Actualizar Secuencia Didactica: 937

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<h2></h2> <h2>¿Qué es el enlace químico?</h2>El enlace químico corresponde
a la fuerza de atracción que mantiene unidos a los átomos que forman parte de
una molécula, para lograr
estabilidad.<o:p></o:p><v:shapetype id="_x0000_t75" coordsize="21600,21600" o:spt="75" o:preferrelative="t" path="m@4@5l@4@11@9@11@9@5xe" filled="f" stroked="f">
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</o:lock></v:path></v:stroke></v:shapetype><v:shape id="Imagen_x0020_15" o:spid="_x0000_i1026" type="#_x0000_t75" alt="enlace_quimico_1.jpg (250×142)" style="width:187.5pt;height:106.5pt;
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</v:imagedata></v:shape><o:p></o:p> <o:p></o:p>Los
átomos, moléculas e iones se unen entre sí para alcanzar la máxima estabilidad,
es decir, tener la mínima energía. Para ello, utilizan los electrones que se encuentran en la capa más
externa, denominados electrones
de valencia. Estos se mueven con mucha facilidad
entre un átomo y otro, de lo cual depende el tipo de enlace que se forme.<o:p></o:p> A
partir de esto, se establecen dos reglas; la regla del octeto y
la regla del dueto. a) La regla
del octeto establece que los átomos se unen
compartiendo electrones hasta conseguir completar la última capa de energía con
cuatro pares de electrones, es decir, con 8 electrones, adquiriendo la 
configuración electrónica del gas noble más cercano.<o:p></o:p><a href="https://concepto.de/regla-del-octeto/"><v:shape id="Imagen_x0020_48" o:spid="_x0000_i1025" type="#_x0000_t75" alt="Regla del Octeto" href="https://concepto.de/regla-del-octeto/" style="width:631.5pt;height:270pt;
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</v:imagedata></v:fill></v:shape></a><o:p></o:p>b) Por otro lado, la regla del dueto,
dice que los átomos se unen compartiendo electrones hasta conseguir en la
última capa de valencia, tener un par de electrones, es decir, 2 electrones,
para conseguir la configuración electrónica del gas noble más cercano, que en
este caso es el helio.<o:p></o:p><o:p> </o:p>Para cumplir con estas reglas, los metales por lo general, tienden a ceder electrones, debido a
su baja electronegatividad y su pequeño potencial de ionización, mientras que
los no metales, debido a
su elevada electronegatividad, y alto potencial de ionización, tienden a captar
electrones. <o:p></o:p><o:p> </o:p><h2>¿Cómo se representan los electrones de
valencia de un átomo o molécula?</h2>Gilbert Lewis, propuso una
representación gráfica para poder establecer los electrones de valencia de un
átomo, colocándolos como puntos alrededor del símbolo del elemento químico.
Esto se denominó simbología
de Lewis<o:p></o:p><iframe width="500" height="281" src="//www.youtube.com/embed/K_91nPB4_CQ" frameborder="0" allowfullscreen=""></iframe> <h2> </h2><h2>OBSERVA LOS SIGUIENTES VIDEOS QUE COMPLEMENTARÁN LO VISTO EN CLASE</h2><a href="https://www.youtube.com/watch?v=6sycXHKHY0Y">https://www.youtube.com/watch?v=6sycXHKHY0Y</a> <a href="https://www.youtube.com/watch?v=S_5hiQiyXaM">https://www.youtube.com/watch?v=S_5hiQiyXaM</a><h4>Clasificación del enlace químico</h4>La clasificación del enlace químico depende del hecho de que se unan átomos, o bien, moléculas. A la unión de átomos se le llama: enlace entre átomos y a la de moléculas se le conoce como: enlace intermolecular.Ahora bien, la clasificación del enlace químico entre átomos va a depender del tipo de elemento que participe en el enlace, ya sean metales o no metales.El siguiente esquema muestra los distintos tipos de enlace.<img src="https://www.aev.dfie.ipn.mx/Materia_quimica/temas/tema4/subtema2/images/sub4_img01.jpg">Dentro de una molécula, los átomos están unidos mediante fuerzas intramoleculares (enlaces iónicos, metálicos o covalentes, principalmente). Estas son las fuerzas que se deben vencer para que se produzca un cambio químico. Son estas fuerzas, por tanto, las que determinan las propiedades químicas de las sustancias.<h2>IONES: <a href="http://www.youtube.com/watch?v=TdS-rMn4Pd0">www.youtube.com/watch?v=TdS-rMn4Pd0</a></h2>El enlace iónico es un tipo de unión química entre átomos, donde uno de ellos transfiere un electrón al otro. Este enlace se establece normalmente entre metales y no metales con diferente electronegatividad. Por lo general, el metal cede sus electrones al elemento no metal. La diferencia de electronegatividad es mayor a 1,7<a href="https://www.ecured.cu/Enlace_i%C3%B3nico"></a><a href="https://www.ecured.cu/Enlace_iónico">https://www.ecured.cu/Enlace_iónico</a> ENLACES COVALENTESDependiendo de la diferencia de electronegatividad, el enlace covalente puede ser clasificado en covalente polar y covalente puro o apolar. Si la diferencia de electronegatividad está entre 0,4 y 1,7 es un enlace covalente polar, y si es inferior a 0,4 es covalente apolar.<a href="https://www.significados.com/enlace-covalente/">https://www.significados.com/enlace-covalente/</a><a href="https://www.significados.com/enlace-covalente/"></a><iframe width="500" height="281" src="//www.youtube.com/embed/ign6-bbOqF4" frameborder="0" allowfullscreen=""></iframe> <img src="https://www.aev.dfie.ipn.mx/Materia_quimica/temas/tema4/subtema2/images/sub4_img06.gif" alt="Clasificación del enlace químico" width="286" height="217" style="width: 286px; height: 217px;"><iframe width="500" height="281" src="//www.youtube.com/embed/7aJ2LpxszPs" frameborder="0" allowfullscreen=""></iframe> <iframe width="500" height="281" src="//www.youtube.com/embed/u1XW0JFPZdM" frameborder="0" allowfullscreen=""></iframe> Ejemplos de enlace covalente. <ul><li>Oxígeno puro (O2). O=O</li><li>Hidrógeno puro (H2). H-H (un enlace simple)</li><li>Dióxido de carbono (CO2). O=C=O</li><li>Agua (H2O). H-O-H (dos enlaces simples)</li><li>Ácido clorhídrico (HCl). H-Cl (un enlace simple)</li><li>Nitrógeno puro (N2). N?N (un enlace triple)</li><li>Ácido cianhídrico (HCN).</li></ul>REALICE LA DISTRIBUCIÓN DE LEWIS. DIGA QUE CLASE DE ENLACE COVALENTE ES Y EXPLIQUE EL PORQUE<h2>¿Qué es el enlace metálico?</h2><img alt="Resultado de imagen para ENLACE METALICO" src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSOem19_800GA9vRfQf3u6nSb_c-LYJ23jT5mOFKz_J&amp;s" width="353" height="166" style="width: 353px; height: 166px;">Una unión metálica es la fuerza de atracción electrostática entre los núcleos de los átomos metálicos y los electrones libres o móviles que se encuentran en su estructura.Los enlaces metálicos se forman por la atracción entre iones metálicos y electrones deslocalizados o "libres".<iframe width="500" height="281" src="//www.youtube.com/embed/BcIRp6AlJE8" frameborder="0" allowfullscreen=""></iframe> PARA REFORZAR ENLACES QUÍMICOS:<iframe width="500" height="281" src="//www.youtube.com/embed/Thzd2YhUkLs" frameborder="0" allowfullscreen=""></iframe>

Ejercicios

TAREA PROPUESTA.REALICE LA DISTRIBUCIÓN DE LEWIS. DIGA CQUE CLASE DE ENLACE ES Y EXPLIQUE EL PORQUE <img 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" alt="">

Evidencia

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calificable?

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