tag:blogger.com,1999:blog-7387571103099001622024-03-19T02:52:40.602-07:00Melu WansidlerBlog escolar de Melina Ailen WansidlerMelu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.comBlogger39125tag:blogger.com,1999:blog-738757110309900162.post-34907736862796689262013-11-29T06:24:00.001-08:002013-11-29T06:24:09.589-08:00Trabajo 13<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-17929176202828181682013-11-29T06:12:00.001-08:002013-11-29T06:12:10.766-08:00Trabajo 11<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-85969761433986771492013-11-29T06:08:00.005-08:002013-11-29T06:08:58.835-08:00Trabajo 8<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-18864807850406138232013-11-29T06:08:00.001-08:002013-11-29T06:08:23.950-08:00Trabajo 12<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-85072207173175723592013-11-29T06:04:00.003-08:002013-11-29T06:04:48.899-08:00Trabajo 10<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-21155733196183974502013-08-23T08:26:00.003-07:002013-08-23T08:26:52.691-07:00Trabajo Pracrtico nº2<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-66574243088431339972013-08-16T07:34:00.000-07:002013-08-23T07:35:12.486-07:00Trabajo Practico Nº6<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-59767244125388242013-07-12T07:54:00.000-07:002013-07-12T07:54:05.966-07:00Trabajo Practico 6<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-56823380995778289262013-07-12T07:32:00.000-07:002013-08-23T07:33:04.422-07:00Trabajo Practico Nº6<div class="separator" style="clear: both; text-align: center;">
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<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-68019612789626193052013-07-05T07:31:00.000-07:002013-08-23T07:34:01.089-07:00Trabajo Practico Nº5<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi-YrIwWdBojVk4OZUoAac4BKPnjGOJYGXSXHBKC90gQFKjn6ONBcNcAHNV8ytMAM4_qu_RAqrqTrOYMbdmiw62GN_lwxoDu-z5EnkEx0vEKiI8BNFUD2tNG3K54Xw7ljvr9mHxkJbrP3U/s1600/tpn%C2%BA5+camila+y+romina.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi-YrIwWdBojVk4OZUoAac4BKPnjGOJYGXSXHBKC90gQFKjn6ONBcNcAHNV8ytMAM4_qu_RAqrqTrOYMbdmiw62GN_lwxoDu-z5EnkEx0vEKiI8BNFUD2tNG3K54Xw7ljvr9mHxkJbrP3U/s1600/tpn%C2%BA5+camila+y+romina.jpg" /></a></div>
<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-54706009078508696402013-06-13T06:41:00.001-07:002013-06-13T06:41:24.722-07:00Multiplicación de Radicales<iframe allowfullscreen="" frameborder="0" height="356" marginheight="0" marginwidth="0" mozallowfullscreen="" scrolling="no" src="http://www.slideshare.net/slideshow/embed_code/22872936" style="border-width: 1px 1px 0; border: 1px solid #CCC; margin-bottom: 5px;" webkitallowfullscreen="" width="427"> </iframe> <br />
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Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-24843189849295220912012-12-11T04:35:00.001-08:002013-03-15T07:01:28.183-07:00La vida de Rene Perez Brandy - movie maker<iframe allowfullscreen="" frameborder="0" height="344" src="http://www.youtube.com/embed/WvJX-Jg8zIU?fs=1" width="459"></iframe>Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-79113566977170677962012-12-07T04:20:00.000-08:002013-03-15T07:08:48.219-07:00Carta de presentación <!--[if gte mso 9]><xml>
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<ul type="disc">
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Empresa: Soluciones
Gastronomicas Gourmet, busca</span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Puesto: Chef</span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Perfil: Entre 30 y 50 años
(excl)</span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Lugar de trabajo: Canning,
Ezeiza, Buenos Aires, Argentina </span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Industria: Gastronomía</span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Tipo de trabajo: Part-time</span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Área Funcional: Cocina</span></span></li>
<li class="MsoNormal"><span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Nivel de Estudio: </span></span></li>
</ul>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;"> <span> </span></span></span></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;"><span> </span>Buenos Aires, 18 de Marzo de 2011.</span></span></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Señores <span> </span>Soluciones Gastronomitas Gourmet</span></span></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;"><u>Presente</u></span></span></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">De mi consideración:</span></span></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">
Por la presente me dirijo a Uds. para acercarles mi Curriculum Vitae,
postulándome como Chef <span> </span>en vuestra
empresa. </span></span></div>
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<br /></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">
Soy una persona
responsable que se compromete con sus tareas y con una amplia vocación de
servicio.</span></span></div>
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<br /></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">
Aspiro a formar parte de
un equipo de trabajo que me brinde la posibilidad de poner en práctica todo lo
aprendido, seguir capacitándome y adquirir experiencia profesional.</span></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;">Sin otro particular, saludo a
Uds. muy atentamente, quedando a la espera de una pronta entrevista personal.</span></span></div>
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<span style="font-size: small;"><span style="font-family: Verdana,sans-serif;"> Melina A. Wansidler </span></span></div>
Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-36961265150107093152012-12-07T04:09:00.000-08:002013-03-15T07:08:48.176-07:00Curriculum Vitae <!--[if gte mso 9]><xml>
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<b style="mso-bidi-font-weight: normal;"><span style="font-family: Tahoma; font-size: 22.0pt;">Curriculum Vitae</span></b></div>
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<u><span style="font-family: Tahoma; font-size: 18.0pt;">Datos
personales</span></u></div>
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<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Tahoma;">Nombre:
Melina</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Tahoma;">Apellido:
Wansidler</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Tahoma;">Estado
Civil: Soltera</span></div>
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<span style="font-family: Tahoma;">Nacionalidad:
Argentina</span></div>
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<span style="font-family: Tahoma;">Fecha
de Nacimiento: 05-07-1982</span></div>
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<span style="font-family: Tahoma;">Domicilio:
Franco 2987 (Villa Pueyrredon)</span></div>
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<span style="font-family: Tahoma;">Código
Postal: 1419, Capital Federal</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Tahoma;">Teléfono:
4571- 0186</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Tahoma;">Celular:
1566609529</span></div>
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<u><span style="font-size: 18.0pt;">Información Académica</span></u></div>
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<span style="font-family: Tahoma;">Curse lycee Instituto de
gastronomía profesional.</span></div>
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<br /></div>
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<span style="font-family: Tahoma;">Escuela E.E.M.1 “Rodolfo
Walsh” – (Estudios Secundarios)</span></div>
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<span style="font-family: Tahoma;">Titulo obtenido: Bachiller
con especialización en comunicación social</span></div>
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<span style="font-family: Tahoma;">Año de egreso: 1999</span></div>
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<br /></div>
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<span style="font-family: Tahoma;">Escuela nº14 distrito 16 “
Vicente Carmelo Gallo” – (Estudios Primarios)</span></div>
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<span style="font-family: Tahoma;">Primario completo.</span></div>
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<u><span style="font-family: Tahoma; font-size: 16.0pt;">Otros
estudios: </span></u></div>
<div class="MsoNormal">
<span style="font-family: Tahoma;">Cursos de Cocinero
Profesional en la CEAC.</span></div>
Con la realización de este curso Puedo:<br />
<ul type="disc">
<li class="MsoNormal" style="mso-list: l0 level1 lfo1; mso-margin-bottom-alt: auto; mso-margin-top-alt: auto; tab-stops: list 36.0pt;">Dominar los métodos de <b>preparación
y presentación</b> de los platos.</li>
<li class="MsoNormal" style="mso-list: l0 level1 lfo1; mso-margin-bottom-alt: auto; mso-margin-top-alt: auto; tab-stops: list 36.0pt;">Conocer las claves de la <b>cocina
gastronómica</b> y la “Nueva Cocina”.</li>
<li class="MsoNormal" style="mso-list: l0 level1 lfo1; mso-margin-bottom-alt: auto; mso-margin-top-alt: auto; tab-stops: list 36.0pt;">Dominar las funciones de
todos los <b>utensilios y maquinaria </b>de cocina.</li>
<li class="MsoNormal" style="mso-list: l0 level1 lfo1; mso-margin-bottom-alt: auto; mso-margin-top-alt: auto; tab-stops: list 36.0pt;">Aprender las técnicas de <b>manipulación
de alimentos</b>.</li>
</ul>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<u><span style="font-family: Tahoma; font-size: 16.0pt;">Idiomas:
</span></u></div>
<div class="MsoNormal">
<span style="font-family: Tahoma;">Ingles: (basico)</span></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<u><span style="font-family: Tahoma; font-size: 16.0pt;">Computación</span></u></div>
<div class="MsoNormal">
<span style="font-family: Tahoma;">Sistema operativo: Windows</span></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<u><span lang="ES-TRAD" style="font-family: Tahoma; mso-ansi-language: ES-TRAD;">Programas</span></u><u><span lang="EN-GB" style="font-family: Tahoma; mso-ansi-language: EN-GB;">:</span></u><span lang="EN-GB" style="font-family: Tahoma; mso-ansi-language: EN-GB;"> Microsoft Word, Microsoft Excel, Microsoft Power
Point y </span><span lang="ES-TRAD" style="font-family: Tahoma; mso-ansi-language: ES-TRAD;">excelente</span><span lang="ES-TRAD" style="font-family: Tahoma; mso-ansi-language: EN-GB;"> </span><span lang="ES-TRAD" style="font-family: Tahoma; mso-ansi-language: ES-TRAD;">manejo</span><span lang="EN-GB" style="font-family: Tahoma; mso-ansi-language: EN-GB;"> de internet.</span></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<u><span lang="ES-TRAD" style="font-family: Tahoma; font-size: 16.0pt; mso-ansi-language: ES-TRAD;">Experiencia</span></u><u><span lang="ES-TRAD" style="font-family: Tahoma; font-size: 16.0pt; mso-ansi-language: EN-GB;"> </span></u><u><span lang="ES-TRAD" style="font-family: Tahoma; font-size: 16.0pt; mso-ansi-language: ES-TRAD;">Laboral</span></u><u><span lang="ES-TRAD" style="font-family: Tahoma; font-size: 16.0pt; mso-ansi-language: EN-GB;">
</span></u><u><span lang="EN-GB" style="font-family: Tahoma; font-size: 16.0pt; mso-ansi-language: EN-GB;"></span></u></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<span style="font-family: Tahoma;">Cocinero en restoranes internacionales
y no internacionales e institucionales.</span></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<span style="font-family: Tahoma;">Puesto: Chef </span></div>
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal">
<br /></div>
Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-51709368190661673022012-12-04T03:43:00.000-08:002013-03-15T07:08:48.191-07:00 Violencia de genereo , Lengua <!--[if gte mso 9]><xml>
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<u><span style="font-size: large;"><span lang="ES-AR" style="color: #333333; font-family: Tahoma;">Violencia de Género desde el siglo XIX.</span></span></u></div>
<div style="background: white; line-height: 14.25pt; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 0cm; margin-right: 0cm; margin-top: 8.35pt;">
<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span>La violencia de género,
manifestada por los hombres hacia las mujeres, es un tema vigente desde el
siglo XIX. En esta época, la mujer era tratada como ignorante, y los hombres
creían que tenían derecho sobre ellas, a golpearlas o agredirlas
verbalmente.<span style="mso-spacerun: yes;"> </span>También es remarcable decir
que todavía no existía la violencia del género femenino hacia el masculino.
Muchos pensadores nos dieron a conocer sus posturas a través de sus obras.<br />
<span style="mso-spacerun: yes;"> </span></span></div>
<div style="background: white; line-height: 14.25pt; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 0cm; margin-right: 0cm; margin-top: 8.35pt;">
<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span>Eugenio Cambaceres, en su
novela “En la sangre”, nos comunica su postura o su opinión sobre la violencia
de género, a través de Genaro y su padre, Esteban. Quienes son violentos
brutalmente con sus esposas. Cambaceres los describe como ambiciosos,
aprovechadores, manipuladores, dañinos para su entorno social, engañosos y
sumamente violentos. El autor, también, hace una separación entre los que es la
barbarie, representada por el protagonista y su padre. Y la civilización la
representa con la clase social alta. Obviamente, Genaro y Esteban son la
barbarie, son la crueldad. Ya que son violentos y pertenecen a la clase social
baja. Cambaceres, nos comunica en esta obra, como en todas sus novelas, que lo
que llevamos en la sangre no lo podemos cambiar, no podemos ir en contra de
nuestra genética. En este caso, Genaro es violento porque su herencia paterna
lo determina. Su herencia de la cual no puede escapar.<span class="apple-converted-space"><span style="font-family: Tahoma;"> </span></span><br />
<span style="mso-spacerun: yes;"> </span></span></div>
<div style="background: white; line-height: 14.25pt; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 0cm; margin-right: 0cm; margin-top: 8.35pt;">
<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span>Otro escritor del siglo XIX.
Es José hernandez, autor del Martin Fierro, en este, los hombres que actuaban
de forma violenta hacia sus esposas, o mujeres, eran los indios. En muchos
cantos, Martin Fierro se muestra en contra de estas actitudes. Tambien nos
comunica que los indios, no creen en dios, son ladrones y dice que ellos le
dejan todo el trabajo a sus mujeres. En la segunda parte del Martin Fierro, en
el canto nueve, se describe un acto de violencia, en el cual la víctima es una
mujer cautiva y su bebe. El indio desgolla a su hijo, y Fierro cuando escucho
el llanto de la muchacha, va a socorrerla. Asi, comienza una pelea contra el
indio.<span style="mso-spacerun: yes;"> </span>Entonces nos queda claro que
Hernandez, está en contra del maltrato hacia la mujer. A los indios los pone en
el lugar de la barbarie por sus actitudes dañinas y claramente porque actúan
maltratando a las mujeres.</span></div>
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<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span></span></div>
<div style="background: white; line-height: 14.25pt; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 0cm; margin-right: 0cm; margin-top: 8.35pt;">
<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span>En el matadero de Esteban
Echeverria, nos comunica que la violencia de género es representada cuando las
mujeres se peleaban por un pedazo de carne en el matadero, por supuesto mujeres
federales.<span style="mso-spacerun: yes;"> </span>Echeverria<span style="mso-spacerun: yes;"> </span>describe a los federales como violentos,
degolladores, carniceros, ladrones, ignorantes, con falta de educación y los
pone en el lugar de la barbarie. En cambio a los unitarios los describe como
apuestos, con un vocabulario refinado y romantico, gente culta, que vestia a la
europea. Poniéndolos obviamente en el lugar de la civilización. Echeverria
creía que el país gobernado por Rosas era todo un “gran matadero”. Entonces en
la<span style="mso-spacerun: yes;"> </span>clase social que se actuaba con actos
violentos, era en la clase social baja. Representada por los federales.
Describe distintos actos de violencia cuando la chusma se pelea con otras
mujeres y hombres por un pedazo de carne. </span></div>
<div style="background: white; line-height: 14.25pt; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 0cm; margin-right: 0cm; margin-top: 8.35pt;">
<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span>¿ Entonces la violencia de
genero es de la clase social baja, como lo representan estos pensadores?</span></div>
<div style="background: white; line-height: 14.25pt; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 0cm; margin-right: 0cm; margin-top: 8.35pt;">
<br /></div>
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<span lang="ES-AR" style="color: #333333; font-family: Tahoma; font-size: 11.0pt;"><span style="mso-spacerun: yes;"> </span>Seria de ignarante pensar que la violencia de
genero es de la clase social baja, ya que la gente con más poder económico
también manifiesta con violencia. Sabemos que en el siglo XIX no se veía a las
mujeres ejerciendo violencia sobre el sexo masculino, pero en la actualidad, si
existe este tipo de violencia, de menor cantidad de casos, pero existe. Creo
que se tiene que juzgar y hacer justicia para que esto no ocurra mas, para que
no halla mas asesinatos por este tipo de violencia, porque cuando no se hace
justicia, vuelve a ocurrir. También es necesario decir, que en la actualidad
hay muchos casos de violencia de género, porque no se hace justicia como
debería ser. Y cuando se hace justicia las cárceles de nuestro país no cumplen
su objetivo como debieran hacerlo, ya que existe la corrupción. No cumplen con
su misión ya que después a los presos, o detenidos no los pueden reinsertar en
la sociedad. Y con respecto a los que pensaban nuestros escritores del siglo
XIX, creo que José Hernández estaba en lo cierto en juzgar este tipo de
violencia como lo hacía Cambaceres, pero igual están equivocados afirmando que
este tipo de violencia solo ocurre en la sociedad de bajo ingreso económico.
Respecto con lo que nos comunica Cambaceres en la obra, sobre la genética es
incorrecto, ya que todos podemos cambiar nuestro destino y ejercer este tipo de
violencia cobarde, depende de cada uno. Y que paremos y digamosle que no a este
problema de la actualidad, es sumamente importante, se deben hacer las
denuncias sin miedo, nadie tiene derecho de ejercer violencia sobre otra
persona. Queda en cada uno, ejercerla, ser cobarde y defender sus derechos.</span></div>
Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-59459633670198323452012-11-29T07:20:00.004-08:002013-03-15T07:08:48.209-07:00Trigonometria<iframe allowfullscreen="allowfullscreen" frameborder="0" height="356" marginheight="0" marginwidth="0" mozallowfullscreen="mozallowfullscreen" scrolling="no" src="http://www.slideshare.net/slideshow/embed_code/15396973" style="border-width: 1px 1px 0; border: 1px solid #CCC; margin-bottom: 5px;" webkitallowfullscreen="webkitallowfullscreen" width="427"> </iframe> <br />
<div style="margin-bottom: 5px;">
<b> <a href="http://www.slideshare.net/MelinaAilen/trabajo-practico-de-matemtica-15396973" target="_blank" title="Trabajo practico de matemática">Trabajo practico de matemática</a> </b> from <b><a href="http://www.slideshare.net/MelinaAilen" target="_blank">MelinaAilen</a></b> </div>
Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com1tag:blogger.com,1999:blog-738757110309900162.post-81444942333348811102012-10-31T05:07:00.004-07:002013-03-15T07:08:48.221-07:00Cuadro de sonido<img alt="" height="240" 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" width="320" />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-33204195052935425702012-10-23T15:45:00.000-07:002013-03-15T07:08:48.174-07:00 Trinomio Cuadrado Perfecto<iframe allowfullscreen="" frameborder="0" height="344" src="http://www.youtube.com/embed/wT6vxmk-yiw?fs=1" width="459"></iframe>Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-50937629165812492042012-10-23T14:25:00.000-07:002013-03-15T07:08:48.187-07:00Diferencia de Cuadrados<iframe allowfullscreen="" frameborder="0" height="344" src="http://www.youtube.com/embed/tABhBMtBmSY?fs=1" width="459"></iframe>Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com1tag:blogger.com,1999:blog-738757110309900162.post-54439339092709734512012-09-05T13:40:00.001-07:002013-03-15T07:08:48.193-07:00Factor común por agrupación de términos<iframe allowfullscreen="" frameborder="0" height="344" src="http://www.youtube.com/embed/uhN2eVLAEDw?fs=1" width="459"></iframe>Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com1tag:blogger.com,1999:blog-738757110309900162.post-57681663969311967602012-09-05T13:35:00.001-07:002013-03-15T07:08:48.206-07:00 Factor comun<iframe allowfullscreen="" frameborder="0" height="344" src="http://www.youtube.com/embed/lzaOlB6f_c8?fs=1" width="459"></iframe>Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com1tag:blogger.com,1999:blog-738757110309900162.post-78761142005343867532012-09-05T13:06:00.004-07:002013-03-15T07:08:48.216-07:00Factorear<span class="Apple-style-span" style="background-color: black;"><span class="Apple-style-span"></span><br /></span>
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<h1 class="r" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; font-family: 'trebuchet ms', verdana, arial; font-size: 1.3em; font-weight: bold; letter-spacing: 1px; line-height: 24px; margin-bottom: 5px; margin-left: 0px; margin-right: 0px; margin-top: 5px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-align: left; word-spacing: 2px;">
<span class="Apple-style-span" style="background-color: black;"><span class="Apple-style-span" style="color: white;">
Factorizar</span></span></h1>
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<span class="Apple-style-span" style="font-family: 'trebuchet ms', verdana, arial; font-size: 20px; font-weight: bold; letter-spacing: 1px; line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="background-color: black; color: white; font-family: Verdana, sans-serif; font-size: small; font-weight: normal; line-height: 27px;">Significa expresar al polinomio como el producto de dos o varios monomios, binomios, trinomios, etc.</span></span></div>
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<span class="Apple-style-span" style="letter-spacing: 1px; word-spacing: 1px;"><span class="Apple-style-span" style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="background-color: black; color: white; line-height: 26px;"><br /></span></span></span></div>
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<span class="Apple-style-span" style="background-color: black; color: white; font-family: Verdana, sans-serif; letter-spacing: 1px; line-height: 26px; word-spacing: 1px;"><b>Factorizar</b> o descomponer un número en factores primos es expresar el número como un producto de numeros primos.</span></div>
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<span class="Apple-style-span" style="background-color: black; color: white; letter-spacing: 1px; word-spacing: 1px;"><span class="Apple-style-span" style="font-family: Verdana, sans-serif;"><span class="Apple-style-span" style="line-height: 26px;"><br /></span></span><span class="Apple-style-span" style="font-family: 'trebuchet ms', verdana, arial;"><span class="Apple-style-span" style="font-size: 20px; line-height: 24px;"><b>Factorización de un número</b></span></span></span></div>
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<span class="Apple-style-span" style="letter-spacing: 1px; word-spacing: 1px;"><span class="Apple-style-span" style="font-family: 'trebuchet ms', verdana, arial;"><span class="Apple-style-span" style="color: white; font-size: 20px; line-height: 24px;"><b style="background-color: black;"><br /></b></span></span></span></div>
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<span class="Apple-style-span" style="background-color: black; color: white; font-family: Verdana, Arial, Helvetica, sans-serif; letter-spacing: 1px; line-height: 27px; word-spacing: 1px;">Para <b>factorizar</b> un <b>número</b> o <b>descomponerlo en factores</b> efectuamos sucesivas divisiones entre sus divisores primos hasta <b>obtener</b> un uno como cociente.</span></div>
<div style="text-align: left;">
<span class="Apple-style-span" style="background-color: black; color: white; font-family: Verdana, Arial, Helvetica, sans-serif; letter-spacing: 1px; line-height: 27px; word-spacing: 1px;"><br /></span></div>
<div style="text-align: left;">
<span class="Apple-style-span" style="font-family: Verdana, Arial, Helvetica, sans-serif; letter-spacing: 1px; line-height: 27px; word-spacing: 1px;"><span class="Apple-style-span" style="background-color: black; color: white; line-height: 27px;">Para realizar las divisiones utilizaremos una <b>barra vertical</b>, a la <b>derecha escribimos los divisores primos</b> y a la <b>izquierda los cocientes</b>.</span></span></div>
<div class="actividades_v" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; font-family: Verdana, Arial, Helvetica, sans-serif; left: 5%; letter-spacing: 1px; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-align: left; text-indent: 2.5em; width: 707px; word-spacing: 2px;">
<span class="Apple-style-span" style="background-color: black;"><span class="Apple-style-span" style="color: white; font-family: 'Times New Roman'; letter-spacing: normal; line-height: normal; word-spacing: 0px;"></span></span></div>
<div style="font-family: Verdana, Arial, Helvetica, sans-serif; font-size: 11px; letter-spacing: 1px; line-height: 1.75em; margin-bottom: 20px; margin-left: 35%; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-align: left; text-indent: 2.5em; word-spacing: 2px;">
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="color: black; font-size: small; line-height: 27px;"></span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;">432 · 2</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;">216 . 2</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;">108 . 2</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;"> 54 . 2</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;"> 27 . 3</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;"> 9 . 3</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;"> 3 . 3</span></span><br />
<span class="Apple-style-span" style="color: white;"><span class="Apple-style-span" style="background-color: black; color: white;"> 1 . </span></span></div>
<div class="actividades_2_g" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; font-family: Verdana, Arial, Helvetica, sans-serif; font-size: 11px; left: 12.5%; letter-spacing: 1px; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-align: left; text-indent: 2.5em; top: 10px; width: 208px; word-spacing: 2px;">
<span class="sol" style="background-attachment: initial; background-clip: initial; background-color: black; background-image: initial; background-origin: initial; color: white; font-size: 1em; font-weight: bold;">432 = 2<sup>4 </sup>· 3<sup>3</sup></span></div>
<div class="actividades_2_g" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; font-family: Verdana, Arial, Helvetica, sans-serif; font-size: 11px; left: 12.5%; letter-spacing: 1px; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-align: left; text-indent: 2.5em; top: 10px; width: 208px; word-spacing: 2px;">
<span class="sol" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; color: white; font-size: 1em; font-weight: bold;"><sup style="background-color: black;"><br /></sup></span></div>
<h2 class="r" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; font-weight: bold; line-height: 24px; margin-bottom: 5px; margin-left: 0px; margin-right: 0px; margin-top: 5px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-align: left; word-spacing: 2px;">
<span class="Apple-style-span" style="background-color: black; color: white; font-family: Arial, Helvetica, sans-serif; font-size: small;">Factorización de un polinomio</span></h2>
<div style="line-height: 24px; word-spacing: 2px;">
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 2px;"><span class="Apple-style-span" style="background-color: black; color: white; font-family: Arial, Helvetica, sans-serif;"><br /></span></span></div>
<span class="Apple-style-span" style="line-height: 27px; word-spacing: 2px;"><b><span class="Apple-style-span" style="background-color: black; color: white; font-family: Arial, Helvetica, sans-serif;">Los pasos a seguir para factorizar un polinomio y hallar sus raíces son:</span></b></span><br />
<div>
<span class="Apple-style-span" style="background-color: black; color: white; font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div>
<span class="Apple-style-span" style="background-color: black; line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="color: white; font-family: Arial, Helvetica, sans-serif;"></span></span><br />
<div class="actividades_2_g" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; left: 12.5%; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-indent: 2.5em; top: 10px; width: 624px;">
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="background-color: black; color: white; font-family: Arial, Helvetica, sans-serif;">1º Sacar factor común en el caso de que no haya término independiente.</span></span></div>
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="color: white; font-family: Arial, Helvetica, sans-serif;"><span class="Apple-style-span" style="background-color: black;">
</span></span></span>
<br />
<div class="actividades_2_g" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; left: 12.5%; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-indent: 2.5em; top: 10px; width: 624px;">
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="color: white; font-family: Arial, Helvetica, sans-serif;"><span class="Apple-style-span" style="background-color: black;">2º Ver si es una diferencia de cuadrados si tenemos un binomio.</span></span></span></div>
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="color: white; font-family: Arial, Helvetica, sans-serif;">
</span></span>
<div class="actividades_2_r" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; left: 12.5%; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-indent: 2.5em; top: 10px; width: 624px;">
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="color: white; font-family: Arial, Helvetica, sans-serif;"><span class="Apple-style-span" style="background-color: black;">3º Comprobar si es un trinomio cuadrado perfecto si es un trinomio.</span></span></span></div>
<span class="Apple-style-span" style="line-height: 24px; word-spacing: 1px;"><span class="Apple-style-span" style="color: white; font-family: Arial, Helvetica, sans-serif;">
<div class="actividades_2_g" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; left: 12.5%; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-indent: 2.5em; top: 10px; width: 624px;">
<span class="Apple-style-span" style="background-color: black;">4º Trinomio de segundo grado.</span></div>
<div class="actividades_2_r" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; left: 12.5%; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-indent: 2.5em; top: 10px; width: 624px;">
<span class="Apple-style-span" style="background-color: black;">5º Polinomio de grado superior a dos.</span></div>
</span></span><br />
<div style="text-indent: 33px;">
<span class="Apple-style-span" style="color: white; line-height: 27px; word-spacing: 1px;"><br /></span></div>
<span class="Apple-style-span" style="color: white; line-height: 24px; word-spacing: 2px;"></span><br />
<div style="font-size: 11px;">
<span class="Apple-style-span" style="background-color: black; color: white; line-height: 24px; word-spacing: 2px;"><br /></span></div>
<span class="Apple-style-span" style="background-color: black; color: white; line-height: 24px; word-spacing: 2px;">
</span>
<br />
<div class="actividades_r" style="border-bottom-width: 0px; border-color: initial; border-left-width: 0px; border-right-width: 0px; border-style: initial; border-top-width: 0px; font-family: Verdana, Arial, Helvetica, sans-serif; left: 5%; letter-spacing: 1px; line-height: 1.75em; margin-bottom: 20px; margin-left: 20px; margin-right: 20px; margin-top: 20px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; position: relative; text-align: left; text-indent: 2.5em; width: 707px; word-spacing: 2px;">
<span class="Apple-style-span" style="color: white;"><br /></span>
<span class="Apple-style-span" style="background-color: black; color: white;"><br /></span></div>
</div>
Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com1tag:blogger.com,1999:blog-738757110309900162.post-15839999688675522032012-09-05T04:41:00.001-07:002013-03-15T07:08:48.160-07:00Infografia de mi escuela<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhj6chlmTCgCRj_8N-ligchyphenhyphenDZp2mJSQk34GLcN66i9g5i4luwt0UQ8mUqWyfC2WQY0ik3p6NwZbT20seOSVLrX-sAUXJizqu-LKYgP724xg32L9BSQoMw0Km8D-DrFsvNgjW9BgMmKFdI/s1600/17+de+agostofdsf.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="235" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhj6chlmTCgCRj_8N-ligchyphenhyphenDZp2mJSQk34GLcN66i9g5i4luwt0UQ8mUqWyfC2WQY0ik3p6NwZbT20seOSVLrX-sAUXJizqu-LKYgP724xg32L9BSQoMw0Km8D-DrFsvNgjW9BgMmKFdI/s400/17+de+agostofdsf.png" width="400" /></a></div>
<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-32158026356408309352012-08-21T20:26:00.000-07:002013-03-15T07:08:48.171-07:00Infografia de calle 13<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgxVbM0Bjh4qzUh4F-KBYVTym0UcM5krLWMDdFDSG1lzVcFJPHlRDoXjiBgEwRT2i8RpVf3maVG0XxNOZeoRckiDF1_lWK1fmHh4CCiR6eMCI93m_RQtiQjaDyFjc6ZqLovyv1prqQv0-U/s1600/Calle+13+infografia.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgxVbM0Bjh4qzUh4F-KBYVTym0UcM5krLWMDdFDSG1lzVcFJPHlRDoXjiBgEwRT2i8RpVf3maVG0XxNOZeoRckiDF1_lWK1fmHh4CCiR6eMCI93m_RQtiQjaDyFjc6ZqLovyv1prqQv0-U/s320/Calle+13+infografia.jpg" width="92" /></a></div>
<br />Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0tag:blogger.com,1999:blog-738757110309900162.post-48873085622831620982012-08-15T04:30:00.003-07:002013-03-15T07:01:28.201-07:00Persistencia retinal<div class="MsoNormal" style="margin-left: 35.4pt; text-align: justify;">
<span style="font-family: Verdana; font-size: 11pt;">EL ojo humano presenta
un fenómeno muy interesante, el de la persistencia retinal. Este hecho se ha
aplicado para crear ilusiones de movimientos aparentes como el cinematógrafo y
la televisión. </span></div>
<div class="MsoNormal" style="margin-left: 35.4pt; text-align: justify;">
<span style="font-family: Verdana; font-size: 11pt;"> Esta se utiliza en el cinematógrafo, en una
sucesión de fotografías fijas a una velocidad de 24 cuadros cada segundo. El
sistema visual toma aquellos puntos de una imagen que son los sobresalientes y
luego busca en dónde se encuentran en las imágenes sucesivas. Esta habilidad ha
sido resultado de la necesidad de poder detectar movimientos que se ven de
manera intermitente. Algunos factores importantes en la forma en que opera el
ojo son los siguientes: iluminación, textura y contornos. Existe evidencia de que hay un rastreo
jerárquico entre estas tres características en el orden en que las mencionamos.
</span><span style="font-family: Verdana; font-size: 11.0pt;"></span></div>
<div class="MsoNormal" style="margin-left: 35.4pt; text-align: justify;">
<span style="font-family: Verdana; font-size: 11.0pt;">En resumen, al percibir movimientos el sistema visual extrae muy
rápidamente rasgos sobresalientes y aplica leyes de movimiento para procesar la
información. </span></div>
<div class="MsoNormal" style="margin-left: 35.4pt; text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-e0vlIFlVHc8/UCuDIwvgB5I/AAAAAAAAACA/lmgdR4iyaU4/s1600/images.jpeg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="400" src="http://2.bp.blogspot.com/-e0vlIFlVHc8/UCuDIwvgB5I/AAAAAAAAACA/lmgdR4iyaU4/s400/images.jpeg" width="400" /></a></div>
</div>
<div style="text-align: center;">
<a href="http://www.educacionplastica.net/ilusiones.htm#movimiento">http://www.educacionplastica.net/ilusiones.htm#movimiento</a></div>
Melu Wansidlerhttp://www.blogger.com/profile/17691355910378408979noreply@blogger.com0