tag:blogger.com,1999:blog-54651914456051591762024-02-19T23:48:41.607-08:00Instrumentación Biomédica - RutAnonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.comBlogger19125tag:blogger.com,1999:blog-5465191445605159176.post-13851704502892688942016-05-23T11:57:00.000-07:002016-05-23T11:57:48.759-07:00REPASO<h2>
Aparatado 2 </h2>
<h3>
3.- <b>Scopia</b>. Qué significa. En qué técnicas aparece. Para qué sirve.</h3>
Scopia = imagen dinámica.<br />
Esta técnica aparece en rayos X,gammacámara y ecografías.<br />
Sirve como guía para prácticas intervencionistas .<br />
<br />
<h3>
</h3>
<h2>
Apartado 3</h2>
<h3>
1.- Contraste en RX. ¿Cómo se mejora?</h3>
Para mejorar el contraste entre tejidos en rayos X:<br />
<ul>
<li>disminuir el kilovoltaje del espectro del haz </li>
</ul>
<ul>
<li>disminuir el volumen irradiado mediante una rejilla antidifusora</li>
<li>realizar un post-procesado en la imagen digital ajustando el brillo y el contraste</li>
</ul>
<br /><h3>
</h3>
<h2>
<b><span style="font-weight: normal;">Apartado 4</span></b></h2>
<h3>
6. - Equipamiento, describir la estructura básica de un equipo de radioterapia (LINAC)</h3>
En un equipo de radioterapia, las estructuras básicas del equipo son las siguientes:<br />
<img alt="" height="197" 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" width="400" /> <br />
<ul>
<li>Sección generadora: </li>
<ul>
<li>el cañón de electrones: inyecta los electrones en la sección aceleradora. </li>
<li>generador de microondas de alta potencia (magnetrón, klystron)</li>
<li>modulador: distribuye y controla la potencia eléctrica suministrada</li>
</ul>
<li> Sección aceleradora: </li>
<ul>
<li>tubo con cavidades de alto vacío</li>
<li>se aceleran los electrones gracias a las microondas</li>
<li>sistemas auxiliares: refrigeración, control automático de frecuencia, bobinas (campo magnético y centrar)</li>
</ul>
<li>Sección deflectora: bobinas para desviar el haz de electrones</li>
<ul>
<li>sección deflectora de 90º </li>
<li>sección deflectora de 270º </li>
</ul>
<li>Cabeza de tratamiento: dependiendo del haz de salida, fotones o electrones</li>
<ul>
<li>Carrusel</li>
<ul>
<li>Fotones: </li>
<ul>
<li>blanco metálico: radiación de frenado y consigue una distribución de radiación no homogénea (gaussiana)</li>
<li>filtro aplanador: produce una distribución uniforme</li>
</ul>
</ul>
<ul>
<li>Electrones:</li>
<ul>
<li>filtros difusores: extiende y uniformiza el haz de electrones</li>
</ul>
</ul>
<li>Cámaras monitoras: controlan la homogeneidad y la simetría del haz</li>
<li>Sistema de colimación: adaptar el haz emergente en forma y tamaño al volumen a irradiar</li>
<li>Sistema de luz</li>
</ul>
</ul>
<img alt="" height="197" 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" width="400" />Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-46682841093150774272016-05-23T07:14:00.001-07:002016-05-23T07:14:29.227-07:00T20No pude asistir a clase, pero gracias a los blogs de mis compañeros, he podido informarme de que trató la clase.Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-10279553583642906262016-05-23T07:08:00.001-07:002016-05-23T07:17:40.791-07:00T18: Preguntas test<h3>
<span style="font-family: "arial" , "helvetica" , sans-serif;">1- Radioactividad</span></h3>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">La captura electrónica es:</span></div>
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<b><span style="background-color: yellow; font-family: "arial" , "helvetica" , sans-serif;">(a) La conversión de un protón en un neutrón.</span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(b) La conversión de un electrón en un neutrón.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Son correctas (a) y (b).</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(d) Ninguna es correcta.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">2- Rayos X</span></h3>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">El coeficiente lineal de atenuación depende:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(a) Del efecto fotoeléctrico.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(b) Del efecto Compton.</span></div>
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<b><span style="background-color: yellow; font-family: "arial" , "helvetica" , sans-serif;">(c) Del efecto fotoeléctrico y del efecto Compton.</span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(d) De la cantidad de fotones que interacciones.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">3- TAC</span></h3>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">La reconstrucción de una imagen de TAC, en la actualidad, se hace en:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(a) Una noche.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(b) Una hora.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Depende de la zona tomografiada.</span></div>
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<b><span style="background-color: yellow; font-family: "arial" , "helvetica" , sans-serif;">(d) En tiempo real.</span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">4- RMN</span></h3>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">La resonancia magnética nuclear se obtiene por:</span></div>
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<b><span style="background-color: yellow; font-family: "arial" , "helvetica" , sans-serif;">(a) Emisión y radiofrecuencia.</span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(b) Transmisión y radiofrecuencia.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Reflexión y ultrasonidos.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(d) Emisión y ultrasonidos.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">5- MN</span></h3>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">La función de los fotomultiplicadores es:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(a) Promover el movimiento de los protones.</span></div>
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<b><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="background-color: yellow;">(b) Convertir la luz visible en pulsos eléctricos</span>.</span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Multiplicar la cantidad de luz visible.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(d) Ninguna es correcta.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">6- Ecografía</span></h3>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Cuál de las siguientes afirmaciones es falsa respecto la capa de adaptación en el transductor:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(a) Minimiza las diferencias de impedancia acústica.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(b) Evita el aire.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Maximiza el acoplamiento de la señal.</span></div>
<div>
<b><span style="background-color: yellow; font-family: "arial" , "helvetica" , sans-serif;">(d) Tiene la función de filtro para una mejor imagen.</span></b></div>
<div>
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<h3>
<span style="font-family: "arial" , "helvetica" , sans-serif;">7- Radioterapia</span></h3>
<div>
<span style="font-family: "arial" , "helvetica" , sans-serif;">La braquiterapia:</span></div>
<div>
<span style="font-family: "arial" , "helvetica" , sans-serif;">(a) Se emite radiación al paciente por medio de una fuente de rayos gamma.</span></div>
<div>
<b><span style="background-color: yellow; font-family: "arial" , "helvetica" , sans-serif;">(b) Las fuentes son posiconadas próximas al tumor a tratar.</span></b></div>
<div>
<span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Se usa como técnica de imagen.</span></div>
<div>
<span style="font-family: "arial" , "helvetica" , sans-serif;">(d) Todas son falsas.</span></div>
<h3>
<span style="font-family: "arial" , "helvetica" , sans-serif;"> </span></h3>
<h3>
<span style="font-family: "arial" , "helvetica" , sans-serif;"> </span></h3>
<div>
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div>
<br /></div>
Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-49685478881884957292016-05-02T00:42:00.000-07:002016-05-02T00:42:00.996-07:00T.19: SPECT & PET (C18, 25 Abr)<span style="font-family: inherit;">La actividad de este día está en el siguiente blog:</span><br />
<a href="https://biomedicinespace.wordpress.com/2016/05/01/656/" target="_blank">blog de Sofía</a>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-71816857002920188762016-04-24T10:25:00.000-07:002016-04-24T10:25:16.615-07:00T.15: Empezando Medicina Nuclear (C16, 18Abr)<span style="font-family: inherit;">Esta tarea está en el blog de Sofía:</span><div>
<a href="https://biomedicinespace.wordpress.com/2016/04/24/180416-t15-sobre-los-radiofarmacos/">blog de Sofía</a></div>
Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-88183125697349498932016-04-24T09:51:00.000-07:002016-04-24T09:53:44.202-07:00T.16 La gammacámara (C17, 21 Abr)<span style="font-family: inherit;">Este día empezamos la teoría de la radiación gamma emitida por el cuerpo tras la administración del radiofármaco.</span><br />
<span style="font-family: inherit;">La T.16 la realizamos en clase Amaya, Idoia, Ainhoa y yo, y está publicado en el blog de Amaya:</span><br />
<a href="http://abainsbioll.blogspot.com.es/2016/04/t6-21042016.html">Blog de Amaya</a>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-62215103681047668672016-04-24T09:46:00.000-07:002016-04-24T09:54:13.365-07:00T.14: RMN: Artefactos, fRMN. dRMN, gadolinio... (C15, 15 Abr)Este dia nos dividimos en dos grupos para finalizar algunos detalles importantes sobre la RMN. La T14 la hicimos en clase Sofía, Jefferson, Esteban, Ainhoa y yo. Está publicada en el blog de Ainhoa:<br />
<a href="http://ibili2016ainhoa.blogspot.com.es/2016/04/t14-ejercicio-bibliografico-de-detalles.html">Blog Ainhoa</a>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-88424926336687369132016-04-24T09:40:00.002-07:002016-04-24T09:40:16.438-07:00T13: RMN- Relajación. Secuencias de pulsos. Gradientes. Generación de imagen (C14, 11 Abr)<span style="font-family: inherit;">Este día estaba programado terminar la teoría de RMN, realizar ejercicios con el ultimo simulador de la clase anterior y la T13 pero no dio tiempo de realizar esta tarea.</span>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-55090339027724018962016-04-24T09:30:00.002-07:002016-04-24T09:30:31.054-07:00T.11 y T.12: Excitación y relajación (long. y transv.) en RMN<h3>
<span style="font-size: medium;"><span style="font-family: Arial, Helvetica, sans-serif; font-size: small;">T11 .- Buscar (a ojo) las frecuencias de resonancia (Freq.) para
distintos valores del campo externo (B0). ¿Influye la intensidad del
campo B1? ¿Que relación hay entre Freq. y B0 (lineal, inversa,
cuadrática, ...)? ¿Cuadra eso con lo que habíamos visto en "teoría"? Si ahora se quita el campo B1 y se sustituye por la bobina (coil) ¿qué ocurre en ella?</span></span></h3>
Hemos buscado probando diferentes frecuencias para distintos valores del campo externo y tenemos los siguientes datos:<br />
<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgFEMbKRpiOeYZ7qK3pg51UJWCTp2cCz8BIciEJ-Qv_-N1dhJ_Xa2bl6Nqq9aUED8K8p9zhJON3AoW7uCEtfTCvdZELTo3pgcuiEaaTUHUFzwrI3xVBzJhAKNLh0ilhqqfKaUEkvbjA9Hqx/s1600/Captura+de+pantalla+2016-04-24+a+las+17.45.01.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="141" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgFEMbKRpiOeYZ7qK3pg51UJWCTp2cCz8BIciEJ-Qv_-N1dhJ_Xa2bl6Nqq9aUED8K8p9zhJON3AoW7uCEtfTCvdZELTo3pgcuiEaaTUHUFzwrI3xVBzJhAKNLh0ilhqqfKaUEkvbjA9Hqx/s200/Captura+de+pantalla+2016-04-24+a+las+17.45.01.png" width="200" /></a></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhL7L2besnEFvz6KqZImQwiz00WSWDcCxaHxIy1OVMrcD4iV1XqfziIPR7t20iM7mP2qG2u8xkdAbxBdSOVKG6_cMD3QOPC0AThGXGD1xcghxUILkA_bdWgSh_3txtemhq_3kE9-JUE6zSG/s1600/Captura+de+pantalla+2016-04-24+a+las+18.24.25.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="324" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhL7L2besnEFvz6KqZImQwiz00WSWDcCxaHxIy1OVMrcD4iV1XqfziIPR7t20iM7mP2qG2u8xkdAbxBdSOVKG6_cMD3QOPC0AThGXGD1xcghxUILkA_bdWgSh_3txtemhq_3kE9-JUE6zSG/s640/Captura+de+pantalla+2016-04-24+a+las+18.24.25.png" width="640" /></a></div>
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<div style="text-align: justify;">
<br /></div>
<div class="separator" style="clear: both; text-align: justify;">
<a href="data:image/png;base64,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" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"> No influye la intensidad del campo B1, porque en todos los casos hemos tenido la intensidad a 1 mT.</a></div>
<div style="text-align: justify;">
La relación entre la frecuencia y B0 que hemos obtenido, la hemos representado en el siguiente gráfico:</div>
<br />
<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjn7x-tnHHl38R-Y1epWmcahAqYOvyAIfOZB_BqDA0CopLnI4PoJEslCacN0Y_T8HCPDUa1IZPk6dDIjA4xCIR9nbcmrp3Fwl_eG5DSM9aqdw2t6OEw8vPeHWY1NYF2XtySOqGXz4t7nsuB/s1600/Captura+de+pantalla+2016-04-24+a+las+17.52.27.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="285" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjn7x-tnHHl38R-Y1epWmcahAqYOvyAIfOZB_BqDA0CopLnI4PoJEslCacN0Y_T8HCPDUa1IZPk6dDIjA4xCIR9nbcmrp3Fwl_eG5DSM9aqdw2t6OEw8vPeHWY1NYF2XtySOqGXz4t7nsuB/s400/Captura+de+pantalla+2016-04-24+a+las+17.52.27.png" width="400" /></a></div>
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</div>
<br />
<br />
<div style="text-align: justify;">
Se puede decir que tiene una relación lineal. No se ve realmente debido a la precisión del simulador, la frecuencia la puedes aumentar o disminuir de 0.05 en 0.05 Hz, y la intensidad de B0 de 0.1 en 0.1 mT.</div>
<div style="text-align: justify;">
Por la teoría, ya sabíamos que la relación debía ser lineal debido a su fórmula (la ecuación de Larmor):</div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhyUV1UlZsEPSvlVOJ2uZmcWqmxseA1JT4YpOQ0i-HaJFKltriRgEkWJuqrpN5GJlpVJkD3SjLhvcqSh4yN5xqFySil6Lra2xww7Yemey8HcIobKbf0VnsAA7ihE3frJug_VGhPbKt6FLLN/s1600/Captura+de+pantalla+2016-04-24+a+las+18.01.33.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="58" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhyUV1UlZsEPSvlVOJ2uZmcWqmxseA1JT4YpOQ0i-HaJFKltriRgEkWJuqrpN5GJlpVJkD3SjLhvcqSh4yN5xqFySil6Lra2xww7Yemey8HcIobKbf0VnsAA7ihE3frJug_VGhPbKt6FLLN/s200/Captura+de+pantalla+2016-04-24+a+las+18.01.33.png" width="200" /></a></div>
<br />
<div style="text-align: justify;">
Si ahora le quitamos el campo B1 y lo sustituimos por una bobina podemos observar el fenómeno de la desexcitación en la señal sinusoide amortiguada de color azul que aparece en la imagen:</div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEghdZTVcw0_bdeFtpWYcb0F5OPQxsVfJKi4JFiCc6G6g31tARL1ZlT-sMxCySFBWN_t6VafB6BWXKoxUnaHBKDLqGnulS85_vJIrbTPQf-S3JsFxk5-o0KD7bmozs338cRug3MaAM67bC9s/s1600/Captura+de+pantalla+2016-04-24+a+las+18.15.35.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="337" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEghdZTVcw0_bdeFtpWYcb0F5OPQxsVfJKi4JFiCc6G6g31tARL1ZlT-sMxCySFBWN_t6VafB6BWXKoxUnaHBKDLqGnulS85_vJIrbTPQf-S3JsFxk5-o0KD7bmozs338cRug3MaAM67bC9s/s640/Captura+de+pantalla+2016-04-24+a+las+18.15.35.png" width="640" /></a></div>
<br />
<br />
<h3>
<span style="background-color: white; color: #222222; font-family: Arial, Tahoma, Helvetica, FreeSans, sans-serif; font-size: 13px; line-height: 18px;">T12.- ¿Qué magnitudes de la señal de radiofrecuencia aplicada determinarán el ángulo de desplazamiento de la magnetización?</span></h3>
<div>
<div style="line-height: 108%; margin-bottom: 0.28cm;">
<span style="font-family: inherit;">Antes de
responder a esta pregunta hay que dejar claro que para poder tener un
control sobre el ángulo de desplazamiento de la magnetización, el
campo magnético variable que apliquemos, deberá estar en resonancia
con la magnetización; si esto no es así, no existirá
realimentación positiva en el sistema y obtendremos ángulos de
desplazamiento variables para cada instante.</span></div>
<div style="line-height: 108%; margin-bottom: 0.28cm;">
<span style="font-family: inherit;"><a href="" name="_GoBack"></a>
Si por el contrario, el campo magnético variable que apliquemos,
está en resonancia con la magnetización, el ángulo de
desplazamiento de la magnetización estará directamente relacionado
con la amplitud del campo magnético variable aplicado (B1); a mayor
B1, mayor ángulo de desplazamiento.</span></div>
</div>
Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-28292985384505494432016-04-05T02:26:00.001-07:002016-04-05T02:26:21.187-07:00T9: Riesgos de la TC, estrategias de reducción de dosis<h3>
<span style="font-weight: normal;">La tarea de este día, la realizamos en clase Esteban, Jefferson, Sofía y yo. Está publicada en el blog de Sofía:</span></h3>
<div>
<span style="font-weight: normal;"><a href="https://biomedicinespace.wordpress.com/2016/03/21/post-en-construccion/">https://biomedicinespace.wordpress.com/2016/03/21/post-en-construccion/</a></span></div>
Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-699144651533919152016-04-05T02:07:00.001-07:002016-04-05T02:11:23.629-07:00T7: ¿Qué tiene que ver M.Curie con Piedrabuena?<span style="font-family: inherit;">Marie Curie nació en 1867 y fue física, química y matemática. Es conocida por sus estudios sobre la radiactividad y por el descubrimiento del polonio y el radio. A parte de esto, fue la primera mujer en obtener un premio Nobel y en obtener una cátedra en la Universidad de París. Pero esto no es lo que la relacionó con Piedrabuena. Durante la Primera Guerra Mundial, M. Curie puso en marcha los "Petite Curie" que se trataba de un equipo de rayos X portátil (estaba en un coche Renault parecido a lo que es actualmente un furgón) dónde el el generador para poder alimentar el tubo de rayos X fue inventado por Mónico Sánchez Moreno. Este hombre nació en Piedrabuena. </span><br />
<span style="font-family: inherit;"><br /></span>
Referencias:<br />
http://blog.uclm.es/albertonajera/files/2012/11/1852-2033-1-PB.pdf<br />
http://elefectotesla.com/tag/marie-curie/<br />
<span style="font-family: inherit;"><br /></span>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com1tag:blogger.com,1999:blog-5465191445605159176.post-39977627578667111522016-03-14T12:55:00.000-07:002016-04-05T02:26:41.177-07:00T8: Simulando espectros <div style="display: block; font-family: "helvetica" , "arial" , sans-serif; font-size: 14px; font-stretch: normal; font-style: normal; font-variant: normal; font-weight: normal; line-height: normal; margin: 12px auto 6px auto;">
<a href="https://es.scribd.com/doc/304686319/2003-2-4-fia-mama" style="text-decoration: underline;" title="View 2003_2_4_fia-mama on Scribd">2003_2_4_fia-mama</a></div>
<div style="display: block; font-size: 14px; font-style: normal; font-variant: normal; font-weight: normal; line-height: normal; margin: 12px auto 6px;">
<span style="font-family: inherit;">La tarea T8, la hicimos en clase entre Sofía, Miguel y yo. </span></div>
<div style="display: block; font-size: 14px; font-style: normal; font-variant: normal; font-weight: normal; line-height: normal; margin: 12px auto 6px;">
<span style="font-family: inherit;">Este documento adjunto lo utilizamos como referencia para realizar los problemas propuestos. </span></div>
<div style="display: block; font-family: "helvetica" , "arial" , sans-serif; font-size: 14px; font-stretch: normal; font-style: normal; font-variant: normal; font-weight: normal; line-height: normal; margin: 12px auto 6px auto;">
<a href="https://biomedicinespace.wordpress.com/2016/03/14/346/">https://biomedicinespace.wordpress.com/2016/03/14/346/</a></div>
<iframe class="scribd_iframe_embed" data-aspect-ratio="undefined" data-auto-height="false" frameborder="0" height="600" id="doc_79756" scrolling="no" src="https://www.scribd.com/embeds/304686319/content?start_page=1&view_mode=scroll&show_recommendations=true" width="100%"></iframe>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com3tag:blogger.com,1999:blog-5465191445605159176.post-29205489609909246132016-03-10T01:56:00.000-08:002016-03-10T01:56:14.383-08:00T6: terminando la radiactividad<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiSDuicada2J0LpFNekhGAy7TrwjhZrpm9Y9-AwiPoTHAwsaHZLFw8SHdPBp90O-YCgSR5-gNIDxDVpzN9_zkqqQHLyqybHZ7kySDQezs2M_FNsjWuEpGhpn00Izx0KYlXKSWz3tpbEmH23/s1600/Captura+de+pantalla+2016-03-10+a+las+10.53.52.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="640" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiSDuicada2J0LpFNekhGAy7TrwjhZrpm9Y9-AwiPoTHAwsaHZLFw8SHdPBp90O-YCgSR5-gNIDxDVpzN9_zkqqQHLyqybHZ7kySDQezs2M_FNsjWuEpGhpn00Izx0KYlXKSWz3tpbEmH23/s640/Captura+de+pantalla+2016-03-10+a+las+10.53.52.png" width="470" /></a></div>
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<br />Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com1tag:blogger.com,1999:blog-5465191445605159176.post-78366009834803093102016-03-07T11:58:00.000-08:002016-04-05T01:47:15.011-07:0007-03-2016: T6<h2>
<span style="font-family: inherit; font-size: x-large;">
T6:<span style="color: black;"> Empezando Rayos X, el tubo y el espectro</span></span></h2>
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<span style="font-family: inherit; font-size: large;">1.- Qué características constructivas del tubo de rayos X se correlacionan
con qué características del espectro de emisión de los rayos X.</span></h3>
<span style="font-family: "georgia" , "times new roman" , serif;"><span style="font-family: inherit;">El tubo de rayos X es el lugar donde se generan los rayos X. Este tubo consta de un filamento metálico (cátodo), que al calentarlo liberará electrones siendo estos acelerados mediante una elevada diferencia de potencial (kV), y chocan contra el ánodo, en donde son frenados liberando su energía </span>cinética como fotones que constituyen los rayos X. De la energía empleada en la producción de rayos X el 99% se convertirá en calor y sólo el 1%
en rayos X.</span><br />
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<span style="font-family: "georgia" , "times new roman" , serif;">El filamento o cátodo suele ser una pequeña bobina o muelle de wolframio. Se utiliza este material por
sus propiedades de emisión termoiónica (Efecto Eddison), y punto de
fusión elevado. Estas propiedades alargan la vida útil del tubo. </span><br />
<span style="font-family: "georgia" , "times new roman" , serif;">El ánodo suele ser Wolframio. En el caso de los tubos de mamografía el material empleado es el Molibdeno, y
recientemente se han comenzado a confeccionar también de Rodio-Paladio. El Wolframio presenta
un punto de fusión elevado.</span><br />
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<span style="font-family: "georgia" , "times new roman" , serif;">El tubo de rayos X de filamento caliente debe de alcanzar una temperatura adecuada para
su funcionamiento, pero en ellos se produce tanto calor que se utiliza el ánodo rotatorio para disipar el calor.</span><br />
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<span style="font-family: "georgia" , "times new roman" , serif;">Los electrones, al llegar al ánodo y pasar por las
proximidades de los núcleos atómicos, son frenados violentamente transformando parte de su
energía cinética en energía electromagnética. Se emiten fotones de rayos X distribuidos en un
espectro continuo, formado por una mezcla de fotones cuyas energías aumentan de forma continua.
La energía máxima de este espectro corresponde al fotón producido cuando el electrón, con una
energía determinada, es frenado por un solo núcleo y produce un único fotón -radiación de frenado-.
Los rayos X de frenado se producen, pues, al hacer impactar electrones contra un ánodo de material
con número atómico suficientemente elevado. </span></div>
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<span style="font-family: "georgia" , "times new roman" , serif;">También puede ocurrir, que tras el choque de electrones contra los átomos del metal
anódico, el salto de electrones desde órbitas más profundas a otras órbitas más externas de dichos
átomos, produce un hueco dejado por estos electrones que han pasado a órbitas más superficiales que es preciso
que se ocupe. Para ello, electrones de otras capas pasan a rellenar este vacío, emitiendo una
energía igual a la diferencia energética entre las órbitas correspondientes. Esta emisión de energía
forma la radiación X característica, con una serie de
picos superpuestos al espectro continuo. El espectro característico de los rayos X es la
suma de los espectros producidos por la radiación de frenado y la radiación característica.</span><br />
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<span style="font-family: inherit; font-size: large;">
2.- Qué características de la operación del tubo de rayos X se
correlacionan con qué características del espectro de la radiación
producida (o lo que es lo mismo, que controles tiene y que es lo que
controlan).</span></h3>
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<span style="font-family: inherit;"><span style="font-family: "georgia" , "times new roman" , serif;">Los tubos de rayos X funcionan con corriente continua de alto voltaje (mayor de 40kV). </span></span><br />
<span style="font-family: inherit;"><span style="font-family: "georgia" , "times new roman" , serif;">Al variar la intensidad de corriente (mA) varía la cantidad de electrones emitidos por el filamento que van a ser acelerados a lo largo del tubo de rayos X. Sin embargo, no se modifica su energía. Debido a este aumento de electrones, el número de fotones producidos, aumentará proporcionalmente con la intensidad de la corriente. El tiempo afecta en la misma medida que la intensidad de corriente.</span></span><br />
<span style="font-family: inherit;"><span style="font-family: "georgia" , "times new roman" , serif;">Al aumentar la tensión aplicada entre ánodo y cátodo, los electrones que llegan al ánodo lo hacen con mayor energía cinética y, por tanto, los fotones de frenado son más energéticos. La radiación característica tiene siempre, para un determinado material del ánodo, la misma energía. Pero al aumentar la tensión de aceleración varía la cantidad de fotones característicos producidos y su proporción con respecto a los de frenado.</span></span><br />
<span style="font-family: inherit;"><span style="font-family: "georgia" , "times new roman" , serif;">Los fotones que constituyen el haz de rayos X emitidos por el tubo presentan una distribución continua en energías (espectro continuo), entre 0 y E, donde E es la energía que corresponde a la diferencia de potencial aplicada entre el ánodo y el cátodo. Por ejemplo, la energía máxima al aplicar una diferencia de potencial de 100 kVp, será de 100 KeV y el espectro de rayos X tendrá energías comprendidas entre 0 y 100 keV.</span></span><br />
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<span style="font-family: inherit;"> </span><span style="font-family: inherit;">3.- Por qué han de estar los tubos a vacío</span></h3>
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<span style="background-color: white; font-family: "georgia" , "times new roman" , serif;">Los tubos de rayos X han de estar vacíos debido a que si no lo estuviera <span style="line-height: 18px; text-align: start;">ocurrirían irregularidades en el flujo de electrones desde el cátodo hacia el ánodo. P</span><span style="line-height: 18px; text-align: start;">ara que el tubo de rayos X funcione bien es fundamental que el flujo de electrones se mantenga lo mas constante posible durante cada exposición. </span><span style="line-height: 18px; text-align: start;">Si el tubo de rayos X se torna gaseoso, lo que significa una pérdida del vacío completo, se produce fluctuaciones perceptibles del mili amperaje cuando está en funcionamiento.</span></span></div>
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<span style="font-family: inherit;">
4.- Por qué es importante el espectro de emisión para la radiología ¿no son iguales todos los rayos x?</span></h3>
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<span style="font-family: inherit;">Se sabe que el espectro de emisión de cada elemento es único. Con lo que dependiendo del material utilizado por el tubo de rayos X, se deberá aumentar o disminuir la energía de este dependiendo del tejido en el que estamos interesados. La intención de aumentar o disminuir la radiación es para intentar que el tejido absorba la menor radiación posible y que la imagen tenga obtenida tenga calidad, para conseguir esto lo que se hace es intentar que el espectro de emisión sea lo más parecido posible al espectro de absorción del tejido a radiografiar.</span></div>
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Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-80789652855848777542016-03-03T09:23:00.001-08:002016-03-03T09:23:13.935-08:0003-03-2016<p style=" margin: 12px auto 6px auto; font-family: Helvetica,Arial,Sans-serif; font-style: normal; font-variant: normal; font-weight: normal; font-size: 14px; line-height: normal; font-size-adjust: none; font-stretch: normal; -x-system-font: none; display: block;"> <a title="View Trabajo en clase día 29 de febrero 2016 (3) on Scribd" href="https://es.scribd.com/doc/301982249/Trabajo-en-clase-di-a-29-de-febrero-2016-3" style="text-decoration: underline;" >Trabajo en clase día 29 de febrero 2016 (3)</a> by <a title="View rutmorapedrogmailcom's profile on Scribd" href="https://www.scribd.com/user/242837130/rutmorapedrogmailcom" style="text-decoration: underline;" >rutmorapedrogmailcom</a></p><iframe class="scribd_iframe_embed" src="https://www.scribd.com/embeds/301982249/content?start_page=1&view_mode=scroll&access_key=key-tGSPOBFmOow7bc0DThCa&show_recommendations=true" data-auto-height="false" data-aspect-ratio="0.7080062794348508" scrolling="no" id="doc_7514" width="100%" height="600" frameborder="0"></iframe>Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com1tag:blogger.com,1999:blog-5465191445605159176.post-69073646019636921502016-03-02T04:47:00.001-08:002016-03-02T04:47:42.500-08:00<h2>
<span style="font-family: inherit; font-size: x-large;">
25-02-2016</span></h2>
<h3>
<span style="font-family: inherit; font-size: x-large;">
T3: Radiaciones ionizante y su interacción con la materia</span></h3>
<h4>
PROBLEMA 1: Calcular cuántos átomos hay en 1cm de arista de un cubo del material que elijas.</h4>
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<h4>
PROBLEMA 2: ¿Qué fotón tiene más energía, uno rojo o uno azul?¿Cuántas veces más?</h4>
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Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com1tag:blogger.com,1999:blog-5465191445605159176.post-53621528016149364982016-03-01T14:09:00.000-08:002016-03-02T04:47:51.892-08:00<h2>
<span style="font-family: inherit; font-size: x-large;">
22-02-2016</span></h2>
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<span style="font-family: inherit; font-size: x-large;">
T2:Sobre el origen de la radiactividad</span></h3>
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<h4>
<b>PROBLEMA 1: <span style="font-size: 14pt; line-height: 108%;">¿En
qué unidades se mide (típicamente) la energía de la gráfica
anterior? ¿Cuál es el factor de conversión de estas unidades con
las más habituales?</span></b></h4>
<div style="line-height: 108%; margin-bottom: 0.28cm;">
<span style="font-size: small;">La
energía de enlace por partícula nuclear suele medirse en unidades
de electrón-voltio. </span>
</div>
<div style="line-height: 108%; margin-bottom: 0.28cm;">
<span style="font-size: small;">La
unidad de energía más habitual es el Julio, que es igual a Cu*V.
Por tanto, el factor de conversión del electrón-voltio al Julio será
convertir la carga del electrón (es una unidad muy pequeña) a
Culombios. </span>
</div>
<br />
<div style="line-height: 108%; margin-bottom: 0.28cm;">
<span style="font-size: 12pt;">Entonces,
1 electrón-voltio = 1.60218x10</span><sup><span style="font-size: 12pt;">-19</span></sup><span style="font-size: 12pt;">
J. </span>
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<div style="line-height: 108%; margin-bottom: 0.28cm;">
<span style="font-size: 12pt;"><br /></span></div>
<h4>
<b><span style="font-size: 12pt;">PROBLEMA 2: </span><span style="font-size: 12pt; line-height: 108%;">¿De
qué orden son los valores de energía que intervienen en las
reacciones nucleares? </span></b><span style="font-size: 12pt; line-height: 108%;"><b>¿Y en las reacciones químicas? (Buscar
ejemplo)</b></span></h4>
<div>
<span style="line-height: 17.280000686645508px;">La energía de un enlace nuclear es del orden de megaelectrón-voltio, es decir, 1x10^6 veces mayor que la de un enlace de electrones. Un ejemplo de reacción nuclear es, por ejemplo, la fusión del deuterio <span style="font-family: "times" , "times new roman" , serif;">c</span><span style="font-family: inherit;">on el </span></span><span style="font-family: inherit;"><span style="text-align: justify;"> </span><span style="color: black;"><a href="https://es.wikipedia.org/wiki/Tritio" style="display: inline; outline: none; text-align: justify; text-decoration: none;" title="Tritio"><span style="color: black;">tritio</span></a><span style="text-align: justify;">, por la cual se producen </span><a class="mw-redirect" href="https://es.wikipedia.org/wiki/Helio_4" style="display: inline; outline: none; text-align: justify; text-decoration: none;" title="Helio 4"><span style="color: black;">helio 4</span></a><span style="text-align: justify;">, se liberan un </span><a href="https://es.wikipedia.org/wiki/Neutr%C3%B3n" style="display: inline; outline: none; text-align: justify; text-decoration: none;" title="Neutrón"><span style="color: black;">neutrón</span></a><span style="text-align: justify;"> y se generan 17,59 </span><span style="color: black; display: inline; outline: none; text-align: justify; text-decoration: none;"><a href="https://es.wikipedia.org/wiki/Electronvoltio" style="display: inline; outline: none; text-align: justify; text-decoration: none;" title="Electronvoltio"><span style="color: black;">MeV</span></a> </span><span style="text-align: justify;">de energía.</span></span></span><br />
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<span style="color: black; font-family: inherit;"><span style="text-align: justify;">En una reacción química se rompen los enlaces moleculares. La energía que se obtiene es del orden de electrón-voltio. Un ejemplo de esta reacción puede ser la de los hidrocarburos con el oxígeno (1) o la de formación de dos moléculas de agua (2):</span></span><br />
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<h4>
<span style="font-family: "times" , "times new roman" , serif;"><span style="color: black;"><span style="font-size: 15px; text-align: justify;"><b>PROBLEMA 3: ¿Podéis hacer un esquema (una tabla o similar) con todos los tipos de reacciones nucleares existentes?</b></span></span></span></h4>
<span style="color: black; font-family: inherit;"><span style="font-size: 15px; text-align: justify;">Los tipos de reacciones nucleares son las siguientes:</span></span><br />
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<ul>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Fusión nuclear: proceso por el cual varios núcleos atómicos de carga similar se unen y forman un núcleo más pesado.</span></span></li>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Fisión nuclear: proceso por el cual un núcleo pesado se divide en dos o más núcleos pequeños.</span></span></li>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Desintegración alfa: el elemento radiactivo de número atómico Z, emite un núcleo de Helio (dos protones y dos neutrones), el número atómico disminuye en dos unidades y el número mágico en 4 unidades, produciéndose un nuevo elemento situado en el lugar Z-2 de la Tabla Periódica.</span></span></li>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Desintegración gamma: ocurre cuando el núcleo se encuentra en un nivel de energía excitado, puede pasar a un nivel de menor energía emitiendo fotones de una cierta frecuencia.</span></span></li>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Desintegración beta comprende tres procesos nucleares:</span></span></li>
<ul>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Desintegración beta- : en esta reacción nuclear se emiten electrones.</span></span></li>
<li><span style="font-family: inherit;"><span style="font-size: 15px;">Desintegración beta+ : en esta </span><span style="font-size: 15px;">reacción nuclear se emiten positrones.</span></span></li>
<li><span style="font-size: 15px;"><span style="font-family: inherit;">Captura electrónica: se produce la captura de un electrón por parte de núcleos alejados de la línea de estabilidad.</span></span></li>
</ul>
</ul>
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<span style="font-family: "times" , "times new roman" , serif;"><span style="font-size: 15px;"><br /></span></span></div>
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Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com0tag:blogger.com,1999:blog-5465191445605159176.post-86425812953782749202016-02-24T07:03:00.000-08:002016-03-02T04:11:27.110-08:00<span style="font-size: x-large;">19-02-2016</span><br />
<h3>
<span style="font-family: inherit; font-size: x-large;">T1: Introducción a la radioactividad.</span></h3>
Se propusieron problemas en clase y después explicar y realizar uno del listado.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEijyLW8S32gd9MLIlhMq0-99ZTHEdwOwvZryr63e7SL1HyyC4QGOMivBrZsgIipNoyf2II5F2ZljQTgc_iXYEUNGhby09QdvGNS-2qkDo_IXqgyy1iIxbo5l6YIwQC0gHk1mh-GG52qX07P/s1600/Captura+de+pantalla+2016-02-24+a+las+16.00.58.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="640" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEijyLW8S32gd9MLIlhMq0-99ZTHEdwOwvZryr63e7SL1HyyC4QGOMivBrZsgIipNoyf2II5F2ZljQTgc_iXYEUNGhby09QdvGNS-2qkDo_IXqgyy1iIxbo5l6YIwQC0gHk1mh-GG52qX07P/s640/Captura+de+pantalla+2016-02-24+a+las+16.00.58.png" width="595" /></a></div>
Anonymoushttp://www.blogger.com/profile/08049495276622942312noreply@blogger.com2tag:blogger.com,1999:blog-5465191445605159176.post-69639727256324724732016-02-23T07:44:00.000-08:002016-02-23T07:44:01.468-08:00<h2>
15-02-2016 </h2>
<h3>
C1</h3>
El primer día se presentó la asignatura.<br />
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