tag:blogger.com,1999:blog-9602543264379583332024-03-05T16:03:37.811-05:00ing-civil-unpAnonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.comBlogger25125tag:blogger.com,1999:blog-960254326437958333.post-30646504601453356652013-06-03T18:47:00.001-05:002013-06-03T18:47:07.730-05:00Milton Chanes: AutoCAD Práctico, válido para AutoCAD 2012 / 2013 ...<a href="http://miltonchanes.blogspot.com/2013/04/autocad-practico-valido-para-autocad.html?spref=bl">Milton Chanes: AutoCAD Práctico, válido para AutoCAD 2012 / 2013 ...</a>: Este libro le apasionará. Casi jugando, absorberá e interiorizará una ingente cantidad de habilidades con el programa líder del...Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-38499072436960048592011-12-20T22:46:00.000-05:002011-12-20T22:46:14.994-05:00Bombeo automatico para tanque elevado, en Provisión de agua - Instalaciones (dwg : Dibujo de Autocad, 208.06 KB)<a href="http://www.bibliocad.com/biblioteca/bombeo-automatico-para-tanque-elevado_35854#.TvFWebd8hVE.blogger">Bombeo automatico para tanque elevado, en Provisión de agua - Instalaciones (dwg : Dibujo de Autocad, 208.06 KB)</a>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-67537641831624192652011-09-14T23:22:00.002-05:002011-09-14T23:22:53.002-05:00Reglamento Nacional de Edificaciones 2006<h3 class="post-title entry-title"> <a href="http://civilgeek.blogspot.com/2009/10/reglamento-nacional-de-edificaciones.html"><br />
</a></h3><h3 class="post-title entry-title"><img alt="" height="320" 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" width="244" /> </h3>Título de Libro : Reglamento Nacional de Edificaciones - Perú<br />
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<a href="http://www.4shared.com/document/mQajf4A_/Reglamento_Nacional_de_Edifica.html">http://www.4shared.com/document/mQajf4A_/Reglamento_Nacional_de_Edifica.html</a>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-35498739617303813072011-08-24T23:55:00.000-05:002011-08-24T23:55:12.005-05:00Dinámica Estructural<br />
<h3 class="post-title entry-title"> <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/08/dinamica-estructural.html"><br />
</a> </h3><div class="post-header"> <div class="post-header-line-1"><span class="post-author vcard"> Publicado por <span class="fn">Fernando Arancibia Carvallo</span> </span> <span class="post-labels"> Etiquetas: <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/search/label/Dinamica%20Estructural" rel="tag">Dinamica Estructural</a></span></div><div class="post-header-line-1"><span class="post-labels"> </span> </div></div><strong>1.1 Aspectos Generales</strong><br />
La Sismología es la ciencia que estudia las causas que producen los terremotos, el mecanismo por el cual se producen y propagan las ondas sísmicas, y la predicción del fenómeno sísmico. Desde el punto de vista de la Ingeniería, lo más importante es la definición y cálculo de las acciones que el movimiento sísmico aporta a la estructura.<br />
<strong>1.1.1 Causas y efectos de los sismos</strong><br />
Los sismos, terremotos o temblores de tierra, son vibraciones de la corteza terrestre, generadas por distintos fenómenos, como la actividad volcánica, la caída de techos de cavernas subterráneas y hasta por explosiones. Sin embargo, los sismos más severos y los más importantes desde el punto de vista de la ingeniería son los de origen tectónico que se deben a desplazamientos bruscos de las grandes placas en que está subdividida la corteza terrestre.<br />
Las presiones que se generan en la corteza por los flujos de magma desde el interior de la tierra llegan a vencer la fricción que mantiene en contacto los bordes de las placas y producen caídas de esfuerzos y liberación de enormes cantidades de energía almacenada en la roca (Ver figura 1.1). La energía se libera principalmente en forma de ondas vibratorias que se propagan a grandes distancias a través de la roca de la corteza. <br />
<em>Figura 1.1 Creación y reciclaje de la corteza </em> <br />
<em>terrestre</em> <br />
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgXzqPdD1SI6ukcidCQ6iNPFfdWPy2gTLaGFq0Sm_GJSNj9r11TjV0EfhovSUrslkNYqYSAuyym9QKFXTg3Y8jZ7qUiDplP7I_peSYqNvoIOfsMAvWEvAx7h_8Kb1ixi-X9WK0JtW6dai39/s1600-h/Corteza.bmp"><img alt="" border="0" height="249" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgXzqPdD1SI6ukcidCQ6iNPFfdWPy2gTLaGFq0Sm_GJSNj9r11TjV0EfhovSUrslkNYqYSAuyym9QKFXTg3Y8jZ7qUiDplP7I_peSYqNvoIOfsMAvWEvAx7h_8Kb1ixi-X9WK0JtW6dai39/s320/Corteza.bmp" width="450" /></a><br />
Esta vibración de la corteza terrestre es la que pone en peligro a las edificaciones que sobre ella se desplantan, al ser éstas solicitadas por el movimiento de su base. Debido a esta actividad, las vibraciones de las masas de los edificios, generan fuerzas de inercia que inducen esfuerzos importantes en los elementos de la estructura y que pueden conducirla a la falla. <br />
Además de la vibración, hay otros efectos sísmicos que pueden afectar a las estructuras, principalmente los relacionados con fallas del terreno, como son los fenómenos de licuación, de deslizamiento de laderas y de aberturas de grietas en el suelo. En el presente curso no se tratarán estos fenómenos que corresponden a condiciones muy particulares de subsuelo que requieren estudios especializados.<br />
En la figura 1.2 se muestra de manera muy esquemática las principales características de este fenómeno tectónico. El sismo se genera por el corrimiento de cierta área de contacto entre placas. Se identifica un punto, generalmente subterráneo, que se denomina foco o hipocentro, donde se considera se inició el movimiento: a su proyección sobre la superficie de la tierra se le llama epicentro. <br />
<em>Figura 1.2<br />
Características de un terremoto</em> <br />
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhce0G1sItqLMQPAJ2ab6NPtpiwQQ4OnK_wSYCExAgMaEgzsM3w9cHyemwLi9_42TaUkocWWqN-iyMXi5zmvAq8iaOs0Hj71j98BuIWKR9wNw11ep1oD7wGfxm5Ay21UgGntfAcqAOz7OFD/s1600-h/Caracter%C3%83%C2%ADsticas.bmp"><img alt="" border="0" height="271" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhce0G1sItqLMQPAJ2ab6NPtpiwQQ4OnK_wSYCExAgMaEgzsM3w9cHyemwLi9_42TaUkocWWqN-iyMXi5zmvAq8iaOs0Hj71j98BuIWKR9wNw11ep1oD7wGfxm5Ay21UgGntfAcqAOz7OFD/s320/Caracter%C3%ADsticas.bmp" width="450" /></a>Aunque prácticamente toda la corteza terrestre está afectada por fallas geológicas, se ha observado que la actividad sísmica se concentra en algunas zonas donde los movimientos a lo largo de estas fallas son particularmente severos y frecuentes. Una visión global de la distribución espacial de los grandes sismos se muestra en la figura 1.3, de la que se aprecia cómo estos se presentan principal, pero no exclusivamente, en los bordes de las grandes placas tectónicas.<br />
<em>Figura 1.3<br />
Mapa que muestra la relación entre las principales placas tectónicas</em> <br />
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj2YbHp_XwlJXCWiVcPpQUHA95PIScFBHK5g7wTFawlUWcowhdZUZdcCzBqOgkTvmllGaL81V1lXRc_fytcVo3RXSBwnfUKcH-ZXkVL0a_mKyw9SFieVHeWtj_ii8GhGi9KgXcHDpOS-EWu/s1600-h/Placas.bmp"><img alt="" border="0" height="259" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj2YbHp_XwlJXCWiVcPpQUHA95PIScFBHK5g7wTFawlUWcowhdZUZdcCzBqOgkTvmllGaL81V1lXRc_fytcVo3RXSBwnfUKcH-ZXkVL0a_mKyw9SFieVHeWtj_ii8GhGi9KgXcHDpOS-EWu/s320/Placas.bmp" width="450" /></a> <br />
La zona donde se libera la mayor parte de la energía sísmica es un gran arco conocido como Cinturón Circumpacífico, un tramo del cual está constituido por la zona de subducción entre la placa de Cocos y la placa de Norteamérica en la costa del Pacífico de México. <br />
<em></em> <br />
<em>Figura 1.4<br />
Movimiento de placas y generación de sismos. </em><br />
<em>Mecanismo de subducción.</em><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj7T0Ls5K9LgSv6QJCMvsQ3A1sW0m9415rrflpYW5aJiAJfDs2KpR-G2Y7Ge0JdfqouT_tz7n51Wyo8Hbn3VHt51aBAbpU8fUl7c9hrVSJq3ECzaRa55VbX5Cu5n_OUDIvF_pctLjU21p00/s1600-h/Subducci%C3%83%C2%B3n.bmp"><img alt="" border="0" height="265" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj7T0Ls5K9LgSv6QJCMvsQ3A1sW0m9415rrflpYW5aJiAJfDs2KpR-G2Y7Ge0JdfqouT_tz7n51Wyo8Hbn3VHt51aBAbpU8fUl7c9hrVSJq3ECzaRa55VbX5Cu5n_OUDIvF_pctLjU21p00/s320/Subducci%C3%B3n.bmp" width="450" /></a><br />
<strong>1.1.2 Sismicidad en Bolivia </strong> <br />
La sismicidad que se observa en Bolivia está relacionada con el proceso de subducción que experimenta la placa de Nazca por el oeste de la placa continental de Sudamérica.<br />
<strong>1.2 Comportamiento sísmico de las edificaciones</strong><br />
<strong>1.2.1 Características de la acción sísmica</strong><br />
Todas las edificaciones transfieren su peso al terreno vinculadas a él por las fundaciones, por consiguiente están sujetas a su comportamiento, sus cambios con respecto a la mecánica de suelos como también a movimientos sísmicos que se transmiten a las edificaciones a través de las fundaciones.<br />
<em>Figura 1.4<br />
Fuerza de inercia generada por la vibración de la estructura</em><br />
<em></em><br />
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgYfBSCB2ZaDQ2zeHn3IlW1vkCYvbf1mqhk8BNWPBty8qgzTb7FklrF2WrZxo3KOisnyqT-9gy-9Jd3bb3X3s4CcWuVESIIM46CuPsj1XIhFmUrDEfEZZ4RfXzjMq8js8xgitN8vukEE8wd/s1600-h/Inercia.bmp"><img alt="" border="0" height="203" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgYfBSCB2ZaDQ2zeHn3IlW1vkCYvbf1mqhk8BNWPBty8qgzTb7FklrF2WrZxo3KOisnyqT-9gy-9Jd3bb3X3s4CcWuVESIIM46CuPsj1XIhFmUrDEfEZZ4RfXzjMq8js8xgitN8vukEE8wd/s320/Inercia.bmp" width="450" /></a>El movimiento sísmico se transfiere inicialmente a la base de la edificación, la cual tiende a seguir el movimiento del suelo (Ver figura 1.4), no así la parte restante del edificio debido a que por inercia, su masa se opone al desplazamiento dinámico transmitido por su base, de tal manera, se generan las fuerzas de inercia que ponen en peligro la seguridad de la estructura. <br />
<br />
Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-47014844040346257342011-08-24T23:52:00.000-05:002011-08-24T23:52:20.020-05:00CONCRETO TRANSLÚCIDO.<br />
<br />
<strong>EL CONCRETO TRANSLÚCIDO.</strong> <div style="text-align: justify;">Ha sido una década de innovación en el campo del Concreto, un período que ha permitido mediante la implementación de los avances científicos de otros campos de la ciencia, la renovación de la industria de la construcción mediante la ampliación de las fronteras de los materiales tradicionales como el hormigón; una de esas fronteras impensables de atravesar hasta hace dos décadas, es la transparencia o la translucidez del concreto, material opaco por excelencia.</div><div class="wp-caption alignleft" id="attachment_7243" style="width: 344px;"><div style="text-align: center;"><img alt="" class="size-full wp-image-7243 " height="461" src="http://civilgeeks.com/wp-content/uploads/2011/08/1.B.jpg" width="334" /></div><div class="wp-caption-text">LITRACON DE DIA . . .</div></div><div class="wp-caption alignright" id="attachment_7242" style="width: 362px;"><img alt="" class="size-medium wp-image-7242" height="374" src="http://civilgeeks.com/wp-content/uploads/2011/08/1.A-224x300.jpg" width="352" /><div class="wp-caption-text">LITRACON DE NOCHE . . .</div></div><br />
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<div style="text-align: justify;"> La nueva perspectiva del concreto se comienza vislumbrar en 1999, cuando un arquitecto estadounidense llamado Bill Price (durante su trabajo en el Estudio de Arquitectura OMA) junto al Arquitecto Rem Kollhaas lleva a cabo un estudio del concreto investigando cuáles de los componentes de éste se pueden substituir para alcanzar su translucidez, fue así que el primer espécimen de concreto translúcido se realizó con trozos de vidrio y trozos de plástico translúcido.</div><div class="wp-caption aligncenter" id="attachment_7244" style="width: 543px;"><img alt="" class="size-full wp-image-7244" height="400" src="http://civilgeeks.com/wp-content/uploads/2011/08/1.C-Litracon-logo.jpg" width="533" /><div class="wp-caption-text" style="text-align: justify;">LOGO DE LITRACON</div></div><div> </div><div style="text-align: justify;">Sin embargo el desarrollo consistente del concreto translúcido corresponde al joven arquitecto húngaro de 29 años Aron Losonczi, que elabora y patenta conjuntamente con su socio, el arquitecto Andreas Bittis en 2001 un nuevo tipo de hormigón que incorpora las fibras ópticas como parte de sus agregados y que le permite trasladar la luz a través de su masa gris, hoy en día se conoce como LITRACON (Light Transmitting Concrete).</div><div class="wp-caption alignright" id="attachment_7246" style="width: 310px;"><img alt="" class="size-medium wp-image-7246" height="224" src="http://civilgeeks.com/wp-content/uploads/2011/08/1.D-300x224.jpg" width="300" /><div class="wp-caption-text" style="text-align: justify;">UN SALÓN CON LITRACON</div></div><div> </div><div style="text-align: justify;">Es un concreto tradicional con un arreglo tridimensional de fibras ópticas y/o fibras de vidrio, su elaboración es algo complicada ya que para formarlo se utilizan miles de fibras ópticas con diámetros que van de dos micrones a dos milímetros, las cuales se ordenan en capas o celdas previo el vertido de la masa de mortero, y en principio se está prefabricando. De momento se comercializa en bloques prefabricados cuyo mayor tamaño de momento es de30 cmx60 cm, aunque su propiedad de transmitir la luces y sombras, incluso colores los pueden mantener en espesores de varios metros conseguidos adosando varios bloques uno detrás del otro.</div><div style="text-align: justify;"> Es sin duda un curioso material que permitirá otra variable en el juego de la luz para los arquitectos. Desde el punto de vista de edificaciones sustentables o sostenibles, propone la ventaja de un hormigón que permite la entrada de la luz sin la necesidad de una ventana o un patio de luces, lo que puede reducir el gasto de electricidad en el interior de las viviendas y oficinas. Un nuevo material que permitirá ampliar los límites de la imaginación en el momento del diseño, si es que la imaginación puede tener límites.</div>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-19511591403601109852011-08-14T17:29:00.002-05:002011-08-14T17:29:53.505-05:00Hackear Calculadora CASIO fx-82MS<h1 class="post-title"><br />
</h1><span class="post-content" style="display: block; overflow: hidden; width: 710px;"> <img border="0" class="imagen" src="http://www.schoolstationery.com.au/images/calculators/fx82ms.jpg" /> <br />
<br />
<b><span style="font-size: 16pt; line-height: 16pt;">La Calculadora CASIO fx-82 MS es la que tienen la mayoría de los estudiantes de secundaria, terciaria y universitarios...y sabían que CASIO fabrica las calculadoras científicas "standars" con la misma plaqueta y lo único que hacen es bloquearle algunas funciones a ciertos modelos y así vender unas a 50$ y otras con las funciones "desbloqueadas" a 120$ o más...Bueno aquí les traigo el truco que les va a poder "desbloquear" ESAS funciones que su calculadora fx-82MS tiene escondidas, como son algunas: <br />
<br />
RESOLVER MATRICES <br />
<br />
RESOLVER CÚBICAS, CUADRÁTICAS, ETC. <br />
<br />
TRABAJAR CON NÚMEROS COMPLEJOS FACILMENTE <br />
<br />
y muchas funciones más!!!</span> <br />
<br />
<br />
<span style="color: darkred;">LOS PASOS A SEGUIR SON:</span> <br />
<br />
1) Poner la calculadora en modo SD <br />
<br />
<div style="text-align: center;">La prendemos ---- MODE ---- 2</div><br />
<br />
2) Presionar el 0 (cero) y luego apretar el boton M+ (arriba de AC), en la pantalla nos va a ir apareciendo: <br />
<br />
n = <br />
1 <br />
<br />
Seguir apretando "M+" varias veces (va a ir diciendo n= 2, n= 3, .....) hasta que nos diga n=80, luego de ahí si apretamos una vez más nos aparece: <br />
<br />
Data FULL <br />
<br />
Luego apretamos 1 vez más y nos aparece: <br />
<br />
EditOFF ESC <br />
1 2 <br />
<br />
Aquí presionamos 2... <br />
<br />
Ahora en la pantalla tenemos otra vez común, recien estamos en la mitad del TRUCO... <br />
<br />
Tenemos que presionar del botón central (4 direcciones) que está abajo de la pantalla la parte superior (flecha para arriba), aquí nos dice: <br />
<br />
Freq 80= <br />
1 <br />
<br />
Ahora empezamos a digitar el número "13" consecutivamente: <br />
<br />
13131313131313....1313131313131 <br />
<br />
(tener cuidado en no equivocarse en ninguna cifra) <br />
<br />
Cuando llegamos al límite de cifras que puede soportar la calculadora (para verificar si escribimos bien, una forma es (no excluyente) que el último número es el 1) <br />
<br />
Presionamos "=" (igual) y nos aparece: <br />
<br />
Data FULL <br />
<br />
Presionamos nuevamente el botón "=" (igual) y nos aparece: <br />
<br />
EditOFF ESC <br />
1 2 <br />
<br />
Aquí presionamos el "0" y luego el "1" <br />
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Cuando apretamos el CERO no nos cambia nada en la pantalla, pero cuando presionamos el UNO nos aparece: <br />
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1 (y separado por un espacio,el cursor para seguir digitando) <br />
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Presionamos "=" (igual) y nos aparece: <br />
<br />
Syntax ERROR <br />
<br />
Presionamos AC y "supuestamente" queda como siempre que la prendemos está PEROOOOo... <br />
<br />
Si apretamos el botón "MODE" aquí están las nuevas funciones! <br />
<br />
COMPLX, BASE, MAT, VCT, EQN !!! <br />
<br />
Y todas fáciles de aprender a usar por como te va llevando la propia calcu a cargar las variables.... <br />
<br />
Como todo "Truco" tiene un lado malo, que en este caso es un lado "no tan bueno..." porque cada vez que apretamos el botón "on" se nos van estas "NUEVAS FUNCIONES" <span style="position: relative;"><img hspace="3" src="http://o2.t26.net/images/big2v5.gif" style="clip: rect(440px 16px 456px 0px); position: absolute; top: -442px;" vspace="2" /><img hspace="3" src="http://o2.t26.net/images/space.gif" style="height: 15px; vertical-align: middle; width: 15px;" vspace="2" /></span> <br />
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Bueno espero que lo hayan echo y sobre todo que les haya servido...Muchas gracias y cualquier duda estoy para lo que sea. </b></span>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-81015673605929148422011-08-12T14:20:00.002-05:002011-08-12T14:20:44.727-05:00vigas - encofrado<h1 class="post-title entry-title"> <a href="http://www.ingenierocivilinfo.com/2010/02/normal-0-false-false-false_01.html">Vigas</a> </h1><div class="post-header"> </div><div id="Botones"> </div><div id="anuncioAdsense" style="float: right;"> <ins style="border: none; display: inline-table; height: 250px; margin: 0; padding: 0; position: relative; visibility: visible; width: 300px;"><ins id="aswift_2_anchor" style="border: none; display: block; height: 250px; margin: 0; padding: 0; position: relative; visibility: visible; width: 300px;"></ins></ins> </div><div class="MsoNormal"><br />
<b><span lang="ES">Encofrado:</span></b></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Colocar los fondos de la viga (tablas de 1 ” entre columna y columna), estos fondos deberán tener el ancho de la viga y estarán apoyados sobre puntales (bolillos)</span></div><div class="separator" style="clear: both; text-align: left;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj24L3ZKTgOlB5IwdLV7E90gIBVfLqOrKryISxxX0fuTLWJAB7GMkTpwB6ysjfiq9KMu_QcIu7BJtFK9gYgjKQSGHty9conNkuNHAk4BE5KwGlsJqP13U0DCmO_PUDyXRucFIKGXe462gWy/s1600/9.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj24L3ZKTgOlB5IwdLV7E90gIBVfLqOrKryISxxX0fuTLWJAB7GMkTpwB6ysjfiq9KMu_QcIu7BJtFK9gYgjKQSGHty9conNkuNHAk4BE5KwGlsJqP13U0DCmO_PUDyXRucFIKGXe462gWy/s1600/9.gif" /></a></div><div class="MsoNormal"><span lang="ES"> </span> </div><div class="MsoNormal" style="line-height: 135%; text-align: left;"><span lang="ES" style="font-family: "Bookman Old Style"; font-size: 9.5pt; line-height: 135%;"> Figura 34. Apuntalado del encofrado para vigas</span></div><div class="MsoBodyTextIndent3" style="line-height: 135%;"><br />
</div><div class="MsoNormal"><span lang="ES">Los puntales están formados por cabezales (listones de 2 ” x 2 ”) sujetados a bolillos de eucalipto, que servirán de soporte a los fondos. Deberán estar colocados cada 80 cm en todo la longitud de las vigas y estarán apoyados sobre cuñas que servirán para nivelar el encofrado de la viga.</span></div><div class="MsoNormal"><span lang="ES">Una vez colocados los fondos de las vigas, se procederá a colocar los encofrados laterales y a nivelar toda la estructura mediante el sistema de vasos comunicantes (manguera). Este sistema consiste en medir las alturas de todas las columnas y tomando como referencia la menor altura se marcarán todas al mismo nivel para que todas las vigas queden perfectamente niveladas y la losa esté completamente horizontal.</span></div><div class="separator" style="clear: both; text-align: left;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhh1o9HKNLxih88kykC9uT6nlbKDLZ0-GA-1dVb-VpkrAJYvW97DhKL178I6OID2MZ_d2SLVTz_KbJ0p8Z_ZeEdo7st20i9cBQU0TvglPmE9Y5K_oGqFjEOZecpAaWYybAEdYgA8RkpgUOw/s1600/10.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhh1o9HKNLxih88kykC9uT6nlbKDLZ0-GA-1dVb-VpkrAJYvW97DhKL178I6OID2MZ_d2SLVTz_KbJ0p8Z_ZeEdo7st20i9cBQU0TvglPmE9Y5K_oGqFjEOZecpAaWYybAEdYgA8RkpgUOw/s1600/10.gif" /></a></div><div class="MsoNormal"><span lang="ES"> </span> </div><div class="MsoNormal" style="line-height: 135%; text-align: left;"><span lang="ES" style="font-family: "Bookman Old Style"; font-size: 9.5pt; line-height: 135%;"> Figura 35. Sistema de vasos comunicantes.</span></div><div class="MsoNormal" style="line-height: 135%; text-align: justify;"><br />
</div><div class="MsoNormal"><span lang="ES">Colocar chanfles en las esquinas del encofrado a lo largo de toda su longitud para evitar roturas al momento del desencofrado.</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Los encofrados laterales exteriores de las vigas de borde tendrán la altura de la viga y deben estar arriostrados con listones para evitar posibles desplazamientos al momento de vaciar el hormigón. (ver Figura 36)</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Los encofrados laterales interiores de las vigas tendrán la altura de la viga descontando el espesor de la losa. (ver Figura 37)</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Una vez que el encofrado esté terminado se debe aplicar aceite sucio en toda la superficie interior para impermeabilizarlo y para evitar la adherencia del hormigón, lo que además facilita el desencofrado.</span></div><div class="separator" style="clear: both; text-align: left;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEimqN39t0XUlKtKGS6bWQwHSZXp5w4M3udWYvb3gr3ITxNTQtQvRxowl2djt6huLhhFr7_VYWSHpLoAWszAi1MwMqmzrNo34qJGy-UC20tsKziIjBxnthpmz1u-pW2VKm9N07QDtQUoAW7w/s1600/11.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEimqN39t0XUlKtKGS6bWQwHSZXp5w4M3udWYvb3gr3ITxNTQtQvRxowl2djt6huLhhFr7_VYWSHpLoAWszAi1MwMqmzrNo34qJGy-UC20tsKziIjBxnthpmz1u-pW2VKm9N07QDtQUoAW7w/s1600/11.gif" /></a></div><div class="MsoNormal"><span lang="ES"> </span> <span lang="ES" style="font-family: "Bookman Old Style"; font-size: 9.5pt; line-height: 135%;">Figura 36. Encofrado viga de borde Figura 37. Encofrado viga central</span></div><div class="MsoNormal" style="line-height: 135%; text-align: justify;"><br />
</div><div class="MsoNormal"><b><span lang="ES">Doblado y montaje de armaduras:</span></b></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES"> El doblado y cortado de la armadura será realizado de acuerdo a las medidas de los planos estructurales.</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Por la dificultad que existe en el armado de fierros en las intersecciones de vigas dentro los encofrados, éste deberá ser realizado sobre caballetes de fierro de ½ ” a una altura de 1 m por encima del encofrado de la losa, los mismos que estarán ubicados por encima del eje de las vigas cada 3 m. (ver Figura 38)</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Una vez colocadas las galletas en los estribos en la parte inferior y los laterales, se procederá al retiro de los caballetes y al descenso de todas las armaduras de las vigas dentro de los encofrados, teniendo el cuidado de coincidir con sus respectivos ejes.</span></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiHB7U5TnPnMKOew3HZ-ZVnwoszyPtN0g7wPGdmq2NakVSGPB0m5tdbQ8hez-nSb9Hk7jwFCjFrxPNmA08zQtIRf_pAospNf4Wy7aO4oUNNZlLvNZM0YrVfRQ4dEJn2I_3_AD7Pu47Vkx0N/s1600/12.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiHB7U5TnPnMKOew3HZ-ZVnwoszyPtN0g7wPGdmq2NakVSGPB0m5tdbQ8hez-nSb9Hk7jwFCjFrxPNmA08zQtIRf_pAospNf4Wy7aO4oUNNZlLvNZM0YrVfRQ4dEJn2I_3_AD7Pu47Vkx0N/s1600/12.gif" /></a></div><div class="MsoNormal"><span lang="ES"> </span> </div><div align="center" class="MsoNormal" style="line-height: 135%; text-align: center;"><span lang="ES" style="font-family: "Bookman Old Style"; font-size: 9.5pt; line-height: 135%;">Figura 38. Caballetes para el armado de vigas</span></div><div class="MsoNormal" style="line-height: 135%; text-align: justify;"><br />
</div><div class="MsoNormal"><b><span lang="ES">Colocado del hormigón:</span></b></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">El hormigón será vaciado de acuerdo con las especificaciones de preparación y puesta en obra del hormigón.</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">Cuando se tengan vigas en dos direcciones y la armadura en la intersección sea muy tupida se deberá retirar la armadura negativa de una dirección, para vaciar el hormigón de la columna hasta la mitad de la viga y luego volver a colocar la armadura y terminar de vaciar. </span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><b><span lang="ES">Desencofrado:</span></b></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><span lang="ES">El desencofrado de los laterales de las vigas puede ser realizado a los 2 días después del vaciado y el desencofrado del resto de la estructura será realizado cuando el hormigón haya alcanzado la resistencia cilíndrica (28 días).</span></div><div class="MsoNormal"><br />
</div><div class="MsoNormal"><b><span lang="ES">Curado:</span></b></div><div class="MsoNormal"><br />
</div><span lang="ES" style="font-family: "Times New Roman"; font-size: 12pt;">El curado será realizado por lo menos durante los primeros de 7 días después del vaciado humedeciendo el hormigón hasta que haya alcanzado como mínimo el 70 % de su resistencia.</span>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-42947426728737433862011-08-12T10:21:00.000-05:002011-08-12T10:21:11.275-05:00cargas sismicas<br />
<div class="post-header"> <div class="post-header-line-1"><span class="post-author vcard"> Publicado por <span class="fn" style="color: black;">Fernando Arancibia Carvallo</span><span style="color: black;"> </span></span> <span class="post-labels" style="color: black;"> Etiquetas: <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/search/label/Dise%C3%B1o%20Sismo%20Resistente" rel="tag">Diseño Sismo Resistente</a> </span> </div></div><span style="color: black;"> </span><div class="post-body entry-content" style="color: black;"> <span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"> </span><br />
<div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 11pt;">DETERMINACIÓN DE LAS CARGAS SÍSMICAS: Pesos y cargas a considerar para la determinación de las solicitaciones por sismo. Clasificación de los edificios según el destino y el tipo estructural. Vinculación en planta de los distintos elementos resistentes. Ductilidad de la estructura. Influencia del terreno en la importancia de las cargas por sismo. Métodos para calcular el Periodo Propio. Coeficiente Sísmico. Corte sísmico en la base. Distribución del corte sísmico en altura. Vuelco. Torsión en planta. Método estático. Conceptos sobre análisis modal.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><b><span style="font-family: 'Times New Roman';"><span style="font-size: 12pt;">Los items que se indican a lo largo del texto corresponden a los del Código de Construcciones Sismoresistentes de la Provincia de Mendoza.</span></span></b></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span lang="ES-TRAD"><span style="font-size: 12pt;">Cálculo del Peso del Edificio:</span></span></u><span lang="ES-TRAD"></span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 12pt;"> </span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 12pt;"> </span></span><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">El sismo tiene la característica de producir aceleraciones instantáneas, aceleraciones que generan grandes fuerzas, y que afectan a los componentes de la estructura del edificio de modo diferente a la acción de las cargas gravitatorias.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Estas fuerzas sísmicas dependen linealmente de la masa del edificio y se expresan con la fórmula:</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;"><b>F = M x <span class="Apple-converted-space"> </span>A</b> <span class="Apple-converted-space"> </span>donde es:</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">F = fuerza inducida por la aceleración <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;"> </span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">A = aceleración producida por el sismo</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">M = masa del edificio</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Por este motivo es necesario conocer el peso del edificio, que incluye el peso de la estructura, cierres, pisos, revestimientos, etc. Debe considerarse el peso de todo lo fijado permanentemente al edificio.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Las<span class="Apple-converted-space"> </span><b>cargas móviles</b><span class="Apple-converted-space"> </span>se computan en un porcentaje del total de sobrecarga prevista para el análisis estático. Los porcentajes a usar, según el tipo de sobrecarga, están definidos en el Código de Construcciones Sismo Resistentes.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">El peso se calcula piso por piso, computando el peso del entrepiso (losa), vigas, la mitad de la longitud de los tramos de columnas sobre y bajo cada entrepiso, como se indica en las figuras.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Computados los volúmenes de los componentes fijos del edificio, estructurales o no, multiplicados por los pesos específicos, se obtiene el peso del edificio. A este peso debe sumarse la sobrecarga reglamentaria según el código, que se incluye en el análisis de las cargas sísmicas.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Resumiendo, el peso a considerar está compuesto por:</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">* peso estructura</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">* peso muros, tabiques divisorios, cierres.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">* peso pisos y revestimientos</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">* peso de otros elementos fijos (maquinarias, etc. )</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">* peso agua en depósitos de reserva.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">* porcentaje sobrecarga según código.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">En los edificios comunes, es suficiente agrupar las cargas en los niveles de entrepisos. Se incluirá el peso propio del entrepiso, muros y otros elementos existentes en su zona de influencia (ver figura)</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;">El centro de gravedad del conjunto se supondrá ubicado en el plano del entrepiso.</span></span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="center" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><img border="0" height="317" src="http://www.um.edu.ar/um/fau/estructura5-anterior/CARGAS_archivos/image001.jpg" width="498" /></span></span></div><div align="center" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">El peso de cada entrepiso se calcula con:</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;"><b>Q<sub>i</sub><span class="Apple-converted-space"> </span>= G<sub>i</sub><span class="Apple-converted-space"> </span>+ p x P<sub>i</sub></b> <span class="Apple-converted-space"> </span>siendo:</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Q<sub>i</sub><span class="Apple-converted-space"> </span>= Peso total del piso.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">G<sub>i</sub><span class="Apple-converted-space"> </span>= carga permanente que actúa en el piso.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">P<sub>i</sub><span class="Apple-converted-space"> </span>= carga accidental que actúa en todo o en parte del entrepiso.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">p = coeficiente de participación de la sobrecarga <span class="Apple-converted-space"> </span>accidental.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">Los valores del coeficiente [p] son: ( ítem 4.5.2.1)</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">p = 0 <span class="Apple-converted-space"> </span>para azoteas y techos inaccesibles</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">p = 0,25 <span class="Apple-converted-space"> </span>para locales donde no es usual la aglomeración de personas o cosas.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;"> (Edificios de departamentos u oficinas, hoteles, etc.)</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">p = 0,50 <span class="Apple-converted-space"> </span>para locales donde es usual la aglomeración de personas o cosas.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">(Templos, museos, bibliotecas, cines, teatros, etc.)</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span lang="ES-TRAD"><span style="font-size: 11pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 11pt;">p = 1 <span class="Apple-converted-space"> </span>Tanques de agua, silos y otro tipo de recipiente</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div></div><span style="color: black;"> </span><div class="jump-link" style="color: black;"> <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/06/cargas-sismicas.html#more" title="Cargas Sísmicas">Leer Mas......</a> </div><span style="color: black;"> </span><div class="post-footer" style="color: black;"> <div class="post-footer-line post-footer-line-1"><span class="post-timestamp"> en <a class="timestamp-link" href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/06/cargas-sismicas.html" rel="bookmark" title="permanent link"><abbr class="published" title="2011-06-27T16:29:00-04:00">16:29</abbr></a> </span> <span class="post-comment-link"> <a class="comment-link" href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/06/cargas-sismicas.html#comments">0 comentarios</a> </span> <span class="post-icons"> <span class="item-action"> <a href="http://www.blogger.com/email-post.g?blogID=4459378344044256635&postID=8220574981938717097" title="Enviar entrada por correo electrónico"> <img alt="" class="icon-action" height="13" src="img/icon18_email.gif" width="18" /> </a> </span> </span> </div></div><span style="color: black;"> </span> <div class="post-outer" style="color: black;"> <div class="post hentry"> <a href="" name="1334747311838995669"></a> <h3 class="post-title entry-title"> <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/06/distribucion-de-los-cortes-sismicos.html">Distribución de los Cortes Sísmicos</a> </h3><div class="post-header"> <div class="post-header-line-1"><span class="post-author vcard"> Publicado por <span class="fn">Fernando Arancibia Carvallo</span> </span> <span class="post-labels"> Etiquetas: <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/search/label/Dise%C3%B1o%20Sismo%20Resistente" rel="tag">Diseño Sismo Resistente</a> </span> </div></div><div class="post-body entry-content"> <span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"> </span><br />
<div align="justify" style="margin-left: 0cm; margin-right: 0cm;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Distribución de los Cortes Sísmicos: conceptos de los métodos y análisis usados para distribuir las fuerzas generadas por el sismo en una estructura. Enumeración de los métodos y descripción conceptual. Elementos sismo resistentes, pórticos, tabiques y triangulaciones. Descripción y funcionamiento. Materiales usados en las estructuras antisísmicas. Especificaciones constructivas. Dimensiones y armaduras mínimas exigidas por las normas. Juntas y linderos. Especificaciones para fundaciones.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Distribución de los Cortes Sísmicos:</span></u></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Las cargas sísmicas que actúan sobre un edificio deben ser distribuidas entre los elementos estructurales que lo componen. Si bien en el cálculo de las acciones que el sismo produce en el edificio se considera a este como un conjunto, para dimensionar y verificar la estructura completa se debe analizar componente por componente.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Los componentes estructurales de un edificio son:</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;"> Vigas</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;"> Columnas</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;"> Tabiques antisísmicos ( Muros Sismo <span class="Apple-converted-space"> </span>Resistentes )</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span>Pórticos Arriostrados.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span>Bases.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Los materiales estructurales usados son:</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Hormigón Armado.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Hormigón pretensado.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Acero.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Mampostería.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Mampostería reforzada.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">La combinación de los elementos enumerados con el material estructural seleccionado, mas el tipo del terreno de fundación<span class="Apple-converted-space"> </span><b>integran globalmente la estructura del edificio</b>. Si bien el análisis se hace para el edificio en conjunto no debe descuidarse la verificación y construcción de cada componente estructural.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Diseñar las uniones en los nudos y los detalles constructivos de un edificio antisísmico es tan importante como verificar el comportamiento dinámico de la estructura en su conjunto. Si la resistencia y ductilidad de las uniones no son adecuadas y los detalles no son los correctos, seguramente la estructura no funcionará ante un sismo como se proyectó.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">El diseño de la estructura debe ser tal que satisfaga la condición:</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Coeficiente de reducción x Resistencia teórica > Cargas de diseño</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">La resistencia teórica es la que se alcanza determinando la resistencia última de las secciones y de los elementos estructurales. El coeficiente de reducción es el factor con el que se consideran disminuciones en la calidad de la estructura, que pueden ser originadas por:</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt; text-indent: 35.4pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Errores en los cálculos.(*)</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Diseño inadecuado de la estructura.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Materiales que no cumplen con la calidad esperada.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Variaciones en las dimensiones de los elementos estructurales.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Modificaciones menores o previstas.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Cambio de destino del edificio o de algunos locales.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> </span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-family: 'Times New Roman';"><span style="font-size: 12pt;">(*) Sobre este tema recomendamos el libro “Como evitar los errores en los proyectos de hormigón armado” <span class="Apple-converted-space"> </span>de Pierre Charon , Editores Técnicos Asociados. Cubre temas tales como: errores en la posición de las armaduras, errores relativos a la aplicación de fórmulas, errores relativos a las mediciones, etc.</span></span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-family: 'Times New Roman';"><span style="font-size: 12pt;"> </span></span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">La estructura monolítica de hormigón armado es uno de los sistemas constructivos más populares en el mundo. Se han obtenido considerables progresos <span class="Apple-converted-space"> </span>en los códigos y en el uso de este sistema estructural, en base a la experiencia de los sismos sucedidos a lo largo de las últimas decadas. Así, se ha logrado disminuir sustancialmente los daños en edificios sometidos a terremotos en años recientes. Se recomienda que el diseño respete las siguientes reglas:</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">La estructura debe tener ductilidad y una gran capacidad de disipación de energía.</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Las vigas deben alcanzar la fluencia antes que las columnas.</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">La falla por flexión debe presentarse antes que la falla por corte.</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">Las resistencia de los nudos debe ser mayor que la de los elementos que unen.</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Para cumplir con las estas reglas en Código de Construcciones Sismo Resistentes de Mendoza exige cumplir con las siguientes exigencias:</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Anclajes y Empalmes de Armaduras</span></u><span style="font-size: 12pt;"><span class="Apple-converted-space"> </span>( <span class="Apple-converted-space"> </span>7.1.1 )</span></span></div><div align="justify" class="MsoBodyText" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> </span><span style="font-size: 12pt;">Se deben utilizar ganchos en todo anclaje y empalme de armaduras de los elementos que forman la estructura resistente a las fuerzas sísmicas, tanto en la estructura principal como en las partes de la construcción. Normalmente no es necesario el uso de ganchos en las armaduras de las losas.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Las longitudes de empalme o anclaje previstas en CIRSOC 201 se mayoran 10% en las armaduras solicitadas por combinación de acciones que incluyen sismo.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Esfuerzo de Corte Último</span></u><span style="font-size: 12pt;"><span class="Apple-converted-space"> </span>( 7.1.2.1 )</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">La capacidad a corte de cualquier pieza estructural debe ser 1,25 veces mayor que el esfuerzo de corte necesario para alcanzar la capcidad a flexión de todas las secciones en que puedan formarse rótulas plásticas.</span></span></div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Para determinar la capacidad a flexión se deben considerar las armaduras realmente colocadas. <span class="Apple-converted-space"> </span>Se exceptuan las piezas incluidas en el punto 7.1.3.4 . ( <span class="Apple-converted-space"> </span>Caso de barras poco esbeltas )</span></span></div><div align="justify" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Tensión tangencial última</span></u><span style="font-size: 12pt;"><span class="Apple-converted-space"> </span>( 7.1.2.2 )</span></span></div><div align="justify" style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">La tensión tangencial máxima no debe sobrepasar el valor <span class="Apple-converted-space"> </span>1,75.</span><span style="font-family: Symbol;"><span style="font-size: 14pt;">t</span></span><sub><span style="font-size: 12pt;">03<span class="Apple-converted-space"> </span></span></sub><span style="font-size: 12pt;">para los estados de solicitación que incluyen la acción sísmica.</span><span class="Apple-converted-space"><span style="font-size: 12pt;"> </span></span><span style="font-family: Symbol;"><span style="font-size: 14pt;">t</span></span><sub><span style="font-size: 12pt;">03<span class="Apple-converted-space"> </span></span></sub><span style="font-size: 12pt;">es la tensión tangencial límite según CIRSOC <span class="Apple-converted-space"> </span>201. Los límites establecidos por las tensiones</span><span class="Apple-converted-space"><span style="font-size: 12pt;"> </span></span><span style="font-family: Symbol;"><span style="font-size: 14pt;">t</span></span><sub><span style="font-size: 12pt;">01 <span class="Apple-converted-space"> </span></span></sub><span style="font-size: 12pt;">y</span><sub><span style="font-size: 12pt;"> </span><span class="Apple-converted-space"><span style="font-size: 12pt;"> </span></span></sub><span style="font-family: Symbol;"><span style="font-size: 14pt;">t</span></span><sub><span style="font-size: 12pt;">02</span></sub><span style="font-size: 12pt;"> <span class="Apple-converted-space"> </span>no se modifican.</span></span></div><div align="justify" style="margin: 0cm 0cm 0pt;"><br />
</div><div style="margin: 0cm 0cm 0pt;"><br />
</div><div style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Métodos y análisis usados para distribuir las fuerzas generadas por el sismo</span></u></span></div><div style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Toda edificio tiene una estructura tridimensional, por ello los esfuerzos debidos a las cargas sísmicas y gravitatorias actúan en las tres dimensiones. <span class="Apple-converted-space"> </span>En la práctica, salvo raras excepciones, ocurre que los esfuerzos más importantes para cada elemento estructural solo están contenidos en un plano, como vemos en el caso de un portico o un tabique antisísmico. <span class="Apple-converted-space"> </span>Entonces, y para dimensionar los elementos estructurales, <span class="Apple-converted-space"> </span>necesitamos <span class="Apple-converted-space"> </span>conocer el porcentaje de las solicitaciones sísmicas que corresponden a cada componente resistente al sismo.</span></span></div><div style="margin: 0cm 0cm 0pt;"><br />
</div><div style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Elementos Finitos</span></u></span></div><div style="margin: 0cm 0cm 0pt;"><br />
</div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Las estructuras de edificios son tridimensionales y pueden analizarse como tales mediante el método de los elementos finitos, que permite representar losas, vigas, columnas, muros, diagonales, etc. empleando diferentes tipos de elementos. Existen programas comerciales de computadora que cuentan con buenas herramientas gráficas para preparar datos e interpretar los resultados. Sin embargo esta no es una práctica común porque surgen varias dificultades: a) es muy grande el número de ecuaciones necesarias para representar un edificio completo, en especial si es de varios pisos; b) la cantidad de datos que hay que proporcionar y su organización aumentan las posibilidades de cometer errores; c) incluso con las actuales ayudas gráficas de los programas es dificil interpretar los resultados, que en muchos programas son dadas en tensiones de compresión o tracción y no como fuerzas y momentos que son las cifras de uso común en el diseño y verificación de elementos estructurales.</span></span></div><div align="justify" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Los análisis con elementos finitos se reservan para estructuras muy importantes ( y aún en estos casos con simplificaciones ) o a partes limitadas de edificios de características inusuales.</span></span></div><div align="justify" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><u><span style="font-size: 12pt;">Elementos sismorresistentes, pórticos, tabiques y triangulaciones. Descripción y funcionamiento</span></u><span style="font-size: 12pt;">.</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Sus <span class="Apple-converted-space"> </span>características y funcionamiento se describan a continuación:</span></span></div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><div class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> </span><strong><span style="font-size: 12pt;">DIAFRAGMAS</span></strong></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;"> Son los elementos horizontales que actúan distribuyendo las fuerzas laterales entre elementos resistentes verticales (tabiques resistentes al cortante o pórticos). En la práctica están formados por los entrepisos, de losas de hormigón armado, macizas o aligeradas. El diafragma debe tener la capacidad de trasmitir las fuerzas horizontales sin deformarse, en los análisis teóricos y numéricos de la Teoría de las Estructuras se adopta como hipótesis que es indeformable, obligando a todos los elementos verticales a tener el mismo desplazamiento en cada piso. En este caso, se supone que el diafragma es infinitamente rígido. En los entrepisos de hormigón armado la aproximación es buena y los resultados obtenidos son satisfactorios, no así cuando las losas son delgadas y existe el peligro que colapsen por pandeo. Las cargas que actúan en los entrepisos paralelas a su plano son del orden de centenares de toneladas para un edificio de seis o siete pisos. Cuando un diafragma está esta formado por una losa de poco espesor o formado por un entrepiso compuesto, para una estructura metálica, su comportamiento depende en parte de su tamaño y su material.<span class="Apple-converted-space"> </span></span><span style="font-size: 12pt;">La flexibilidad del diafragma, relativa a los tabiques resistentes al cortante cuyas fuerzas está transmitiendo, también tiene una influencia importante sobre la naturaleza y magnitudes de estas fuerzas.</span><span lang="ES-TRAD"><span style="font-size: 12pt;">Las vigas de los pórticos y las que unen columnas y tabiques actúan como colectores que conducen las fuerzas horizontales del entrepiso a los elementos verticales. Cuando el entrepiso se mueve, los elementos verticales se oponen absorbiendo así las cargas sísmicas.</span></span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><h6 style="margin-left: 0cm; margin-right: 0cm;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">PÓRTICOS</span></span></h6><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><span class="Apple-style-span" style="-webkit-border-horizontal-spacing: 0px; -webkit-border-vertical-spacing: 0px; -webkit-text-decorations-in-effect: none; -webkit-text-size-adjust: auto; -webkit-text-stroke-width: 0px; border-collapse: separate; letter-spacing: normal; line-height: normal; orphans: 2; text-indent: 0px; text-transform: none; white-space: normal; widows: 2; word-spacing: 0px;"><span style="font-size: 12pt;">Conocemos como pórticos a una<span class="Apple-converted-space"> </span> combinación de columnas y vigas, generalmente horizontales que tienen los extremos restringidos (restringe los tres grados de libertad en el plano, funciona como un empotramiento). <span class="Apple-converted-space"> </span>Capaces de soportar cargas verticales y horizontales. Se construyen de hormigón armado, acero o madera.<span class="Apple-converted-space"> </span>E</span><span style="font-size: 12pt;">n estructuras con alto grado de hiperestaticidad, <span class="Apple-converted-space"> </span>con un gran número de nudos con capacidad de plastificarse generando rótulas, que actúan como fusibles disipando la energía que el sismo induce en la estructura.<span class="Apple-converted-space"> </span>Son estructuras más dúctiles que los otros tipos estructurales y su trabajo es de flexión. El pórtico es más flexible que el tabique y por consecuencia se deforma más. En edificios de altura, las secciones de estos elementos disminuyen desde los pisos inferiores a los pisos superiores. En algunos casos, responden a una necesidad estructural del diseño, ya <span class="Apple-converted-space"> </span>que permiten aberturas. Si comparamos el comportamiento de pórticos resueltos de un tramo y dos tramos, para cargas verticales y horizontales, se observa que si las cargas sísmicas son más importantes conviene la solución de un tramo, en tanto que si predominan las cargas verticales conviene la solución de dos tramos.</span></span></div><div align="justify" class="MsoNormal" style="margin: 0cm 0cm 0pt;"><br />
</div><span style="color: black;"></span><a href="" name="6982945722458085426" style="color: black;"></a> </div></div></div><h3 class="post-title entry-title" style="color: black;"> <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/06/funciones-de-vulnerabilidad-calculadas.html">Funciones de vulnerabilidad calculadas para edificaciones en muros de hormigón reforzado</a> </h3><span style="color: black;"> </span><div class="post-header" style="color: black;"> <div class="post-header-line-1"><span class="post-author vcard"> Publicado por <span class="fn">Fernando Arancibia Carvallo</span> </span> <span class="post-labels"> Etiquetas: <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/search/label/Vulnerabilidad%20Sismica" rel="tag">Vulnerabilidad Sismica</a> </span> </div></div><span style="color: black;"> </span> <b style="color: black;">1. Introducción</b><span style="color: black;"> </span><br style="color: black;" /><span style="color: black;"> En el desarrollo de los planes de ordenamiento territorial (POT) de las ciudades, se debe involucrar lo correspondiente a los escenarios de daño debido a amenazas naturales; y dentro de ello lo relacionado con los sismos es de gran importancia. Por consiguiente, es fundamental contar con estudios que permitan conocer el grado de daño que pueden alcanzar las edificaciones ante la acción de un sismo. De esta manera se puede planificar el desarrollo urbano, mitigar el riesgo y preparar a la comunidad para responder ante una amenaza sísmica. </span><br style="color: black;" /><span style="color: black;"> Dentro de la estimación del daño se deben establecer las diferencias entre las distintas tipologías estructurales que existen en las edificaciones de una ciudad. En la actualidad el sistema de muros estructurales de hormigón es uno de los sistemas estructurales más usados en las ciudades colombianas; sin embargo, es uno de los menos considerados en este tipo de estudios. De aquí la importancia de investigar, y proponer modelos que estimen los niveles de daño que pueden alcanzar las edificaciones correspondientes a este sistema estructural, cuando ocurre un terremoto. </span><br style="color: black;" /><span style="color: black;"> Independiente del sistema estructural los modelos para evaluar la vulnerabilidad; generalmente, cuantifican el daño a través de un índice de daño, el cual se determina bien sea por medio de las funciones de vulnerabilidad o por medio de las matrices de probabilidad de daño. Las principales metodologías usadas para la construcción de las funciones y las matrices, básicamente difieren en los datos, dado que pueden ser experimentales, analíticas o estar basadas en observaciones de campo o en la opinión de expertos. En el caso de la aplicación a ciudades colombianas, en las cuales no se cuenta con datos de daños sísmicos reales, ni con información experimental, se debe pensar en modelos aplicables a nuestros medios superando las deficiencias de la información. Por consiguiente, para superar este inconveniente se propone un modelo que considere las características de las edificaciones del entorno colombiano y que se base en opinión de expertos. </span><br style="color: black;" /><span style="color: black;"> De esta forma, el presente trabajo ofrece un modelo de evaluación de la vulnerabilidad sísmica de edificaciones construidas con muros de hormigón reforzado basado en funciones de vulnerabilidad, las cuales involucran aspectos estructurales y constructivos del medio colombiano. </span><br style="color: black;" /><span style="color: black;"> </span><b style="color: black;">2. Funciones de vulnerabilidad</b><span style="color: black;"> </span><br style="color: black;" /><span style="color: black;"> Una función de vulnerabilidad es una relación matemática que expresa de forma continua el daño que puede sufrir un tipo específico de estructura, cuando se somete a una solicitación sísmica de determinado nivel. Las funciones de vulnerabilidad se deducen por medio de una regresión estadística de los datos de daño observados o generados artificialmente. Una de sus principales variantes la constituyen las funciones de vulnerabilidad que relacionan un índice de vulnerabilidad con un índice de daño, condicionado por un parámetro que describe el movimiento del terreno; este parámetro puede ser la aceleración máxima Aa, o una de las escalas de intensidad sísmica, tales como MSK y MMI. </span><br style="color: black;" /><span style="color: black;"> Las funciones de vulnerabilidad pueden ser calculadas o definidas a través de datos observados (Caicedo et al., 1994). Las observadas se basan en información existente de registros de daño debidos a sismos, a diferencia de las calculadas, que dada la falta de esta información, simulan las características de las edificaciones para evaluar el daño. </span><br style="color: black;" /><span style="color: black;"> Trabajos anteriores realizados (Maldonado et al., 2008 a, b y Maldonado y Chio, 2009) proponen funciones para las edificaciones de mampostería, de hormigón en sistema pórtico y de tierra. En el documento WP4 (Milutinovic y Trendafiloski, 2003) se presentan matrices de probabilidad de daño para edificaciones de muros en hormigón. </span><br style="color: black;" /><span style="color: black;"> </span><b style="color: black;">3. Metodología para la construcción de las funciones de vulnerabilidad</b><span style="color: black;"> </span><br style="color: black;" /><span style="color: black;"> El procedimiento realizado para la definición de la función de vulnerabilidad en el presente trabajo, se basó en un análisis del comportamiento de las edificaciones ante la acción de un terremoto, a través del modelamiento estructural de una muestra representativa de las edificaciones de la ciudad de Bucaramanga en Colombia, realizando el siguiente procedimiento: </span><br style="color: black;" /><span style="color: black;"> a) Recolección de información sobre aspectos arquitectónicos y estructurales a partir de planos estructurales y de visitas de campo. </span><br style="color: black;" /><span style="color: black;"> b) Identificación de los parámetros que más influyen en la vulnerabilidad sísmica de estas edificaciones. </span><br style="color: black;" /><span style="color: black;"> c) Generación de modelos a partir de la información recopilada. Algunos modelos fueron denotados como reales dado que dependieron totalmente de la información de los planos y otros se llamaron hipotéticos o simulados debido a que fueron construidos variando algunas características de los reales. De esta forma se pretendió representar la variación de las características de las edificaciones de este tipo estructural. </span><br style="color: black;" /><span style="color: black;"> d) Cuantificación de la vulnerabilidad de cada edificación a través de un índice de vulnerabilidad a partir de la adaptación de la metodología propuesta por Benedetti y Petrini (1984). </span><br style="color: black;" /><span style="color: black;"> e) Análisis no lineal de cada modelo, incorporando las rotulas de cortante y la interacción momento - carga axial. </span><br style="color: black;" /><span style="color: black;"> f) Cálculo de un índice global de daño para cada edificación, ante diferentes solicitudes sísmicas, utilizando la metodología propuesta en el WP4 (Milutinovic y Trendafiloski, 2003). </span><br style="color: black;" /><span style="color: black;"> g) Relación de los valores del índice de vulnerabilidad con el índice de daño para cada acción sísmica definida, y con ellos definición de las funciones de vulnerabilidad. </span><br style="color: black;" /><span style="color: black;"> </span><b style="color: black;">4. Muestra de edificaciones para la construcción de funciones</b><span style="color: black;"> </span><br style="color: black;" /><span style="color: black;"> La muestra sobre la que se construyeron las funciones de vulnerabilidad la conformaron 38 edificaciones construidas en muros de hormigón, 32 corresponden a reales y 6 definidas a partir de las reales, las cuales se les llamó hipotéticas o simuladas; ver </span><a href="http://www.scielo.cl/scielo.php?script=sci_arttext&pid=S0718-50732010000100003&lng=es&nrm=iso&tlng=es#tabla1" style="color: black;">Tabla 1</a><span style="color: black;">. En esta tabla se identifica cada una por un número y se indica el tipo de modelo generado; el real es elaborado a partir de información existente de planos y complementado con visitas de campo, el hipotético es simulado a partir de uno real con variaciones de sus propiedades. A su vez, en la tabla se describe el periodo de construcción de la edificación de manera que ofrezca una indicación acerca del código de construcción utilizado en su diseño y construcción, el número de pisos y el área en planta. </span><br style="color: black;" /><span style="color: black;"> </span><a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/search?updated-min=2011-06-01T00%3A00%3A00-04%3A00&updated-max=2011-07-01T00%3A00%3A00-04%3A00&max-results=3" name="tabla1" style="color: black;"></a><br style="color: black;" /><span style="color: black;"> </span><b style="color: black;">Tabla 1.</b><span style="color: black;"> Muestra de edificaciones de muros de hormigón</span><br style="color: black;" /><span style="color: black;"> </span><img height="490" src="http://www.scielo.cl/fbpe/img/ric/v25n1/art3.1.jpg" style="color: black;" width="330" /><br />
Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-67609914356422259582011-08-11T23:28:00.000-05:002011-08-11T23:28:03.087-05:00El puente de vidrio<h3 class="post-title entry-title"> <a href="http://facingyconst.blogspot.com/2009/09/el-puente-de-vidrio.html"><br />
</a> </h3><div class="post-header"> <div class="post-header-line-1"><span class="post-labels"> Etiquetas: <a href="http://facingyconst.blogspot.com/search/label/Mega%20Proyectos" rel="tag">Mega Proyectos</a> </span> <span class="post-author vcard"> Publicado por <span class="fn">Fernando Arancibia Carvallo</span> </span> <span class="post-icons"> <span class="item-action"> <a href="http://www.blogger.com/email-post.g?blogID=21072581&postID=3212116723221840046" title="Enviar la entrada por correo electrónico"> <img alt="" class="icon-action" height="13" src="img/icon18_email.gif" width="18" /> </a> </span> </span> <span class="post-backlinks post-comment-link"> </span> </div></div><div id="wrapper"> <div id="highlands"> <div id="column1"> <div class="post"> <div class="entry"> <div align="justify"><span>Skywalk comúnmente conocido como El Puente de vidrio es uno de los proyectos aspirantes a la ingeniería civil, que muestra el pensamiento sin precedentes de la construcción Civil.La Ingeniería civil de este puente de cristal comenzó en marzo de 2004. Vidrio puente será suspendido 4,000 pies sobre el río Colorado en el borde del Gran Cañón.</span> <span> En 2005, se puso a prueba por su capacidad estructural y los resultados fueron realmente muy bueno.</span> <span> Pasó todos sus requisitos de ingeniería en un 400 por ciento y por lo tanto la carga total que este puente de vidrio es capaz de soportar es igual al peso de 71 a plena carga aviones Boeing 747 que es más que 71 millones de libras.</span><span> El puente será capaz de sostener vientos de más de 100 millas por hora desde las 8 direcciones diferentes, así como de un terremoto de magnitud 8.0 a 50 millas.</span> <span> Se dice que más de un millón de libras de acero se utiliza en la construcción de recorrer el cielo del Gran Cañón.</span> </div><div align="justify"><span>Las siguientes son las imágenes de este maravilloso proyecto --</span> </div><div style="text-align: center;"><img alt="Skywalk-vidrio-novia-civil-engineering-pregunto-1" height="474" src="http://www.engineeringcivil.com/wp-content/uploads/2008/03/glass_bridge_engineering_wonder_1.jpg" width="360" /></div><div align="justify"><span>El punto de vista de este puente de vidrio es</span> </div><div align="left" style="text-align: center;"><img alt="Skywalk-vidrio-novia-civil-engineering-pregunto-2" height="474" src="http://www.engineeringcivil.com/wp-content/uploads/2008/03/glass_bridge_engineering_wonder_2.jpg" width="361" /></div><span>También puedes ver este vídeo para una sensación real del puente</span> <br />
</div></div></div></div></div><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen='allowfullscreen' webkitallowfullscreen='webkitallowfullscreen' mozallowfullscreen='mozallowfullscreen' width='320' height='266' src='https://www.youtube.com/embed/BvzlZuWrJNw?feature=player_embedded' frameborder='0'></iframe></div><br />
Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-39573413297460852972011-08-11T08:25:00.000-05:002011-08-11T08:25:20.307-05:00Hundimientos de Suelo<br />
<br />
<h3 class="post-title entry-title"> <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/08/hundimientos-de-suelo.html">Hundimientos de Suelo</a> </h3><div class="post-header" style="text-align: justify;"> <div class="post-header-line-1"><span class="post-author vcard"> Publicado por <span class="fn">Fernando Arancibia Carvallo</span> </span> <span class="post-labels"> Etiquetas: <a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/search/label/Licuefaccion%20del%20Suelo" rel="tag">Licuefaccion del Suelo</a></span></div><div class="post-header-line-1"><span class="post-labels"> </span> </div></div>Un hundimiento de suelo es un movimiento de la superficie terrestre en el que predomina el sentido vertical descendente y que tiene lugar en áreas aclinales o de muy baja pendiente. Este movimiento puede ser inducido por distintas causas y se puede desarrollar con velocidades muy rápidas o muy lentas según sea el mecanismo que da lugar a tal inestabilidad. <br />
Si el movimiento vertical es lento o muy lento (metros ó centímetros / año) y afecta a una superficie amplia (km<sup>2</sup>) con frecuencia se habla de <a href="http://es.wikipedia.org/wiki/Subsidencia">subsidencia</a>. Si el movimiento es muy rápido (m/s) se suele hablar de <a href="http://es.wikipedia.org/w/index.php?title=Colapso&action=edit&redlink=1">colapso</a>. <br />
Las causas de la subsidencia pueden ser, entre otras: <br />
- <b>La respuesta de los materiales geológicos ante los esfuerzos tectónicos</b>. <br />
<b>- Las variaciones en el nivel freático o en el estado de humedad del suelo</b>, por ejemplo como consecuencia de la explotación de acuíferos. <br />
- <b>La actividad minera subterránea</b>, por ejemplo tras el abandono de galerías subterráneas. <br />
Por su parte, las causas de los colapsos implican el fallo de la estructura geológica que sostiene una porción del terreno bajo el cual existe una cavidad, lo que puede venir motivado por la disolución de las rocas hasta el límite de la resistencia de los materiales o el vaciado de acuíferos o en general el debilitamiento por meteorización física o química de una estructura que alberga una cavidad. El aprovechamiento de los recursos naturales (actividad minera, explotación de acuíferos) también puede inducir colapsos. <br />
Los hundimientos son comunes en donde la roca que existe debajo de la superficie es piedra caliza, roca de carbonato, tiene capas de sal o son rocas que pueden ser disueltas naturalmente por la misma circulación del agua subterránea. Al disolverse la roca, se forman espacios y cavernas subterráneas. <br />
La apariencia de los hundimientos es impresionante porque la tierra se mantiene usualmente intacta por cierto tiempo hasta que los espacios adentro de la tierra subterránea se hacen demasiado grandes para seguir dando suficiente apoyo a la tierra de la superficie. Si no se cuenta con suficiente apoyo para la tierra que se encuentra sobre los espacios y cavernas subterráneas, entonces puede ocurrir un colapso súbito en la tierra. <br />
<br />
<b><u>RESPUESTA DE LOS MATERIALES GEOLÓGICOS ANTE LOS ESFUERZOS TECTÓNICOS DISTENSIVOS</u></b><b>.</b> <br />
Al hablar de este punto hablamos de las fallas que es la deformación que se identifica con una fractura de los materiales rocosos, acompañada de un desplazamiento de los bloques fallados. Las fallas se producen en respuesta a esfuerzos tectónicos compresivos y distensivos en los que, respectivamente, los esfuerzos mayores se producen en la horizontal (en compresión), o en la vertical (en distensión). La variedad de fallas es muy grande, produciéndose a todas las escalas, desde el milímetro hasta la centena de kilómetros. El valor del desplazamiento entre los bloques también es muy variable, desde el milímetro hasta varios kilómetros. El aspecto que presentan puede ser muy variable, dependiendo de la litología que afectan, de la profundidad y temperatura a la que se han originado, de la intensidad del esfuerzo tectónico, de la velocidad de deformación y de los fluidos que impregnan las rocas. <br />
Los elementos que se pueden observar en una falla son: los bloques, que corresponden a las partes separadas por la falla; el plano de falla, que es la superficie de fractura a lo largo de la cual se deslizan ambos bloques; el escarpe de falla, que es la altura del desplazamiento entre los dos bloques, y el salto o desplazamiento que es la longitud del desplazamiento entre los dos bloques. <br />
La clasificación de las fallas se realiza basándose en diferentes criterios. Según el desnivel del plano de falla, las fallas se clasifican en verticales e inclinadas. Atendiendo el sentido del movimiento, las fallas se subdividen en fallas normales, inversas, direccionales y rotacionales. Las fallas normales se originan mediante una tectónica distensiva, con planos de falla inclinados en donde el bloque hundido es el superior. Las fallas inversas se originan mediante una tectónica compresiva, en donde el bloque superior se levanta respecto al inferior. Cuando los planos de las fallas inversas se presentan escalonados, o bien con inclinaciones de poco ángulo, se denominan cabalgamientos. Las fallas direccionales son las que presentan planos de falla verticales, pero con un desplazamiento horizontal; se denominan dextras si el desplazamiento se produce en el mismo sentido que las agujas del reloj, mientras que si el desplazamiento se realiza en sentido contrario, se denominan sinistras: Las fallas rotacionales son las que un bloque se desplaza respecto al otro, produciendo un movimiento circular, donde existe un punto inmóvil. <br />
<br />
<b><u>LAS VARIACIONES EN EL NIVEL FREÁTICO O EN EL ESTADO DE HUMEDAD DEL SUELO.</u></b> <br />
El agotamiento de la presión producto de la extracción de fluidos de un yacimiento productivo puede conducir a la compactación del mismo, además del movimiento de los estratos de sobrecarga y por ende a la subsidencia de la superficie.<br />
La subsidencia es el hundimiento progresivo de la superficie con respecto a un nivel de referencia estable, producido por causas naturales como la actividad tectónica, fallas activas y expulsión de fluidos en estratos subyacentes. Se puede incrementar la tasa de subsidencia con la extracción de fluidos como agua e hidrocarburos. <br />
La compactación es la reducción del volumen en un yacimiento resultado del agotamiento de la presión y la producción de fluidos. Si el material posee una alta porosidad, inmediatamente luego de su sedimentación podría comportarse más como un medio líquido con partículas sólidas en suspensión en lugar de un sólido contenedor de líquido. Siempre que estos fluidos tengan una trayectoria, fracciones del líquido serán expulsadas a medida que la depositación de capas suprayacentemente aumenten el peso que debe ser soportado por el material original y también conlleva una reducción de la porosidad.<br />
Junto con el aumento de la profundidad también aumenta la presión del fluido, pero si entre los estratos existe una capa impermeable que no permite la comunicación del fluido y éste no puede escapar lateralmente, entonces se producen sobrepresiones anormales mayores a lo que produciría el efecto hidrostático. Este efecto se encuentra también en los casos en que los procesos de sedimentación superan en velocidad a la expulsión del fluido excedente. <br />
El principio del esfuerzo efectivo establece que cuando existe un fluido presurizado dentro de un material sólido, ambos soportan los esfuerzos que sobre ellos se ejerce. Por lo tanto cuando es producido el fluido el peso de los estratos suprayacentes no disminuye pero sí la presión de poros, incrementando el esfuerzo vertical que soporta la matriz sólida.<br />
Es la compresibilidad la propiedad de la roca que relaciona los cambios de volumen con las variaciones en el esfuerzo aplicado sobre la matriz. Al considerarse incompresibles los granos, el cambio del volumen aparente de un cuerpo poroso es resultado cambio del volumen del espacio poroso. El valor de la compresibilidad depende de la composición mineralógica de la roca y la historia de sedimentación, así como de la composición del fluido intersticial, y el material cementante que se adhiere a los grano incrementa su rigidez.<br />
Vemos que el esfuerzo predominante de subsidencia es vertical, pero también se originan esfuerzos horizontales, los cuales suelen ser nulos en el centro y los bordes, incrementándose hacia la región intermedia. Estos movimientos pueden tener efectos devastadores en las estructuras de superficie, sobretodo si la rigidez de la roca no permite la deformación en subsuelo. <br />
<br />
<b><u>PLACAS TECTÓNICAS</u></b> <br />
La tectónica de placas afirma que la corteza de la Tierra (litosfera) se divide en fragmentos de placas semirrígidas, semejantes a las piezas de un rompecabezas llamadas placas “litosféricas” que flotan sobre la astenosfera, que es un estrato de roca líquida del manto, cuyo material que aflora por los bordes de las placas, hacen que se separen. <br />
Hasta el momento se han detectado 15 placas: la del Pacífico, la Suramericana, la Norteamericana, la Africana, la Australiana, la de Nazca, la de los Cocos, la Juan de Fuca, la Filipina, la Euroasiática, la Antártica, la Arábiga, la Índica, la del Caribe y la Escocesa. Aunque existe una gran variedad de placas, los tipos de contactos o fronteras entre ellas son únicamente tres: márgenes de extensión (divergencia), márgenes de subducción (convergencia) y márgenes de transformación (deslizamiento horizontal). El movimiento de estas placas se realiza por medio de rotaciones en torno a un eje o polo que pasa por el centro de la Tierra. <br />
El problema geométrico del movimiento de las placas consiste en establecer los polos de rotación de cada una de ellas y su velocidad angular. La actual división de los continentes, es debida a una fracturación que se inicia hace unos doscientos millones de años. <br />
<b>a) </b><b><u>Márgenes de extensión (divergencia):</u></b> <br />
Las placas se separan una de la otra, surgiendo en el espacio resultante una nueva Litósfera. Formándose cuando los márgenes de extensión van generando en forma de lava la nueva litósfera que al llegar a la superficie se enfría y se incorpora a la corteza. Lo constituyen las dorsales oceánicas como la Cordillera Centro-Atlántica, (Observar imagen N°3) formada por una cadena montañosa de origen volcánico. El grosor de los sedimentos marinos aumenta en la función de la distancia de separación, así como su edad. <br />
<b>b) </b><b><u>Márgenes de subducción (convergencia):</u></b> <br />
En los márgenes de subducción o convergencia, este movimiento permite que la placa se introduzca en el manto por debajo de otra, produciéndose la destrucción de una de las placas. En este proceso se puede distinguir tres tipos de convergencia de placas: <br />
· Continental - Continental (Placa de la India y Euroasia), <br />
· Continental - Oceánica (Placa de Nasca y Sudamérica) <br />
· Oceánica - Oceánica (Placa de Nueva Guinea). <br />
<b>c) </b><b><u>Márgenes de transformación (deslizamiento horizontal):</u></b> <br />
En los márgenes de fractura, las placas se deslizan horizontalmente, una con respecto a la otra sin que se produzca la destrucción de las mismas. Formada por fallas con movimiento totalmente horizontal y cuyo ejemplo, más común, es la falla de San Andrés en California (EEUU). <br />
<a href="http://lh5.ggpht.com/-J-XJA1a2_zI/Tj7gkVa13jI/AAAAAAAAQbk/zJIcAR6Pc8U/s1600-h/clip_image002%25255B4%25255D.jpg"><img alt="clip_image002" border="0" height="570" hspace="12" src="http://lh6.ggpht.com/-vcwvQhalDQA/Tj7gmCKvfPI/AAAAAAAAQbo/r24Pr7tz1vw/clip_image002_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image002" width="454" /></a> <br />
Figura N° 2. Falla de San Andrés <br />
En este tipo de Fallas, el desplazamiento horizontal se termina súbitamente en los dos extremos de la misma, debido a que conectan zonas en extensión y subducción entre sí o unas con otras. Estas fallas son necesarias para explicar el movimiento de las placas, que no sería posible sin este tipo de margen. <br />
<a href="http://lh6.ggpht.com/-qTxpz24xBvE/Tj7goDcrO8I/AAAAAAAAQbs/qhimq6CReSc/s1600-h/clip_image004%25255B4%25255D.jpg"><img alt="clip_image004" border="0" height="235" src="http://lh3.ggpht.com/-fXkYtgLp8sc/Tj7gpwOt80I/AAAAAAAAQbw/bN7f2cOI92g/clip_image004_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image004" width="454" /></a> <br />
Imagen N° 3. Placas Tectónicas. <br />
<b><u>LICUEFACCIÓN</u></b> <br />
Consiste en el hundimiento súbito del mismo debido a que la resistencia al corte es muy pequeña o nula, por causa del aumento de la presión del agua contenida en el suelo al suceder la vibración sísmica, lo que puede ser catastrófico. <br />
Este fenómeno se da en terrenos poco consolidados o suelos arcillosos. Cuando se produce la licuefacción, los edificios y casas se encuentran flotando en un lodo inestable saturado en agua, y por lo tanto pierden la estabilidad. La pérdida de resistencia del suelo hace que las estructuras sean arrastradas sobre la masa de suelo líquido. <br />
La imagen N°7. Muestra el efecto devastador y asombroso del terremoto de Niigata. Los edificios de vivienda caen tumbados como si fueran de juguete, sin que llegue a romperse la estructura.<a href="" name="_ftnref1_6839">[A]</a> <br />
<a href="http://lh6.ggpht.com/-i03V7gfejcE/Tj7gq0hwy_I/AAAAAAAAQb0/nW5eAzFu1y8/s1600-h/clip_image006%25255B4%25255D.jpg"><img alt="clip_image006" border="0" height="306" hspace="12" src="http://lh3.ggpht.com/-X2fJ3x3f4Aw/Tj7gsSB7hJI/AAAAAAAAQb4/f2Ltgi46WjE/clip_image006_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image006" width="454" /></a> <br />
Existen cuatro tipos básicos de fallas del terreno asociadas con la licuefacción: <br />
· Flujos de tierra. Los materiales del suelo se desplazan rápidamente cuesta abajo en un estado licuado. <br />
· Flujo lateral. Desplazamiento limitado de las capas superficiales del suelo por pendientes suaves o hacia superficies libres, como márgenes del río. <br />
· Flotación. Objetos enterrados, menos pesados que el suelo licuado desplaza, como tanques, buzones o tuberías de gravedad, flotan en la superficie. <br />
<a href="http://lh4.ggpht.com/-T0ey6cfcreM/Tj7guaPErzI/AAAAAAAAQb8/fZYnuEP--8s/s1600-h/clip_image008%25255B4%25255D.gif"><img alt="clip_image008" border="0" height="270" hspace="12" src="http://lh5.ggpht.com/-HEJWqChxMZM/Tj7gw1ffvZI/AAAAAAAAQcA/EzWt4McSuL8/clip_image008_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image008" width="454" /></a> <br />
Figura N°8. Buzón flotante como resultado de la licuefacción después del terremoto en Niigata, Japón <br />
· <a href="http://lh6.ggpht.com/-BH_cZ09_BkQ/Tj7gzBQbERI/AAAAAAAAQcE/q86-PNiVswc/s1600-h/clip_image010%25255B4%25255D.jpg"><img alt="clip_image010" border="0" height="263" hspace="12" src="http://lh3.ggpht.com/-6KqSVfyej4Q/Tj7g0RH_4VI/AAAAAAAAQcI/X2vt-gEW7YM/clip_image010_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image010" width="454" /></a>Pérdida de resistencia de <br />
<a href="" name="more"></a>soporte. Reducción de la capacidad de soporte de los cimientos debido al debilitamiento del material del suelo inferior o contiguo que puede hacer que las estructuras se hundan. <br />
Figura N° 9. <br />
<b>Factores de la licuefacción</b> <br />
Gracias a la experiencia se ha demostrado que existen siete factores importantes para determinar el potencial de un suelo para licuarse: <br />
· <b>Distribución del tamaño de los granos.</b> La arena uniformemente graduada, con granos pocos finos o muy gruesos (arena limpia) tiene mayor probabilidad de licuarse y es posible que se vuelva más densa. Las arenas limosas y gravas también son susceptibles a la licuefacción bajo cargas cíclicas muy severas. <br />
· <b>Profundidad de las aguas subterráneas</b>. Puede ocurrir licuefacción si existe agua subterránea. Mientras menor sea la profundidad, menor será el peso del recubrimiento del suelo y el potencial de que ocurra densificación. Por lo tanto mayor será la probabilidad de que ocurra licuefacción. <br />
· <b>Densidad</b>. La licuefacción ocurre principalmente en suelos sueltos, saturados y no cohesivos. Se produce una acumulación gradual de la presión de poros dentro del depósito de suelo, en deterioro de los esfuerzos efectivos, tal que si el número de aplicaciones de carga resulta suficiente, los esfuerzos efectivos se anulan, quedando el suelo licuado si su resistencia al corte es de tipo friccional; el suelo así se ha transformado en un pantano. Después del proceso y cuando las presiones de poros se han disipado el suelo volverá a su condición hidrostática sufriendo densificación por reacomodo de su estructura (el pantano se vuelve tierra firme y se asienta). <br />
Si el suelo es denso, habrá menos posibilidad de que se produzca la licuefacción. <br />
· <b>Peso del recubrimiento y profundidad del suelo.</b> Las tensiones entre partículas aumentan a medida que se incrementa la presión del recubrimiento. Mientras mayor sea la tensión entre las partículas, menor será la probabilidad de que ocurra la licuefacción. Por lo general, la licuefacción ocurre a profundidades menores de 30 pies (9 metros); rara vez ocurre a profundidades mayores de 50 pies (15 metros). <br />
· <b>Amplitud y duración de la vibración del terreno</b>. La capacidad del suelo para resistir una vibración sin causar fallas depende de la intensidad del movimiento del terreno, incluida tanto su amplitud como su duración. Los movimientos más fuertes tienen mayor probabilidad de causar fallas. La licuefacción de suelos bajo condiciones de tensión provocadas por un terremoto puede ocurrir, ya sea cerca del epicentro durante terremotos pequeños o moderados, o a cierta distancia en caso de terremotos moderados a severo. <br />
· <b>Edad del depósito</b>. Los suelos débiles y no cohesivos por lo general son jóvenes. Con el tiempo, actúan dos factores para incrementar la resistencia de un suelo típico: la compactación (que cambia la relación de vacíos) y varios procesos químicos (que actúan para cementar los granos del suelo). <br />
· <b>Origen del suelo.</b> El suelo depositado por procesos fluviales se sedimenta fácilmente y sus granos tienen poca probabilidad de compactarse. Similar a lo que sucede en los rellenos artificiales no compactados, generalmente por debajo del nivel del agua, pueden tener deficiencias similares. Una práctica común de décadas pasadas era la colocación de los rellenos hidráulicamente. Todos ellos se licuarán con facilidad. Por otro lado, los sedimentos depositados glacialmente, particularmente aquellos sobre los cuales ha pasado un glaciar, generalmente ya son bastante densos y tienen menor probabilidad de licuarse. <br />
<br />
<h4 style="text-align: justify;"><a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/08/hundimientos-de-suelo.html" name="presiondea">Presión de hundimiento</a></h4><b>1. <u>CONCEPTO</u>.-</b> <br />
En un cimiento, la aplicación de una carga vertical creciente V, da lugar a un asiento creciente. (Figura 1). Las diversas formas que pueden adoptar las curvas de presión-asiento dependen en general de la forma y el tamaño de la zapata, de la naturaleza y resistencia del suelo y de la carga aplicada (tipo, velocidad de aplicación, frecuencia, etc.) <br />
<a href="http://lh6.ggpht.com/-9-Gcyr_e1rc/Tj7g1gzZSMI/AAAAAAAAQcM/kscgTBs50lY/s1600-h/clip_image012%25255B4%25255D.jpg"><img alt="clip_image012" border="0" height="248" hspace="12" src="http://lh6.ggpht.com/-NefD0l1ojBI/Tj7g232Id6I/AAAAAAAAQcQ/IxwQpvOqrV0/clip_image012_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image012" width="454" /></a> <br />
Mientras la carga V sea pequeña o moderada, el asiento crecerá de manera aproximadamente proporcional a la carga aplicada. Sin embargo, si la carga V sigue aumentando, la pendiente de la relación asiento-carga se acentuara, llegando finalmente a una situación en la que pueda sobrepasarse la capacidad portante del terreno, agotando su resistencia al corte y produciendo movimientos inadmisibles, situación que se identifica con el hundimiento. <br />
La carga V para la cual se alcanza el hundimiento es en función de la resistencia al corte del terreno, de las dimensiones y forma de la cimentación, de la profundidad a la que esta situada, del peso especifico del terreno y de las condiciones del agua subálvea. <br />
<b>2. <u>ESTADO LIMITE ULTIMO DE HUNDIMIENTO</u>.-</b> <br />
<a href="http://lh4.ggpht.com/-dtTfZs4_MqM/Tj7g3uJ3PWI/AAAAAAAAQcU/j7ras0HMnbY/s1600-h/clip_image014%25255B4%25255D.jpg"><img alt="clip_image014" border="0" height="345" hspace="12" src="http://lh4.ggpht.com/-U4iByTDtnDg/Tj7g6thjyuI/AAAAAAAAQcY/_Md7k7JysVc/clip_image014_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image014" width="454" /></a> <br />
El hundimiento se alcanzara cuando la presión actuante (total bruta) sobre el terreno bajo la cimentación supere la resistencia característica del terreno frente a este modo de rotura, también llamada presión de hundimiento. <br />
La resistencia del terreno puede expresarse para cada situación de dimensionado mediante la siguiente ecuación: <br />
<a href="http://lh3.ggpht.com/-8eWnWbC12Ss/Tj7g8jJSLgI/AAAAAAAAQcc/Mn2nd07LyYc/s1600-h/clip_image016%25255B6%25255D.gif"><img alt="clip_image016" border="0" height="66" src="http://lh4.ggpht.com/-6vfoxiqNX9o/Tj7g-OLJZiI/AAAAAAAAQcg/x3SfE-4NzcI/clip_image016_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image016" width="84" /></a> <br />
Siendo: <br />
<a href="http://lh5.ggpht.com/-G7jo06E6kgw/Tj7g_ApiV3I/AAAAAAAAQck/4wEeOn1GUPI/s1600-h/clip_image018%25255B6%25255D.gif"><img alt="clip_image018" border="0" height="34" src="http://lh6.ggpht.com/-OmzTSZn_gB0/Tj7hAnBdiyI/AAAAAAAAQco/fo1NI0aQa2w/clip_image018_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image018" width="28" /></a>: El valor característico de la presión de hundimiento (qh) <br />
<a href="http://lh5.ggpht.com/-D_3rf6eE6t4/Tj7hBsXQzSI/AAAAAAAAQcs/NLec31cycmI/s1600-h/clip_image020%25255B6%25255D.gif"><img alt="clip_image020" border="0" height="32" src="http://lh4.ggpht.com/-zzvYvFUhSU4/Tj7hCfEIT9I/AAAAAAAAQcw/EitJxQnYAeU/clip_image020_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image020" width="26" /></a>: El coeficiente parcial de resistencia. <br />
<b>3. </b><b><u>PRESIÓN ADMISIBLE Y DE HUNDIMIENTO</u></b><b>.</b> <br />
<b>3.1 <u>DEFINICIONES</u>.- </b> <br />
Se emplearan los siguientes términos en cuanto a la identificación de las presiones en relación con los principios clásicos de la mecánica del suelo. <br />
<a href="http://lh4.ggpht.com/-8u1QWvYfEro/Tj7hDqWLGsI/AAAAAAAAQc0/rSR533n8ljI/s1600-h/clip_image022%25255B4%25255D.jpg"><img alt="clip_image022" border="0" height="145" hspace="12" src="http://lh5.ggpht.com/-yWapjNabvZE/Tj7hEPEyd0I/AAAAAAAAQc4/hn5iDxyGDSc/clip_image022_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image022" width="454" /></a> <br />
a) Presión total bruta (qb): es la presión vertical total que actúa en la base del cimiento, definida como el cociente entre la carga total actuante, incluyendo el peso del cimiento y aquello que pueda gravitar sobre el, y el área equivalente del cimiento. <br />
b) Presión efectiva bruta (q’b): es la diferencia entre la presión total bruta y la presión intersticial de equilibrio, (u), al nivel de la base del cimiento. <br />
c) Presión total neta (qneta): es la diferencia entre la presión total bruta y la presión vertical total existente en el terreno (qo) al nivel de la base del cimiento (sobrecarga que estabiliza lateralmente al cimiento). La presión total neta es, por tanto, el incremento de presión vertical total a que se ve sometido el terreno por debajo del cimiento debido a las cargas de la cimentación. <br />
d) Presión efectiva neta (q’neta): es la diferencia entre la presión efectiva bruta y la presión efectiva vertical al nivel de la base del cimiento, debida a la sobrecarga. La presión total neta es igual a la efectiva neta. <br />
e) Presión vertical de hundimiento (qh, q’h): es la resistencia característica del terreno Rk para el estado límite último de hundimiento. Puede expresarse en términos de presiones totales o efectivas, brutas o netas. <br />
f) Presión vertical admisible (qadm., q’adm.): es la presión vertical admisible de una cimentación teniendo en cuenta no solo la seguridad frente al hundimiento, sino también su tolerancia a los asientos: por tanto igual o menor que la presión vertical admisible. Puede expresarse en términos de presiones totales efectivas, brutas o netas. <br />
<b>3.2. Métodos para la comprobación del estado limite último de hundimiento.-</b> <br />
En cimentaciones sobre todo tipo de suelos la presión admisible o valor de cálculo de resistencia del terreno Rd se podrá determinar mediante la expresión anteriormente citada: <br />
<a href="http://lh5.ggpht.com/-L6oqE8UuJjg/Tj7hE-VvZVI/AAAAAAAAQc8/5F664_VxQQM/s1600-h/clip_image016%25255B1%25255D%25255B3%25255D.gif"><img alt="clip_image016[1]" border="0" height="66" src="http://lh6.ggpht.com/-xPyimQ2T940/Tj7hHNXv_lI/AAAAAAAAQdA/abqiduVrQwQ/clip_image016%25255B1%25255D_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image016[1]" width="84" /></a> <br />
Siendo: <br />
<a href="http://lh5.ggpht.com/-j0hMQR6OZ7U/Tj7hIazFKUI/AAAAAAAAQdE/Jl0vmFu1wPk/s1600-h/clip_image018%25255B1%25255D%25255B3%25255D.gif"><img alt="clip_image018[1]" border="0" height="34" src="http://lh4.ggpht.com/-n5O6_RdERhw/Tj7hJqsTiOI/AAAAAAAAQdI/VOliDQeKsRc/clip_image018%25255B1%25255D_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image018[1]" width="28" /></a>: El valor característico de la presión de hundimiento (qh) <br />
<a href="http://lh5.ggpht.com/-GQINxRfoV-Q/Tj7hLdN5PrI/AAAAAAAAQdM/qiYJCXP6Woo/s1600-h/clip_image020%25255B1%25255D%25255B3%25255D.gif"><img alt="clip_image020[1]" border="0" height="32" src="http://lh6.ggpht.com/-y7gsaH-ZV-I/Tj7hMIHH7mI/AAAAAAAAQdQ/_0CX561-MEQ/clip_image020%25255B1%25255D_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image020[1]" width="26" /></a>: El coeficiente parcial de resistencia. <br />
<b>3.3. DETERMINACIÓN</b><b> DE LA PRESIÓN DE HUNDIMIENTO MEDIANTE MÉTODOS ANALÍTICOS. </b> <br />
<b>3.3.1 Expresión analítica básica </b> <br />
La presión de hundimiento de una cimentación directa vendrá definida por la ecuación siguiente. Podrá expresarse en presiones totales o efectivas, brutas o netas. <br />
<br />
<a href="http://lh3.ggpht.com/-7vNYIRQkRmE/Tj7hNGPQrmI/AAAAAAAAQdU/KBDqEuvfXHU/s1600-h/clip_image025%25255B5%25255D.gif"><img alt="clip_image025" border="0" height="38" src="http://lh3.ggpht.com/-jAzkJJeFRqs/Tj7hOeA75rI/AAAAAAAAQdY/xyvalGEL6ic/clip_image025_thumb%25255B2%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image025" width="350" /></a> <br />
SIENDO: <br />
<a href="http://lh4.ggpht.com/-UGG3WAIjdPc/Tj7hPc04aEI/AAAAAAAAQdc/8tObEirAGa4/s1600-h/clip_image027%25255B4%25255D.gif"><img alt="clip_image027" border="0" height="34" src="http://lh5.ggpht.com/-hIby5HBMsuo/Tj7hQtR4kCI/AAAAAAAAQdg/GJVXJAzp2gw/clip_image027_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image027" width="26" /></a>: La presión vertical de hundimiento o resistencia característica del terreno Rk. <br />
<a href="http://lh3.ggpht.com/-zrP3un5V0RE/Tj7hRbwnMDI/AAAAAAAAQdk/YvZ8kkqfUt8/s1600-h/clip_image029%25255B4%25255D.gif"><img alt="clip_image029" border="0" height="34" src="http://lh6.ggpht.com/-z0fCon8364Q/Tj7hSQAmISI/AAAAAAAAQdo/TTG4FJ5X5U8/clip_image029_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image029" width="39" /></a>: La presión vertical característica alrededor del cimiento al nivel de su base. <br />
<a href="http://lh3.ggpht.com/-bsFkjZCEHYE/Tj7hTXIbUoI/AAAAAAAAQds/ZdzOSqf4mnw/s1600-h/clip_image031%25255B4%25255D.gif"><img alt="clip_image031" border="0" height="32" src="http://lh3.ggpht.com/-i53x4-CZm3A/Tj7hUwapXPI/AAAAAAAAQdw/7H4uq6uq8tc/clip_image031_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image031" width="28" /></a>: El valor característico de la cohesión del terreno. <br />
<a href="http://lh6.ggpht.com/-puSTXKT_Ccs/Tj7hXgI9v-I/AAAAAAAAQd0/wxomargHyOE/s1600-h/clip_image033%25255B4%25255D.gif"><img alt="clip_image033" border="0" height="28" src="http://lh4.ggpht.com/-PqGtIpJwoCI/Tj7hYvSTSvI/AAAAAAAAQd4/mmKKSHrEbnY/clip_image033_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image033" width="30" /></a>: El ancho equivalente del cimiento. <br />
<a href="http://lh6.ggpht.com/-WgYSsoo22fM/Tj7hZHcvgzI/AAAAAAAAQd8/xoA1FugxKc4/s1600-h/clip_image035%25255B4%25255D.gif"><img alt="clip_image035" border="0" height="34" src="http://lh5.ggpht.com/-Q1Fk6fbGiMs/Tj7haLoSRcI/AAAAAAAAQeA/xwUuqWyYSiw/clip_image035_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image035" width="26" /></a>: El peso especifico característico del terreno por debajo de la base del cimiento. <br />
<a href="http://lh5.ggpht.com/-6NhSBYPSIEQ/Tj7han4sOGI/AAAAAAAAQeE/sYP5XNQ8Mvs/s1600-h/clip_image037%25255B4%25255D.gif"><img alt="clip_image037" border="0" height="49" src="http://lh5.ggpht.com/-7-76cRl6kmY/Tj7hbvLAvZI/AAAAAAAAQeI/KiqKU_l4AJU/clip_image037_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image037" width="107" /></a>: Los factores de capacidad de carga. Son adimensionales y dependen exclusivamente del valor característico del ángulo de rozamiento interno característico del terreno <a href="http://lh5.ggpht.com/-rrbRiSEZqsk/Tj7hcVBlpgI/AAAAAAAAQeM/Nr8HgdWHYkI/s1600-h/clip_image039%25255B4%25255D.gif"><img alt="clip_image039" border="0" height="34" src="http://lh5.ggpht.com/-QZT7KXA5djg/Tj7hdPauufI/AAAAAAAAQeQ/LuzIpOvypaE/clip_image039_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image039" width="43" /></a>. Se denominan respectivamente factor de cohesión, de sobrecarga y de peso específico. <br />
<a href="http://lh5.ggpht.com/-iWiJhqFMYJQ/Tj7hdy7Hx3I/AAAAAAAAQeU/0UXV3tXAtvg/s1600-h/clip_image041%25255B4%25255D.gif"><img alt="clip_image041" border="0" height="49" src="http://lh5.ggpht.com/-Cm80feIPYrc/Tj7hem5kYxI/AAAAAAAAQeY/iPxoNn_dLzk/clip_image041_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image041" width="94" /></a>: Los coeficientes correctores de influencia para considerar la resistencia al corte del terreno situado por encima y alrededor de la base del cimiento. Se denominan factores de profundidad. <br />
<a href="http://lh6.ggpht.com/-oWE0m1bJEYE/Tj7hf7RgHII/AAAAAAAAQec/SQ8liwBAIog/s1600-h/clip_image043%25255B4%25255D.gif"><img alt="clip_image043" border="0" height="49" src="http://lh4.ggpht.com/-Ysj3qXG8vHM/Tj7hgwZyUjI/AAAAAAAAQeg/u-0AXdrN2u4/clip_image043_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image043" width="92" /></a>: Los coeficientes correctores de influencia para considerar la forma n planta del cimiento. <br />
<a href="http://lh3.ggpht.com/-AIdjkfF4u4k/Tj7hhnjKGXI/AAAAAAAAQek/qBdw_MmOCkQ/s1600-h/clip_image045%25255B4%25255D.gif"><img alt="clip_image045" border="0" height="49" src="http://lh6.ggpht.com/-e80YoMg6rBY/Tj7hjV-GOoI/AAAAAAAAQeo/hevh_Beyokk/clip_image045_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image045" width="71" /></a>: Los coeficientes correctores de influencia para considerar el efecto de la inclinación de la resultante de las acciones con respecto a la vertical. <br />
<a href="http://lh4.ggpht.com/-eNaN4Je3hBA/Tj7hkiv3PXI/AAAAAAAAQes/lnvCLbF6nxg/s1600-h/clip_image047%25255B4%25255D.gif"><img alt="clip_image047" border="0" height="49" src="http://lh4.ggpht.com/-_-sKwpAEkF0/Tj7hmVC0H8I/AAAAAAAAQew/vVWFi4B8yUw/clip_image047_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image047" width="73" /></a>: Los coeficientes correctores de influencia para considerar la proximidad del cimiento a un talud. <br />
Los parámetros característicos de la resistencia al corte del terreno <a href="http://lh5.ggpht.com/-_Qy7JV9_WGY/Tj7hn6K_m9I/AAAAAAAAQe0/YuWkIrpVDnE/s1600-h/clip_image049%25255B4%25255D.gif"><img alt="clip_image049" border="0" height="32" src="http://lh4.ggpht.com/-i_851tm0TeI/Tj7hoyluPZI/AAAAAAAAQe4/PdcJZwfXleE/clip_image049_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image049" width="84" /></a>deben ser representativos, para cada situación de dimensionado, de la resistencia del terreno en una profundidad comprendida, al menos, entre vez <b>(1.0 B) </b>y vez y media <b>(1.5 B) </b>el ancho real de la cimentación <b>(B)</b>, a contar desde la base de esta. <br />
La expresión anterior se podrá ampliar con factores de influencia adicionales para tener en cuenta la existencia de una capa rígida a escasa profundidad bajo la cimentación, la inclinación de la base de la zapata, etc. Los factores a emplear en estos casos deben encontrarse suficientemente justificados y documentados, y se ajustaran a los criterios comúnmente aceptados en mecánica de suelos. <br />
A efectos prácticos, si el terreno es uniforme (de peso especifico aparente aproximado (18Kn/m3) y si la cimentación se encuentra por encima del nivel freático, sobre el terreno horizontal, se podrán tomar los valores de la presión de hundimiento que figuran a continuación, validos para zapatas rectangulares de ancho equivalente comprendido entre 1 y 3. <br />
<a href="http://lh3.ggpht.com/-KoG4naBbiLI/Tj7hqO9c8uI/AAAAAAAAQe8/8gX0ASObeO4/s1600-h/clip_image051%25255B4%25255D.jpg"><img alt="clip_image051" border="0" height="231" src="http://lh5.ggpht.com/-GXWxOJLK5mM/Tj7hrz1PmqI/AAAAAAAAQfA/bdpr5Wo62-8/clip_image051_thumb%25255B1%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image051" width="454" /></a> <br />
<br />
<b>CAPÍTULO II</b> <br />
<h4 style="text-align: justify;"><a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/08/hundimientos-de-suelo.html" name="casorealda">Caso real del fenómeno de hundimiento</a></h4><b><u>INTRODUCCION</u></b> <br />
Un lugar donde podemos apreciar y observar mas lo que es el fenómeno de hundimiento es en la ciudad de México, ya que en este lugar este es un fenómeno que sucede desde hace tiempo, preocupando ingenieros, y cada vez va tomando mayor importancia, principalmente por dos razones, la primera por las necesidades de cimentación de los grandes y modernos rascacielos que en su actual y acelerado desarrollo se construyen en aquella capital, y la segunda por su relación con el abastecimiento de agua de la ciudad. <br />
<a href="http://lh5.ggpht.com/-6nOR3fUhLLk/Tj7hs3NnE5I/AAAAAAAAQfE/e5hMsR8TKHU/s1600-h/clip_image053%25255B5%25255D.jpg"><img alt="clip_image053" border="0" height="253" hspace="12" src="http://lh6.ggpht.com/-Nzo2u43IsoY/Tj7hufbOz0I/AAAAAAAAQfI/97SdH-Rt-no/clip_image053_thumb%25255B2%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image053" width="450" /></a> <br />
Cuantía de estos hundimientos es francamente impresionante, y sus efectos visibles unos y ocultos otros, son desde luego, para preocupar y dignos de ser tomados en consideración como así viene ya ocurriendo, tanto por parte del gobierno como por la de los ingenieros y arquitectos que proyectan y planean la construcción y urbanización de una de las capitales mas bellas de América del norte. <br />
<b><u>ANTECEDENTES HISTORICOS</u></b> <br />
La ciudad de México se construyó sobre las ruinas de Tenochtitlán, a partir de la conquista en 1521, periodo en el cual se desarrollaron obras de ingeniería para evitar inundaciones por medio de sistemas de drenaje que facilitaron el incremento de los asentamientos humanos, hasta formar lo que hoy día se conoce como la zona metropolitana. <br />
En la planicie lacustre del Sur y Oriente del Distrito Federal que corresponde a los ex lagos de Xochimilco, Chalco y Texcoco, la zona urbana ha incrementado la extracción de agua del subsuelo lo que conlleva ha problemas de hundimiento y formación de grietas (Marsal, 1992). <br />
El proceso de hundimiento no es homogéneo, se produce con velocidades diversas y esto se reconoce en la superficie por deformación del plano original horizontal, el cual presenta inclinaciones y ondulaciones, en varios casos se acompaña de agrietamiento por simple abertura y movimientos laterales y verticales respecto al plano de ruptura (Juárez, 1961). <br />
<b>TECTONICA ACTUAL DE MÉXICO.</b> <br />
LA GEOLOGÍA de la República Mexicana es el resultado de múltiples procesos tectónicos que la han afectado durante toda su evolución; para explicarlos se ha requerido de la paciencia y los conocimientos geológicos de los estudiosos de las ciencias de la Tierra. <br />
La configuración geográfica actual de México es, asimismo, consecuencia de la interacción del bloque continental con las provincias oceánicas que lo circundan. Es decir, en la región del Pacífico, la Península de Baja California se está separando del resto del continente con un movimiento hacia el noroeste; en el Pacífico sur de México, desde Cabo Corrientes en el estado de Jalisco hacia Centroamérica, la placa oceánica de Cocos es asimilada por el continente; tal subducción ocurre a lo largo de una fosa oceánica a la que se conoce como <i>Trinchera de Acapulco</i> o <i>Mesoamericana.</i> <br />
Por otro lado, en las provincias geológicas del Golfo de México y del Caribe, se tienen esfuerzos tectónicos de separación cortical, identificados también como de tensión o distensivos, que están actuando en los márgenes continentales; éstos, a su vez, avanzan sobre los fondos más profundos de las cuencas oceánicas, como consecuencia del desplazamiento de la placa tectónica continental de Norteamérica hacia el poniente, y de la del Caribe hacia el oriente (Figuras 10 y 11). <br />
Los procesos geodinámicos que son aún más complejos se pueden describir con relativa facilidad de una forma general. En términos globales, su influencia es muy importante por la contribución al conocimiento universal sobre el origen y evolución de nuestro planeta. A su vez, este entendimiento es básico en la prospección de recursos minerales, hidrotermales y petrolíferos que se generan y acumulan en el interior de la corteza de la Tierra, como consecuencia de su evolución geotectónica. <br />
<a href="http://lh5.ggpht.com/-rDTy2a33Lc0/Tj7hvldMnnI/AAAAAAAAQfM/DSjoxFuc6Vo/s1600-h/clip_image054%25255B4%25255D.gif"><img alt="clip_image054" border="0" height="340" src="http://lh3.ggpht.com/-XiHfpA6fLbU/Tj7hxNcI0iI/AAAAAAAAQfQ/aHIzgfx8fnM/clip_image054_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image054" width="454" /></a> <br />
<a href="http://lh4.ggpht.com/-Ecx5iv1C79E/Tj7hyJydH4I/AAAAAAAAQfU/1LJN_bNLNB4/s1600-h/clip_image055%25255B4%25255D.gif"><img alt="clip_image055" border="0" height="306" src="http://lh4.ggpht.com/-VP7dnukPYYo/Tj7h0T4wbXI/AAAAAAAAQfY/FXyHlS75SvM/clip_image055_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image055" width="454" /></a> <br />
Figuras 10 y 11. La configuración actual de México se debe al movimiento simultáneo de las cuatro placas tectónicas: a) la de Norteamérica, con desplazamiento hacia el suroccidente; b) la del Pacífico oriental, hacia el noroeste; c) la de Cocos, hacia el noreste, y d) la del Caribe, hacia el oriente franco. <br />
En otro aspecto, la identificación de las provincias geológicas y su caracterización son fundamentales cuando se planifican nuevos centros de población, ya que para fundarlos es necesaria la disponibilidad de recursos como el agua y la ubicación de los sectores de alto riesgo sísmico que afectan drásticamente a las porciones noroccidental y sur de México, así como a la zona intermedia conocida como <i>Cinturón Volcánico Transmexicano </i><code>(CVT)</code>, que cruza el país desde el Océano Pacífico hasta el Golfo de México. Más adelante nos referiremos a él (Figura 12) en el marco tectónico de una cronología de eventos geológicos en nuestro territorio. <br />
La placa continental de Norteamérica, en el transcurso de su migración hacia el noroccidente y el occidente, asimiló progresivamente, en el pasado geológico, a las oceánicas Farallón y Kula, lo que dio como consecuencia que el arco magmático desarrollado durante el Jurásico Superior migrara hacia el noreste en el interior del continente, seguido por otros arcos magmáticos del Cretácico. <br />
<b>JURÁSICO SUPERIOR-CRETÁCICO SUPERIOR (HACE 140 A 70 MILLONES DE AÑOS)</b> <br />
Durante este tiempo la velocidad de incidencia entre las placas oceánica y continental, en el Pacífico, se incrementó de 6 a 7 cm/año. A la vez, la placa oceánica de Farallón sufrió un cambio en su inclinación a menos de 10° y, como consecuencia, la actividad magmática migró hacia el oriente. Dio inicio así el evento tectónico de deformación y convergencia hacia el noreste que se conoce como Orogenia Laramide (Figura 13). <br />
<b>CRETÁCICO SUPERIOR-PALEOCENO (HACE 70 A 58 MILLONES DE AÑOS)</b> <br />
Del Cretácico Superior al Paleoceno en México (Figura 14), el arco magmático del margen pacífico continuó su migración hacia el oriente. En la zona que actualmente ocupan la Península de Baja California y las costas de Sonora y Sinaloa se inició un periodo de quietud volcánica que perduró hasta el Eoceno Superior. Al mismo tiempo, desde Cabo Corrientes, en el estado de Jalisco, hasta el actual Golfo de Tehuantepec en Oaxaca y Chiapas, una porción del margen continental sur comenzó a desplazarse hacia el sureste en forma intermitente, a lo largo del borde actual del Pacífico, coincidente a su vez con el desplazamiento hacia el noreste de la placa oceánica Protocaribeña, que se movía a medida que se separaban las placas de Norteamérica y de Sudamérica. <br />
<a href="http://lh4.ggpht.com/-TX8-FhwN7xc/Tj7h0xLeQEI/AAAAAAAAQfc/OhN4jAyho8A/s1600-h/clip_image056%25255B4%25255D.gif"><img alt="clip_image056" border="0" height="300" src="http://lh6.ggpht.com/-a1DsY-Gihws/Tj7h3A1TZ3I/AAAAAAAAQfg/XLSJybQnZhM/clip_image056_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image056" width="454" /></a> <br />
Figura 12. El Cinturón Volcánico Transmexicano <code>(CVT)</code> es un sistema de fisuras corticales por donde son expulsadas a la superficie las rocas volcánicas provenientes de la fusión de la corteza oceánica de la Placa de Cocos. <br />
<a href="http://lh6.ggpht.com/-RXyDIfyqLjE/Tj7h3n9R0ZI/AAAAAAAAQfk/5p7xUegOjx8/s1600-h/clip_image057%25255B4%25255D.gif"><img alt="clip_image057" border="0" height="356" src="http://lh4.ggpht.com/-dLLB0NQDvGU/Tj7h5_0uwxI/AAAAAAAAQfo/ooHPef_yLOc/clip_image057_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image057" width="454" /></a> <br />
Figura 13. Durante el Jurásico Superior (140 m. a.) y el Cretácico Superior (70 m. a.) el continente asimiló la placa oceánica de Farallón, generándose así el Arco Volcánico Marginal en el borde occidental de México y del noroeste de Sudamérica; la corteza oceánica del antiguo Océano Pacífico también estaba en colisión con el fondo oceánico del ancestral Océano Atlántico, y en su unión se formaron los arcos volcánicos insulares de la región caribeña. <br />
El fragmento continental desplazado constituye ahora el basamento paleozoico del sur de Guatemala y del norte de Honduras; la traza del desplazamiento es la falla que corresponde a la actual Trinchera del Pacífico de México, y su prolongación hacia el noreste corresponde al sistema de fallas y fracturas que han migrado hacia el oriente como consecuencia del movimiento de la Placa Protocaribeña en esa misma dirección. <br />
<a href="http://lh4.ggpht.com/-71cw_0yKaUs/Tj7h6yqelHI/AAAAAAAAQfs/gAJmleI-SGo/s1600-h/clip_image058%25255B4%25255D.gif"><img alt="clip_image058" border="0" height="307" src="http://lh4.ggpht.com/-DHagJcts7rI/Tj7h-vZP05I/AAAAAAAAQfw/JvhFZRnUKfU/clip_image058_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image058" width="454" /></a> <br />
Figura 14. Durante el Cretácico Superior (70 m. a.) y el Paleoceno (58 m. a.) la placa continental estaba próxima a asimilar una cordillera oceánica, y el arco volcánico marginal migraba hacia el interior del continente en México. En la porción sur del país se iniciaba un rompimiento y su desplazamiento hacia el noreste. <br />
Ese fragmento continental del sur de México desplazado hacia la actual América Central es motivo de controversia. Mientras algunos geólogos aceptan esta hipótesis, otros opinan que el truncamiento continental del sur de México es producto de un proceso de asimilación del fondo oceánico por el continente, que habría ocurrido durante el impacto tectónico entre la placa oceánica con la continental y posterior a una reorganización. Otra opinión que intenta conciliar las dos anteriores, es aquella que postula la ruptura del margen continental, el cual se transportó lateralmente a lo largo de la falla de transcurrencia durante la subducción o asimilación de la placa oceánica en forma oblicua al continente. Esto debió ocurrir antes del Mioceno, ya que, con base en estudios geofísicos, en la Trinchera del Pacífico, en las cercanías del puerto de Acapulco, no se encontraron evidencias de que los sedimentos del Mioceno al Reciente estuvieran sujetos a procesos de deformación por esfuerzos de compresión. <br />
Por otro lado, en el margen continental de la provincia del Golfo de México, la Sierra Madre Oriental siguió emergiendo por plegamiento y fallamiento, y al pie de la misma se formaban una serie de cuencas y subcuencas debido al rompimiento del basamento que subsidía hacia el Golfo de México. Estas depresiones marginales se hundían intermitentemente y se rellenaban con sedimentos provenientes de la Sierra Madre Oriental, depositándose en ambientes que variaban desde litorales hasta marinos someros y profundos, dependiendo de la actividad tectónica local dentro de un mismo patrón regional de deformación. <br />
En particular al sur del Golfo de México, en las cuencas terciarias de Veracruz, Tabasco y Campeche, subsidieron en forma discontinua los bloques del basamento, a partir del Cretácico Superior y principios del Terciario. El mismo fenómeno ocurrió en el margen occidental del Banco de Campeche durante la migración del bloque de Yucatán hacia el noreste, lo cual es evidente en las secuencias estratigráficas y por el estilo de fallamiento normal en bloques que se observa en el subsuelo. <br />
El mecanismo de desplazamiento del bloque de Yucatán no está del todo entendido; sin embargo, se postula un movimiento del bloque yucateco hacia el norte para explicar los procesos distensivos que dieron lugar a la formación de las cuencas marginales del Terciario y a la formación y evolución del cañón de Campeche. <br />
Por otro lado, geológicamente se propone un modelo tectónico para la subplaca chiapaneca, que explica el plegamiento de la Sierra Madre de Chiapas como un desplazamiento de la Plataforma de Yucatán del noreste al sureste, durante el Mioceno Medio, a lo largo del sistema de fallas Motagua-Polochic. Este desplazamiento tuvo la particularidad, hasta ahora conocida, de que el movimiento tectónico de la plataforma de Yucatán se manifestó en la porción sur del Golfo de México a partir del Cretácico Superior y principios del Terciario, dando lugar al rompimiento del basamento en bloques y a la subsidencia diferencial de los mismos. Estos movimientos se intensificaron durante el Mioceno. <br />
El desplazamiento hacia el oriente de la Placa del Protocaribe produjo el movimiento distensivo del borde oriental del bloque yucateco, lo que dio origen a la formación de la cuenca de Yucatán y a la Trinchera del Caimán en el mar Caribe. Por otro lado, la trinchera oceánica de la porción occidental de la isla de Cuba se desactivó, provocando que esta isla se separara del bloque Honduras-Nicaragua y que, tras su migración, dejara fallas y fracturas inactivas (Figura 14). Simultáneamente a estos movimientos también disminuyó el dinamismo de la Placa de América del Sur hacia el noroeste, por lo que la subducción de la Placa del Caribe en la Trinchera de Venezuela comenzó a desactivarse. <br />
<a href="http://lh5.ggpht.com/-HqR5_ryAn-I/Tj7iAxA7_pI/AAAAAAAAQf0/jLGxfA8Ze_M/s1600-h/clip_image059%25255B4%25255D.gif"><img alt="clip_image059" border="0" height="343" src="http://lh4.ggpht.com/-VzZN5iZgQms/Tj7iC8PK-1I/AAAAAAAAQf4/U-L1nUwrpPE/clip_image059_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image059" width="454" /></a> <br />
Figura 15. Desde el Eoceno Superior (42 m. a.) hasta el Mioceno Inferior (18 m. a.), el arco magmático marginal continental de México iniciaba su retroceso hacia el Pacífico. La porción sur del continente se siguió desplazando hacia el noreste y la Península de Yucatán giraba en el sentido del movimiento de las manecillas del reloj. <br />
<br />
<b>EOCENO SUPERIOR-OLIGOCENO-MIOCENO INFERIOR (HACE 42 A 18 MILLONES DE AÑOS)</b> <br />
En el Eoceno Superior, el arco magmático tuvo su máximo avance hacia el interior de México; desde el Oligoceno Inferior al Mioceno Inferior la actividad volcánica retrogradó hacia las costas del Pacífico, y tuvo su máxima manifestación durante el Oligoceno Medio (Figura 15). Al evento magmático se le conoce como <i>Orogenia del Terciario Medio.</i> <br />
Esta gran manifestación volcánica del Oligoceno Medio pudo ser consecuencia del traslape del margen continental occidental de México con alguna dorsal activa situada al este de la actual Dorsal del Pacífico oriental, ya que las fallas geológicas y fracturas de transformación que inciden en el borde continental —incluyendo las de Orozco y de Tehuantepec, que están orientadas aproximadamente al norte 50°, este 50° noreste— no corresponden al sistema actual de la Dorsal del Pacífico oriental, cuya orientación en general varía de este-oeste a noreste-sureste (Figura 11). <br />
Al occidente de esta dorsal oceánica se localiza otra, denominada del Matemático, en la que se observan las fallas de transformación orientadas suroeste 75° noreste; es decir, diferentes en posición a los otros dos sistemas estructurales de las dorsales oceánicas mencionadas anteriormente (Figura 10). <br />
De la dorsal inferida y posiblemente asimilada en el Oligoceno Medio, quedaron como remanentes las fracturas que inciden casi perpendicularmente al borde continental del Pacífico, desde la fosa de Colima hasta la porción meridional de América del Sur, en el margen continental de Chile (Figura 16). <br />
Hacia el Pacífico sur de México y en el Caribe, durante el Eoceno y el Oligoceno Inferior, el bloque Honduras-Nicaragua se siguió desplazando hacia el noreste, a lo largo de las trazas de las fallas del Sistema Motagua-Polochic. Por otro lado, la fosa o trinchera oceánica del Océano Pacífico en México se prolongó hacia el sureste y, a la vez, se extendió el arco magmático insular de Centroamérica. <br />
En las costas de Venezuela, como ya se mencionó, se desactivó totalmente la trinchera oceánica y se formó la falla geológica de transcurrencia denominada <i>Oca,</i> para determinar el límite sur de la Placa del Caribe. <br />
Hacia el norte, las trincheras de Cuba y de Puerto Rico se reactivaron y las fallas de Bartlett y de Puerto Rico conformaron, en conjunto, el límite norte de la Placa del Caribe durante el desplazamiento de ésta hacia el oriente, formándose las Antillas Menores. <br />
<a href="http://lh4.ggpht.com/-SP7LF2FthE8/Tj7iE94WZFI/AAAAAAAAQf8/Qzw25efu1b4/s1600-h/clip_image060%25255B4%25255D.gif"><img alt="clip_image060" border="0" height="267" src="http://lh5.ggpht.com/-r8qaAQpftRo/Tj7iGF_GeBI/AAAAAAAAQgA/61V5xl0oVvg/clip_image060_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image060" width="454" /></a> <br />
Figura 16. La antigua dorsal o cordillera oceánica inferida aparentemente fue asimilada por el continente durante el Oligoceno Medio (30 m. a.), y quedan como testigos las fracturas que inciden en el borde continental del Pacífico. El arco volcánico siguió en retroceso desde el interior del continente hacia el occidente, y la Dorsal o Cordillera del Pacífico oriental estaba próxima al continente. <br />
En la provincia del Golfo de México, las cuencas terciarias siguieron evolucionando con subsidencias continuas durante el Oligoceno y el Mioceno Inferior. Hacia la provincia de la actual América Central no se manifestó ninguna actividad magmática durante este tiempo, debido al cambio en la dirección de la Placa del Caribe, o bien a la disminución del ángulo de subducción de la placa oceánica al ser asimilada la dorsal inferida en el noroeste de México durante el Oligoceno Medio, o quizá debido a otras causas, aún en proceso de investigación. <br />
<b>MIOCENO MEDIO-PLIOCENO TEMPRANO (HACE 13 A 4.5 MILLONES DE AÑOS</b>) <br />
Durante el Mioceno Medio el margen occidental de la Placa de Norteamérica traslapó a la Dorsal Oceánica del Pacífico oriental, y dio origen a un sistema estructural complejo con dos juntas triples de fracturas y fallas geológicas de transformación que, posteriormente, facilitaron el desplazamiento del margen noroccidental de México (Figura 17). Este traslape se manifestó en el continente como un sistema de fosas y pilares elongados y paralelos al margen occidental de México. La evolución de las fosas distensivas permitió las efusiones de lavas y piroclastos de composición andesítica. La actual Península de Baja California fue afectada por las fallas de transcurrencia con movimiento lateral del Sistema San Andrés. Éstas son, evidentemente, la proyección en superficie de las fallas de transformación de la dorsal oceánica asimilada por el continente. <br />
Hacia el sur, la provincia del Istmo de Tehuantepec alcanzó su máxima actividad tectónica a partir del Mioceno, lo cual se refleja en la presencia de rocas volcánicas y en el rápido hundimiento del basamento, que a su vez se manifiesta en la formación del Golfo de Tehuantepec. La evolución de esta gran provincia geológica es consecuencia de la reactivación del bloqne Honduras-Nicaragua, que se desplazaba a lo largo del sistema de fallas geológicas conocido como Motagua-Polochic. Esto provocó el máximo desarrollo del sistema de fallamiento lateral en el Macizo Granítico de Chiapas. <br />
Hacia el noreste, en la subplaca chiapaneca, la secuencia estratigráfica del Mesozoico también fue afectada por los sistemas de fallas transcurrentes ya mencionados, con orientación noroeste 55° sureste, y a la vez generó pliegues en forma abanicada. <br />
<a href="http://lh3.ggpht.com/-_rYBTfV4fl8/Tj7iHR1bEbI/AAAAAAAAQgE/1fR624kuRkE/s1600-h/clip_image061%25255B4%25255D.gif"><img alt="clip_image061" border="0" height="294" src="http://lh3.ggpht.com/-EEVZUYOzcS8/Tj7iJJ8os3I/AAAAAAAAQgI/lcYKJBLLE3Q/clip_image061_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image061" width="454" /></a> <br />
Figura 17. Durante el Mioceno Medio (13 m. a.) al Plioceno temprano (4.5 m. a.) el borde noroccidental de México traslapó a la Dorsal o Cordillera del Pacífico oriental, asimilando a la vez a la trinchera oceánica en esa porción. Hacia el sur, la trinchera siguió activa, lo que se manifestó por el Arco Volcánico Marginal. <br />
En Guatemala, Burkart (1978) también detectó e interpretó la deformación de la columna estratigráfica en términos de la actividad del Sistema Motagua-Polochic, y para ello utilizó imágenes del satélite <code>LANDSAT</code>. El autor explica que desde el Mioceno Medio hasta el Plioceno el movimiento lateral entre los bloques fue de 130 kilómetros. Simultáneamente a la actividad del sistema mencionado, también actuaban esfuerzos compresivos generados por el desplazamiento de la Placa de Cocos hacia el noreste. Estos provocaron la ruptura del Macizo Granítico de Chiapas con sistemas de fractura orientados en esa dirección, y la formación de los bloques del basamento limitados por escarpes de fallas que definen al límite occidental del Golfo de Tehuantepec. <br />
El frente norte del Macizo Granítico plegó y falló a las secuencias estratigráficas del Mesozoico y, a su vez, el borde sur del macizo fue cabalgado por la secuencia alóctona sedimentaria ya metamorfizada del Cretácico Medio y Superior. <br />
La actividad tectónica miocénica en México, en América Central y el Caribe fue muy importante, particularmente durante el Mioceno Medio. En la zona centromeridional de México existe una gran superficie de traslape de las secuencias estratigráficas del Mesozoico sobre las del Terciario. Hacia la provincia del Golfo de México, desde el norte hasta el sur, el basamento del margen continental subsidió rápida y simultáneamente con la emersión de la Sierra Madre Oriental y de la Sierra de Chiapas. Los sedimentos miocénicos de las cuencas del Terciario están constituidos por partículas provenientes de las zonas orogénicas expuestas y se depositaron conjuntamente con las arcillas y los limos de origen marino. El borde occidental del Banco de Campeche estuvo afectado por fallamientos distensivos, y los sedimentos marinos se acumularon y subsidieron rápidamente en forma diferencial, con franca tendencia de engrosamiento hacia las porciones occidental y suroccidental del mismo banco. La sal de los mantos jurásicos subyacentes se inyectó entre los sistemas de fallas y fracturas de los bloques sobreyacentes, migró hacia la superficie y produjo plegamientos y fallas en los estratos del Terciario. <br />
La rápida subsidencia secuencial del basamento durante el Mioceno Medio, tanto en las costas de Veracruz, Tabasco y Campeche, como en la parte suroccidental del Banco de Campeche y en la parte occidental de la Península de Yucatán, induce a interpretar un desplazamiento rápido de esta última provincia geológica. Esta secuencia de pulsaciones tectónicas es a la vez coincidente con la reactivación del sur del Sistema Motagua-Polochic, la cual fue consecuencia del desplazamiento de la Placa del Caribe hacia el oriente franco. Por tal motivo, quedó bien definido el desplazamiento a lo largo de la Falla Oca en el margen continental de Venezuela. Es decir, el movimiento de la Placa del Caribe hacia el oriente reactivó la Falla Motagua-Polochic, lo que provocó a su vez que el bloque Maya (Banco de Campeche-Yucatán) girara en el sentido del movimiento de las manecillas del reloj. De este modo se generaron los sistemas de fallas de transcurrencia que deformaron las rocas del Mesozoico y del Terciario Inferior, y que edificaron la Sierra de Chiapas. <br />
La interpretación que se ha hecho sobre la rotación del bloque de la Península de Yucatán y Campeche también se apoya en los datos paleomagnéticos de las rocas volcánicas en la región de Siguatepeque, en Honduras. Para ello se determinó un ángulo de rotación de 30° entre los bloques norte y sur del Sistema Motagua-Polochic, lo cual ocurrió desde el Terciario Medio. <br />
La zona de ruptura y de separación con la porción sur del Golfo de México, o sea en la Bahía y Sonda de Campeche (Figura 13), también se manifiesta en el continente por el cauce del río Usumacinta, que separa a la provincia fisiográfica plana del Petén, en contraste con las montañas Maya en Guatemala y su continuación hacia el norte, que corresponde al frente de la Sierra de Chiapas en México. <br />
Por ello, el río Usumacinta desemboca en la llanura costera del Golfo de México, conservando la misma dirección, es decir, hacia el noroeste. En su desembocadura en el Golfo de México, existe una fosa delimitada por los ríos San Pedro-San Pablo y Grijalva en Punta Buey, y San Pedro en Nuevo Campechito. La fosa continúa hacia la plataforma continental con el mismo rumbo (noroeste) hasta la isóbata de 2600 m b.n.m., en la provincia del Cinturón de Domos Salinos, entre los cañones de Veracruz y de Campeche (Figura 20). <br />
Por otro lado, durante el Mioceno Medio en América Central continuó el vulcanismo, el arco magmático casi se unió con América del Sur, y la subplaca del Pacífico que conformaba a la Protocaribeña se separó de la oceánica de Farallón. Esta nueva Placa del Caribe se movió independientemente de la de Farallón, que se desplazaba hacia el noreste, y la del Caribe, en tránsito hacia el oriente franco. <br />
Al borde de la Placa de América del Sur, en su parte noroccidental, la trinchera oceánica empezó a desactivarse, y la de Galápagos entró en actividad aparentemente desde el Oligoceno Superior (Figura 18). Esta fractura estaba inicialmente orientada este-noreste, pero adquirió su orientación franca este-oeste con el cambio en el movimiento de la Placa del Caribe hacia el oriente durante el Mioceno tardío y el Plioceno temprano. Así se definieron los límites de las placas oceánicas de Cocos y de Nazca, presentes hasta la actualidad. <br />
En el noroeste de México, durante el Mioceno tardío y el Plioceno temprano, el extremo suroriental de la actual Península de Baja California se empezó a separar del resto del continente, y las aguas del Océano Pacífico penetraron por esta abertura, conformándose el protogolfo de California (Figura 18). <br />
<a href="http://lh4.ggpht.com/-hSzDo3gE-Mo/Tj7iKyDC-fI/AAAAAAAAQgM/7iSf9c1bbdQ/s1600-h/clip_image062%25255B4%25255D.gif"><img alt="clip_image062" border="0" height="289" src="http://lh5.ggpht.com/-d7Dav9lAvyc/Tj7iMch95HI/AAAAAAAAQgQ/4bzL9gE6Roo/clip_image062_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image062" width="454" /></a> <br />
Figura 18. En una etapa tectónica posterior, la porción sur de la actual Península de Baja California se separó del resto del continente y las aguas oceánicas del Pacífico inundaron esa porción. La parte meridional del país se levantaba y se fracturaba, facilitándose así la formación de la Cadena Volcánica Transversal, desde el Océano Pacífico hasta el Golfo de México. En el Pacífico se formó otra cordillera o dorsal conocida como Galápagos, que se unió con la del Pacífico oriental y dio límites a la Placa de Cocos. <br />
<a href="http://lh4.ggpht.com/-6kpOWS4gvyM/Tj7iNWtEx9I/AAAAAAAAQgU/SJQfRpVpcHM/s1600-h/clip_image063%25255B4%25255D.gif"><img alt="clip_image063" border="0" height="325" src="http://lh4.ggpht.com/-za_GUMlAxJo/Tj7iPcPMMbI/AAAAAAAAQgY/TV_oNTL0k44/clip_image063_thumb%25255B1%25255D.gif?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image063" width="454" /></a> <br />
Figura 19. Durante el Plioceno y el Cuaternario la actual configuración de México siguió gobernada por los desplazamientos continuos del continente y de las placas oceánicas. La Península de Baja California se mueve hacia el noroccidente, gobernada por las fallas del Sistema San Andrés; los márgenes meridional y sur del continente, en el Pacífico, asimilan la corteza oceánica de la Placa de Cocos. La Península de Yucatán se desplaza en sentido de las manecillas del reloj y el Cinturón Volcánico Transmexicano, sigue en actividad desde el Pacífico hasta el Golfo de México. <br />
<b>PLIOCENO-CUATERNARIO (HACE 4.5 MILLONES DE AÑOS A LA ÉPOCA ACTUAL)</b> <br />
A partir del Plioceno (4.5 m. a. 0.5), el margen continental se siguió desplazando hacia el noroeste hasta separarse casi totalmente del resto de México, y dio como resultado la actual Península de Baja California (Figura 19) y su mar interior. <br />
El rompimiento y el desplazamiento de la península se debieron al movimiento de la Placa de Norteamérica hacia el occidente, que asimiló a la Dorsal del Pacífico oriental. Una vez en el interior, los esfuerzos distensivos formaron el Golfo de California. En el fondo centro-meridional del golfo afloran rocas ígneas de composición de corteza oceánica típica. Por otro lado, durante los desplazamientos de la Península de Baja California hacia el noroeste, de la Placa de Norteamérica hacia el occidente, de la de Cocos hacia el noreste y la del Caribe hacia el oriente, la porción media de México se convirtió en una zona de debilidad cortical con una expresión estructural conocida como <i>Cinturón Volcánico Transmexicano</i> <code>(CVT)</code>, cuya mayor actividad magmática se manifestó durante el Plio-Cuaternario (Figuras 11 y 19). Sin embargo, existen evidencias de vulcanismo precursor en diferentes sectores del mismo complejo volcánico. <br />
<b><u>CAUSA DEL PROBLEMA</u></b> <br />
Buena parte de la ciudad de México se asienta sobre arcillas lacustre que se caracterizan por su gran deformabilidad y su baja resistencia. Como resultado de la aplicación de cargas externas a estas arcillas, muchas construcciones en la ciudad se han inclinado o hundido o han perdido la vertical. Las inclinaciones y hundimientos producidos por los incrementos de esfuerzos que ocurren en el subsuelo por el peso propio de las estructuras se agravan por el hundimiento regional, fenómeno que comenzó a mediados del siglo XIX. La acumulación de distorsiones, hundimientos e inclinaciones debidas a estos dos factores así como el daño estructural asociado incrementa paulatinamente la vulnerabilidad de las estructuras ante la acción de los temblores y, asimismo, ante la aparición de hundimientos diferenciales subsecuentes. <br />
Los asentamientos superficiales producidos por el bombeo son la manifestación externa de otros cambios internos, mucho más complejos, que ocurren dentro de la masa de suelo y que modifican las propiedades mecánicas del subsuelo. <br />
Todo este proceso se debe por ser un suelo totalmente arcilloso y por haber sobre extracción del agua. El Zócalo Central junto con su Asta Bandera, y la Catedral, se han asentado en un total de 2.8 cms por año. Las líneas del metro también se han visto afectadas, ya que presentan hundimientos diferenciales, por lo que sobre estos han ocasionados accidentes notables. <br />
El agua lluvia no penetra ya que las estructuras desarrolladas por el hombre como son carpetas asfálticas, estructuras, parques, plazas, etc. crean impermeabilidad, lo que impide la recarga del agua en el suelo. Esta agua que cae, va directamente a los drenajes y no al acuífero, por lo que el suelo no vuelve a su estado anterior, por lo que se producen más asentamientos. Al perder humedad, las arcillas y demás sedimentos presentan contracción por lo que el volumen de los mismos baja de nivel, y este descenso depende directamente de la velocidad local con la que se extrae el agua del subsuelo. <br />
<b><u>FENOMENO MECANICO DE HUNDIMIENTO</u></b> <br />
El mecanismo de los hundimientos parece ser provocado por la perdida de presión de agua contenida en las capas permeables del subsuelo. <br />
El subsuelo de la ciudad de México esta formado por unas de las capas de arcilla con gran contenido de agua, intercaladas entre un relleno de aluvión superficial y sobre un deposito permeable formado por un conglomerado de arenas y gravas. Si de alguna manera se provoca en estas ultimas una perdida de presión en el agua que contienen, la que satura las arcillas superiores, empieza a fluir hacia abajo, originándose entonces en el interior de la estructura molecular de estas arcillas una serie de fuerzas internas que, por unidad de volumen, son iguales al peso del agua, por el gradiente hidráulico en el punto que se considere y que originan sobre ellas un aumento hacia debajo de las presiones a que están sometidas, produciéndose en consecuencia en su masa una deformación en este mismo sentido. <br />
Para un mejor estudio sobre este mecanismo, ingenieros que se dedicaron a analizar este tema instalaron mas de un centenar de piezómetros distribuidos por todo el valle, al mismo tiempo se ha medido la profundidad a que se encuentra el nivel de las aguas freáticas, que en general sigue con bastante regularidad las variaciones topográficas del suelo. En las estaciones piezometricas se han hecho mediciones a distintas profundidades y, de su comparación con la superficie del nivel de las aguas freáticas, resultaron aparentes las primeras anomalías del subsuelo. <br />
Es evidente que, para cualquier punto concreto, la diferencia entre la altura del nivel freático y la de la elevación piezometrica, es la perdida de presión en el mismo, expresada en toneladas por metro cuadrado. <br />
Actualmente, las perdidas de presión controladas aumentan a razón de una tonelada-metro cuadrado por año. <br />
<b><u>SOLUCIONES PROPUESTAS</u></b> <br />
Para evitar estas perdidas de presión en la base de las arcillas, debida a la intensa explotación de que es objeto el agua contenida en las capas permeables inferiores, se piensa, por un lado, en el abandono gradual de todos los pozos de servicio, y por otro, además, en restituir al subsuelo el agua extraída. <br />
Pero sin embargo el restituir el agua al subsuelo, presenta serios problemas, ya que al restablecer las condiciones de equilibrio hidrostático del subsuelo y desaparecer el régimen de depresión que actúa sobre la plasticidad de las arcillas, el efecto resultante equivale a una descarga de las mismas, produciéndose por tanto, en consecuencia una expansión hacia arriba del terreno. <br />
Según las mediciones hechas con muestra de arcillas extraídas del subsuelo de la ciudad, se estima que la superficie de la ciudad se elevaría en unos 60 cm, lo que hay, por tanto que tener en cuenta para que este proceso no ocasione mayores perjuicios que los actuales. <br />
<b><u>CONSECUENCIAS DEL PROBLEMA</u></b> <br />
Muchos edificios modernos y antiguos han sufrido desplomes, hundimientos parciales, y en consecuencia, serios agrietamientos que ponen en peligro su estabilidad, en principio sin causa aparente externa de todo ello, ya que no habían cambiado ni había habido alteración alguna en sus condiciones de trabajo ni en la de sus vecinos. <br />
<b>HUNDIMIENTO DE LA CATEDRAL DE MÉXICO:</b> <br />
El Templo Mayor se edificó sobre una isla o placa formada artificialmente por un relleno de unos 12 metros de espesor. <br />
Al llegar los españoles arrasaron las construcciones de los aztecas hasta el nivel del piso y utilizaron los materiales originales seguramente para ampliar y elevar la isla, lo que permite explicar el gran espesor de los rellenos que es de 15 m. Como es sabido, una parte de la Catedral de México se construyó sobre esta isla llamada por los aztecas "Isla de los Perros". <br />
Se puede decir que la causa principal de los problemas constructivos y de hundimiento de la Catedral fue el haber sido asentada en un terreno desigual que permitió mayor firmeza al costado oriente, que esta sobre la Isla de los Perros, y en cambio el poniente quedó sobre un terreno más fangoso. Esta circunstancia provocó una falla precisamente en el costado poniente que persiste hasta nuestros días. <br />
Desde el inicio de su construcción, en 1573 hasta 1667, año en que se terminaron las bóvedas, se desarrolló un hundimiento de 0.8 metros entre el altar mayor y la torre poniente, para fines del siglo XIX éste ya era de 1.53 metros y, desafortunadamente esta cifra ha ido en aumento y, ante la alarmante predicción de que, de seguir las cosas así, en 60 años el edificio quedaría en peligro de colapsarse, se han establecido diferentes medidas para salvarlo. Hasta hace unos años, la distribución de los hundimientos se presentaba de la siguiente manera mostrada en la figura. <br />
De esta forma, desde hace tiempo, e intensificándose en la década de los 90, se han venido realizando correcciones geométricas de las estructuras de la Catedral, ya que es, desde luego, uno de los monumentos más importantes de América Latina, cuenta con una larga historia y es representativa de varios estilos arquitectónicos. Además de la belleza y la importancia del edificio en sí, es necesario considerar que éste alberga en su interior una gran cantidad de obras artísticas (pinturas, esculturas, muebles y retablos), que también corren riesgo de perderse <br />
<a href="http://lh6.ggpht.com/-fdXRgTL0R7c/Tj7iQzMsfxI/AAAAAAAAQgc/r6nEwzFjnh0/s1600-h/clip_image065%25255B5%25255D.jpg"><img alt="clip_image065" border="0" height="554" src="http://lh4.ggpht.com/-FDpYcsF5anU/Tj7iRve_6kI/AAAAAAAAQgg/6nxeQ6mLdGs/clip_image065_thumb%25255B2%25255D.jpg?imgmax=800" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="clip_image065" width="450" /></a> <br />
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<h4 style="text-align: justify;"><a href="http://ingenieriasismicaylaconstruccioncivil.blogspot.com/2011/08/hundimientos-de-suelo.html" name="conclusioa">Conclusiones</a></h4>Al finalizar este trabajo se puede concluir con lo siguiente: <br />
ü La apariencia de los hundimientos es impresionante porque la tierra se mantiene usualmente intacta por cierto tiempo hasta que los espacios adentro de la tierra subterránea se hacen demasiado grandes para seguir dando suficiente apoyo a la tierra de la superficie. <br />
ü Es importante el estudio de los movimientos tectonicos ya que el hundimiento de suelos depende de la respuesta a los esfuerzos tectonicos distensivos que se produzcan en este. <br />
ü Con lo que respecta al coso de México, el hundimiento continuara a mayor o menor ritmo de aceleración de acuerdo con los caudales de agua que se extraigan del subsuelo. <br />
<h4 style="text-align: justify;"> </h4><br />
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Autor: <br />
<b>Paico Saavedra Segundo A.</b>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-83519741007681123542011-07-31T20:32:00.000-05:002011-07-31T20:32:32.431-05:00ing-civil-unp: “ESTÁTICA – PROBLEMAS RESUELTOS”<a href="http://ing-civil-unp.blogspot.com/2011/07/estatica-problemas-resueltos.html?spref=bl">ing-civil-unp: “ESTÁTICA – PROBLEMAS RESUELTOS”</a>: "El autor Dr. Genner Villarreal Castro indica que este libro nació, después de comprobar las grandes dificultades mostradas por los alumn..."Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-9551801741165735982011-07-31T20:28:00.000-05:002011-07-31T20:28:38.604-05:00“ESTÁTICA – PROBLEMAS RESUELTOS”<div style="text-align: justify;"><br />
</div>El autor <a class="external" href="http://gennervillarrealcastro.blogspot.com/" target="_blank">Dr. Genner Villarreal Castro</a> indica que este libro nació, después de comprobar las grandes dificultades mostradas por los alumnos en la resolución de problemas aplicados en prácticas calificadas y exámenes, así como en la realización de sus trabajos domiciliarios.<br />
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" 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<a class="external" href="http://gennervillarrealcastro.blogspot.com/" target="_blank">DESCARGAR :</a><br />
<a href="http://www.4shared.com/document/qz-RHC59/Libro_ESTATICA_Problemas_Resue.html">http://www.4shared.com/document/qz-RHC59/Libro_ESTATICA_Problemas_Resue.html</a><br />
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125 problemas tipos y con el rigor científico, propiciando de manera más amena la convivencia con la Estática<br />
<strong>Descripción ,el autor:</strong><br />
En el presente libro, se tratan temas que en la mayoría de programas de las universidades se analizan y que son muy importantes en la formación profesional de los ingenieros civiles. Como base se tomó la experiencia adquirida en el dictado de los cursos de Estática en la Universidad Peruana de Ciencias Aplicadas, Universidad de San Martín de Porres y Universidad Privada Antenor Orrego.<br />
En mi modesta opinión, el presente libro es único en su género, tanto en la forma de resolución de problemas; así como en su contenido, que no es una repetición de otros textos, editados anteriormente.<br />
<strong>El presente libro consta de 5 capítulos y bibliografía.</strong><br />
<ul><li>En el <strong>primer capítulo</strong> se analizan las diversas formas de las fuerzas y momentos, a las cuales están sometidas las estructuras.</li>
<li>En el <strong>segundo capítulo</strong> se estudian el equilibrio de estructuras simples, estructuras con rótulas intermedias, estructuras compuestas y estructuras espaciales.</li>
<li>En el <strong>tercer capítulo</strong> se calculan los centroides en alambres y áreas, así como, los momentos de inercia de áreas planas y de perfiles metálicos.</li>
<li>En el <strong>cuarto capítulo</strong> se analizan diversos tipos de armaduras, a través del método de los nudos y método de las secciones.</li>
<li>En el <strong>quinto capítulo</strong> se calculan las fuerzas internas y se grafican los diagramas de fuerza axial, fuerza cortante y momento flector para vigas, pórticos, arcos y estructuras espaciales.</li>
</ul>El presente texto está dirigido a estudiantes de ingeniería civil y docentes que imparten los cursos de Estática; así como, a ingenieros civiles, postgraduandos e investigadores en el área de estructuras.<br />
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De manera muy especial, dedico el presente libro a la <strong>Ing. Leyda Yudith Suárez Rondón</strong>, una linda venezolana, quien con su inteligencia, comprensión, apoyo constante, dulzura y belleza espiritual conquistó mi corazón, rogando a Dios Todopoderoso nos conceda la oportunidad de seguir compartiendo nuestras vidas, para continuar aportando al desarrollo integral de la sociedad.<br />
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Gracias a: <a class="external" href="http://gennervillarrealcastro.blogspot.com/" target="_blank">www.gennervillarrealcastro.blogspot.com</a>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-66914415707971179072011-07-27T04:17:00.001-05:002011-08-11T23:16:46.675-05:00El Geotextil<h3 class="post-title entry-title" style="text-align: justify;"> <a href="http://facingyconst.blogspot.com/2011/07/el-geotextil.html"><br />
</a> </h3><div> </div><div class="post-header" style="text-align: justify;"> <div class="post-header-line-1"><span class="post-labels"> Etiquetas: <a href="http://facingyconst.blogspot.com/search/label/Materiales%20para%20la%20Construccion%20Civil" rel="tag">Materiales para la Construccion Civil</a> </span> <span class="post-author vcard"> Publicado por <span class="fn">Fernando Arancibia Carvallo</span> </span> <span class="post-icons"> <span class="item-action"> <a href="http://www.blogger.com/email-post.g?blogID=21072581&postID=734204022563819518" title="Enviar la entrada por correo electrónico"> <img alt="" class="icon-action" height="13" src="img/icon18_email.gif" width="18" /> </a> </span> </span> <span class="post-backlinks post-comment-link"> </span> </div></div><div style="text-align: justify;"> <blockquote>El GEOTEXTIL es un material textil permeable de estructura planar usado como parte integral de los suelos y cimentaciones en aplicaciones relacionadas a proyectos de ingeniería.</blockquote>Los geotextiles se han convertido en las capas filtrantes mas adecuadas porque superan las desventajas de los filtros de arena y los de agregados pétreos. Para empezar, se fabrican ya con propiedades hidráulicas específicas y de retención de tierra, las cuales pueden seleccionarse fácilmente para complementar el suelo que necesite protección. Segundo, pueden instalarse con facilidad sobre taludes – aún bajo el agua <br />
Geotextiles <br />
Polímeros para Geotextiles <br />
La mayoría de los geotextiles disponibles y más comunes en el mercado se fabrican ya sea con poliéster o con polipropileno. <br />
El polipropileno es más ligero que el agua (gravedad especifica de 0.9), resistente y muy durable. Los filamentos de polipropileno y las fibras del mismo material se usan en la manufactura de fibras geotextiles tejidas y no tejidas. <br />
Las fibras y tejidos de poliéster de alta resistencia también se usan en la manufactura de geotextiles. El poliéster es más pesado que el agua, tiene excelente resistencia y propiedades de deslizamiento, además es compatible con los materiales naturales más comunes. <br />
<img alt="" height="310" src="http://www.gemia.com.mx/documents/geotextil.jpg" title="geotextil" width="409" /> <br />
<img alt="" height="296" src="http://www.gemia.com.mx/documents/W83_pasted_0.jpeg" title="" width="450" /> <br />
<img alt="" height="295" src="http://www.gemia.com.mx/documents/W83_pasted_1.jpeg" title="" width="450" /> <br />
Estructuras de Geotextiles <br />
Hay dos tipos o estructuras principales de geotextiles: tejidos y no tejidos. Otras técnicas de manufactura, por ejemplo la unión por medio de costuras, ocasionalmente se emplean en la fabricación de productos especiales. <br />
No Tejidos. Los geotextiles no tejidos se fabrican ya sea con fibras cortas (generalmente de 1 a 4 pulgadas de longitud) o con filamentos continuos distribuidos al azar en capas sobre una banda en movimiento para formar una especie de ”panal“, el cual se pasa a través de un ”telar“ de agujas y/o por otro tipo de máquina para entrelazar o unir las fibras/filamentos. Los geotextiles no tejidos son altamente recomendables para el drenaje de subsuelo y para el control de la erosión, así como para la estabilización de caminos sobre suelos húmedos o saturados. <br />
Tejidos. El tejido es un proceso de entrelazados de hilos para fabricar una tela. Los geotextiles tejidos se hacen tejiendo monofilamentos, multifilamentos o fibras de películas cortas. Las fibras de películas cortas posteriormente pueden subdividirse en cintas planas y tejidos fibrilados (o tejidos como tela de araña). Hay dos pasos en este proceso de fabricación de un geotextil tejido: primero, la manufactura de los filamentos o el corte de la película para obtener tejidos; y segundo tejer los hilos para obtener el geotextil. <br />
Las telas de películas cortas se usan generalmente para control de sedimentos, por ejemplo cortinas de retención, y para estabilizar caminos, pero es una alternativa poco recomendable para usarse en drenaje de subsuelo y en control de erosión. Aunque los tejidos de cinta plana de películas cortas son bastante resistentes, forman una tela que tiene una permeabilidad relativamente baja (pobre). Por otra parte, las telas hechas con cintas fibriladas tienen una menor permeabilidad y aberturas mas uniformes que los productos hechos con cintas planas. <br />
Ventajas en el uso de los Geotextiles <br />
-Presentan una alternativa más económica comparada con métodos constructivos tradicionales. <br />
-Son versátiles, flexibles, resistentes y se adaptan a las irreguaridades de las superficies y condicones donde se colocan. <br />
-Son de fácil y rápido manejo y aplicación, y no requieren equipo especializado. <br />
-Tienen una amplia variedad de aplicaciones en la construcción y aumetan la vida útil de las instalaciones. <br />
Aplicaciones de Geotextiles no tejidos en caminos. <br />
Superficies Pavimentadas: <br />
-Entre el subsuelo y capas de estructura del pavimento de carreteras, estacionamientos y aereopuertos. <br />
-Sobre superficies deterioradas de concreto hidráulico ó carpetas asfálticas en colocación de sobre carpetas de asfalto <br />
Superficies no Pavimentadas: <br />
-Entre el subsuelo y base de caminos no pavimentados <br />
General <br />
- Filtro envolvente en subdrenes (dren ciego ó dren francés) para eliminación de presencia de agua en las capas de caminos. <br />
- Capa de rompimiento de capilaridad entre el terreno y capas de caminos para evitar humedecimiento de la estructura del pavimento. <br />
-Protección de socavación en puentes. <br />
<img alt="" height="223" src="http://www.gemia.com.mx/documents/W83_pasted_2.jpeg" title="" width="450" /> <br />
Aplicaciones de Geotextiles no tejidos en los suelos base de caminos. <br />
Separación <br />
<br />
<a href="" name="more"></a>- Evita la migración indeseable de los finos del terreno hacia la base, y también evita la incrustación de los agregados de la base en la subrasante. Mantiene integra la base con lo cual se asegura su buen funcionamiento prolongando la vida útil del camino. <br />
Refuerzo (suelos blandos) <br />
- Los geotextiles proveen refuerzo por medio de posibles mecanismos como: <br />
-Restricción al desplazamiento lateral y confinamiento del material de la base y subrasante a través de fricción y amarre entre el agregado, el suelo y el geotextil, proporcionando rigidez y distribuyendo mejor las cargas. Aumento en la capacidad portante del sistema al causar que la superficie de falla por capacidad carga se extienda más y se desarrolle en un plano mayor resistencia al cortante. <br />
Filtración <br />
- El geotextil previene que los finos migren hacia el agregado debido a las altas presiones de poro inducidas por las cargas dinámicas de las ruedas y al mismo tiempo permite el paso del agua para disipar presiones hidrostáticas. <br />
Uso de Geotextil no tejido para estabilización y separación de caminos sobre suelos blandos. <br />
-Separación y filtración de suelos. <br />
-Refuerzo (V.R.S < 3%) <br />
-Restricción desplazamiento lateral. <br />
-Aumento capacidad portante, disminución de deformaciones. <br />
Beneficios <br />
- Reducir la sustitución de suelos blandos que se consideran inadecuados para la construcción tradicional de un camino. <br />
- Reducir el espesor y mantener la integridad de la base necesaria para el camino. <br />
- Reducir el asentamiento diferencial del camino, lo cual prmite mantener la integridad, uniformidad y servicio del pavimento. <br />
- Prolongar el costo de mantenimiento y prolongar la vida útil del pavimento. <br />
Uso de Geotextil no tejido para estabilización y separación de caminos <br />
<img alt="" height="254" src="http://www.gemia.com.mx/documents/W83_pasted_3.jpeg" title="" width="450" /> <br />
<img alt="" src="http://www.gemia.com.mx/documents/W83_pasted_4.jpeg" title="" /> <br />
Materiales aplicables comúnmente: <br />
No tejidos medianos robustos. <br />
Pasos de diseño de caminos no pavimentados y pavimentados usando Geotextil. <br />
- Determinar la capacidad de carga del suelo <br />
- Estimar la intensidad de tránsito y cargas por rueda esperadas en la vida útil del camino. <br />
- Establecer profundidad de deformación aceptable para diseño de caminos no pavimentados. <br />
- Diseñar espesor de pavimento. Para método AASHTO aplicar factor apropiado para tipo y calidad de capas de pavimento, y factor de contribución del geotextil. <br />
- Checar criterio de filtración del geotextil. <br />
- Determinar requerimientos de sobrevivencia del geotextil: <br />
o Tabla de valores mínimos establecidos por AASHTO M288 <br />
- Especificar lineamientos y requerimientos de construcción. <br />
Lineamientos de instalación del geotextil no tejido <br />
-Aplicar el Geotextil no tejido sobre superficies lisas, libres de objetos que puedan dañar al geotextil. <br />
<img alt="" height="230" src="http://www.gemia.com.mx/documents/W83_pasted_8.jpeg" title="" width="450" /> <br />
- El Geotextil puede desenrollarse a mano o utilizando algún equipo adaptado para esta función, evitando en lo posible las arrugas. <br />
<img alt="" height="277" src="http://www.gemia.com.mx/documents/W83_pasted_9.jpeg" title="" width="450" /> <br />
- La unión o traslape no debe ser menos de 30 cms. o la indicada por especificaciones de diseño, también pueden usar uniones cosidas o grapadas <br />
<img alt="" height="378" src="http://www.gemia.com.mx/documents/W83_pasted_10.jpeg" title="" width="450" /> <br />
- El Geotextil no se puede fijar al suelo por medio de anclas o broches, ó piedras lisas. <br />
<img alt="" height="281" src="http://www.gemia.com.mx/documents/W83_pasted_11.jpeg" title="" width="450" /> <br />
- El material no debe ser pisado directamente por equipos de construcción. Debe existir una capa de 20 ó 30 cms. de relleno para proteger el material de estos equipos y proporcionar confinamiento. <br />
<img alt="" height="282" src="http://www.gemia.com.mx/documents/W83_pasted_12.jpeg" title="" width="450" /> <br />
- Es recomendable no tener expuesto el material geotextil al sol por más de quince días. <br />
<img alt="" height="436" src="http://www.gemia.com.mx/documents/W83_pasted_13.jpeg" title="" width="450" /> <br />
Lineamientos de instalación del geotextil no tejido <br />
- El Geotextil no se puede fijar al suelo por medio de anclas o broches, ó piedras lisas. <br />
- El material no debe ser pisado directamente por equipos de construcción. Debe existir una capa de 20 ó 30 cms. de relleno para proteger el material de estos equipos y proporcionar confinamiento. <br />
- Es recomendable no tener expuesto el material geotextil al sol por más de quince días. <br />
Filtración <br />
El funcionamiento equilibrado del sistema geotextil-suelo que permita el flujo del líquido a través del plano del geotextil y que a la vez retenga las partículas de grano fino del suelo de acuerdo a los requerimientos del diseño. <br />
<img alt="" src="http://www.gemia.com.mx/documents/W83_pasted_14.jpeg" title="" /> <br />
Sustitución de filtro granular por Geotextil no tejido <br />
<img alt="" height="323" src="http://www.gemia.com.mx/documents/W83_pasted_15.jpeg" title="" width="450" /> <br />
Factores a considerar para aplicaciones de filtración. <br />
-Definir tipo de obra, identificar si la naturaleza del proyecto es crítica ó severa. <br />
-Analizar condiciones de flujo. Determinar propiedades del suelo con el que se interactúa. <br />
-Aplicar criterio de diseño adecuado para la filtración: retención, taponamiento, permeabilidad. <br />
- Considerar para condiciones extremas llevar a cabo pruebas que simulen condiciones reales de filtración. <br />
-Resistencia adecuada a la sobrevivencia al procedimiento de construcción (Tabla AASHTO M288). <br />
- Definir procedimiento de construcción apropiado. <br />
Ejemplos de usos de Filtros Geotextiles no tejidos en caminos <br />
<img alt="" height="348" src="http://www.gemia.com.mx/documents/W83_pasted_5.jpeg" title="" width="450" /> <br />
<img alt="" height="582" src="http://www.gemia.com.mx/documents/W83_pasted_6.jpeg" title="" width="450" /> <br />
<img alt="" height="681" src="http://www.gemia.com.mx/documents/W83_pasted_7.jpeg" title="" width="450" /> <br />
Geotextiles no tejidos usados en sobrecarpetas asfálticas <br />
Los Geotextiles no tejidos pueden aplicarse sobre pavimentos deteriorados de concreto asfáltico o hidráulico en colocación de sobrecarpetas asfálticas <br />
Funciones del Geotextil. <br />
-Impermeabilización: al ser impregnado con asfalto forma una barrera impermeable que protege de la humedad a la estructura del pavimento subyacente evitando así el ablandamiento de la base portante y posterior degradación del pavimento. <br />
-Capa disipadora de esfuerzos: con lo que se retarda la reflexión de grietas existentes en el pavimento deteriorado hacia la sobrecarpeta. <br />
Ventajas <br />
- Aumenta la vida útil del pavimento <br />
- Disminuye los costos de mantenimiento <br />
- Incrementa el tiempo con condiciones satisfactorias de servicio del pavimento. </div>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-56949396886379789782011-07-25T09:49:00.002-05:002011-08-11T23:19:58.753-05:00DISEÑO Y ANALISIS POR MEDIO DE ELEMENTOS FINITOS CON SAP 2000Este curso de enseña los fundamentos básicos para la comprensión y manejo del software SAP2000 y al terminar el curso el estudiante estará en la capacidad de:<br />
<img alt="" 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" /> <br />
<ul><li>Modelar estructuras en el plano utilizando los elementos FRAME y SHELL.</li>
<li>Modelar estructuras en el espacio utilizando los elementos FRAME y SHELL.</li>
<li>Manejar archivo DXF para importar modelos elaborados en AUTO CAD.</li>
</ul><blockquote><i>Manual escrito por:</i> <b>Carlos Humberto Herrera</b></blockquote> FUENTE : <b>CivilGeek</b><br />
<b> DESCARGALO EN :</b><br />
<a href="http://www.4shared.com/document/6S4pzFWR/CURSO_DISEO_ESTRUCTURAL_CON_SA.html">http://www.4shared.com/document/6S4pzFWR/CURSO_DISEO_ESTRUCTURAL_CON_SA.html</a>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-35610356353941877052011-07-25T09:36:00.000-05:002011-07-25T09:36:01.958-05:00MANUAL DE DISEÑO DE ESTRUCTURAS PREFABRICADAS Y PREFORZADAS<div style="text-align: justify;"><br />
</div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;">Es un hecho que los métodos constructivos del futuro van a estar basados en la prefabricación. Estos nacen con las producciones en serie y viéndose favorecidos con la aparición del presfuerzo, de tal modo que al producir piezas o elementos prefabricados presforzados (pretensados o postensados) su aplicación ha sido creciente. Hay campos de la construcción en donde estos métodos prácticamente son los únicos que se utilizan, por ejemplo, en viaductos, puentes vehiculares, puentes peatonales; también se aplica en tanques de almacenamiento, techumbres en naves industriales, en losas de entrepiso y azotea, en viviendas de interés social, interés medio, edificios de oficinas y centrales de abasto, entre otros. </div><br />
descargalo en :<br />
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<div style="text-align: justify;"><img alt="" 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" 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Fuente : <span><strong>CivilGeek</strong></span>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-1754237538885902132011-07-22T03:02:00.000-05:002011-07-22T03:02:21.755-05:00Ingeniería Civil UNP otorgó reconocimiento a docentes fundadores<h5><a href="http://www.unp.edu.pe/institucional/images/stories/noticias/facultades/faccivil/recondocfundacivil_600x450.jpg"><img align="right" border="0" height="100" src="http://www.unp.edu.pe/institucional/images/stories/noticias/facultades/faccivil/recondocfundacivil_600x450.jpg" width="150" /></a>Celebra XV Aniversario </h5><div> </div><div style="text-align: justify;">En mérito a su destacada trayectoria profesional y por ser dos de sus principales fundadores, la Facultad de Ingeniería Civil (FIC), de la Universidad Nacional de Piura, otorgó un merecido reconocimiento al Ing. Jorge Alberto Jibaja Elías y al Ing. Zivco Gencel Opalic, en la inauguración de la semana de la Ingeniería Civil por el XV Aniversario de esta Facultad.</div><div style="text-align: justify;">A la ceremonia asistieron el Dr. José Rodríguez Lichtenheldt, Rector de la <a href="http://www.unp.edu.pe/">UNP</a>, el Dr. Oscar Vásquez Ramos Vicerrector Administrativo, además estuvo presente el Decano de la Facultad de Ingeniería Civil, Dr. Omar Vences Martínez y estudiantes de Ingeniería Civil de esta Casa Superior de Estudios.</div><div style="text-align: justify;">Las palabras de bienvenida a los destacados profesionales estuvo a cargo del Decano de la FIC, quien resaltó que gracias a la iniciativa de sus fundadores y al trabajo realizado en estos 15 años, dicha Facultad se ha convertido en una de las mejores del país. “En las principales empresas de nuestro país están posesionados nuestros alumnos y vamos a seguir así, formando buenos profesionales”, dijo.</div><div style="text-align: justify;">El Rector de la Universidad Nacional de Piura, Dr. José Rodríguez Lichtenheldt afirmó “nuestros alumnos tienen espacios ganados en las mejores empresas del país por su profesionalismo, su destreza y su honestidad, lo que queremos es hacer una buena labor académica, formar profesionales que aporten al país”. Instó a que todos nos superemos, a estar en competencia con las otras Universidades del País y demostrar que una Universidad de Provincia está a la altura de las mejores Universidades del País.</div><div style="text-align: justify;">Así mismo, el Ing. Zivco Gencel Opalic, docente de esta Universidad dijo “Seguiré comprometido con ustedes dando lo mejor de mí, sólo estudiando mejor, pueden llevar al Perú a un destino mucho más decente, depende de ustedes que destino va a llevar el Perú”.</div><div style="text-align: justify;">Por su parte, el Ing. Jorge Alberto Jibaja Elías, ex docente de la UNP manifestó “Este reconocimiento es un aliciente para mi, seguiré prestando mis conocimientos para que sus estudios sean en beneficio de los alumnos de la Universidad Nacional de Piura”.</div><div style="text-align: justify;">De esta manera se dio inicio al ciclo de conferencias por la semana de Ingeniería Civil. Para mañana martes a partir de las 9:00 a.m. se ofrecerán charlas de SENCICO OSINERG Y PRO VIAS NACIONAL.</div><div style="text-align: justify;">El día miércoles a las 9:00 a.m. el Mg. Ing. Augusto Zegarra Ramírez ofrecerá la conferencia “Programas de Viviendas en Centros Urbanos y Rurales” y el Ing. Genaro Delgado Contreras, docente de la Facultad de Ingeniería Civil de la Universidad Nacional de Ingeniería (UNI) tendrá a cargo la Conferencia “Estructura y Construcción en edificios altos” a las 11:15 a.m.</div><div style="text-align: justify;">Para el día jueves 21 de julio a las 11:15 a.m. se tiene programada la conferencia “Análisis Dinámico de Estructuras” a cargo del Dr. Ing. Javier Pique del Pozo, Decano de la Facultad de Ingeniería Civil de la Universidad Nacional de Ingeniería (UNI).</div><div style="text-align: justify;">El día viernes a las 9:00 a.m. la Conferencia "Estudio y Análisis de Vigas Curvas" estará a cargo del Dr. Ing. Julio Kuroiwa Zevallos, Director del Laboratorio Nacional de Hidráulica y docente de la UNI. </div>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-70291987768902698862011-07-21T10:03:00.000-05:002011-07-21T10:03:11.208-05:00ENERGÍA DEL FLUJO EN CANALES ABIERTOS<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">La <span class="IL_AD" id="IL_AD8">energía</span> total de cualquier línea de corriente que pasa a través de una sección se define como la <span class="IL_AD" id="IL_AD12">suma</span> de las energías de posición, más la de presión y más la de velocidad, es decir:</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Energía total = Energía de posición + Energía de presión Energía de velocidad</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj1BMSpPhvCY57BVtjArsabSRo9A9i2ZvAP81vHXHrXuN9VFWqvhws4K2l9fH9WvJ8cPQosX5UPAzmVLY_yesHKBjf4bSaAUwXZCLXKH_jYm8en0sif27YM05uZ86KjlapO6wcfEYmqbxU/s1600/333.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="181" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj1BMSpPhvCY57BVtjArsabSRo9A9i2ZvAP81vHXHrXuN9VFWqvhws4K2l9fH9WvJ8cPQosX5UPAzmVLY_yesHKBjf4bSaAUwXZCLXKH_jYm8en0sif27YM05uZ86KjlapO6wcfEYmqbxU/s320/333.jpg" width="320" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">FIGURA Energía total en una sección de un canal.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Con respecto al plano de referencia de la figura siguiente, la altura total <i>E </i>de una sección <i>O </i>que contiene el punto <i>A </i>en una línea de corriente del flujo de un canal de <span class="IL_AD" id="IL_AD5">pendiente</span> alta puede escribirse como:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgKSZlPIhvrtdDOjOHgxn9fNgSlXulT_RtvVqSSzToyMy0AQpTWPIosRifQYTXLRs7pEp23bw_2pYen1Pt2-5Z7wF6dLu10pqPfjFeFXMjH39kJ5iG3O-RKztQfisc9gJDBq-Z1bHX3Pvo/s1600/334.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgKSZlPIhvrtdDOjOHgxn9fNgSlXulT_RtvVqSSzToyMy0AQpTWPIosRifQYTXLRs7pEp23bw_2pYen1Pt2-5Z7wF6dLu10pqPfjFeFXMjH39kJ5iG3O-RKztQfisc9gJDBq-Z1bHX3Pvo/s1600/334.jpg" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCA1-Lp5O32COkC2NJPoKt2mGxqvM_XV2lpGq2hji2VIuKRvvIQrfSYMot5GTGL-3OlEMCC_SUaWOU20ze12jKDYZqfUMNqYDMJbOS5bXMHXXFk25eFbSYmhZLUAz7yuwW_mLyD6MM9gU/s1600/335.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="170" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCA1-Lp5O32COkC2NJPoKt2mGxqvM_XV2lpGq2hji2VIuKRvvIQrfSYMot5GTGL-3OlEMCC_SUaWOU20ze12jKDYZqfUMNqYDMJbOS5bXMHXXFk25eFbSYmhZLUAz7yuwW_mLyD6MM9gU/s320/335.jpg" width="320" /></a></div><br />
<span style="font-size: 11.5pt;">FIGURA Energía de un flujo gradualmente variado en canales abiertos.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Dónde:</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">ZA </span></i><span style="font-size: 11.5pt;">= elevación del punto <i>A </i>por encima del plano de referencia</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">yA </span></i><span style="font-size: 11.5pt;">= profundidad del punto <i>A </i>por debajo de la superficie del agua</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">θ </span></i><span style="font-size: 11.5pt;">= ángulo de la pendiente del fondo del canal.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">VA²</span></i><span style="font-size: 11.5pt;">/2<i>g </i>= altura de velocidad del flujo en la línea de corriente que pasa a través de <i>A</i>.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">En general, cada línea de corriente que pasa a través de una sección de canal tendrá una altura de velocidad diferente, debido a la distribución no uniforme de velocidades en flujos reales. Solo en un flujo <span class="IL_AD" id="IL_AD7">paralelo</span> ideal con distribución uniforme de velocidades la altura de velocidad puede ser idéntica para todos los puntos de la sección transversal. En el caso del flujo gradualmente variado, sin embargo, para propósitos prácticos, puede suponerse que las alturas de velocidad para todos los puntos de la sección del canal son iguales y, con el fin de tener en cuenta la distribución no uniforme de velocidades, puede utilizarse el coeficiente de energía para corregir este efecto. Luego la energía total en la sección es:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhk_drvSGe7seQcpydCJqPqBvUSgJFiEhMndU51NS0gaO-MBatDg75MT9NG1e2Pt2ySKys8Fxw02dYZdd1qOscyEJQPwlK7V0EO8kKSvNM1WmWxETcQez3kNgb3kDZQPlJQ26dhwmyDAIU/s1600/336.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhk_drvSGe7seQcpydCJqPqBvUSgJFiEhMndU51NS0gaO-MBatDg75MT9NG1e2Pt2ySKys8Fxw02dYZdd1qOscyEJQPwlK7V0EO8kKSvNM1WmWxETcQez3kNgb3kDZQPlJQ26dhwmyDAIU/s1600/336.jpg" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Para canales con pendientes bajas, <i>θ </i>≈ <i>0</i>. La energía total en la sección del canal es:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhY042Wd8Ba5_90Cf7yl95NL7w0oNzrncccpxJD0eOiD8JjqmqEfA-ZPnrkrjh_UNCRDy9WoKWvVXWTUBvFeTQHHheoVYi4A2A6HjIEIaEdMz16mUWTbRcP346oyQF4JCl_DKjP5fLBFy0/s1600/337.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhY042Wd8Ba5_90Cf7yl95NL7w0oNzrncccpxJD0eOiD8JjqmqEfA-ZPnrkrjh_UNCRDy9WoKWvVXWTUBvFeTQHHheoVYi4A2A6HjIEIaEdMz16mUWTbRcP346oyQF4JCl_DKjP5fLBFy0/s1600/337.jpg" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Ahora si se considera un canal prismático con pendiente alta, figura anterior. La línea que representa la elevación de la altura total de flujo es la línea de energía. La pendiente de esa línea se conoce como gradiente de energía, representada por <i>Sf</i>.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">La pendiente de la superficie del agua se representa por <i>Sw </i>y la pendiente del fondo del canal por <i>S</i>o = <i>senθ</i>. En el flujo uniforme, <i>Sf = Sw = S</i>o = <i>senθ</i>.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Como la energía por unidad de peso (m-kg/kg) se expresa en unidades de longitud, entonces los elementos de la ecuación de energía total se expresan de la siguiente forma:</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">E </span></i><span style="font-size: 11.5pt;">= altura total de sección</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">Z </span></i><span style="font-size: 11.5pt;">= altura de posición</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">y </span></i><span style="font-size: 11.5pt;">= altura de presión</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">α</span><span style="font-family: "Cambria Math","serif"; font-size: 11.5pt;">⋅</span><span style="font-size: 11.5pt;">V²/ (2</span><span style="font-family: "Cambria Math","serif"; font-size: 11.5pt;">⋅</span><span style="font-size: 11.5pt;">g) </span><span style="font-size: 11.5pt;">= altura de velocidad</span><span style="font-size: 11.5pt;"></span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Siendo: <i>Z + y </i>la altura piezométrica</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgBiZrjvYCVpCzERx28IStj9ArXarZ72agpIL5jbV_XFQVVYemW_j4bcaIfCCWM4QE5K8Jm6S8jitRr2lYhd5wKZLsLn3Y0ptHfkxwMgwt22Y747fu_xz4GgQ1zK9-MxcUHnrc7wg5qGnk/s1600/338.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="140" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgBiZrjvYCVpCzERx28IStj9ArXarZ72agpIL5jbV_XFQVVYemW_j4bcaIfCCWM4QE5K8Jm6S8jitRr2lYhd5wKZLsLn3Y0ptHfkxwMgwt22Y747fu_xz4GgQ1zK9-MxcUHnrc7wg5qGnk/s320/338.jpg" width="320" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">FIGURA Línea de alturas totales, piezométricas y horizonte de energía.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Si la energía total se expresa por unidad de peso, se obtiene la forma más conocida de la ecuación de Bernoulli, la cual se representa como:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjJKRYH2SLngQPB_VagovRr0nXYTyteGrdlC70v9R2v373bVkpvKSJzkemsedYtPea8xYZZ2DX1kME_nttsyNNQuJFXPqwAnBVj8pFbq9rPu5wdg4-Swnv6hPu0bgu2lQiVCdAxjA_ic48/s1600/339.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjJKRYH2SLngQPB_VagovRr0nXYTyteGrdlC70v9R2v373bVkpvKSJzkemsedYtPea8xYZZ2DX1kME_nttsyNNQuJFXPqwAnBVj8pFbq9rPu5wdg4-Swnv6hPu0bgu2lQiVCdAxjA_ic48/s1600/339.jpg" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Dónde:</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">E </span></i><span style="font-size: 11.5pt;">= energía total en la sección</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">Z </span></i><span style="font-size: 11.5pt;">= energía de posición o de elevación</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">y </span></i><span style="font-size: 11.5pt;">= <span class="IL_AD" id="IL_AD1">tirante</span> en la sección</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">V </span></i><span style="font-size: 11.5pt;">= velocidad media que lleva el flujo en esa sección</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">α </span></i><span style="font-size: 11.5pt;">= coeficiente de Coriolis para la sección</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">De acuerdo con el principio de conservación de energía, la altura de energía total en la sección (1) localizada aguas arriba debe ser igual a la altura de energía en la sección (2) localizada aguas abajo.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">En el caso de un fluido ideal, la energía <i>E </i>en (1) es igual a la energía en (2). Para el caso de un fluido real hay una pérdida de energía entre (1) y (2) .En realidad no es energía pérdida, sino transformada a calor debido a la fricción. En este caso, la ecuación de la energía para el tramo (1) y (2) se muestra en la figura siguiente y se representa como:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi-HezHEb-_N-IzlsA2ieEOy8scr_1sQC-oUpZ_PvQhXCS8TWMmh7zHox8ROoQqt_-7Uopp0PreF-1eSvj4u8Y7i7LKSJauzM3kTL3Xk7jdBNAdwk2FikBrMHrWGZgTGrbHnOp4bLys5SM/s1600/340.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="172" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi-HezHEb-_N-IzlsA2ieEOy8scr_1sQC-oUpZ_PvQhXCS8TWMmh7zHox8ROoQqt_-7Uopp0PreF-1eSvj4u8Y7i7LKSJauzM3kTL3Xk7jdBNAdwk2FikBrMHrWGZgTGrbHnOp4bLys5SM/s320/340.jpg" width="320" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhGr_594zFXndMUy4ntI-KVbKDPcJBXjSpJJFtoWFrCdcbS7-v8REoTFKBfhD7HjuDLHXv7iaqjMYzFXq-G97kieHf9AKjoltKCoCEhPjprNUxlWTixnXegW9X5pc0fbllmzQeHF3M-_dM/s1600/341.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhGr_594zFXndMUy4ntI-KVbKDPcJBXjSpJJFtoWFrCdcbS7-v8REoTFKBfhD7HjuDLHXv7iaqjMYzFXq-G97kieHf9AKjoltKCoCEhPjprNUxlWTixnXegW9X5pc0fbllmzQeHF3M-_dM/s1600/341.jpg" /></a></div><span style="font-size: 11.5pt;">FIGURA Energía en las secciones 1 y 2.</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Esta ecuación es aplicable a flujos paralelos o gradualmente variados. Para un canal de pendiente pequeña (<i>θ </i>≈ <i>0 </i>y <i>Cosθ </i>≈ 1), esta se convierte en:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgcWlmPHaCv3A1S5PqSOYFGK2MbRrTZDVSkhNBfSQ9PDQFFFk4ifWWDAOIllTzaP0eurF5Lqwjt74m3hqxr6-YEoIO3HDupYkm7E9zmCZuQSZmzBtITgsuT0EyKovcTOpnFxMpJIHUNlnE/s1600/342.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgcWlmPHaCv3A1S5PqSOYFGK2MbRrTZDVSkhNBfSQ9PDQFFFk4ifWWDAOIllTzaP0eurF5Lqwjt74m3hqxr6-YEoIO3HDupYkm7E9zmCZuQSZmzBtITgsuT0EyKovcTOpnFxMpJIHUNlnE/s1600/342.jpg" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">O bien:</span><br />
<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSyk9K9X5-6TinQA9yrtoJU02RhbM_u81Tu3B15NPQnDD2v2V3A2He0eTJKRoHCrpGjtk600ux815486S911V20jt9ltPU02OjkRJML1GoVFDWOGmFwEoOw94IYwKgF63zMXHozBHXshY/s1600/343.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSyk9K9X5-6TinQA9yrtoJU02RhbM_u81Tu3B15NPQnDD2v2V3A2He0eTJKRoHCrpGjtk600ux815486S911V20jt9ltPU02OjkRJML1GoVFDWOGmFwEoOw94IYwKgF63zMXHozBHXshY/s1600/343.jpg" /></a></div></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none; text-justify: inter-ideograph;"><span style="font-size: 11.5pt;">Dónde:</span></div><div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; text-align: justify; text-justify: inter-ideograph;"><i><span style="font-size: 11.5pt;">hf </span></i><span style="font-size: 11.5pt;">= disipación de energía entre las secciones (1) y (2)</span></div>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-63179870564459826592011-07-21T09:51:00.000-05:002011-07-21T09:51:26.976-05:00Clasificación de suelos por los métodos Unificado SUCS y AASHTO<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi3be34EavVscCIWQhWK660dY6ogQCuZR-IauWwrURAcPpIM9Tzgnh41KTqOj2vBXbrEo2QpZ8GRwJ_J1j7tSoHXhQB7nPBqOgrrwZoKEw1vq7fUOInCTIdzp-ptHXNkQkgBYjVrbxOgw18/s1600/construccion.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="161" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi3be34EavVscCIWQhWK660dY6ogQCuZR-IauWwrURAcPpIM9Tzgnh41KTqOj2vBXbrEo2QpZ8GRwJ_J1j7tSoHXhQB7nPBqOgrrwZoKEw1vq7fUOInCTIdzp-ptHXNkQkgBYjVrbxOgw18/s320/construccion.jpg" width="320" /></a></div>Esta es una planilla Excel muy completa, ya que les ayuda con la clasificación de suelos por los métodos Unificado SUCS y AASHTO, además de realizar la granulometría y los limites de Atterberg.<br />
<br />
<a href="http://www.4shared.com/file/Mjk9Wvyz/clasificar_suelos_de_acuerdo_a.html">http://www.4shared.com/file/Mjk9Wvyz/clasificar_suelos_de_acuerdo_a.html</a>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-58217054951321904342011-07-17T17:23:00.001-05:002011-08-11T08:31:57.682-05:00RELACION DE POISSON - HORMIGON<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjjNcUvX3XtmE1Kcr6ewan1TFca9Zks-BbGt9eZr1DKldyOqaZmqhkFeTcCJ7HWWP3i4S_69toto9JpcbAjBJW2jSBKgoTp0SVI8uPku1DJiZXRoBbsWsGX3fc4SV5hp8YqFWjd7MTI8g98/s1600/DSC06202.JPG" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"></a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg2wBehVBjeQvuWRX7PJv1J9agKBCvJVl5zSXkmJq9qozgJLJxCFdyN2s-3KkaFLdbI8GdDWxBQuwZWFlVBK7TPq6LXjVymN_q6eJOmWced8Ro5iqZmsw_ejCYhmyAtl_D1jQDee6ZkrjCB/s1600/DSC06199.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgdhSjiuHawIDrBuqg2o6cEiUGSvRGYOqtiWDRhmYZMUTB3BXbEzjpz0ZVhGb9Y-pX3KbMHsVbh_hyphenhyphenPmS5dEdqCGTpYja99V6QEY9ya9o5LGLgpH-_STdtdP15hR0DsWvjXVKViWNWymgxd/s1600/DSC06200.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjjNcUvX3XtmE1Kcr6ewan1TFca9Zks-BbGt9eZr1DKldyOqaZmqhkFeTcCJ7HWWP3i4S_69toto9JpcbAjBJW2jSBKgoTp0SVI8uPku1DJiZXRoBbsWsGX3fc4SV5hp8YqFWjd7MTI8g98/s1600/DSC06202.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br />
</a></div><br />
<div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSAkjez_DpJrJ43yRk9OP0oxYHaAjLwZl-dTHhRJwm9Mem_rrYtjCadtxFNSy1NXYlVepLqPWOFM5N3l7E_V8mHVIBmzfRxFSRfmdOsfm1rvYNqS5-ifCdOyN8c2GjbQG9OMS1p4UOuGhu/s1600/DSC06203.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhetFhYxritL8OqRZds3E7iUXUKxFECcxmGIXGavKIPdC-OPfFbYrOiDAWfj21fAB-9pueWkC9cs3pJ1ANlHK26qVPdjL40j7SG6ecQHzOE8tEHe5m8CEkJB9dJY3YaFDYeKqTEhXVxKZYp/s1600/DSC06204.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br />
</a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSAkjez_DpJrJ43yRk9OP0oxYHaAjLwZl-dTHhRJwm9Mem_rrYtjCadtxFNSy1NXYlVepLqPWOFM5N3l7E_V8mHVIBmzfRxFSRfmdOsfm1rvYNqS5-ifCdOyN8c2GjbQG9OMS1p4UOuGhu/s1600/DSC06203.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhetFhYxritL8OqRZds3E7iUXUKxFECcxmGIXGavKIPdC-OPfFbYrOiDAWfj21fAB-9pueWkC9cs3pJ1ANlHK26qVPdjL40j7SG6ecQHzOE8tEHe5m8CEkJB9dJY3YaFDYeKqTEhXVxKZYp/s1600/DSC06204.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br />
</a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSAkjez_DpJrJ43yRk9OP0oxYHaAjLwZl-dTHhRJwm9Mem_rrYtjCadtxFNSy1NXYlVepLqPWOFM5N3l7E_V8mHVIBmzfRxFSRfmdOsfm1rvYNqS5-ifCdOyN8c2GjbQG9OMS1p4UOuGhu/s1600/DSC06203.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhetFhYxritL8OqRZds3E7iUXUKxFECcxmGIXGavKIPdC-OPfFbYrOiDAWfj21fAB-9pueWkC9cs3pJ1ANlHK26qVPdjL40j7SG6ecQHzOE8tEHe5m8CEkJB9dJY3YaFDYeKqTEhXVxKZYp/s1600/DSC06204.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br />
</a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSAkjez_DpJrJ43yRk9OP0oxYHaAjLwZl-dTHhRJwm9Mem_rrYtjCadtxFNSy1NXYlVepLqPWOFM5N3l7E_V8mHVIBmzfRxFSRfmdOsfm1rvYNqS5-ifCdOyN8c2GjbQG9OMS1p4UOuGhu/s1600/DSC06203.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhetFhYxritL8OqRZds3E7iUXUKxFECcxmGIXGavKIPdC-OPfFbYrOiDAWfj21fAB-9pueWkC9cs3pJ1ANlHK26qVPdjL40j7SG6ecQHzOE8tEHe5m8CEkJB9dJY3YaFDYeKqTEhXVxKZYp/s1600/DSC06204.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br />
</a></div><div class="separator" style="clear: both; text-align: justify;">La relación de la deformación lateral a la deformación longitudinal, dentro del rango elástico, para muestras cargadas axialmente se llama Relación de Poisson. Los valores de la relación de Poisson se requieren para el análisis estructural y para el diseño de muchos tipos de estructuras. El método para determinar la relación de Poisson se detalla en la ASTM C469.<br />
<br />
La mayor parte de los valores de la relación de Poisson que se han dado a conocer, hasta un envejecimiento de 50 años, caen dentro del rango de 0.15 a 0.25. A falta de datos experimentales, se puede utilizar un valor de 0.20. </div>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-24833943939090603132011-07-16T17:45:00.001-05:002011-08-12T10:23:37.203-05:00LIBRO DE RESISTENCIA DE MATERIALES<h3 class="post-title entry-title"><br />
</h3><div class="post-header"></div><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgQaTqOLnyMAaNPojGgK1zZryC5ul2Ql1oqoYrZolUSQ3FfqfGpZMkNte6V9ZjNO1zWOLCVIZE1IH7Nz9ixhO5yNXEtgr85Fz-Q2cjEB5RJTEBdAtaniL8rJR977A5YtkPC3cLj-yYvGyw/s1600/6.jpg"><img alt="" border="0" id="BLOGGER_PHOTO_ID_5498668947732055314" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgQaTqOLnyMAaNPojGgK1zZryC5ul2Ql1oqoYrZolUSQ3FfqfGpZMkNte6V9ZjNO1zWOLCVIZE1IH7Nz9ixhO5yNXEtgr85Fz-Q2cjEB5RJTEBdAtaniL8rJR977A5YtkPC3cLj-yYvGyw/s320/6.jpg" style="cursor: hand; float: left; height: 320px; margin: 0px 10px 10px 0px; width: 224px;" /></a><br />
<span style="color: black; font-family: arial;"><span style="font-size: 130%;"><b>RESISTENCIA DE MATERIALES</b></span><br />
<br />
<span style="font-family: arial;">Autor:</span><br />
<b>Dr. Genner Villarreal Castro</b></span><br />
<span style="color: black; font-family: arial;"><b><a href="mailto:genner_vc@hotmail.com">genner_vc@hotmail.com</a> </b><br />
<br style="color: white;" /><span style="color: white;"> Lima - Perú</span><br style="color: white;" /><span style="color: white;"> 2009</span><br style="color: white;" /><span style="color: white;"> </span><br style="color: white;" /><span style="color: white;"> </span><b style="color: white;">Bajar texto completo en PDF</b><br />
<b><a href="http://www.blog.pucp.edu.pe/concretoarmado">www.blog.pucp.edu.pe/concretoarmado</a></b> </span><br />
<span style="color: black; font-family: arial;"><b><a href="http://www.capi.org.pe/articulos.html">www.capi.org.pe/articulos.html</a></b></span><a href="http://www.4shared.com/document/FqvnI-II/Libro_Resistencia_de_Materiale.html" style="color: black;"><b><span style="font-family: arial;">www.4shared.com/document/FqvnI-II/Libro_Resistencia_de_Materiale.html</span></b></a><span style="font-family: arial;"><br style="color: black;" /><br />
<b><span style="color: #33ffff;"></span></b></span>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-86518091336895464482011-07-16T03:25:00.001-05:002011-07-25T09:54:19.455-05:00SAP2000 v.14, dictado por el Dr. Genner Villarreal Castro<b style="color: black;"><span style="font-family: arial;">Podrán bajar los laboratorios, videos y archivos del curso SAP2000 v.14, dictado por el Dr. Genner Villarreal Castro, para el Centro de Capacitación Profesional en Ingenierías (CAPI) en las ciudades de Piura:</span></b><br />
<div style="color: red;"></div><div style="color: red;"></div><div style="color: red;"><b><span style="font-family: arial;">LABORATORIO Nº 1: Armaduras</span></b></div><div style="color: red;"></div><div style="color: red;"><span style="font-family: arial;"></span></div><div style="color: red;"><span style="font-family: arial;"><b></b></span></div><div style="color: red;"><span style="font-family: arial;"><b>LABORATORIO Nº 2: Vigas</b></span></div><div style="color: blue;"><b><a href="http://www.4shared.com/file/9FGkKapc/Laboratorio_N_2.html" target="_blank"><span style="font-family: arial;">www.4shared.com/file/9FGkKapc/Laboratorio_N_2.html</span></a></b></div><div style="color: blue;"><b><span style="font-family: arial;"> </span><span style="font-family: arial;"> </span></b></div><div style="color: blue;"><b><span style="font-family: arial;"></span></b></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: blue;"><span style="font-family: arial;"></span></div><div style="color: red;"><b><span style="font-family: arial;">LABORATORIO Nº 3: Pórticos</span></b></div><div style="color: blue;"><b><a href="http://www.4shared.com/file/ONnkStj0/Laboratorio_N_3.html" target="_blank"><span style="font-family: arial;">www.4shared.com/file/ONnkStj0/Laboratorio_N_3.html</span></a></b></div><div style="color: blue;"><b><span style="font-family: arial;"> </span><span style="font-family: arial;"> </span></b></div><div style="color: red;"><b><span style="font-family: arial;">LABORATORIO Nº 4: Análisis sísmico estático y diseño estructural de edificio aporticado</span></b></div><div style="color: blue;"><b><a href="http://www.4shared.com/file/YJQ4iG96/Laboratorio_N_4_a.html" target="_blank"><span style="font-family: arial;">www.4shared.com/file/YJQ4iG96/Laboratorio_N_4_a.html</span></a><span style="font-family: arial;"> </span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/8H8xXsfL/Laboratorio_N_4_b.html" target="_blank">www.4shared.com/file/8H8xXsfL/Laboratorio_N_4_b.html</a></span></b></div><div style="color: blue;"></div><div style="color: red;"><b><span style="font-family: arial;">LABORATORIO Nº 5: Análisis sísmico dinámico de edificio aporticado</span></b></div><div style="color: blue;"><b><span style="font-family: arial;"><a href="http://www.4shared.com/file/VM2ywJvU/Laboratorio_N_5_a.html" target="_blank">www.4shared.com/file/VM2ywJvU/Laboratorio_N_5_a.html</a></span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/EvLiezXj/Laboratorio_N_5_b.html" target="_blank">www.4shared.com/file/EvLiezXj/Laboratorio_N_5_b.html</a></span></b></div><div style="color: blue;"></div><div style="color: red;"><b><span style="font-family: Arial;">LABORATORIO Nº 6: Análisis sísmico dinámico de edificio con muros estructurales</span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/c84_2vyw/Laboratorio_N_6_a_part1.html" target="_blank">www.4shared.com/file/c84_2vyw/Laboratorio_N_6_a_part1.html</a> </span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/IpAlWp70/Laboratorio_N_6__a_part2.html" target="_blank">www.4shared.com/file/IpAlWp70/Laboratorio_N_6__a_part2.html</a> </span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/GeajWN60/Laboratorio_N_6__a_part3.html" target="_blank">www.4shared.com/file/GeajWN60/Laboratorio_N_6__a_part3.html</a></span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/ab7FdyG5/Laboratorio_N_6_b.html" target="_blank">www.4shared.com/file/ab7FdyG5/Laboratorio_N_6_b.html</a></span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"> </span></b></div><div style="color: red;"><b><span style="font-family: Arial;">LABORATORIO Nº 7: Análisis no-lineal para edificio aporticado con disipadores de energía</span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/vSMdt4J9/Laboratorio_N_7.html" target="_blank">www.4shared.com/file/vSMdt4J9/Laboratorio_N_7.html</a></span></b></div><div style="color: blue;"><b><span style="font-family: Arial;">Modelo de Trabajo SAP2000 CAPI Piura: Ing. Edward Castillo Castillo</span></b></div><div style="color: blue;"><b><span style="font-family: Arial;"><a href="http://www.4shared.com/file/WZz_2kSM/Modelo_de_Trabajo_SAP2000_CAPI.html" target="_blank">www.4shared.com/file/WZz_2kSM/Modelo_de_Trabajo_SAP2000_CAPI.html</a></span></b></div><div style="color: blue;"><img alt="" height="1" src="https://blogger.googleusercontent.com/tracker/1088443365611466797-1857604658299922293?l=gennervillarrealcastro.blogspot.com" width="1" /></div>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-52987473363104141932011-07-16T03:13:00.000-05:002011-07-16T03:13:16.883-05:00DR. GENNER VILLARREAL CASTRO (ARTICULOS )<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiYFHldBEI3sFwtCKznlMaJTqf0x4x5xn1lmqPZl8QbKxqkRPcwib1nHZm5I326NtffTUaqrY9SnnaAu_gVAnZG2_pjYV_IrXOr_vMr29-wTta6tzdoUkuO5QCfdhyphenhyphenerOGOQ_bFlpUezSIQ/s1600/UCP-Large.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="228" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiYFHldBEI3sFwtCKznlMaJTqf0x4x5xn1lmqPZl8QbKxqkRPcwib1nHZm5I326NtffTUaqrY9SnnaAu_gVAnZG2_pjYV_IrXOr_vMr29-wTta6tzdoUkuO5QCfdhyphenhyphenerOGOQ_bFlpUezSIQ/s320/UCP-Large.jpg" width="320" /></a></div><h3 class="post-title entry-title"><br />
</h3><div class="post-header"> </div><br style="color: blue;" /><span style="color: blue; font-family: arial;"><strong></strong></span><br style="color: blue;" /><span style="color: blue; font-family: arial;"><strong>ARTICULO 1: Construcciones sismo-resistentes (revista CAPECO 2011)</strong></span><br style="color: blue;" /><a href="http://www.4shared.com/account/document/IKIXve28/ARTICULO_1.html" style="color: red;"><strong><span style="font-family: Arial;">www.4shared.com/account/document/IKIXve28/ARTICULO_1.html</span></strong></a><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 2: Espectros sísmicos CIP Lima y Arequipa (Charla Lima)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.blogger.com/goog_1341455882">www.4shared.com/document/xKCWSFXX/ESPECTROS_SISMICOS_CIP_LIMA_Y_.html</a></span></strong><strong style="color: blue;"><span style="font-family: Arial;"></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 3: Diagnóstico estructural del colapso del parque de agua de Moscú "Transval-Park" (revista Ingeniería y Construcción, 2010)</span></strong><br style="color: blue;" /><strong style="color: red;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/4ZT5_fyx/ARTICULO_3.html">www.4shared.com/document/4ZT5_fyx/ARTICULO_3.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 4: Construcción, evaluación y rehabilitación de puentes (revista CAMPUS - USMP, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/p9P_5N51/ARTICULO_4.html">www.4shared.com/document/p9P_5N51/ARTICULO_4.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 5: Interacción suelo-estructura en edificaciones (revista USTA-Tunja-Colombia, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/uFgkZoCK/ARTICULO_5.html">www.4shared.com/document/uFgkZoCK/ARTICULO_5.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 6: Análisis de estructuras con el programa LIRA 9.0 (revista Ingeniería y Construcción, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/z4WSQ0ec/ARTICULO_6.html">www.4shared.com/document/z4WSQ0ec/ARTICULO_6.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 7: Universidad Nacional de Ingeniería Civil de Moscú (para web oficial MSCEU, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/ez9MWxJZ/ARTICULO_7.html">www.4shared.com/document/ez9MWxJZ/ARTICULO_7.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 8: Propuesta de Reglamento de Tesis en Ingeniería Civil - Area de Estructuras (revista CAMPUS-USMP, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/2qWN2Kdf/ARTICULO_8.html">www.4shared.com/document/2qWN2Kdf/ARTICULO_8.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 9: Atención permanente en preparación humanística de los estudiantes universitarios (revista CAMPUS-USMP, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.4shared.com/document/vebBhzqj/ARTICULO_9.html">www.4shared.com/document/vebBhzqj/ARTICULO_9.html</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 10: El Ingeniero Civil determina las causas de un colapso (para web carreras con futuro, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;"><a href="http://www.carrerasconfuturo.com/2010/07/06/el-ingeniero-civil-determina-las-causas-de-un-colapso">www.carrerasconfuturo.com/2010/07/06/el-ingeniero-civil-determina-las-causas-de-un-colapso</a></span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ARTICULO 11: En el Perú es importante aplicar sistemas estructurales de muros (para web carreras con futuro, 2010)</span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">www.carrerasconfuturo.com/2010/08/11/en-el-peru-es-importante-aplicar-sistemas-estructurales-de-muros </span></strong><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ENTREVISTA 1: Sistema estructural de muros de ductilidad limitada (entrevista para Diario La Industria, 2010)</span></strong><br style="color: blue;" /><a href="http://www.4shared.com/document/Y2i0MQgH/ENTREVISTA_1.html"><strong style="color: blue;"><span style="font-family: Arial;">www.4shared.com/document/Y2i0MQgH/ENTREVISTA_1.html</span></strong></a><br style="color: blue;" /><strong style="color: blue;"><span style="font-family: Arial;">ENTREVISTA 2: Casonas son un peligro (para Diario Correo, 2010)</span></strong><br style="color: blue;" /><strong><span style="color: #ff6600; font-family: Arial;">http://correoperu.pe/correo/nota.php?txtEdi_id=7&txtSecci_parent=0&txtSecci_id=44&txtNota_id=155292 </span></strong>Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-52079911352638753322011-07-16T02:38:00.000-05:002011-07-16T02:38:18.514-05:00construccion del Cristo del Pacífico<img src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEigQ_HUvro30h6PA9D-NmJi_rALpNJbnCUa_ek502hgpYWbmx2k_tDiyO2hRd4pDqZdpyD5iMS7gCuy0fHpoWTOBC86z-sext20CbJLc6nu527nDEmWVyvbqqUU__ZGHLAMeg2YLGz3a04/s400/Rendy.JPG" style="display: block; float: none; margin: 0px auto 4px;" /><br />
La enorme estructura, que está emplazada en la cima del histórico Morro Solar, y que tiene nada menos que 37 metros de altura (el equivalente a un edificio de 12 pisos), ha sido donada (ver <a href="http://www.pcm.gob.pe/transparencia/Resol_ministeriales/2011/RM-112-2011-PCM.pdf">aquí</a>) por la Asociación Odebrecht Perú para el Desarrollo Sostenible y la Conservación, que para el efecto conformó, con ciudadanos peruanos, el Patronato Cristo del Pacífico. Valorizada en US$ 833 mil, fue construida íntegramente en Brasil, desde donde fue traída, semi armada, por barco.<br />
<img src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzhRL5OSMWzMyMFgyhYamK2imwBsJvyXuR03KBekY23bVJh2UF36C8h76uUnZ9gA7jU7-wNqF98o1vUWt-VjasAzpl0reNZHTFZvwHlUYxmeSoyiPR_IWqcjYtaEuKJ2RujBVCW7OCCKk/s400/Rendy2.JPG" style="display: block; float: none; margin: 0px auto 4px;" />Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-65485311850608238022011-07-16T01:52:00.000-05:002011-07-16T01:56:01.162-05:00Ingeniería Civil es la carrera mejor remunerada del Perú<h1></h1><div style="text-align: justify;">Según una encuesta realizada por el portal <b>Universia Perú</b>, el 24% de consultados creen que <b>Ingeniería Civil </b>es la carrera que obtiene mejor remuneración en el país.</div><div style="text-align: justify;"><a href="http://www.peruenvideos.com/wp-content/uploads/2010/06/ing-civil_energia.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img alt="" border="0" class="alignright size-full wp-image-6073" height="212" src="http://www.peruenvideos.com/wp-content/uploads/2010/06/ing-civil_energia.jpg" title="ing-civil_energia" width="300" /></a>El sondeo se realizó con motivo del <b>Día del Ingeniero</b> el pasado 8 de junio con una muestra de 1.359 personas entre el 21 y 25 de mayo, según <b>Jorge Morales, editor de Contenidos de Universia</b>.</div><div style="text-align: justify;">Es así que un ingeniero civil gana en promedio S/.4.800 al mes, seguido por un ingeniero de sistemas, con un sueldo de unos S/.4.600 mensuales, según los estudios realizado en “Retornos a la educación superior en el mercado laboral” por <b>Gustavo Yamada, profesor de la Universidad del Pacífico</b>. “Ingeniería civil es la carrera mejor remunerada en el Perú, pues desde el 2003, tanto en el sector público como en el privado, se han venido realizando grandes inversiones en obras que requieren de profesionales calificados”, agregó Yamada.</div><h2 style="text-align: justify;">Más carreras tienen la proyección</h2><div style="text-align: justify;">En tanto, la carrera que más necesita el país, según el 25% de los encuestados, eligió <b>Ingeniería Industrial,</b> el 23% eligió <b>Ingeniería Ambiental </b>y un 18% eligió <b>Ingeniería Civil</b>.</div><div style="text-align: justify;">Y con más proyección para el futuro, el 26% cree que es Ingeniería Ambiental, el 21% piensa que Ingeniería Industrial y el 20% aprobó Ingeniería Civil.</div><h2 style="text-align: justify;">Las carreras que el país necesita</h2><div style="text-align: justify;">Finalmente el sondeo de Universia dio como resultado que el 10% de los encuestados cree que el Perú necesita de <b>ingeniero de Sistemas,</b> el 9%, por ingenieros de <b>Mecatrónica</b> y el 4%, por <b>ingenieros de Minas.</b></div><div style="text-align: justify;">Cabe señalar que la encuesta fue realizada entre estudiantes de pregrado, posgrado y egresados de la <b>universidad de Lima </b>y de provincias, donde el 45% de encuestas oscila entre las edades de 18 y 25 años.</div>A continuación sepa qué es Ingeniería Civil.<br />
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<div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen='allowfullscreen' webkitallowfullscreen='webkitallowfullscreen' mozallowfullscreen='mozallowfullscreen' width='320' height='266' src='https://www.youtube.com/embed/dWTEoogb79E?feature=player_embedded' frameborder='0'></iframe></div>(Fuente: El Comercio)Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0tag:blogger.com,1999:blog-960254326437958333.post-70074822755408804282011-07-16T00:08:00.001-05:002011-08-11T23:21:23.390-05:002011-julio-01 CHINA : El puente más largo del mundo sobre el mar<div style="text-align: justify;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiAAobzNR1RruML3d9YAkoxLHc2aWLjBUTd_2Y6RVK8uEPpshYTezBfOQAuTyLFt16tBU16GDYBwZomkZAtOFDk8pNKgsQPai6-aOP_q4xxJ6iobnr7mtjGdavnzg4c3Bnf4UtWoYumljNz/s1600/puente-qingdao-haiwan.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="213" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiAAobzNR1RruML3d9YAkoxLHc2aWLjBUTd_2Y6RVK8uEPpshYTezBfOQAuTyLFt16tBU16GDYBwZomkZAtOFDk8pNKgsQPai6-aOP_q4xxJ6iobnr7mtjGdavnzg4c3Bnf4UtWoYumljNz/s320/puente-qingdao-haiwan.jpg" width="320" /></a>Pekín, China.- China inauguró ayer el puente más largo del mundo sobre el mar, a ambos lados de la bahía de Jiazhou, que une el centro de la ciudad porteña de Qingdao con uno de sus suburbios, Huangdao, informaron portales de noticias en internet. </div><br />
La obra, que costó 2.300 millones de dólares, tiene 42,5 kilómetros de largo, y supera al que alguna vez fue el más largo construido por el hombre, ubicado también en China. La obra de ingeniería, que se creía era insuperable, tiene 36 kilómetros de longitud y se emplazó en la bahía de Hangzhou.<br />
La construcción iniciada en el 2007 tardó cuatro años en ser concluida, con la participación de más de 10.000 obreros, divididos en dos equipos que trabajaron empezando en ambos extremos del puente, para conectarlo estos días en el centro.<br />
El puente, que cuenta con ocho pistas o carriles de circulación vehicular, se sustenta en más de 5.200 columnas. Para edificarlo fueron utilizados 450.000 toneladas de acero, una cantidad que sería suficiente para elevar unas 65 Torres Eiffel, y 2,3 millones de metros cúbicos de hormigón, precisaron los sitios informativos en la web.<br />
Según las autoridades, gracias a esta nueva autopista la distancia entre ambas zonas de uno de los puertos más importantes del gigante asiático se reducirá de 40 a 20 minutos. <br />
Así, el país asiático se transforma en el precursor de las grandes obras de ingeniería en el planeta.<br />
TREN BALA UNE PEKÍN CON SHANGHAI<br />
Pekín, China. AFP.- Los 1.318 kilómetros que separan a las dos mayores ciudades chinas, Pekín y Shanghai, se podrán recorrer a partir de ahora en menos de cinco horas en el tren de alta velocidad inaugurado ayer, lo que ha llevado a las compañías aéreas a una guerra de precios.<br />
<div class="separator" style="background-color: blue; clear: both; color: blue; text-align: center;"><a href="http://www.ingciv.com%20y%20www.lanacion.com.py/"><span style="font-size: large;"><iframe allowfullscreen='allowfullscreen' webkitallowfullscreen='webkitallowfullscreen' mozallowfullscreen='mozallowfullscreen' width='320' height='266' src='https://www.youtube.com/embed/4KjXnfLlXCQ?feature=player_embedded' frameborder='0'></iframe></span></a></div>El primer ministro Wen Jiabao declaró la línea “operacional” en la estación al sur de Pekín poco antes de subirse al tren que trasladaba a los primeros pasajeros a Shanghai, mientras las fuerzas del orden vigilaban la estación.<br />
Esta línea de alta velocidad debe “mejorar el sistema de transporte moderno, promover el desarrollo social y económico y responder a las necesidades de desplazamiento de la población”, declaró el primer ministro.<br />
La nueva línea, a prueba desde mediados de mayo, reduce a la mitad la duración del viaje en tren entre las dos megalópolis chinas.Anonymoushttp://www.blogger.com/profile/07136530680714496671noreply@blogger.com0