adopción de recursos tecnológicos y sus razones. <o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
A partir de las tareas
finales, en las que declaran algunos de sus aprendizajes, rescatamos:<o:p></o:p></div>
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; mso-add-space: auto; mso-list: l1 level1 lfo2; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->Aprendí
algo sobre mí (a través de la autoevaluación diagnóstica)<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; mso-add-space: auto; mso-list: l1 level1 lfo2; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->Conocí
algunas herramientas que me serán útiles para mis cursos<o:p></o:p></div>
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; mso-add-space: auto; mso-list: l1 level1 lfo2; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->Generamos
algunos compromisos en equipo (equipos conformados según sus afinidades) para
mejorar nuestra práctica educativa y lograr mejores aprendizajes en los alumnos<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<b>Con respecto a la apropiación
de algunos recursos tecnológicos</b>:<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0in 5.4pt 0in 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
<tr>
<td style="background: #D9D9D9; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Herramienta<o:p></o:p></b></div>
</td>
<td style="background: #D9D9D9; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Frecuencia de adopción o mención<o:p></o:p></b></div>
</td>
<td style="background: #D9D9D9; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: background1; mso-background-themeshade: 217; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<b>Razones externadas<o:p></o:p></b></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 1;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Rubistar<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
6<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Para mejorar (hacer más
objetivo) el proceso de evaluación de los trabajos de los estudiantes<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 2;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Edmodo<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
6<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-add-space: auto; mso-list: l2 level1 lfo3; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->asignar
actividades a realizar fuera del aula<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-add-space: auto; mso-list: l2 level1 lfo3; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->dar
de alta videos, artículos y páginas web de empresas, para facilitar a los
estudiantes el análisis de la información y la generación de un juicio
crítico sobre decisiones tomadas por las empresas<o:p></o:p></div>
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; margin-right: 0in; margin-top: 0in; mso-add-space: auto; mso-list: l2 level1 lfo3; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: "symbol"; mso-bidi-font-family: Symbol; mso-bidi-font-style: italic; mso-fareast-font-family: Symbol;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]-->asignación
y entrega de tareas<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 3;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><table border="0" cellpadding="0" cellspacing="0" class="MsoNormalTable" style="border-collapse: collapse; mso-padding-alt: 0in 3.5pt 0in 3.5pt; mso-yfti-tbllook: 1184; width: 64px;">
<tbody>
<tr style="height: 15.0pt; mso-yfti-firstrow: yes; mso-yfti-irow: 0; mso-yfti-lastrow: yes;">
<td nowrap="" style="height: 15.0pt; padding: 0in 3.5pt 0in 3.5pt; width: 48.0pt;" valign="bottom" width="64"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Popplet<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Como herramienta de
organización del pensamiento<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 4;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><table border="0" cellpadding="0" cellspacing="0" class="MsoNormalTable" style="border-collapse: collapse; mso-padding-alt: 0in 3.5pt 0in 3.5pt; mso-yfti-tbllook: 1184; width: 64px;">
<tbody>
<tr style="height: 15.0pt; mso-yfti-firstrow: yes; mso-yfti-irow: 0; mso-yfti-lastrow: yes;">
<td nowrap="" style="height: 15.0pt; padding: 0in 3.5pt 0in 3.5pt; width: 48.0pt;" valign="bottom" width="64"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Desmos<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Por la facilidad para
construir gráficas de oferta y demanda en dos variables, pertinentes en el
análisis de un problema<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 5;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><table border="0" cellpadding="0" cellspacing="0" class="MsoNormalTable" style="border-collapse: collapse; mso-padding-alt: 0in 3.5pt 0in 3.5pt; mso-yfti-tbllook: 1184; width: 64px;">
<tbody>
<tr style="height: 15.0pt; mso-yfti-firstrow: yes; mso-yfti-irow: 0; mso-yfti-lastrow: yes;">
<td nowrap="" style="height: 15.0pt; padding: 0in 3.5pt 0in 3.5pt; width: 48.0pt;" valign="bottom" width="64"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
PbWorks<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Para facilitar discusiones
en línea<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 6;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><table border="0" cellpadding="0" cellspacing="0" class="MsoNormalTable" style="border-collapse: collapse; mso-padding-alt: 0in 3.5pt 0in 3.5pt; mso-yfti-tbllook: 1184; width: 64px;">
<tbody>
<tr style="height: 15.0pt; mso-yfti-firstrow: yes; mso-yfti-irow: 0; mso-yfti-lastrow: yes;">
<td nowrap="" style="height: 15.0pt; padding: 0in 3.5pt 0in 3.5pt; width: 48.0pt;" valign="bottom" width="64"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Symbaloo<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Para organizar recursos
tecnológicos<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 7;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Nuevas licencias de software<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Para facilitar el proceso de
aprendizaje en los alumnos<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 8;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Wolfram Alpha<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
2<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; tab-stops: 46.5pt; text-align: justify; text-justify: inter-ideograph;">
Como buscador sumamente eficiente<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 9;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Prezi<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
2<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Alternativa a Power Point<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 10;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Videos en YouTube<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
2<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Algo que ya utilizaban en
muchos casos<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 11;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Wolfram (todos los recursos
del sitio)<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
1<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Por los muchos recursos
gratuitos<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 12;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Storyboard<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
1<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Para desarrollar el
pensamiento creativo<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 13;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Nuevas licencias de software<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
faciliten el proceso de
aprendizaje en los alumnos<o:p></o:p></div>
</td>
</tr>
<tr style="height: .1in; mso-yfti-irow: 14; mso-yfti-lastrow: yes;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 98.75pt;" valign="top" width="132"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Uso de dispositivos en clase<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 64.5pt;" valign="top" width="86"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
1<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: .1in; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Permitirá, sin lugar a duda,
un incremento de los intercambios; un mejor funcionamiento colectivo del
equipo; un aprendizaje en las prácticas; una concientización de los
conocimientos y de los saberes; un saber hacer colectivo; una mayor
seguridad; una valorización de las competencias adquiridas; un mejor uso de
las tecnologías<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Es decir: se generó interés en
algún grado, pero hay limitaciones autoimpuestas en algunos docentes
(dependiendo del área del conocimiento, el tiempo dedicado a la docencia
semanalmente, condicionamientos sociales, etc.), como en cualquier grupo. Lo
importante sería que la sinergia que comenzó a desarrollarse se incrementara a
través del trabajo en grupos multidisciplinares, por ejemplo, para conformar
una academia sólida. Los estudiantes serían altamente beneficiados.<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
Es muy pronto para pedir resultados y, en todo caso, habría que esperar
a que terminaran el semestre para ver los efectos entre los docentes, los
alumnos y la institución. Entonces será momento de revisar estas reflexiones.<br />
<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div align="center" class="MsoNormal" style="text-align: center;">
<span style="font-family: "times" , serif; font-size: 12.0pt; line-height: 115%;">Anexo 1: Características de los talleres<span style="color: #a4a4a4;"><o:p></o:p></span></span></div>
<div class="MsoNormal">
<b><span style="background: white; font-family: "segoe ui" , sans-serif;">Taller Básico: El desarrollo de las habilidades docentes
universitarias<o:p></o:p></span></b></div>
<div class="MsoNormal">
<span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Subtítulo del programa: Competencias para mejorar la labor
frente a grupo<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<INPUT
NAME=\"programa[SubtituloEvento]\" SIZE=\"30\"
TYPE=\"text\">" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Competencia a
desarrollar: Ser capaz de detectar fortalezas y debilidades en el desempeño
docente a través de ejercicios de autoconocimiento y exploración para reforzar
y/o desarrollar los aspectos detectados individualmente utilizando los recursos
disponibles institucionalmente y a través de redes de aprendizaje.<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[Objetivo]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Justificación: El
primer paso para mejorar el desempeño de uno es el conocimiento objetivo y
verificable de lo que hacemos y de la manera en la que lo hacemos. Para ello
necesitamos la visión de los otros, los que participan del proceso y pueden
darnos las claves para entender nuestro quehacer y cómo mejorarlo.<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[Justificacion]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Metodología: Trabajo
colaborativo en modalidades presencial y virtual. 20 horas de trabajo
presencial.<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[Metodologia]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Requisitos: Ser
docente de la institución o invitado por la misma institución a ser parte del
taller<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<INPUT
NAME=\"programa[material]\" TYPE=\"file\">" <span
style='mso-element:field-end'></span>MACROBUTTON HTMLDirect </span><![endif]--><!--[if supportFields]><span
style='font-size:10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:
"Times New Roman";mso-bidi-font-family:"Times New Roman"'><span
style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Material de trabajo: Se asignarán
materiales/recursos en línea<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[MaterialesTrabajo]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Resultado de
aprendizaje: Diseño personal de cada docente de un paquete de recursos para
monitorear su desempeño durante un curso; propuesta de trabajo colaborativo,
elaborado por el grupo completo, para auxiliar a otros docentes como academia y
ayudar a desarrollar un trabajo docente de calidad, reconocible en el desempeño
de sus estudiantes y la satisfacción de los mismos, de los padres y de las
autoridades, en concordancia con la propuesta contenida en el Modelo Educativo
de la Institución</span><!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span>
<span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"40\" NAME=\"programa[InstructorSugerido]\"
ROWS=\"20\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">. <o:p></o:p></span></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<b><span style="background: white; font-family: "segoe ui" , sans-serif;">Taller Avanzado: Desarrollo de competencias en los alumnos<o:p></o:p></span></b></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<INPUT
NAME=\"programa[TituloEvento]\" SIZE=\"30\"
TYPE=\"text\">" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> Subtítulo del programa: Desarrollo de
aprendizajes significativos en los estudiantes<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<INPUT
NAME=\"programa[SubtituloEvento]\" SIZE=\"30\" TYPE=\"text\">"
<span style='mso-element:field-end'></span>MACROBUTTON HTMLDirect </span><![endif]--><!--[if supportFields]><span
style='font-size:10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:
"Times New Roman";mso-bidi-font-family:"Times New Roman"'><span
style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> Competencia
a desarrollar: Definir con claridad las competencias/habilidades que se esperan
del estudiante al egresar, desde la concepción de los programas educativos
hasta las que solicitan actualmente los empleadores y apoyarse en estrategias y
herramientas probadas para favorecer esos aprendizajes y para la evaluación de
ellos.<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman";color:#C00000'><span style='mso-element:
field-begin'></span><span style='mso-spacerun:yes'> </span><span
style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[Objetivo]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman";color:#C00000'><span style='mso-element:
field-end'></span></span><![endif]--><span style="color: #c00000; font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> </span><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;">Justificación: Para saber a dónde
queremos llevar a nuestros estudiantes es preciso conocer la ruta por recorrer,
así como las estrategias y apoyos que les permitan arribar a buen puerto y de
la mejor manera; al mismo tiempo, reconocer que es un trabajo de equipo entre
los docentes de cada carrera y la institución en su conjunto. <span style="color: #c00000;"><o:p></o:p></span></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[Justificacion]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> Metodología: Trabajo colaborativo en
modalidades presencial y virtual. 20 horas de trabajo presencial.<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[Metodologia]\"
ROWS=\"5\"></TEXTAREA>" <span style='mso-element:field-end'></span>MACROBUTTON
HTMLDirect </span><![endif]--><!--[if supportFields]><span style='font-size:
10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> Requisitos: Ser docente de la institución o
invitado por la misma institución a ser parte del taller. Haber participado en
el Taller Básico.<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<INPUT
NAME=\"programa[material]\" TYPE=\"file\">" <span
style='mso-element:field-end'></span>MACROBUTTON HTMLDirect </span><![endif]--><!--[if supportFields]><span
style='font-size:10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:
"Times New Roman";mso-bidi-font-family:"Times New Roman"'><span
style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> Material de trabajo: Se asignarán
materiales/recursos en línea<o:p></o:p></span></div>
<div class="MsoNormal">
<!--[if supportFields]><span style='font-size:10.0pt;
line-height:115%;font-family:"Times",serif;mso-fareast-font-family:"Times New Roman";
mso-bidi-font-family:"Times New Roman"'><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span><span style='mso-element:field-begin'></span><span
style='mso-spacerun:yes'> </span>PRIVATE "<TEXTAREA
COLS=\"20\" NAME=\"programa[MaterialesTrabajo]\" ROWS=\"5\"></TEXTAREA>"
<span style='mso-element:field-end'></span>MACROBUTTON HTMLDirect </span><![endif]--><!--[if supportFields]><span
style='font-size:10.0pt;line-height:115%;font-family:"Times",serif;mso-fareast-font-family:
"Times New Roman";mso-bidi-font-family:"Times New Roman"'><span
style='mso-element:field-end'></span></span><![endif]--><span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"> Resultado de aprendizaje: Diseño personal de
una propuesta curricular para <u>uno</u> de los temas de su curso, partiendo de
la filosofía educativa de la institución y considerando las habilidades y
conocimientos que buscan desarrollar en sus estudiantes; la propuesta debe
incluir, además, recursos que faciliten el aprendizaje, estrategias para
alcanzar las competencias deseadas, diseño de al menos una actividad derivada
de lo anterior y de una evaluación acorde con los resultados de aprendizaje
intencionalmente planeados.</span><br />
<span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"><o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "times" , serif; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal;">
<br /></div>
<div align="center" class="MsoNormal" style="line-height: normal; text-align: center;">
<span style="font-size: 12.0pt; mso-bidi-font-size: 11.0pt; mso-bidi-font-style: italic;">Anexo
2: los descriptores dados por los participantes de los talleres en su auto
evaluación <o:p></o:p></span></div>
<div align="center" class="MsoNormal" style="line-height: normal; text-align: center;">
<br /></div>
<table border="0" cellpadding="0" cellspacing="0" class="MsoNormalTable" style="background: white; mso-cellspacing: 0in; mso-padding-alt: 0in 0in 0in 0in; mso-table-layout-alt: fixed; mso-yfti-tbllook: 1184; width: 638px;">
<tbody>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">1 __ Well
thought of<br />
2 __ Always giving advice<br />
3 __ Often admired<br />
4 __ Tries to be too successful<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">33 __
Makes a good impression<br />
34 __ Acts important<br />
35 __ Respected by others<br />
36 __ Expects everyone to admire him<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">___</span><span style="color: #323232; font-family: "inherit" , serif; font-size: 13.0pt; line-height: 115%;">_</span><span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_<br />
P <o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">5 __ Able
to give orders<br />
6 __ Bossy<br />
7 __ Good Leader<br />
8 __ Manages other<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">37 __
Forceful<br />
38 __ Dominates<br />
39 __ Likes responsibility<br />
40 __ Dictatorial<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">___</span><span style="color: #323232; font-family: "inherit" , serif; font-size: 12.0pt; line-height: 115%;">_</span><span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_<br />
A<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">9 __
Self-respecting<br />
10 __ Boastful<br />
11 __ Self-Confident<br />
12 __ Somewhat snobbish<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">41 __
Independent<br />
42 __ Proud and self-satisfied<br />
43 __ Self-reliant and assertive<br />
44 __ Egotistical and conceited<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">___</span><span style="color: #323232; font-family: "inherit" , serif; font-size: 13.0pt; line-height: 115%;">_</span><span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_<br />
B <o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">13 __ Able
to take care of self<br />
14 __ Thinks only of himself<br />
15 __ Businesslike<br />
16 __ Selfish<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">45 __ Can
be, indifferent to others<br />
46 __ Shrewd and calculating<br />
47 __ Likes to compete with others<br />
48 __ Cold and unfeeling<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
C <o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">17 __ Can
be strict if necessary<br />
18 __ Impatient with others’ mistakes<br />
19 __ Hard boiled when necessary<br />
20 __ Sarcastic<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">49 __ Firm
but just<br />
50 __ Self-seeking<br />
51 __ Stern but just<br />
52 __ Cruel and unkind<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
D <o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">21 __ Can
be frank and honest<br />
22 __ Outspoken<br />
23 __ Irritable<br />
24 __ Frequently angry<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">53 __
Critical of others<br />
54 __ Often Unfriendly<br />
55 __ Straight forward<br />
56 __ Hard hearted<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____
<br />
E <o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">25 __ Can
complain if necessary<br />
26 __ Bitter<br />
27 __ Resents being bossed<br />
28 __ Resentful<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">57 __
Often Gloomy<br />
58 __ Complaining<br />
59 __ Skeptical<br />
60 __ Rebels against everything<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
F<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">29 __ Able
to doubt others<br />
30 __ Jealous<br />
31 __ Hard to impress<br />
32 __ Stubborn<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">61 __
Frequently disappointed<br />
62 __ Slow to forgive a wrong<br />
63 __ Touchy and easily hurt<br />
64 __ Distrusts everybody<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
G<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">65 __ Able
to criticize self<br />
66 __ Self punishing<br />
67 __ Easily embarrassed<br />
68 __ Timid<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">97 __
Apologetic<br />
98 __ Shy<br />
99 __ Lacks self-confidence<br />
100 __ Always ashamed of self<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
H<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">69 __ Can
be obedient<br />
70 __ Passive and unagressive<br />
71 __ Easily led<br />
72 __ Obeys too willingly<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">101 __
Usually gives in<br />
102 __ Meek<br />
103 __ Modest<br />
104 __ Spineless<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
I<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">73 __
Grateful<br />
74 __ Dependent<br />
75 __ Often helped by others<br />
76 __ Hardly ever talks back<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">105 __
Admires and imitates others<br />
106 __ Wants to be led<br />
107 __ Very respectful to authority<br />
108 __ Clinging vine<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
J<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">77 __
Appreciative<br />
78 __ Lets others make decisions<br />
79 __ Accepts advice readily<br />
80 __ Likes to be taken care of<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">109 __
Very anxious to be approved of<br />
110 __ Trusting and eager to please<br />
111 __ Easily fooled<br />
112 __ Will believe anyone<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
K<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">81 __
Cooperative<br />
82 __ Too easily influenced by friends<br />
83 __ Always pleasant and agreeable<br />
84 __ Wants everyone’s love<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">113 __
Eager to get along with others<br />
114 __ Will confide in anyone<br />
115 __ Wants everyone to like him<br />
116 __ Agrees with everyone<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
L<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"><div align="center" class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">
</span><br />
<hr align="center" noshade="" size="1" style="width: 612.75pt;" width="817" />
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">
</span></div>
</td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">85 __
Friendly<br />
86 __ Fond of everyone<br />
87 __ Sociable and neighborly<br />
88 __ Friendly all the time<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">117 __
Affectionate and understanding<br />
118 __ Likes everybody<br />
119 __ Warm<br />
120 __ Likes everyone<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____ <o:p></o:p></span></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;"><br />
M (todas de una sola persona)<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">89 __
Considerate<br />
90 __ Forgives anything<br />
91 __ Kind and reassuring<br />
92 __ Too lenient with others<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">121 __
Encourages others<br />
122 __ Over sympathetic<br />
123 __ Tender and soft hearted<br />
124 __ Tries to comfort everyone<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 139.5pt;" valign="bottom" width="186"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">_____<br />
N<o:p></o:p></span></div>
</td>
</tr>
<tr>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 478.5pt;" valign="bottom" width="638"></td>
</tr>
<tr>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 168.0pt;" valign="bottom" width="224"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">93 __
Helpful<br />
94 __ Generous to a fault<br />
95 __ Enjoys taking care of others<br />
96 __ Too willing to give to others<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border: none; mso-border-bottom-alt: solid windowtext .75pt; padding: 0in 19.5pt 0in 19.5pt; width: 171.0pt;" valign="bottom" width="228"><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="EN-US" style="color: #323232; font-family: "inherit" , serif; font-size: 8.0pt; line-height: 115%;">125 __
Big-hearted and unselfish<br />
126 __ Over protective of others<br />
127 __ Gives freely of self<br />
128 __ Spoils people with kindness<o:p></o:p></span></div>
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Senge, Peter. <i>La quinta disciplina</i>.
Capítulo I. PDF<span style="background: white; font-family: "arial" , sans-serif;">. </span><span lang="EN-US" style="background: white; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Retrieved 9 October 2017, from
http://www.jmonzo.net/blogeps/laquintadisciplina.pdf</span><span lang="EN-US"> <o:p></o:p></span></div>
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Complementarity and Trust in Virtual Collaboration”<i>. Journal of Management Information Systems</i> 20(4): 115-137. March
2004. Disponible en ResearchGate: http://bit.ly/2kAsaVO<o:p></o:p></span></div>
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<a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftnref3" name="_ftn3" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 10.0pt; line-height: 115%;">[3]</span></span><!--[endif]--></span></a> <i><span lang="EN-US" style="background: white; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Leary, Timothy - Interpersonal Circle Model of Personality - PAEI -
Structures of Concern</span></i><span lang="EN-US" style="background: white; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">. (2017). <i>Paei.wikidot.com</i>. Retrieved 11 October 2017, from http://paei.wikidot.com/leary-timothy-interpersonal-circle-model-of-personality</span><span lang="EN-US"><o:p></o:p></span></div>
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Retrieved 9 October 2017, from
https://therearenosunglasses.wordpress.com/2010/01/23/the-leary-personality-test/</span><span lang="EN-US"><o:p></o:p></span></div>
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Poole, Marshall S. et al. Óp. Cit. Pág. 126 -132<o:p></o:p></div>
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<a href="file:///C:/Users/Blanca/Desktop/Congreso%20EduTicInnova2017/VII%20Congreso%20Internacional%20EduTicInnova%202017%20%20final.docx#_ftnref6" name="_ftn6" title=""><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 8.0pt; line-height: 115%;"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="color: #365f91; font-size: 8pt; line-height: 115%;">[6]</span></span><!--[endif]--></span></span></a><span style="font-family: "calibri" , sans-serif; font-size: 8.0pt; line-height: 115%;"> </span><span style="font-family: "calibri" , sans-serif; font-size: 10pt; line-height: 115%;">Monroy-Gómez-Franco,
L. (2017). <i>La herencia invisible: habilidades cognitivas y
socioemocionales | Economía y sociedad</i>. </span><i><span lang="EN-US" style="font-family: "calibri" , sans-serif; font-size: 10pt; line-height: 115%;">Economia.nexos.com.mx</span></i><span lang="EN-US" style="font-family: "calibri" , sans-serif; font-size: 10pt; line-height: 115%;">.
Retrieved 20 October 2017, from https://economia.nexos.com.mx/?p=303</span><span lang="EN-US" style="font-family: "calibri" , sans-serif; font-size: 38.5pt; line-height: 115%;"><o:p></o:p></span></h1>
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Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-18319921360332652552017-09-24T16:25:00.002-05:002017-10-04T09:18:38.694-05:00Mujeres y conocimiento<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 0.0001pt;">
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 13.3333px;">Advertencia: Se trata solamente de mis notas, para evitar que yo divague de más en una presentación de 20 minutos en Casa Cuatro, Guanajuato, el 25 de septiembre de 2017. De paso, para que nadie se distraiga demasiado tomando notas sobre mi rollo (a veces ocurre) y, a cambio, dirigirlos a esta publicación.</span></span></div>
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<a href="https://2.bp.blogspot.com/-UO6GiNAwvJ4/WcgiJwcMh4I/AAAAAAAAPN0/cQucsOLowgQ458pf_9R2GctduTNQ4p2kACLcBGAs/s1600/IMG_4328.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1600" data-original-width="1200" height="320" src="https://2.bp.blogspot.com/-UO6GiNAwvJ4/WcgiJwcMh4I/AAAAAAAAPN0/cQucsOLowgQ458pf_9R2GctduTNQ4p2kACLcBGAs/s320/IMG_4328.JPG" width="240" /></a></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 9.5pt;"></span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt;">Mujeres: por género asociado al nacimiento e independientemente de su identidad, pero mujeres.</span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt;"><br /></span></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://2.bp.blogspot.com/-gq6UY80_p6o/WcgfMThv6nI/AAAAAAAAPNs/w-yKfb6ZnrkdEvbZ2mbo7Y1O7uDtXkPaQCLcBGAs/s1600/IMG_4823.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="902" data-original-width="807" height="320" src="https://2.bp.blogspot.com/-gq6UY80_p6o/WcgfMThv6nI/AAAAAAAAPNs/w-yKfb6ZnrkdEvbZ2mbo7Y1O7uDtXkPaQCLcBGAs/s320/IMG_4823.JPG" width="286" /></a></div>
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<!--[if !supportLists]--><span style="color: #222222; font-family: "symbol"; font-size: 10.0pt;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que aman y sufren como las demás
(Marie Curie) y que reciben apoyo de hombres (Einstein)<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="background: white; line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; mso-add-space: auto; mso-list: l0 level1 lfo3; text-indent: -.25in;">
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</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que comparten con las minorías los
estigmas y la discriminación porque les <i>moeurs</i>
de los tiempos, las sociedades y las religiones así lo determinan, antes
(Hipatia) y ahora (Malala), los fundamentalistas de todos tipos y regiones.<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #222222; font-family: "symbol"; font-size: 10.0pt;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que se visten de hombre o se meten de
monjas para seguir su vocación (Sor Juana)<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que deciden luchar al lado de su
pareja (muchas soldaderas voluntarias) o acompañarlos cumpliendo su rol
tradicional (otras soldaderas)<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que luchan por convicción (las
Serdán, las coronelas, doña Josefa y Leona Vicario)<o:p></o:p></span></div>
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<!--[if !supportLists]--><span style="color: #222222; font-family: "symbol"; font-size: 10.0pt;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que enferman y mueren como cualquier
otra (como </span><a href="https://elpais.com/elpais/2017/07/15/ciencia/1500123537_307923.html"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Maryam
Mirzakhani, ganadora de la medalla Fields</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;"> en 2014)<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="background: white; line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; mso-add-space: auto; mso-list: l0 level1 lfo3; text-indent: -.25in;">
<!--[if !supportLists]--><span style="color: #222222; font-family: "symbol"; font-size: 10.0pt;">·<span style="font-family: "times new roman"; font-size: 7pt; font-stretch: normal; line-height: normal;">
</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Que se enfrentan, muchas más veces de lo que imaginamos, a las zancadillas y golpes bajos de otras mujeres, esas
que deciden emplear las "armas femeninas" para conseguir lo que
quieren a costa de lo que sea; porque el empoderamiento que vemos en la
película “Talentos ocultos”, la solidaridad entre mujeres, no se da en países
como el nuestro (tal vez ni entre los hombres)<o:p></o:p></span></div>
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</span></span><!--[endif]--><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Mujeres bellas, como Hedi Lamarr y
otras actrices, que son científicas o matemáticas o ingenieras y que dejan
huella en diferentes campos.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">En términos de ciencia y matemáticas
resulta que, proporcionalmente y respecto de sus pares varones, hay más mujeres
en matemáticas que en física. Y una hipótesis bastante aceptable se maneja en “</span><a href="http://scholarworks.gvsu.edu/cgi/viewcontent.cgi?article=1327&context=gvr"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Pythagoras'
Trousers: God, Physics, and the Gender Wars</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">", de Margaret
Wertheim.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">En discusiones al respecto, con
académicas y académicos de otras áreas, artistas e intelectuales, pareciera que
el asunto de la discriminación femenina no es privativo de las áreas de ciencia
y matemáticas, sino que se extiende a todos los ámbitos y en todos los tiempos.</span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">El </span><a href="http://popplet.com/app/#/4170790"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Popplet</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;"> (<a href="https://drive.google.com/file/d/0B33nni72fr_YOTZvTnB3Smp4X1U/view?usp=sharing" target="_blank">aquí</a> como imagen) que preparé como apoyo gráfico es solamente un muestrario de casos, no
exhaustivo, donde la discriminación femenina se da. Y es parte de un sistema de
discriminación más general, de ahí la </span><a href="https://youtu.be/z7ihNLEDiuM"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">respuesta de Neil de Grasse Tyson a la pregunta de
si las mujeres son discriminadas o están mal representadas en la ciencia</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">. No son solamente las mujeres y los negros, lo han sido los musulmanes
y los representantes de culturas sometidas a una dependencia cultural, política
o económica (basta ver el caso de </span><a href="https://www.youtube.com/watch?v=Y7Ufxl-zSRI"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Ramanujan</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">).<o:p></o:p></span></div>
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<!--[endif]--><o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">¿Por qué llama tanto la atención el
caso de las ciencias y, particularmente, el de las matemáticas? <o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Hipótesis:</span></div>
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<ol>
<li>El pensamiento matemático está asociado (estúpidamente) a un alto nivel
intelectual; la cultura dominante exige que mujeres, negros y todas las otras
“minorías”, que están revirtiendo la proporción, sean menos capaces que los
representantes de la cultura dominante, precisamente<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;"> </span></li>
<li><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">Siendo, en su origen, un elemento de dominación política está asociada
al ejercicio del poder de un gobernante, generalmente masculino, aunque se
contesta cada vez más por los y las representante de todas las clases
dominadas, particularmente por las representantes del 50% de la población. </span></li>
<li>En su libro “<a href="https://www.decitre.fr/livres/la-perversion-mathematique-9782268003542.html" style="text-indent: -0.25in;"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">La
perversion mathématique. L’oeil du pouvoir” </span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">, </span><a href="https://www.decitre.fr/auteur/167985/Arnaud+Aaron+Upinsky" style="text-indent: -0.25in;"><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt;">Arnaud-Aaron Upinsky</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;"> </span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">cuestiona: “En términos de poder,
¿son las matemáticas el "imperio del mal"? Declara que el sistema
escolar nos hace creer que las matemáticas son la principal referencia de la
inteligencia mientras que “en realidad, terminan siendo un instrumento de
selección y de represión, que es aún más astuto porque pretende ser
"neutral". El modelo matemático ha dado forma a un mundo en el cual
la cantidad sola es importante; ha entrado en nuestras conciencias hasta el
punto de hacernos confundir "inteligencia verdadera" con
"habilidad mental". Tal vez un poco exagerado, hay una buena parte de
verdad en ello. Para comenzar, basta con utilizar la “nomenclatura” matemática
para desanimar a o tratar de imponerse sobre los que entienden menos… y
comienza con muchos de los profesores.</span></li>
<li><a href="http://bit.ly/2xdNcPR">El lenguaje/conocimiento matemático es
indispensable para acceder a las ciencias</a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;"> (una buena lectura
al respecto es </span><a href="http://www.math.chalmers.se/~ulfp/Review/descartesdr.pdf" style="text-indent: -0.25in;"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Descartes'
Dream. </span><span lang="EN-US" style="font-family: "arial" , sans-serif; font-size: 10.0pt;">The world according to
mathematics</span></a><span lang="EN-US" style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">, de </span><a href="https://www.google.com.mx/search?tbo=p&tbm=bks&q=inauthor:%22Philip+J.+Davis%22" style="text-indent: -0.25in;"><span lang="EN-US" style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt;">Philip J.
Davis</span></a><span lang="EN-US" style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">, </span><a href="https://www.google.com.mx/search?tbo=p&tbm=bks&q=inauthor:%22Reuben+Hersh%22" style="text-indent: -0.25in;"><span lang="EN-US" style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt;">Reuben
Hersh</span></a><span lang="EN-US" style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">). </span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">Más representantes de las culturas hasta ahora sometidas representan un
reto y un descalabro para los de los que controlan y deciden por todos</span></li>
<li>Y podría seguir</li>
</ol>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">¿Dónde comienza esta discriminación
hacia las mujeres? En la propia casa/familia.<br />
Se imponen y se dejan imponer los estereotipos tradicionales, incluso de manera
inconsciente: ser popular, ser considerada atractiva, el pelo, el vestido, los
modales, y un largo etcétera. A ello contribuyen, si no los propios padres y
hermanos, sí los parientes, amigos y hasta los profesores. “Eres poco
femenina”, “Pareces marimacho”, “Mujer que sabe latín…”, etc. Perseverar en lo
que uno ha decidido como carrera, a partir de una vocación, no es sencillo. Y
en el camino encontrará obstáculos de diferentes estilos y en diferentes
entornos, pero también el reconocimiento de gente que vale mucho la pena. Es
decir: si uno sabe lo que quiere y está dispuesto a dejar de lado las presiones
familiares, de pareja y sociales y a no sacrificar su integridad, se puede. En
eso no creo que haya mucha diferencia con otras áreas de conocimiento.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">En contra de nuestra vocación
influyen hasta los modelos de mujeres de ciencia que nos han sido transmitidos,
desprovistos de su parte humana (y Bruner<a href="file:///C:/Users/Blanca/Documents/Rollos/2017/Mujeres%20para%20Casa%204.docx#_ftn1" name="_ftnref1" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="color: #222222; font-size: 10pt; line-height: 115%;">[1]</span></span><!--[endif]--></span></a>
tiene mucho que decir al respecto). Los prototipos son Hipatia y Marie Curie;
curiosamente apenas nos enteramos de los casos de </span><a href="http://findingada.com/about/who-was-ada/"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Ada Lovelace</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;"> y de </span><a href="http://www.women-inventors.com/Hedy-Lammar.asp"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Hedi Lamar</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;"> como contribuyentes al desarrollo de la tecnología, por citar solamente
dos.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">A través de lo poco que se sabe de </span><a href="http://www.ancient.eu/Hypatia_of_Alexandria/"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Hipatia</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">, nos enteramos de que fue la educación de su padre, Teón de Alejandría,
lo que desarrolló el carácter y pasión de su hija:<o:p></o:p></span></div>
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“Teón se reusó a imponer a su hija el rol tradicional asignado a las mujeres y
la educó como hubiera educado a un hijo en la tradición griega; transmitiéndole
su propio oficio”. Ella tuvo los privilegios de un académico respetado en la
universidad de Alejandría, a lo cual hasta ese entonces solamente podían
aspirar los hombres, dedicada al aprendizaje y la enseñanza. <o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">En los tiempos que corren,
seguramente Hipatia sería desacreditada por el SIN por su escasa producción
matemática original.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Por otro lado, se le ha convertido en
mártir de la ciencia cuando, en realidad, “Hipatia de Alejandría ha llegado a
encarnar todo lo que se perdió a la civilización en el tumulto de la
intolerancia religiosa y la destrucción que engendra.” Fue víctima de los
conflictos políticos y religiosos entre Cirilo, el obispo intolerante y
sanguinario, y Orestes el nuevo prefecto imperial de Egipto, quien se resistía
a la invasión eclesiástica en su jurisdicción civil. Cirilo acusó a Hipatia de
impedir que Orestes se reconciliara con Cirilo. <br />
Posteriormente, unos 200 años después de su existencia, el obispo </span><a href="https://es.wikipedia.org/wiki/Juan_de_Niki%C3%BB"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Juan de Nikiû</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;"> la describió como se suele describir a las mujeres que viven una vida
conforme a sus reglas e intereses y que son escuchadas por su sensatez: <o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">“Y en aquellos días apareció en
Alejandría una hembra filósofa, una pagana llamada Hipatia, que siempre se
dedicaba a la magia, a los astrolabios y a los instrumentos musicales, y engañó
a muchas personas a través de las asechanzas satánicas, y el gobernador de la
ciudad [ Orestes] la honró en gran manera, porque ella le había engañado con su
magia y él dejó de asistir a la iglesia como había sido su costumbre ... Y no
sólo hizo esto, sino que atrajo a muchos creyentes a ella, y él mismo recibió a
los incrédulos en su casa.”<o:p></o:p></span></div>
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<a href="http://www.lexpress.fr/actualite/sciences/marie-curie-feministe-de-l-ombre_1612123.html"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Marie
Curie</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">, por su parte, se nos presenta
siempre como el estereotipo de la mujer dedicada a la ciencia, alejada de
cualquier tipo de feminidad, afecto u otro interés fuera de la ciencia pura. Se
le considera una mujer emocionalmente fría y, al decir de una ex alumna, hasta
amargada por falta de afectos. Baste con leer su diario o, más accesible, el
libro de Rosa Montero “</span><a href="http://aifos.mx/wp-content/libros/La%20ridicula%20idea%20de%20no%20volver%20a%20verte.pdf"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">La
ridícula idea de no volver a verte</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">”. <o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Es cierto: Marie muestra que para
trabajar uno necesita lo mismo que un hombre: ropa de trabajo, pasión, y nada
más; ni siquiera estaba preocupada por el reconocimiento (que llegó) sino por
obtener los recursos para continuar con su trabajo. Mientras que es imitado </span><a href="http://www.vogue.mx/moda/tendencias/articulos/steve-jobs-icono-de-estilo/5593"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">el estilo
de Jobs</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">, por ejemplo, de siempre vestir de
la misma manera para no perder el tiempo pensando en qué ponerse, en el caso de
Marie </span><a href="https://www.franceculture.fr/emissions/la-marche-des-sciences/marie-curie"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">se
considera hasta patético que vistiera siempre de la misma manera</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">, por no hablar de la ausencia de coquetería. <br />
<br />
El libro clásico de Bell, “</span><a href="http://www.simonandschuster.com/books/Men-of-Mathematics/E-T-Bell/9780671628185"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Men of
Mathematics</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">”, publicado originalmente en 1937, incluye
propiamente a sólo tres mujeres: Sophie Germain, Sonja (Sofía) Kowalewski y
Emmy Noether. Ni Hipatia aparece en ese recuento que trata solamente de quienes
se dedicaron a las matemáticas puras. Hay sin embargo una nota al respecto de
las Sofía mencionadas (aquí en traducción libre): <i>Sofía parece ser un nombre afortunado en matemáticas para las mujeres
-siempre y cuando se afilien con maestros de mentalidad abierta </i>(Pág. 261,
edición de julio de 2008 por Touchstone, Simon and Schuster, Inc.)<i>.</i> Probablemente siga siendo cierto en
muchos lugares.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Otro punto sobre la falta de
reconocimiento es que mientras en otros países los matemáticos y las
matemáticas están presentes en las redes (incluidas algunas medallas Fields) a
través de las cuales colaboran y comparten sin demasiada pretensión ni
arrogancia, de manera que su trabajo llega a muchas más personas, en México
seguimos en el culto a la personalidad encerrada en su torre de marfil
perfectamente centrados en un perfil formal (desde el disfraz) e inaccesible
para los profanos, cargados de ego ("si sabes quién soy", repetida
hasta que le dices su nombre, ... y lo malo es que SI sabes quién es y más) y,
por supuesto, alejadas de la “banalidad de las redes sociales”.<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Y luego nos preguntamos por qué muy pocas
mujeres se adentran en la ciencia y las matemáticas y por qué pocas sobresalen
o son reconocidas.<br />
<o:p></o:p></span></div>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">La película “</span><a href="https://www.youtube.com/watch?v=VnM9Bt7QiGk"><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">Con ganas de triunfar</span></a><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">” muestra muchas de las situaciones en las que son más que evidentes las
razones para la escasa participación de hombres y mujeres, pero particularmente
de las mujeres, en las áreas antiguamente llamadas ”duras” a través de los
estudiantes que deciden permanecer hasta el final del curso de Cálculo buscando
continuar sus estudios:<o:p></o:p></span></div>
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<ol>
<li style="text-indent: 0px;"><span style="text-indent: -0.25in;">S</span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">e necesitan ganas</span></li>
<li><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">En el camino pueden surgir retos, dudas, enojos, etc. por lo que se está
dejando de lado (vida social, sentido de moda y pertenencia a los grupos y
pandillas)</span></li>
<li><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">Romper con las tradiciones familiares</span></li>
<li><span style="text-indent: -0.25in;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 10pt;">Asumir que los privilegios se ganan con base en el puro trabajo, </span><span style="font-size: 13.3333px;">dedicadamente</span><span style="font-size: 10pt;">, realizado con el mayor esmero, y que puede robar horas a las
distracciones e, incluso, a parejas y familias demandantes</span></span></span></li>
<li><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10pt; text-indent: -0.25in;">La satisfacción no está ni en los diplomas, ni en las menciones en artículos
y revistas, ni en el reconocimiento de instituciones como el SIN y el propio
Conacyt (para no hablar de las universidades) que privilegian los campos
tradicionales y desde un punto de vista muy tradicional de la formación y la
investigación, sino en el placer de hacer lo que uno hace gustosamente, de
manera honesta y responsable; en el sentido del propio trabajo que es utilizado
y compartido por otros; el respeto de la comunidad y las invitaciones a formar
parte de grupos selectos</span></li>
</ol>
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<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 10.0pt;">Sí, a veces uno quisiera que eso se
tradujera también en holgura económica. Pero hay de placeres a placeres. Uno,
primordial, es la satisfacción de desarrollarse sin deber favores a persona
alguna. Y, derivado de eso, les aseguro que poder mirar a los ojos de un hijo
que ha recibido todos los beneficios de los privilegios de ser uno quien es, de
tener los amigos que tiene y de haber ganado lo ganado con honradez y ética, no
tiene comparación.<o:p></o:p></span></div>
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<div id="ftn1">
<div class="MsoFootnoteText">
<a href="file:///C:/Users/Blanca/Documents/Rollos/2017/Mujeres%20para%20Casa%204.docx#_ftnref1" name="_ftn1" title=""><span class="MsoFootnoteReference"><!--[if !supportFootnotes]--><span class="MsoFootnoteReference"><span style="font-family: "calibri" , sans-serif; font-size: 10.0pt; line-height: 115%;">[1]</span></span><!--[endif]--></span></a> Jerome
S. Bruner. <u>Aprendizaje y pensamiento</u>. En <i>Aprendizaje escolar y evaluación</i>. Paidós Educador. México, 1997.
Pág. 117.<o:p></o:p></div>
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Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-20941900570894957952017-08-23T08:09:00.000-05:002017-08-23T08:09:52.098-05:00La cultura de la deshonestidad<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">Hace un año, al descubrirse y hacerse público el
plagio de la tesis de EPN, escribí esta nota en Facebook. El problema del
plagio no comienza con una tesis o un artículo del que alguien se apropia. Se
las comparto.<br />
<br />
La reacción frente a la nota (que para nada es novedosa) sobre la deshonestidad
académica del señor presidente (y pareciera que no han escuchado a su virrey
educativo, que plagia citas y datos en sus rollos) exige recordar que la
deshonestidad de cualquier tipo no se genera en la universidad. Es triste, es
grave, es un delito … en el que todos (excepciones honrosas) participamos de
diferentes maneras. <br />
Se parte de:</span><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
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</div>
<ol>
<li>Desde
jardín de niños la expectativa y la exigencia de los padres sobre sus hijos
(todos genios y artistas en potencia, por supuesto) para que obtengan medallas,
diplomas y todo tipo de reconocimientos.</li>
<li>El
valor de los indicadores para las escuelas y el sistema educativo propicia que
cada uno se valga de todo para obtener lo que quiere o le exigen. ·</li>
<li>Las
medallas que se suelen colgar en las paredes para impresionar y convencer a
otros, los títulos sin los cuales nuestro nombre está incompleto.</li>
<li>Las
becas y estímulos económicos que se otorgan por la cantidad de publicaciones, y
no por su calidad, o por el grado de complicidad con quienes tienen el poder de
otorgarlas.</li>
</ol>
<br />
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">Va una larga lista recogida en 44 años de docencia
en cada uno de los niveles educativos que van de secundaria a doctorado como
investigadora, docente y coordinadora de docentes, y en los 34 años como madre
de un escuincle que no entendía que sus maquetas hechas con materiales de reúso
recibieran una calificación muy inferior a las de los alumnos que habían pagado
porque se las hicieran, por ejemplo.<br />
Cada cosa citada es una experiencia vivida. Y si quieren detalles de una
institución o empresa particular, pues me la solicitan: guardo TODAS las
evidencias por escrito.<br />
<br />
</span><b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los padres de familia:</span></b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "Courier New"; font-size: 14.0pt; mso-bidi-font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
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</div>
<ul>
<li>hacer las tareas por los hijos</li>
<li>buscar quién se las haga y pagar por ello</li>
<li>presentarse en la escuela para protestar por una
calificación inferior a 9 o, escandalo, por una nota reprobatoria</li>
<li>llevar regalos a los maestros y directivos</li>
<li>llamar por teléfono al profesor en turno para
pedirle que le baje a la presión porque su bebé se estresa</li>
<li>eliminar cualquier responsabilidad de los hombros
de los hijos</li>
</ul>
<br />
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<b><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los alumnos:</span></b><span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
</div>
<ul>
<li>asumir que no tienen responsabilidad alguna, que
todo es culpa del docente porque les tiene envidia, no los quiere, les tiene
tirria, no les llama con palabras cariñosas, usa lenguaje que el alumno no
entiende, califica con demasiado rigor</li>
<li>aplicar todas las cosas aprendidas en su casa y de
las experiencias de sus compañeros para sobornar al profe y, si no funciona,
buscar maneras de extorsionarlo, amenazarlo e, incluso, asesinarlo (sí, es una
tristísima experiencia)</li>
<li>ir a la escuela (así la llaman sin importar el
nivel educativo) porque tienen que y no porque quieren aprender</li>
<li>copiar tareas, copiar en exámenes, y cualquier cosa
que funcione para evitar el reto de aprender</li>
<li>acudir a cualquier instancia para obligar (tratar
de) que el docente asigne una nota alta, porque sí, porque soy muy inteligente,
porque en mi casa me van a quitar el carro, porque mis padres se van a
decepcionar, …</li>
</ul>
<br />
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los
maestros:</span></b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "Courier New"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
</div>
<ul>
<li>malas prácticas de enseñanza y desconocimiento de
lo formativo que incluyen:</li>
<li>dejar como tarea 50 o 100 ejercicios que por
supuesto que no van a revisar y que solamente cuentan como entregadas</li>
<li>pedir ensayos de x páginas, que tampoco revisan,
propiciando (de verdad) que el alumno incorpore lo que sea para cumplir con la
cuota</li>
<li>desconocer las herramientas para revisar y detectar
plagio e, incluso, no considerarlo como un delito sino como un errorcito</li>
<li>asumir que tendrán tiempo y oportunidad de que en
el futuro y “en su momento” se les exigirá a los alumnos hacerlo bien</li>
<li>aceptar las presiones de los padres de familia y de
los directivos de las escuelas (en todos los grados):</li>
<li>buscando, sobre todas las cosas, una buena
evaluación por parte de los alumnos, formal o informalmente, para que no se
quejen o lo acusen y, como consecuencia, lo cuestionen formalmente, condicionen
su permanencia laboral, o de plano lo descalifiquen</li>
<li>buscando los premios, distintivos y reconocimientos
que pueden recibir en forma de diplomas, medallas, dinero en efectivo o
cualquier otra cosa. El ego es canijo</li>
<li>desconocimiento de lo que significa <b><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">evidencias de desempeño</span></b><span style="color: #1d2129; font-family: Georgia, serif; font-size: 10pt;"> y la importancia de los portafolios de los alumnos
para validar su </span><span style="color: #1d2129; font-family: Georgia, serif;"><span style="font-size: 13.3333px;">práctica</span></span></li>
<li>asumir sin protestar que no tiene maneras de darle
la vuelta a las imbecilidades de la burocracia escolar, perdiendo su libertad
de cátedra</li>
<li>aceptar que una persona decente no protesta, no se
indigna, que eso es de chairos y salir a la defensa del sistema</li>
</ul>
<br />
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<br /></div>
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<b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los
directivos escolares y las propias instituciones (todos los grados):</span></b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="color: #1d2129; font-family: "Courier New"; font-size: 14.0pt; mso-bidi-font-size: 13.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
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</div>
<ul>
<li>admitir sin cuestionar que el cliente (padres y/o
alumnos) tiene la razón, siempre, contra lo que el docente diga o demuestre</li>
<li>pasar por alto los documentos fundacionales de la
institución para buscar clientes</li>
<li>presionar por altos puntajes en la evaluación del
docente por parte de los alumnos, a costa de lo que sea</li>
<li>presionar por alto índice de aprobación de cada
curso y por alto promedio en las calificaciones de los alumnos</li>
<li>preferir la enseñanza por repetición, tradicional,
al aprendizaje verdadero. Por ejemplo, validar que el alumno: <i><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">tiene que decir lo que es el color exactamente como
está escrito en el libro de texto</span></i><span style="color: #1d2129; font-family: Georgia, serif; font-size: 10pt;"> </span></li>
<li>descalificar a los docentes, quitarles toda la
autoridad dentro del aula y frente a los clientes</li>
<li>sobornar (tratar de) al docente para que “se
cuadre” y actúe como se espera</li>
<li>castigar al docente que no acepta involucrarse en
semejantes prácticas</li>
</ul>
<br />
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<b><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de las autoridades educativas estatales y
nacionales:</span></b><span style="font-family: "Times New Roman",serif; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
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</div>
<ul>
<li>apuntar a indicadores y no a formación (ni técnica,
ni profesional ni integral) para cumplir con cuotas basadas en criterios
establecidos por instancias de control tipo OCDE y similares</li>
<li>apostar por la obediencia en todos los niveles,
comenzando por la de los directivos de las escuelas y la de los docentes,
utilizando todo tipo de recursos</li>
<li>desvirtuar el trabajo docente y de investigación a
través del otorgamiento de estímulos y recompensas al trabajo que realmente
reconocen cantidad y no calidad. Gabriel Zaid tiene mucho escrito al respecto</li>
<li>llevar a cabo licitaciones amañadas, entre cuates,
para lograr sus propósitos</li>
<li>otorgar estímulos a investigadores y docentes por
recomendaciones y para acallar voces y no por méritos válidos</li>
</ul>
<br />
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<span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><br />
</span><b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">De parte de los investigadores:</span></b><span style="color: #1d2129; font-family: "Courier New"; mso-bidi-font-size: 10.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> </span><span style="font-family: "Courier New"; font-size: 14.0pt; mso-bidi-font-size: 12.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"><o:p></o:p></span></div>
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</div>
<ul>
<li>buscar los estímulos y recompensas a costa de lo
que sea</li>
<li>trucar datos para satisfacer las hipótesis
preestablecidas</li>
<li>establecer resultados a partir de una
selección de datos recogidos previamente y sin una base metodológica</li>
<li>manipular la información recabada en su estudio
para que las conclusiones quepan en el marco teórico establecido</li>
<li>validar estudios y tesis sin revisar a fondo
metodologías, bibliografías, etc.</li>
<li>aceptar que hay que hacer <i><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">papers</span></i><span style="color: #1d2129; font-family: Georgia, serif; font-size: 10pt;">
de lo que sea pero que se publiquen, mejor en el extranjero, para incrementar
puntos frente a instancias evaluadoras</span></li>
<li>participar en esos grupos de intercambio de citas</li>
<li>auto plagiarse para producir muchos <i><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">papers</span></i><span style="color: #1d2129; font-family: Georgia, serif; font-size: 10pt;">
en diferentes idiomas y con títulos ligeramente modificados en este afán de
generar puntos</span></li>
<li>apropiarse del trabajo de sus estudiantes y
publicarlo como propio</li>
</ul>
<br />
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<br /></div>
<br />
<div class="MsoNormal" style="margin-bottom: 10.0pt; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">Probablemente sea
redundante, como redundante ha sido la constatación de estos puntos.<br />
<br />
A raíz del plagio de mi texto sobre los logaritmos de los números negativos
-presentado en París en 1980 y en proceso de revisión para ser publicado en la </span><i><span style="color: #1d2129; font-family: "inherit",serif; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">Enciclopedia Universalis</span></i><span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;"> en el apartado de Historia de las
matemáticas, a cargo de mi profesor Jean-Luc Verley- , plagio a cargo de un
grupo de alumnos (ahora flamantes investigadores multi reconocidos y premiados)
y el jefe del posgrado en el que trabajaba, me presenté ante el jefe, primera
instancia, para hacer el reclamo: los alumnos habían asistido a un coloquio
organizado por la Maestría en Educación Matemática del CCH-UNAM, donde presenté
el trabajo y del cual entregué copias. En el documento que publicaron me daban
crédito por la traducción de la memoria de D’Alembert sobre los logaritmos de
los números negativos, documento que me había sido proporcionado por el Prof.
Verley. </span></div>
<div class="MsoNormal" style="margin-bottom: 10.0pt; margin-left: .1in; margin-right: .1in; margin-top: 0in;">
<span style="color: #1d2129; font-family: "Georgia",serif; font-size: 10.0pt; line-height: 115%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: ES-MX;">Les dejo la respuesta de Fernando Hitt -el jefe mencionado: “Las ideas
están en el aire; cualquiera las puede tomar”</span><span style="font-family: "Courier New";"><o:p></o:p></span></div>
Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com2tag:blogger.com,1999:blog-6067917109571797942.post-73970213914316838552017-05-31T09:43:00.000-05:002017-05-31T14:47:46.172-05:00Segunda sesión e intermedios: asesoría de estadísticaDurante la primera sesión de trabajo surgieron detalles interesantes:<br />
<ul>
<li>El estudiante no recordaba haber aprendido a trazar gráficos de ningún estilo</li>
<li>Desconoce o no recuerda el uso de variables; se sorprende de que en la calculadora que utiliza (de la que desconoce las funciones) aparezca la x en diversas teclas</li>
<li>Comenta que <b>todo</b> se puede convertir a número</li>
</ul>
<div>
Para los primeros dos casos simplemente hay que ir con cuidado, haciendo notar el sentido, el uso y sus reglas; en el último caso, proporcionar una serie de ejemplos en los que eso no es verdadero. </div>
<div>
En la segunda sesión supe el origen de esa afirmación: la maestra proporciona ejemplos de codificación y los datos cualitativos se convierten en números en el mismo momento. Pero también, y de manera explícita, dice que algunas variables cuantitativas, como la edad, se pueden tratar tanto como variable cuantitativa y como variable cualitativa; agrega que si se trata de la edad de un individuo entonces es cuantitativa pero cuando se agrupan las edades en clases, la variable pierde su naturaleza cuantitativa:<br />
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<a href="https://1.bp.blogspot.com/-8x3rKR9a6gY/WS7RMBDsZ3I/AAAAAAAAPGs/FA6sM8V4ctkdSxgjlCVk6hiy-0CbqrySgCLcB/s1600/DE8DC983-4679-4839-BB29-6B31F6138CA7.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="588" data-original-width="1600" height="117" src="https://1.bp.blogspot.com/-8x3rKR9a6gY/WS7RMBDsZ3I/AAAAAAAAPGs/FA6sM8V4ctkdSxgjlCVk6hiy-0CbqrySgCLcB/s320/DE8DC983-4679-4839-BB29-6B31F6138CA7.jpg" width="320" /></a></div>
<br /></div>
<div>
<br /></div>
<div>
Entre la primera y la segunda sesión hice el resumen que compartí en la entrada anterior de este blog y el siguiente mapa mental simple (y de carrera)</div>
<div>
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://1.bp.blogspot.com/-OXi8TB8p8ws/WS4AlF2cShI/AAAAAAAAPFs/dQW0ZfLfTBoKy3t1zOGXwib_OQoa3-NXACLcB/s1600/mapa%2Bmental%2Bde%2Bestadistica%2Bdescriptiva.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="440" data-original-width="640" height="220" src="https://1.bp.blogspot.com/-OXi8TB8p8ws/WS4AlF2cShI/AAAAAAAAPFs/dQW0ZfLfTBoKy3t1zOGXwib_OQoa3-NXACLcB/s320/mapa%2Bmental%2Bde%2Bestadistica%2Bdescriptiva.jpeg" width="320" /></a></div>
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<br /></div>
<div class="separator" style="clear: both; text-align: left;">
El estudiante en realidad no ha tenido tiempo de resolver ni un solo ejercicio, de modo que llegamos a la segunda sesión en la que me muestra una serie de "materiales" que le entregaron sus compañeros para que se prepare: una guía de estudio y unas cuantas fotos de las diapositivas en Power Point que constituyeron la clase.</div>
<br />
La guía incluye una especie de resumen de los temas tratados:<br />
<div class="separator" style="clear: both; text-align: left;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://1.bp.blogspot.com/-GoNBFkHjaVE/WS7TYc0LuEI/AAAAAAAAPHI/ThR9ruWp_3Uq1NKjtKyFzNXNv8tjRts7gCLcB/s1600/18740364_1192786740831582_1615549360986216479_n.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="960" data-original-width="720" height="200" src="https://1.bp.blogspot.com/-GoNBFkHjaVE/WS7TYc0LuEI/AAAAAAAAPHI/ThR9ruWp_3Uq1NKjtKyFzNXNv8tjRts7gCLcB/s200/18740364_1192786740831582_1615549360986216479_n.jpg" width="150" /> </a><a href="https://4.bp.blogspot.com/-tLZykQe-Q2Q/WS7Rq2IFOmI/AAAAAAAAPGw/qNHXSj73HkIcNKEOlMyYix3AH46RtnB_wCLcB/s1600/A4058F14-9015-428B-9B40-926E68D53D0C.JPG" imageanchor="1" style="clear: left; display: inline !important; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="1600" data-original-width="1200" height="200" src="https://4.bp.blogspot.com/-tLZykQe-Q2Q/WS7Rq2IFOmI/AAAAAAAAPGw/qNHXSj73HkIcNKEOlMyYix3AH46RtnB_wCLcB/s200/A4058F14-9015-428B-9B40-926E68D53D0C.JPG" width="150" /></a></div>
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Y los ejercicios propuestos a partir de una tabla de datos codificados, que es lo que lleva a pensar al estudiante que todo se convierte a número y entonces puede calcularse cualquier cosa:</div>
<br />
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<a href="https://3.bp.blogspot.com/-CkpCuPER6QQ/WS7Ru38zuFI/AAAAAAAAPG4/QQXA_5372KIvKJcgbA_axUljC9y4IljFgCLcB/s1600/E7AE09D7-015B-44A0-834B-4EA6DE5ACF26.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="1600" data-original-width="1200" height="200" src="https://3.bp.blogspot.com/-CkpCuPER6QQ/WS7Ru38zuFI/AAAAAAAAPG4/QQXA_5372KIvKJcgbA_axUljC9y4IljFgCLcB/s200/E7AE09D7-015B-44A0-834B-4EA6DE5ACF26.jpg" width="150" /></a></div>
<a href="https://1.bp.blogspot.com/-5EbMD_t74HU/WS7RvEtaLrI/AAAAAAAAPG8/fX-VqYgAV2wmesqNepg3ZLU_ZvSbnBZmwCLcB/s1600/D8AF13C4-3E6A-45A5-B24B-28DCD9ADC2E6.JPG" imageanchor="1" style="clear: left; display: inline !important; margin-bottom: 1em; margin-right: 1em; text-align: center;"><img border="0" data-original-height="1600" data-original-width="1200" height="200" src="https://1.bp.blogspot.com/-5EbMD_t74HU/WS7RvEtaLrI/AAAAAAAAPG8/fX-VqYgAV2wmesqNepg3ZLU_ZvSbnBZmwCLcB/s200/D8AF13C4-3E6A-45A5-B24B-28DCD9ADC2E6.JPG" width="150" /></a><br />
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<br /></div>
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Algunas de las fotos compartidas. </div>
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Las que siguen se refieren al concepto de variable estadística:</div>
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<br /></div>
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Y luego, al muestreo:<br />
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Ahí es a donde el estudiante quiere llegar, y le urge. Pretende brincar a las técnicas de muestreo, intervalos de confianza y pruebas de hipótesis, sin conocer siquiera lo básico.</div>
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Sin embargo, uno de los ejercicios propuestos en la especie de guía de estudio le pide hacer un histograma a partir de datos brutos. De hecho pareciera que debe hacerlo con cada una de las variables de la tabla que le fue proporcionada donde aparecen números (códigos) para la variable Sexo y Orientación en el plano, por ejemplo, y otros valores numéricos que no tenemos idea de qué representan exactamente pero que podrían ser puntuaciones en un examen de aptitudes. Ese ejercicio da pie para que continuemos con lo básico, apuntado ya en el diagrama anterior.<br />
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El resumen de la sesión se presenta en dos partes en los enlaces siguientes.<br />
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<a href="https://drive.google.com/file/d/0B33nni72fr_YZFlDekwwUWFiODA/view?usp=sharing" target="_blank">Primera parte</a></div>
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<a href="https://drive.google.com/file/d/0B33nni72fr_YLUNLbkdYV0trdU0/view?usp=sharing" target="_blank">Segunda parte</a></div>
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Al recibir los materiales, el joven me reenvió las fotografías anteriores porque, evidentemente, tiene prisa en terminar de "aprender" lo que requiere para su examen. Le reitero:<br />
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<i>Digamos que esos temas están en el diagrama que te envié ayer por la mañana. pero el diseño de encuestas o cuestionarios es otra cosa y debería ser realizado por expertos en el área de interés (maestros, sociólogos, políticos, etc.) porque cada uno busca información específica respecto a un grupo de la sociedad o de la sociedad competa.</i><br />
<i>En el caso de la criminalística, lo que interesa observar son variables de ese tipo: delitos cometidos, por tipo, y su relación con otras variables como pueden ser: sexo, grado de escolaridad, consumo de drogas, religión, filiación partidista, tipo de música preferida, y un gran etcétera.</i><br />
<i>Y entonces lo que se busca es la correlación entre la variable que nos interesa con cada una de las otras.</i><br />
<i>Y entonces estamos ya en otro contexto.</i><br />
<i>Cuando relacionamos variables (varias, de dos en adelante), podemos hacerlo de manera muy simple (comparación de medias, o comparación de varianzas, por ejemplo) o podemos meternos a lo que es el Diseño y Análisis de Experimentos (ANOVA, cuadrados latinos, cuadrados grecolatinos, etc.).</i><br />
<i>Para eso necesitamos la probabilidad, y que las variables sean verdaderamente cuantitativas. Y asegurar que tienen una distribución normal. A partir de esas certitudes es que pueden llevarse a cabo esos análisis.</i><br />
<i>La correlación simple sí puede detectarse aún cuando las variables no sean cuantitativas.</i><br />
<i>Y está toda la estadística no paramétrica que, lamentablemente, no se estudia en las universidades</i>.<br />
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Aquí no voy a emitir juicios sobre la exposición de la maestra ni los comentarios que intercambiamos al respecto. Cada uno puede juzgar a partir de lo expuesto.<br />
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Algo que alcanzamos a hacer en la segunda sesión, cuando el estudiante ya pedía que lo dejara en paz (la sesión es de dos horas), fue calcular la media para los datos agrupados. Que no resultara lo mismo que en el caso de datos brutos le provocó un gran conflicto. Para él significaba que nos habíamos equivocado al hacer los cálculos ("las matemáticas son exactas" dicen algunos, y luego se topan con esto que los desconcierta y desanima). Y por ahí recomenzaremos en la sesión de mañana.<br />
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<br />Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997tag:blogger.com,1999:blog-6067917109571797942.post-7258851144275561742017-05-24T19:31:00.000-05:002017-05-24T19:31:08.251-05:00Inicio de una breve introducción a la estadística<div class="MsoNormal">
Solamente doy asesorías a particulares en casos excepcionales, y éste es uno de ellos. Alguien que requiere de conocer los elementos de la estadística con apenas un par de semanas para aprenderlo. Lo bueno: la disposición. Trabajaremos un total de 10 horas, aproximadamente, partiendo de cero (absoluto). </div>
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El día de ayer tuvimos la primera sesión de dos horas y lo que sigue es el resumen que hice yo esta mañana.</div>
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<b>Primera sesión</b></div>
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<div class="MsoListParagraphCxSpFirst" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->1.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Hacemos observaciones todos los días, en
diferentes lugares y por diferentes razones. Una observación realizada a
propósito es un <b>experimento</b>. Por
ejemplo, podemos decidir <u>observar a las personas que salen de un elevador en
un edificio público</u>, ese sería un experimento.<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->2.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Lo que registramos al hacer la observación se
llaman <b>Variables</b>. Por ejemplo, al
observar a las personas que salen de un elevador en un edificio público podemos
fijarnos en si son hombres o son mujeres (la variable es <u>Sexo</u>), o
podemos observar si usan zapatos formales, tenis, chanclas, botas (la variable
sería <u>tipo de calzado</u>), pero también podemos observar el número de
personas que salen en cada vuelta (la variable sería <u>número de personas</u>),
incluso podríamos preguntarles su religión (esa sería la variable) o su edad (y
esa sería la variable). <o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->3.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Algunas variables dan como resultado
“cualidades” es decir, características no medibles con regla, pesas, etc. como
en el caso de las variables Sexo, tipo de calzado, religión. Esas variables se
dicen <b>cualitativas</b>.<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->4.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Otras variables dan como resultado números y se
dicen <b>cuantitativas</b>. Es el caso de
las variables número de personas, edad, tiempo, …<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->5.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Según la variable que nos interese, lo que vamos
registrando tiene un cierto número de opciones. En el caso de <u>Sexo</u> (en
documento oficiales, por ejemplo), las opciones son Hombre y Mujer (o Masculino
y Femenino). Esos son <b>los valores que
puede tomar la variable</b> Sexo. Si la variable es <u>número de personas</u>
que salen del elevador que observamos, los valores que puede tomar son 0, 1, 2,
3, 4, 5, 6, 7 (de acuerdo con las normas). <o:p></o:p></div>
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<!--[if !supportLists]-->6.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->En el caso de las variables cuantitativas
tenemos dos situaciones:<o:p></o:p></div>
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<!--[if !supportLists]-->a.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Lo que registramos se puede contar como si
fueran naranjas: años cumplidos, número de hijos en una familia, personas que
salen de un elevador, veces que sale águila cuando tiramos cinco volados,
frutos que da un árbol en una temporada. En estos casos las opciones van,
generalmente, de 0 a algún número entero por muy grande que sea. Se llaman <b>variables cuantitativas <span style="color: red;">discretas</span>.</b><o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto; mso-list: l0 level2 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->b.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Lo que registramos puede tomar cualquier valor
(entero, decimal, etc.) en un rango. Por ejemplo: tiempo que tarda en salir la
gente de un elevador, medido en segundos (de 0 a 90, por ejemplo), y puede ser
cualquier número, con decimales incluidos, en ese rango. O el tiempo que dura
un foco sin fundirse medido en horas (de 0 a 250, por ejemplo). O el peso de un
ser humano vivo, ya nacido, (de 0.200 a
220 kg, más o menos). En estos casos decimos que se trata de <b>variables cuantitativas <span style="color: red;">continuas</span>.</b><o:p></o:p></div>
<div class="MsoListParagraphCxSpLast" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->7.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;"> </span></div>
<div class="MsoListParagraphCxSpLast" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[endif]--> Las variables se representan con letras
mayúsculas; los valores de las variables (para efectos de las fórmulas que seguirán) se representan con letras minúsculas. Por ejemplo:<br /><o:p></o:p></div>
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Variable<o:p></o:p></div>
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<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Símbolo<o:p></o:p></div>
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<td style="border-left: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 227.1pt;" valign="top" width="303">
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Valores<o:p></o:p></div>
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Sexo<o:p></o:p></div>
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X<o:p></o:p></div>
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Femenino, masculino</div>
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<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 100.6pt;" valign="top" width="134">
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Número de personas que salen de un elevador<o:p></o:p></div>
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Q<o:p></o:p></div>
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0, 1, 2, 3, 4,5, 6,7<br />
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Si el número
posibilidades es muy grande (por ejemplo, el número de personas que viajan en
un vehículo público, como un camión urbano) <u>puede no ser conveniente</u> escribir
todas las posibilidades y entonces se agrupan en rangos pequeños.<o:p></o:p></div>
</td>
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<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 100.6pt;" valign="top" width="134">
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in;">
Peso de un ser humano vivo ya nacido, en kg<o:p></o:p></div>
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<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt; width: 59.05pt;" valign="top" width="79">
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P<o:p></o:p></div>
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<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0in; text-align: center;">
Aquí <u>no es posible</u> dar todos los
valores que pueden observarse, porque el continuo es infinito. Se acostumbra
trabajar por intervalos cortos, subdividiendo el rango para que “tenga
sentido”<o:p></o:p></div>
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</tbody></table>
<div class="MsoNormal" style="margin-left: .25in;">
<o:p><span style="text-indent: -0.25in;"><br />8.</span><span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal; text-indent: -0.25in;">
</span><span style="text-indent: -0.25in;">Una vez que tenemos el experimento formulado
(incluyendo sus condiciones) y la variable que nos interesa bien definida, de
manera que NADIE pueda malinterpretar lo que se pide observar, registramos de
manera precisa cada una de las observaciones que hacemos. Cada uno de esos
registros se llama un </span><b style="text-indent: -0.25in;">dato</b><span style="text-indent: -0.25in;">.</span> </o:p></div>
<div class="MsoListParagraphCxSpFirst" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->9.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Por ejemplo: Estamos <u>observando a las
personas que salen del elevador del edificio público de la SEG, en Guanajuato,
frente a la salida del elevador en la planta baja del edificio, entre las 8 y
las 9 de la mañana</u> (todo eso es la descripción del experimento y sus
condiciones), y vamos a registrar el <u>número de personas que descienden en
ese piso</u> (esta es la variable). Sabemos que los valores que puede tomar la
variable, sus opciones, van de 0 a 7 por las limitantes de seguridad.
Supongamos que en el tiempo que duró la observación hubo un total de 20
llegadas <b>(número total de observaciones</b>
= N) y que registramos lo siguientes números: 0, 2, 2, 1, 0, 3, 4, 1, 3, 4, 5,
2, 1, 3, 5, 3, 6, 3, 4, 5 (estos son los <b>datos
recabados</b>)<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->10.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Lo que sigue es presentar la información y
sacarle provecho. Porque para eso se estudia estadística.<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="mso-list: l0 level1 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->11.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->El asunto entonces es a quién se le va a
presentar la información, qué habilidades tiene para comprenderla, y qué
queremos hacerle ver (sin trampas). Hay opciones:<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto; mso-list: l0 level2 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->a.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Darle la lista de valores registrados, los
datos, tal cual los obtuvimos: 0, 2, 2, 1, 0, 3, 4, 1, 3, 4, 5, 2, 1, 3, 5, 3,
6, 3, 4, 5<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto; mso-list: l0 level2 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->b.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Darle la misma lista, pero ordenada: 0, 0, 1, 1,
1, 2, 2, 2, 3, 3, 3, 3, 3, 4, 4, 4, 5, 5, 5, 6<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto; mso-list: l0 level2 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->c.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
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<![if !mso]>
<table cellpadding=0 cellspacing=0 width="100%">
<tr>
<td><![endif]>
<div>
<p class=MsoNormal>
f(q) se lee como “frecuencia con la que aparece el valor
q”.<br>
La frecuencia (número de veces) con la que aparece el valor q =1 es 3, por
ejemplo.<br>
<br>
La suma de todas las frecuencias debe ser igual al total de observaciones
registradas, en este caso N = 20:<br>
2 + 3 + 3 + 5 + 3 + 3 + 1 = 20<o:p></o:p></p>
</div>
<![if !mso]></td>
</tr>
</table>
<![endif]></v:textbox>
<w:wrap type="square"/>
</v:shape><![endif]--><!--[if !vml]--><!--[endif]-->Construirle una tabla de <b>frecuencias absolutas</b> (cada valor con
el número de veces que apareció). <o:p></o:p>f(q) se lee como “frecuencia con la que aparece el valor q”.</div>
<div class="MsoNormal">
La frecuencia (número de veces) del valor q =1 es 3, por
ejemplo.</div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<o:p></o:p></div>
<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; margin-left: 1.0in; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0in 5.4pt 0in 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
<tr>
<td style="border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
q<o:p></o:p></div>
</td>
<td style="border-left: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
f(q)<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
0<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
2<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
1<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
2<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
5<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
4<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
5<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
6<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
1<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoListParagraphCxSpFirst" style="margin-left: 1.0in; mso-add-space: auto;">
<o:p> </o:p> </div>
<div class="MsoListParagraphCxSpFirst" style="margin-left: 1.0in; mso-add-space: auto;">
La suma de todas las frecuencias debe ser igual al total de observaciones registradas.</div>
<div class="MsoNormal">
En este caso N = 20 y verificamos: 2 + 3 + 3 + 5 + 3 + 3 + 1 = 20</div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto;">
<br /></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto;">
La misma tabla se puede construir con <b>frecuencias relativas</b>, dividiendo la frecuencia de cada dato entre
el total de observaciones registradas (N = 20). <o:p></o:p><span style="font-family: Calibri, sans-serif; font-size: 11pt;">En
el caso de las frecuencias relativas, en decimal, la suma debe ser 1. </span><span style="font-family: Calibri, sans-serif; font-size: 11pt;">Si se da en porcentajes debe ser 100%. </span><span style="font-family: Calibri, sans-serif; font-size: 11pt;">Y es muy importante verificarlo.</span></div>
<br /><table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; margin-left: 1.0in; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0in 5.4pt 0in 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
<tr>
<td style="border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
q<o:p></o:p></div>
</td>
<td style="border-left: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
f(q) absoluta<o:p></o:p></div>
</td>
<td style="border-left: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
f(q) relativa<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
0<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
2<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
2/20 = 0.10 = 10%<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
1<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
2/20 = 0.15 = 15%<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
2<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3/20 = 0.15 = 15%<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
5<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
5/20 = 0.25 = 25%<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
4<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3/20 = 0.15 = 15%<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
5<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
3/20 = 0.15 = 15%<o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
6<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
1<o:p></o:p></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0in 5.4pt 0in 5.4pt;" valign="top">
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin: 0in; mso-add-space: auto;">
1/20 = 0.05 = 5%<o:p></o:p></div>
</td>
</tr>
</tbody></table>
<div class="MsoNormal">
<br /></div>
<div class="MsoListParagraphCxSpFirst" style="margin-left: 1.0in; mso-add-space: auto; mso-list: l0 level2 lfo1; text-indent: -.25in;">
<!--[if !supportLists]-->d.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Construirle un diagrama de barras a partir de
esa tabla:<o:p></o:p></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://4.bp.blogspot.com/-ddtP_6zVpvc/WSYi8lE9ogI/AAAAAAAAPD0/nMNHeiuIjlUcy32_Y37p75YDogIei_T-wCLcB/s1600/Slide1.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="720" data-original-width="1280" height="225" src="https://4.bp.blogspot.com/-ddtP_6zVpvc/WSYi8lE9ogI/AAAAAAAAPD0/nMNHeiuIjlUcy32_Y37p75YDogIei_T-wCLcB/s400/Slide1.JPG" width="400" /></a></div>
<div class="MsoListParagraphCxSpFirst" style="margin-left: 1.0in; mso-add-space: auto; mso-list: l0 level2 lfo1; text-indent: -.25in;">
<br /></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 1.0in; mso-add-space: auto;">
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<!--[if !supportLists]-->e.<span style="font-size: 7pt; font-stretch: normal; font-variant-numeric: normal; line-height: normal;">
</span><!--[endif]-->Construirle un diagrama de pay o pastel: <o:p></o:p></div>
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<a href="https://1.bp.blogspot.com/-lSO7chgkqcs/WSYjEpNHXpI/AAAAAAAAPD4/mM1zSfZu_zAb4F0lHku0htFVWsM3YF7sQCLcB/s1600/Slide2.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="720" data-original-width="1280" height="225" src="https://1.bp.blogspot.com/-lSO7chgkqcs/WSYjEpNHXpI/AAAAAAAAPD4/mM1zSfZu_zAb4F0lHku0htFVWsM3YF7sQCLcB/s400/Slide2.JPG" width="400" /></a></div>
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Blanca Parrahttp://www.blogger.com/profile/07581763226085296903noreply@blogger.com0Leon, Guanajuato, Mexico21.1250077 -101.6859604999999620.8880182 -102.00868399999996 21.3619972 -101.36323699999997