tag:blogger.com,1999:blog-84199667522589535982024-03-27T13:14:30.292+01:00El blog de tu profe MaríaMaríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.comBlogger181125tag:blogger.com,1999:blog-8419966752258953598.post-74396198699374127542020-03-16T10:39:00.000+01:002020-03-16T10:39:39.278+01:00TRABAJO DESDE CASA<div style="text-align: justify;">
Hola a tod@s. Estos días tendremos que habituarnos a trabajar de otra forma. En el blog continuaré poniéndoos cosas pero las tareas concretas os las pondré por classroom (el del correo del intituto). Será por ahí por donde tendréis que enviarlas. Uníos cuanto antes a vuestra clase con el código que os dí. Ánimo a tod@s, veréis cómo aprendemos tod@s mucho.</div>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-24590689928753990832019-11-08T20:31:00.002+01:002019-11-13T18:53:53.328+01:00ECUACIONES<div style="text-align: justify;">
Hoy algunos me habéis pedido más ejercicios de ecuaciones. Os he dejado algunos en la página cursos pero he decidido recordaros algunas páginas que podéis usar:</div>
<ul style="text-align: justify;">
<li><a href="https://www.edu.xunta.es/espazoAbalar/sites/espazoAbalar/files/datos/1291360755/contido/recurso/index.htm" target="_blank">Álgebra con papas</a>. Os la recomendé al comenzar el álgebra, sobre todo a aquellos que tenéis más dificultades, porque os va corrigiendo los fallos. Con ella podéis trabajar casi todo el álgebra de secundaria.</li>
<li><a href="http://recursostic.educacion.es/secundaria/edad/index_mat.htm" target="_blank">Matemáticas para la ESO.</a> Con esta página podéis trabajar la teoría y los ejericios de matemáticas de toda la secundaria. Os he dejado el anlace al índice general, El tema de ecuaciones y sistemas de 4º académicas está <a href="http://recursostic.educacion.es/secundaria/edad/4esomatematicasB/ecuaciones/index4_4.htm" target="_blank">AQUÏ</a></li>
<li><a href="https://alcaste.com/departamentos/matematicas/secundaria/Cuarto/" target="_blank">IES Alcate</a>. Con teoría, ejercicios resueltos, test autocorregibles, ... Como también hemos visto ecuaciones logarítmicas y vamos a trabajar exponenciales, o dejo mejor éstos <a href="https://alcaste.com/departamentos/matematicas/bachillerato/PrimeroccssI/03_algebra/ejercicios_resueltos.pdf" target="_blank">ejercicios resueltos</a>.</li>
<li><a href="https://www.matesfacil.com/" target="_blank">Matesfácil</a>. Una página bastante completa donde estudiar la teoría y trabajar ejercicios. (Todos los niveles)</li>
</ul>
Escoged lo que más os guste. Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com1tag:blogger.com,1999:blog-8419966752258953598.post-28381936036832973942019-11-03T20:10:00.000+01:002019-11-03T20:10:16.515+01:00NÚMEROS NATURALES. DIVISIBILIDAD.Os dejo algunos enlaces actualizados para los que tenéis que trabajar más el tema.<br />
<ul>
<li><a href="http://recursostic.educacion.es/secundaria/edad/1esomatematicas/1quincena1/index1_1.htm" target="_blank">Números naturales</a> en ED@D y <a href="http://recursostic.educacion.es/secundaria/edad/1esomatematicas/1quincena2/index1_2.htm" target="_blank">Múltiplos y divisores</a></li>
<li>En superporf: <a href="ttps://www.superprof.es/apuntes/escolar/matematicas/aritmetica/naturales/" target="_blank">naturales</a> y <a href="https://www.superprof.es/apuntes/escolar/matematicas/aritmetica/divisibilidad/" target="_blank">divisibilidad</a></li>
<li><a href="https://conteni2.educarex.es/?sd=201" target="_blank">Números naturales y divisibilidad</a> en educarex</li>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-2473626131725428362019-04-19T19:56:00.000+02:002019-04-19T19:56:05.433+02:00FuncionesOs dejo varios enlaces para trabajar con el ordenador:<br />
<ul>
<li>La página de Antonio Expósito</li>
</ul>
<a href="http://perso.wanadoo.es/amiris/funciones/indicegraficas.html" target="_blank"><img alt="http://perso.wanadoo.es/amiris/funciones/indicegraficas.html" height="180" src="http://perso.wanadoo.es/amiris/funciones/imagenes/matematicas.jpg" width="200" /> </a><br />
<ul>
<li>La de <a href="https://iesarroyoharnina.es/extremate/ESO/Definitivo%20Funciones/pruebas/Funciones_Generales/reproductor.swf" target="_blank">Fernando Villarrubia</a></li>
<li>Proyecto ed@D: </li>
<ul>
<li>Funciones y gráficas: <a href="http://recursostic.educacion.es/secundaria/edad/3esomatematicas/3quincena9/index3_9.htm" target="_blank">1</a>, <a href="http://recursostic.educacion.es/secundaria/edad/4esomatematicasA/4quincena9/index_9.htm" target="_blank">2</a></li>
<li><a href="http://recursostic.educacion.es/secundaria/edad/3esomatematicas/3quincena10/index3_10.htm" target="_blank">Funciones lineales</a></li>
<li><a href="http://recursostic.educacion.es/secundaria/edad/4esomatematicasA/4quincena10/index_10.htm" target="_blank">Funciones elementales </a></li>
</ul>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-22611224696773805642019-03-07T19:23:00.001+01:002019-03-07T19:23:09.542+01:00GEOMETRÍA 3 ESO<a href="https://www.dropbox.com/s/sdicpn64e95ylcw/ejerciciosgeometr%C3%ADa.pdf?dl=0" target="_blank">Ésta</a> es la ficha que trabajaremos mañana en clase.Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-57616090183626384092019-02-10T20:11:00.002+01:002019-02-10T20:22:03.259+01:00PROPORCIONALIDAD Y PORCENTAJES<div style="text-align: justify;">
Después de todos los ejercicios que hemos hecho deberíais estar preparados para el examen pero por si queréis practicar de forma interactiva os dejo unos cuantos enlaces (algunos os los puse ya en classroom)</div>
<ul>
<li><a href="http://recursostic.educacion.es/secundaria/edad/1esomatematicas/1quincena6/index1_6.htm" target="_blank">Ed@d</a> (Tema completo)</li>
<li><a href="http://www.educarm.es/alkaragi/content/main.htm">Proporcionalidad</a> en Matemáticas para inmigrantes (Tema completo con teoría y ejercicios)</li>
<li>Ematemáticas:</li>
<ul>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=1" target="_blank">razón y proporción</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=2" target="_blank">proporcionalidad directa</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=3" target="_blank">proporcionalidad inversa</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=5" target="_blank">porcentajes</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=5&p=1" target="_blank">determinación de %</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=5&p=2" target="_blank">cálculo del porcentaje</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=5&p=3" target="_blank">cálculo de la cantidad inicial</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=5&p=4" target="_blank">incremento porcentual</a></li>
<li><a href="https://www.ematematicas.net/porcentajes.php?a=1&tp=5&p=5" target="_blank">descenso porcentual</a></li>
<li><a href="https://www.ematematicas.net/ejemplos/porcentajes.php" target="_blank">ejercicios resueltos de %</a></li>
</ul>
<li style="text-align: justify;">Lo más básico en EDUCAREX (para los que tenéis más dificultades): <a href="http://conteni2.educarex.es/mats/101030/contenido/">Proporción y razón. Constante de proporcionalidad</a>.; <a href="http://conteni2.educarex.es/mats/101032/contenido/">Magnitudes directamente proporcionales. Regla de tres directa.</a>; <a href="http://conteni2.educarex.es/mats/101033/contenido/">Magnitudes inversamente proporcionales. Regla de tres inversa</a>; <a href="http://conteni2.educarex.es/mats/101035/contenido/">Proporción y porcentaje</a>; <a href="http://conteni2.educarex.es/mats/101036/contenido/">Porcentaje como fracción</a>; <a href="http://conteni2.educarex.es/mats/101037/contenido/">Porcentaje como número decimal</a>; <a href="http://conteni2.educarex.es/mats/101038/contenido/">Problemas con porcentajes</a>; <a href="http://conteni2.educarex.es/mats/101039/contenido/">Disminuciones procentuales</a>; <a href="http://conteni2.educarex.es/mats/101031/contenido/">Aumentos porcentuales</a>. </li>
<li>ATENEX: </li>
<ul>
<li><a href="http://conteni2.educarex.es/mats/11856/contenido/" target="_blank">Proporciones</a></li>
<li><a href="http://conteni2.educarex.es/mats/11855/contenido/" target="_blank">Porcentajes</a></li>
</ul>
<li><a href="https://www.matesfacil.com/ESO/proporcionalidad/ejercicios-resueltos-proporcionalidad-directa-inversa.html" target="_blank">Matesfácil</a> (teoría y ejercicios resueltos)</li>
<li><a href="https://www.vitutor.com/di/p/p_e.html" target="_blank">Vituto</a>r (ejercicios resueltos)</li>
</ul>
¡A REPASAR! <br />
<br />Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-67712450623631574072019-01-16T19:11:00.001+01:002019-01-16T19:12:35.341+01:00Factorización de polinomiosOs dejo un enlace para practicar la factorización de polinomios.<br />
PINCHA <span style="font-size: large;"><a href="http://www.aomatos.com/juegos/factor-poli.php?tipo=5" target="_blank">AQUÍ</a></span>Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-15676935334193833472018-11-25T12:01:00.000+01:002018-11-25T13:00:35.596+01:00POLINOMIOSOs dejo las soluciones de la ficha que habéis estado haciendo en clase.<br />
<br />
<div style="text-align: center;">
<a href="https://www.dropbox.com/s/8deaf2j6xt812h5/solucionesfichapolinomiosclase.pdf?dl=0" target="_blank">SOLUCIONES</a><br />
<br />
<div style="text-align: justify;">
Recordad la página que os recomendé para hacer ejercicios interactivos: <a href="https://www.edu.xunta.es/espazoAbalar/sites/espazoAbalar/files/datos/1291360755/contido/recurso/index.htm" target="_blank">ÁLGEBRA CON PAPAS</a> </div>
</div>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-65184659880505200152018-11-22T18:01:00.000+01:002018-11-22T18:10:45.941+01:00PROPORCIONALIDAD<a href="https://www.vitutor.com/di/p/proporcionalidad.html#ei" target="_blank">AQUÍ</a> está el enlace que hemos esta trabajando en clase.<br />
<br />
Y pronto trabajaremos también <a href="http://proyectodescartes.org/EDAD/materiales_didacticos/EDAD_4eso_problemas_aritmeticos-JS-apli/index.htm" target="_blank">ÉSTE</a> Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-33187978931929724692018-11-02T18:44:00.000+01:002018-11-02T18:44:08.720+01:00RADICALESOs dejo los enlaces de vitutor que os comenté esta mañana para que trabajéis de forma interactiva con los radicales. Estudiad el resumen que os he dado.<br />
<ul>
<li><a href="http://www.vitutor.com/di/re/r8e.html" target="_blank">potencias con exponente fraccionario</a></li>
<li><a href="http://www.vitutor.com/di/re/r9e.html" target="_blank">radicales equivalentes</a></li>
<li><a href="http://www.vitutor.com/di/re/r10e.html" target="_blank">reducir a índice común</a></li>
<li><a href="http://www.vitutor.com/di/re/r11e.html" target="_blank">extraer e intruducir factores en un radical</a></li>
<li><a href="http://www.vitutor.com/di/re/r12e.html" target="_blank">suma de radicales</a></li>
<li><a href="http://www.vitutor.com/di/re/r13e.html" target="_blank">producto de radicales</a></li>
<li><a href="http://www.vitutor.com/di/re/r14e.html" target="_blank">cociente de radicales</a></li>
<li><a href="https://www.vitutor.com/di/re/r15e.html" target="_blank">potencia de un radical</a> </li>
<li><a href="http://www.vitutor.com/di/re/r16e.html" target="_blank">raíz de un radical</a></li>
<li><a href="http://www.vitutor.com/di/re/r17e.html" target="_blank">racionalizar</a></li>
</ul>
También podéis hacer los de intermatia<br />
<ul>
<li> <a href="https://www.intermatia.com/ejercicios/RA001/" target="_blank">definición</a></li>
<li><a href="https://www.intermatia.com/ejercicios/RA002/" target="_blank">introducir factores </a></li>
<li><a href="https://www.intermatia.com/ejercicios/RA003/" target="_blank">escribir como potencia</a></li>
<li><a href="https://www.intermatia.com/ejercicios/RA004/" target="_blank">sumas y restas</a></li>
<li><a href="https://www.intermatia.com/ejercicios/RA006/" target="_blank">multiplicaciones y divisiones</a></li>
<li><a href="https://www.intermatia.com/ejercicios/RA005/" target="_blank">racionalizar</a></li>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-73612680200504747782018-10-31T08:59:00.000+01:002018-10-31T09:03:16.560+01:00NÚMEROS ENTEROSOs dejo algunos enlaces con ejercicios interactivos para que podáis practicar:<br />
<ul>
<li><a href="https://www.matesfacil.com/interactivos/enteros/ejercicios-interactivos-operaciones-entre-numeros-enteros.html" target="_blank">Mates fácil</a> </li>
<li><a href="https://www.vitutor.com/di/e/a_3e.html" target="_blank">Vitutor</a></li>
<li><a href="https://www.thatquiz.org/es-1/?-jh8f-lc-p0" target="_blank">Thatquiz</a></li>
<li><a href="https://www.matematicasonline.es/anaya/anaya1ESO/datos/04/unidad_04.htm" target="_blank">Anaya</a></li>
<li><a href="http://www.lamanzanadenewton.com/materiales/aplicaciones/pasoapaso/matematicas/lmn_numeros_enteros.html" target="_blank">La manzana de Newton</a> </li>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-91688280179860600682018-06-01T18:36:00.000+02:002018-06-01T18:41:14.043+02:00FUNCIONES 4º ESO<div style="text-align: justify;">
Ya tenéis las soluciones de los ejercicios del libro en la página <a href="https://tuprofedematesmaria.blogspot.com/p/cursos.html" target="_blank">cursos</a>. También os he actualizado los enlaces a los exámenes de funciones de otros años (cursos 2015/2106 y 2011/2012). Además, podéis mirar los ejercicios resueltos del <a href="http://www.alcaste.com/departamentos/matematicas/secundaria/Cuarto/index.htm" target="_blank">IES ALCASTE</a>: <a href="http://www.alcaste.com/departamentos/matematicas/secundaria/Cuarto/04_Funciones_caracteristicas/Ejercicios_resueltos.pdf" target="_blank">1</a> y <a href="http://www.alcaste.com/departamentos/matematicas/secundaria/Cuarto/05_Funciones_elementales/Ejercicios_resueltos.pdf" target="_blank">2</a></div>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-1893977228402911322017-11-13T17:49:00.001+01:002017-11-13T17:49:45.814+01:001º ESO: NÚMEROS ENTEROS<div style="text-align: justify;">
Hace mucho que no reviso los enlaces y se que muchos de ellos no funcionan así que os dejo algunos que podéis usar:</div>
<ul>
<li><a href="http://recursostic.educacion.es/secundaria/edad/1esomatematicas/1quincena3/index1_3.htm" target="_blank">Tema completo EDAD</a></li>
<li><a href="http://www.librosvivos.net/smtc/homeTC.asp?TemaClave=1025" target="_blank">Libros vivos</a></li>
<li>Tema completo <a href="https://www.vitutor.com/di/e/numeros_enteros.html" target="_blank">vitutor</a></li>
<li>Los enteros en <a href="http://www3.gobiernodecanarias.org/medusa/eltanquematematico/todo_mate/numenteros/enteros_p.html" target="_blank">el tanque</a> </li>
<li>Tema completo <a href="https://conteni2.educarex.es/mats/11801/contenido/" target="_blank">EDUCAREX</a></li>
<li>Tema completo <a href="http://www.educa.jcyl.es/educacyl/cm/gallery/recursos_atica/matematicas/ENTEROS/index.html" target="_blank">jcyl</a> </li>
<li>Interactivos SM: <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128214&idioma=es-ES">Opuesto de un número entero</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128232&idioma=es-ES">Suma de números enteros</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=134444&idioma=es-ES">Combinaciones de sumas y restas de números enteros</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128228&idioma=es-ES">Operaciones combinadas con números enteros</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128226&idioma=es-ES">Operaciones de repaso con números enteros</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128224&idioma=es-ES">Operaciones con números enteros</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128222&idioma=es-ES">Operaciones con números enteros: la propiedad distributiva</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=128200&idioma=es-ES">Repaso de operaciones combinadas I</a>, <a href="http://www.smconectados.com/actividades/flashActividadesLir/examen.swf?idejecucion=136718&idioma=es-ES">Repaso de operaciones combinadas II</a> </li>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-49086541379342836392017-05-02T19:56:00.002+02:002017-05-02T20:16:05.822+02:00PROBLEMAS CON ENLACES<a href="https://www.blogger.com/blogger.g?blogID=8419966752258953598" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=8419966752258953598" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=8419966752258953598" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a>Desde el mes pasado la carpeta pública de Dropbox ha dejado de funcionar y no podéis acceder a los documentos que tenía allí. Es imposible que pueda actualizarlos todos pero, si me vais avisando, pococ a poco puedo ir poniendo los que necesitéis.Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-59259485377667562202017-05-02T19:13:00.001+02:002017-05-02T20:19:13.069+02:00I CONCURSO DE PROBLEMAS DE INGENIO BARRIO DE TRIANA<div style="line-height: 100%; margin-bottom: 0cm;">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><br /></span></span></div>
<div align="justify" style="line-height: 100%; margin-bottom: 0cm;">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><span style="font-family: "comic sans ms" , cursive;">Durante
los dos primeros trimetres del presente curso escolar los alumnos de
nuestro centro han tenido la oportunidad de participar en el “I
Concurso de Problemas de Ingenio Barrio de Triana”</span></span></span></div>
<div align="justify" style="line-height: 100%; margin-bottom: 0cm;">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><br /></span></span></div>
<div align="justify" style="line-height: 100%; margin-bottom: 0cm;">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><span style="font-family: "comic sans ms" , cursive;">El
pasado 25 de Abril tuvo lugar la última prueba en el IES Bécquer.
Los tres primeros fueron Sabas López, Francisco José Vargas y Celia
Jiménez.</span></span></span></div>
<div align="justify" style="line-height: 100%; margin-bottom: 0cm;">
<br /></div>
<div align="justify" style="line-height: 100%; margin-bottom: 0cm;">
<img align="left" border="0" height="300" name="Imagen2" 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" width="400" />
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><span style="font-family: "comic sans ms" , cursive;">Después,
los alumnos disfrutaron de una gymkhana matemática en el parque
María Luisa.</span></span></span></div>
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<img align="left" border="0" height="300" name="Imagen3" 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" 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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><span style="font-family: "comic sans ms" , cursive;">Gracias
a todos los que habéis participado:</span></span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><span style="font-family: "comic sans ms" , cursive;">Berta
Capote (1ºA), Ismael Cuevas López (1ºA), María Delgado Domínguez
(1ºA), Nicolás Domínguez Fernández (1ºA), Montse Fernández
Gayoso (1ºA), Pablo Fernández Velázquez (1ºA), Gonzalo López
Luque(1ºA), Antonio Miguel Lozano (1ºA), Carmela Revilla López
(1ºA), Alejandro Ruiz Martín (1ºA), Carmen Vico García (1ºA),
Ying Ying Xo ( 1ºA), Carmen Barrera (1ºB), Daniela Company (1ºB),
Marvin Gabriel Cruz (1ºB), Fco. José De la Torre Soriano (1ºB),
Nicolás Delgado Cámeron (1ºB), Nerea Díaz Barrera (1ºB), Manuel
Fernández Barrero (1ºB), Pablo Lagares Suárez (1ºB), Ismael
Medina (1ºB), Lucía Moreno ( 1ºB), José M.ª Peláez Rodriguez
(1ºB), Alejandro Santaella (1ºB), Pepe Acuña Altamirano (2ºA),
Miriam Inmaculada Bal Cutzal (2ºA), Ana Bueno Vega (2ºA), Carlos
Cortés ( 2ºA), Fabián Cuevas (2ºA), Roberto De Loma (2ºA),
Ángela de la Cruz Del Toro (2ºA), Candela Esparrica Torrecilla
(2ºA), Lorena Mateos Rodríguez (2ºA), Ana Molina Lupiáñez (2ºA),
Belén Olivares Amaya (2ºA), Paula Yúfera Daza (2ºA), Rui Kang
(2ºA), Alejandro López Benítez (2ºB), Helena Márquez Mayoral
(2ºB), Hugo Rodrígez Bocanegra (2ºB), Paula Reyes Riesco (2ºB),
Pablo Sanz-Agero Siles (2ºB), Adrián Morales Alfonso ( 2ºC), Juan
Ábalos Moreno (2ºC), Ramón Moreno(2ºC), Lucía Aguilar Martín
(3ºA), Celia Jiménez Palacio (3ºA), María Romero (3ºA), Pablo
González Morgado (3ºB), Daniel Rodríguez Marín (3ºB), Carlos
Santiago González (3ºB), Antonio Aubeyzón (4ºA), Manuel Delgado
Gallardo (4ºA)</span></span></span></div>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-2547583979226906212017-05-02T18:25:00.001+02:002017-05-02T18:25:31.864+02:00FUNCIONESEjercicios interactivos:<br />
<ul>
<li><a href="http://perso.wanadoo.es/amiris/funciones/indicegraficas.html" target="_blank">Antonio Expósito Fernández</a></li>
<li><a href="http://www.vitutor.com/fun/2/a_1_e.html" target="_blank">Vitutor</a></li>
<li><a href="https://www.matematicasonline.es/cidead/2esomatematicas/2quincena11/index2_11.htm" target="_blank">EDAD </a></li>
<li><a href="http://www.educa3d.com/ud/fun/story.html" target="_blank">Educa3D </a></li>
<li><a href="http://contenidos.educarex.es/mci/2006/05/index.html" target="_blank">Educarex</a> </li>
</ul>
Trabajaremos algunos en clase. Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-55865420295991692422017-02-12T18:40:00.002+01:002017-02-12T19:02:48.739+01:00ECUACIONES DE PRIMER GRADOResuelve todas las que puedas en tres minutos con este juego de Sergio Darias Beautell:<br />
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<a href="http://www3.gobiernodecanarias.org/medusa/ecoescuela/secundaria/files/2012/01/Ecuacion_3M.swf" target="_blank"><img alt="http://www3.gobiernodecanarias.org/medusa/ecoescuela/recursosdigitales/2014/11/19/ecuaciones-de-primer-grado-en-3-minutos/" border="0" src="http://www3.gobiernodecanarias.org/medusa/ecoescuela/recursosdigitales/files/formidable/ecuaciones-primergrado-3minutos2.jpg" height="198" width="320" /></a></div>
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Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-41920132586803658252016-05-23T19:17:00.002+02:002016-05-23T19:24:36.927+02:00APLICACIÓN DE LAS DERIVADAS AL ESTUDIO DE FUNCIONES<div style="text-align: justify;">
La teoría la tenéis en la página de <a href="http://tuprofedematesmaria.blogspot.com.es/p/cursos.html" target="_blank">cursos</a> y, con el esquema que os he dado en clase, ya estamos en condiciones de representar muchas funciones. </div>
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Para comprobar vuestra gráfica podéis usar <i><a href="http://www.mathe-fa.de/es" target="_blank">MAFA Plotter</a> </i>No necesitáis instalar nada y es bastante intuitivo.</div>
<div style="text-align: justify;">
En <a href="https://madaedu.wordpress.com/1%C2%BA-de-bachillerato-cn-3%C2%AA-evaluacion/" target="_blank">Madaedu's Blog</a> tenéis un montón de ejercicios de funciones resueltos paso a paso: <a href="https://madaedu.files.wordpress.com/2009/07/funcion11.doc" target="_blank" title="funcion1">1</a> , <a href="https://madaedu.files.wordpress.com/2010/12/funcion2.doc" target="_blank" title="función2">2</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion3.doc" target="_blank" title="funcion3">3 </a>, <a href="https://madaedu.files.wordpress.com/2009/07/funcion41.doc" target="_blank" title="funcion4">4</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion51.doc" target="_blank" title="funcion5">5</a>, <a href="https://madaedu.files.wordpress.com/2009/07/funcion611.doc" target="_blank" title="función6">6 </a>, <a href="https://madaedu.files.wordpress.com/2009/07/funcion72.doc" target="_blank" title="función7">7</a> , <a href="https://madaedu.files.wordpress.com/2009/07/funcion82.doc" target="_blank" title="función8">8</a>, <a href="https://madaedu.files.wordpress.com/2009/07/funcion92.doc" target="_blank" title="función9">9</a>, <a href="https://madaedu.files.wordpress.com/2009/07/funcion10.doc" target="_blank">10</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion261.doc" target="_blank" title="función26">26</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion27.doc" target="_blank" title="funcion27">27</a>, <a href="https://madaedu.wordpress.com/files/2009/11/funcion28.doc" target="_blank" title="función28">28</a>, <a href="https://madaedu.wordpress.com/files/2009/11/funcion29.doc" target="_blank" title="función29">29</a>, <a href="https://madaedu.wordpress.com/files/2009/11/funcion31.doc" target="_blank" title="función31">31</a>, <a href="https://madaedu.wordpress.com/files/2009/11/funcion32.doc" target="_blank" title="función 32">32</a>,</div>
<div style="text-align: justify;">
Y, de la página de 2º de Bachillerato: <br />
<a href="https://madaedu.files.wordpress.com/2009/08/funcion11.doc" target="_blank" title="funcion11">11</a>, <a href="https://madaedu.files.wordpress.com/2009/08/funcion12.doc" target="_blank" title="funcion12">12</a>, <a href="https://madaedu.files.wordpress.com/2009/08/funcion13.doc" target="_blank" title="funcion13">13</a> , <a href="https://madaedu.files.wordpress.com/2009/08/funcion14.doc" target="_blank" title="funcion14">14</a>, <a href="https://madaedu.files.wordpress.com/2009/08/funcion15.doc" target="_blank" title="funcion15">15</a>, <a href="https://madaedu.files.wordpress.com/2009/08/funcion16.doc" target="_blank" title="funcion16">16</a> , <a href="https://madaedu.files.wordpress.com/2009/08/funcion17.doc" target="_blank" title="funcion17">17</a>, <a href="https://madaedu.files.wordpress.com/2009/08/funcion18.doc" target="_blank" title="funcion18">18</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion19.doc" target="_blank" title="función19">19,</a> <a href="https://madaedu.files.wordpress.com/2009/11/funcion20.doc" target="_blank" title="función20">20 </a> , <a href="https://madaedu.files.wordpress.com/2009/11/funcion21.doc" target="_blank" title="función21"> 21</a>, <a href="https://madaedu.files.wordpress.com/2009/08/funcion22.doc" target="_blank">22</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion231.doc" target="_blank" title="funcion 23">23</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion241.doc" target="_blank" title="funcion24">24</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion251.doc" target="_blank" title="función25">25</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion261.doc" target="_blank" title="función26">26</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion27.doc" target="_blank" title="función27">27</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion28.doc" target="_blank" title="función28">28</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion29.doc" target="_blank" title="función29">29</a>, <a href="https://madaedu.files.wordpress.com/2009/12/funcion30.doc" target="_blank" title="funcion30">30</a>, <a href="https://madaedu.files.wordpress.com/2009/11/funcion33.doc" target="_blank" title="función 33">33</a> , <a href="https://madaedu.files.wordpress.com/2010/09/funcion34.doc" target="_blank">34</a>, <a href="https://madaedu.files.wordpress.com/2010/04/funcion351.doc" target="_blank" title="función35">35</a><br />
También podéis mirar los <a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/12_Derivadas_aplicaciones/Ejercicios_resueltos.pdf" target="_blank">ejercicios resueltos</a> del IES Alcaste<br />
<span style="font-family: "trebuchet ms" , sans-serif;"><span style="font-size: large;">¡¡ÀNIMO!! ¡Ya queda muy poco!</span></span></div>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-85707072540163658512016-05-08T21:04:00.000+02:002016-05-08T21:04:11.251+02:00DERIVADASOs dejo algunos enlaces que os pueden venir bien para trabajar el tema:<br />
<ul>
<li>Los temas de <a href="http://personales.unican.es/gonzaleof/#" target="_blank">proyecto MATEX</a>:</li>
<ul>
<li><a href="http://personales.unican.es/gonzaleof/Ciencias_1/DerivadaC1.pdf" target="_blank">Derivadas</a></li>
<li><a href="http://personales.unican.es/gonzaleof/Ciencias_1/AplicaDerC1.pdf" target="_blank">Aplicación de la derivada</a></li>
<li><a href="http://personales.unican.es/gonzaleof/Ciencias_1/GraFunC1.pdf" target="_blank">Gráfica de funciones</a></li>
</ul>
</ul>
<ul>
<li>En VITUTOR:</li>
<ul>
<li><a href="http://www.vitutor.com/fun/4/derivada.html" target="_blank">Derivadas</a> </li>
<li><a href="http://www.vitutor.com/fun/4/derivadas.html" target="_blank">Cálculo de derivadas</a> </li>
<li><a href="http://www.vitutor.com/fun/4/derivada_aplicaciones.html" target="_blank">Aplicaciones físicas y geométricas </a></li>
<li><a href="http://www.vitutor.com/fun/5/estudio_funciones.html" target="_blank">Aplicaciones al estudio de las funciones</a> </li>
</ul>
</ul>
También podéis mirar los de <a href="http://tuprofedematesmaria.blogspot.com.es/2013/04/mascs-i-iniciacion-al-calculo-de.html" target="_blank">esta entrada</a>Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-76878331777281767582016-05-06T21:29:00.001+02:002016-05-06T21:31:46.244+02:00COMBINATORIA 4º ESOOs dejo aquí la página que estamos usando (Pinchad en la imagen)<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://thales.cica.es/rd/Recursos/rd99/ed99-0516-02/practica/index.html" target="_blank"><img alt="http://thales.cica.es/rd/Recursos/rd99/ed99-0516-02/practica/index.html" border="0" height="227" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzTEnDbHrEpaTj1_72Y4jW8DsHnlZ1QXqTuD7gWtWxa2TnxNnLGEj6MzCJRiT4lM3C9C83I9Vp1bjS7DN40zSUX8IjxRdR2EafHXxto98UDRx7t362GidAt4wwbpOw7CCfuey7zFYnwKyx/s1600/Tabla+resumen+combinatoria.pnga" width="320" /></a></div>
<br />
Os dejo además relaciones de ejercicios resueltos o con soluciones para quien necesite más:<br />
<ul>
<li><a href="http://www.edu.xunta.es/centros/iesmos/system/files/Ejercicios_Resueltos_Combinatoria.pdf" target="_blank">Ejercicios resueltos</a></li>
<li><a href="http://www.alcaste.com/departamentos/matematicas/secundaria/Cuarto/10_Combinatoria/Ejercicios_resueltos.pdf" target="_blank">Los resueltos del IES Acaste </a></li>
<li><a href="https://www.google.es/url?sa=t&rct=j&q=&esrc=s&source=web&cd=1&cad=rja&uact=8&ved=0ahUKEwiohZWrl8bMAhWBFR4KHUvbDGgQFggdMAA&url=http%3A%2F%2Fwww.edu.xunta.es%2Fcentros%2Fiesmos%2Fsystem%2Ffiles%2FEjercicios_Resueltos_Combinatoria.pdf&usg=AFQjCNE9_kwK8jbwHunyVmzcu2FHujo02A&sig2=Imu2DTdLcwTnk0kItB4-qw" target="_blank">Más ejercicios resueltos</a> </li>
<li><a href="http://www.matematicasonline.es/cuarto-eso/ejercicios/ejercicios%20de%20combinatoria.pdf" target="_blank">26 ejercicios con soluciones</a> (y resueltos) </li>
<li><a href="http://www.fing.edu.uy/tecnoinf/mvd/cursos/pye/materiales/practico/pye-pr02.pdf" target="_blank">61 ejercicios con soluciones</a> </li>
<li><a href="http://www.iescampanillas.es/departamento/attachments/article/188/Problemas%20de%20combinatoria.pdf" target="_blank">Problemas de combinatoria</a> (con soluciones)</li>
</ul>
Recordad que hay más enlaces en las entradas de otros años. Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-34936375853576101652016-04-08T17:42:00.000+02:002016-04-08T17:56:40.023+02:00ECUACIONES 1º ESOOs dejo los enlaces que os comenté en clase para trabajar con las balanzas:<br />
<ul>
<li><a href="http://web.educastur.princast.es/ies/pravia/carpetas/recursos/mates/recursos_2005/interactivos/balanza/balanza1.htm" target="_blank">para empezar</a>, </li>
<li><a href="http://web.educastur.princast.es/ies/pravia/carpetas/recursos/mates/recursos_2005/interactivos/balanza/balanza2.htm" target="_blank">para continuar</a></li>
</ul>
La ficha para imprimir que os comenté es <a href="http://www.iesprofesorjuanbautista.es/IMG/pdf_6-IntroducionAlgebra.pdf" target="_blank">ésta</a> aunque también os dejo <a href="https://dl.dropboxusercontent.com/u/11933765/1%C2%BAESO/fichas%20algebra.pdf" target="_blank">ésta otra</a>.<br />
<br />
¡¡Practicad!!<br />
<br />
Recordad que las soluciones de la primera ficha de álgebra está en la página CURSOS. Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-64409886143895264542016-01-24T14:45:00.000+01:002016-02-22T21:24:34.050+01:00GEOMETRÍA ANALÍTICA<div style="text-align: justify;">
Ya terminamos el tema hace tiempo pero os dejo algunos enlaces por si los necesitais para preparar el examen de geometría.</div>
<ul>
<li style="text-align: justify;">Comienzo esta vez con unas relaciones de jercicios resueltos muy completos (de la página de Alfonso González) para trabajar los <a href="https://drive.google.com/file/d/0B80bAhpAV1Y8NlJlV1FybjVxMUU/edit" target="_blank">vectores</a> y la <a href="https://drive.google.com/file/d/0B80bAhpAV1Y8VnlRemxOZ1RyWEE/edit" target="_blank">geometría del plano</a>. También os dejo los de IES Alcaste: <a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/08_Geometria_analitica/Ejercicios_resueltos.pdf" target="_blank">resueltos</a>, <a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/08_Geometria_analitica/ejercicios_voluntarios.pdf" target="_blank">propuestos</a>. y los de <a href="http://www.amolasmates.es/pdf/ejercicios/Ejercicios%20Geometria%20analitica.pdf" target="_blank">amo las mates</a></li>
<li>Temas completos:</li>
<ul>
<li>Proyecto MATEX: <a href="http://personales.unican.es/gonzaleof/Ciencias_1/recta.pdf" target="_blank">Geometría de la recta</a>.</li>
<li><a href="http://www.vitutor.com/geo/rec/dvideos.html" target="_blank">Vitutor</a></li>
<li><a href="http://descartes.cnice.mec.es/materiales_didacticos/Geometria_afin_analitica_plano_lugares_geometricos/Geometria_0.htm" target="_blank">Geometría analítica</a> (Ángela Núñez) (Proyecto descartes)</li>
<li><a href="http://descartes.cnice.mec.es/materiales_didacticos/ac_rectas_d/index.htm" target="_blank">Problemas de rectas en el plano</a> (Proyecto descartes)</li>
</ul>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-5880853754399183342016-01-24T14:23:00.000+01:002016-02-22T20:02:02.781+01:00LUGARES GEOMÉTRICOS. CÓNICAS. Algunos enlaces que os pueden venir bien para trabajar el tema (reforzar y/o ampliar):<br />
<ul>
<li><a href="http://personales.unican.es/gonzaleof/Ciencias_1/conicas.pdf" target="_blank">Tema completo</a> proyecto MATEX. Con teoría, ejemplos y ejercicios (resueltos al final)</li>
<li>En Vitutor podéis estudiar y hacer ejercicios sobre:</li>
<ul>
<li><a href="http://www.vitutor.com/geo/coni/conicas.html" target="_blank">Ecuación de la circunferencia</a></li>
<li><a href="http://www.vitutor.com/geo/coni/elipse.html" target="_blank">Ecuación de la elipse</a></li>
<li><a href="http://www.vitutor.com/geo/coni/hiperbola.html" target="_blank">Ecuación de la hipérbola</a> </li>
<li><a href="http://www.vitutor.com/geo/coni/parabola.html" target="_blank">Ecuación de la parábola</a> </li>
</ul>
<li> Proyecto Descartes tiene también bastantes unidades didácticas sobre el tema:</li>
<ul>
<li><a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/Lugares_geometricos_conicas/index.htm" target="_blank">Lugares geométricos y las cónicas</a></li>
<li><a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/Identificacion_conicas_d3/index.htm" target="_blank">Identificación de cónicas</a> </li>
<li><a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/Construccion_geometrica_conicas/Indice.htm" target="_blank">Construcción geométrica de las cónicas</a></li>
<li><a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/Circunferencia/Circunindex.htm" target="_blank">La circunferencia </a></li>
<li> <a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/ac_conicas/index.htm" target="_blank">Ecuaciones de las cónicas. Traslaciones y giros de ejes. Ejercicios y problemas.</a></li>
</ul>
</ul>
En cuanto a relaciones de ejercicios:<br />
<ul>
<li>Los de IES Alcaste:<span class="Apple-style-span" style="font-size: large;"><span style="font-size: small;"><a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/09_Lugares_geometricos/Ejercicios_resueltos.pdf" target="_blank"> Resueltos</a>, <a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/09_Lugares_geometricos/ejercicios_voluntarios.pdf" target="_blank">Propuestos</a>, </span></span></li>
<li><span class="Apple-style-span" style="font-size: large;"><span style="font-size: small;"><a href="http://www.amolasmates.es/pdf/ejercicios/ejercicios%20de%20lugares%20geometricos.pdf" target="_blank">Los de Amo las mates</a> (resueltos)</span></span></li>
<li><span class="Apple-style-span" style="font-size: large;"><span style="font-size: small;">Y algunos más resueltos: <a href="http://ocw.unizar.es/ocw/pluginfile.php/72/mod_label/intro/u5conreto.pdf" target="_blank">1</a>, <a href="http://www.segundoperez.es/MatI/MIConicas.htm" target="_blank">2</a>, <a href="https://matematicasiesoja.files.wordpress.com/2013/10/ejercicios-resueltos-conicas.pdf" target="_blank">3</a>, <a href="https://matematicasiesoja.files.wordpress.com/2013/10/conicas_prob_resueltos.pdf" target="_blank">4</a>, <a href="https://matematicasiesoja.files.wordpress.com/2013/10/ejercicios_resueltos_lugares_geometricos_conicas.pdf" target="_blank">5</a>, <a href="https://sites.google.com/site/matematicas1r/home/1o-bachillerato-ct/tema09/ejercicios-resueltos" target="_blank">6</a>,<a href="http://ocw.upm.es/algebra/algebra-y-geometria/contenidos/problemas/sol-conicas.pdf" target="_blank"> 7</a>, </span></span></li>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-6370850052236237702015-12-07T21:52:00.002+01:002016-02-22T21:27:01.022+01:00Vectores.<div style="text-align: justify;">
Podéis comenzar viendo <a href="http://tuprofedematesmaria.blogspot.com.es/2012/02/4-eso-geometria-analitica.html" target="_blank">la entrada</a> que hice hace unos años para el tema de 4ºESO.<br />
Pero me habéis pedido sobre todo ejercicios:</div>
<div style="text-align: justify;">
<ul>
<li>Tenéis muchos ejercicios resueltos de vectores: <a href="http://www.amolasmates.es/pdf/ejercicios/Ejercicios%20de%20vectores.pdf" target="_blank">0</a>, <a href="http://www.amolasmates.es/cidead/libros/1Bach_Mat_I/ejercicios/vectores.pdf" target="_blank">1</a>, <a href="https://sites.google.com/site/matematicas1r/home/1o-bachillerato-ct/tema07/ejercicios-resueltos" target="_blank">2</a>,<a href="http://www.vitutor.com/geo/vec/bActivdades.html" target="_blank"> 3</a>, <a href="http://www.pinae.es/wp-content/uploads/2013/10/EJERCICIOS-RESUELTOS-VECTORES.pdf" target="_blank">4</a>, <a href="http://www.pinae.es/wp-content/uploads/2013/12/FICHA-VECTORES-SOLUCI%C3%93N.pdf" target="_blank">5</a>, <a href="https://docs.google.com/viewer?a=v&pid=sites&srcid=ZGVmYXVsdGRvbWFpbnxtb25vZ3JhZmlhczIwMTN8Z3g6MTY5ZGQ1MGQ5MDQ4OGFiNg" target="_blank">6</a>, <a href="http://maralboran.org/web_ma/Anaya/Anaya07/1BT_ALUMNO/Datos/Unidades/07/CDa_1bach_CC_t07_4_mec.pdf" target="_blank">7</a>, <a href="http://maralboran.org/web_ma/Anaya/Anaya07/1BT_ALUMNO/Datos/Unidades/07/CDa_1bach_CC_t07_5sol_mec.pdf" target="_blank">8</a>, <a href="http://www.juntadeandalucia.es/averroes/iesarroyo/matematicas/materiales/1bach/naturaleza/u-7.pdf" target="_blank">9</a>, <a href="http://www.guiaruralcantabria.com/matematicas/vectores_en_el_plano08.htm" target="_blank">10</a>, <a href="http://victormms.aprenderapensar.net/files/2010/05/198_pdfsam_1%C2%BA-Bachillerato-Solucionario-Matem%C3%A1ticas-I-La-Casa-del-Saber-2008.pdf" target="_blank">11</a> (también geometría analítica), </li>
<li> Más ejercicios: <a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/07_vectores/ejercicios_voluntarios.pdf" target="_blank">1</a>, <a href="http://maralboran.org/web_ma/Anaya/Anaya07/1BT_ALUMNO/Datos/Unidades/07/CDa_1bach_CC_t07_5_mec.pdf" target="_blank">2</a>, <a href="https://db.tt/gHWAocD0" target="_blank">3</a>,<a href="http://clasesdeapoyonuevo.s3.amazonaws.com/capitulos/problemas/2.5.1.2.pdf" target="_blank"> 4</a>, <a href="https://db.tt/FcBmjXnO" target="_blank">5</a>, </li>
<li>Con soluciones: <a href="http://www.masmates.com/enunciados/mm0702030000.pdf" target="_blank">1</a>, <a href="https://db.tt/fm0uPg08" target="_blank">2</a>, </li>
</ul>
</div>
<div style="text-align: justify;">
Para trabajar de forma interactiva:</div>
<ul>
<li><a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/07_vectores/test.htm" target="_blank">Autoevaluaciones Alcaste</a> </li>
<li><a href="http://personales.unican.es/gonzaleof/Ciencias_1/Vectores.pdf" target="_blank">Vectores en el plano</a> con Proyecto Matex (también con ejercicios)</li>
<li>Vectores y producto escalar con <a href="http://www.vitutor.com/geo/vec/vector.html" target="_blank">Vitutor</a></li>
<li><a href="http://geometriadinamica.es/index.php?option=com_content&view=category&layout=blog&id=258&Itemid=148" target="_blank">Geometría dinámica </a></li>
<li>Podéis mirar el tema del instituto <a href="http://maralboran.org/wikipedia/index.php/Matem%C3%A1ticas_1%C2%BA_Bachillerato_%28Tecnol%C3%B3gico_y_C._Salud%29" target="_blank">Mar de Alborán</a>, con teoría y ejercicios interactivos (tema7)</li>
<li><a href="http://www.amolasmates.es/Bachillerato%20CCNN/Primero/mat1_Bach_ciencias.html" target="_blank">Amo las mates</a></li>
<li><a href="http://www.xtec.cat/~jbartrol/vectores/manual/vectores.html" target="_blank">UD Jaume Bartrolí </a></li>
<li><a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2002/vectores/index.html" target="_blank">Actividades sobre vectores</a> (tres UD)</li>
</ul>
<a href="http://www.unicoos.com/tema/matematicas/1-bachiller/geometria-analitica" target="_blank">Videos</a> sobre vectores y geometría del plano<br />
<ul>
</ul>
Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0tag:blogger.com,1999:blog-8419966752258953598.post-18168363797448326092015-11-03T20:07:00.000+01:002015-11-03T20:09:19.634+01:001º BACHILLERATO: TRIGONOMETRÍA<div style="text-align: justify;">
Podéis repasar lo del curso anterior con <a href="http://tuprofedematesmaria.blogspot.com.es/2010/11/4-eso-trigonometria.html" target="_blank">los enlaces de esta entrada</a> o con el <a href="http://recursostic.educacion.es/secundaria/edad/4esomatematicasB/trigonometria/index4_7.htm" target="_blank">tema completo de ED@D</a>.</div>
Tenéis teoría, ejercicios resueltos e interactivos en:<br />
<ul>
<li style="text-align: justify;"><a href="http://www.amolasmates.es/Bachillerato%20CCNN/Primero/mat1_Bach_ciencias.html" target="_blank">Amo las mates</a></li>
<li>Vitutor: <a href="http://www.vitutor.com/al/trigo/trigonometria_eso.html" target="_blank">Trigonometría I</a> y <a href="http://www.vitutor.com/al/trigo/trigonometria.html" target="_blank">Trigonometría II</a></li>
<li style="text-align: justify;"><a href="http://personales.unican.es/gonzaleof/#" target="_blank">MATEX</a>: Pinchando en 1ºbach de Ciencias os aparecerá menú con <a href="http://personales.unican.es/gonzaleof/Ciencias_1/Trigo_1.pdf" target="_blank">TrigonometríaI</a> (razones trigonométricas), <a href="http://personales.unican.es/gonzaleof/Ciencias_1/Trigo_2.pdf" target="_blank">trigonometríaII</a> (suma, diferencia, ángulo doble, mitad, ecuaciones) y <a href="http://personales.unican.es/gonzaleof/Ciencias_1/Triangulos.pdf" target="_blank">Triángulos</a> (resolución de triángulos).</li>
<li style="text-align: justify;">Unidad completa Descartes: <a href="http://descartes.cnice.mec.es/materiales_didacticos/razones_trigonometricas_bcnt/indicetri2.htm" target="_blank">Razones trigonometricas</a> (Jesús Fernández Martín de los Santos)</li>
<li style="text-align: justify;">Trigonometría en <a href="http://www.ematematicas.net/trigonometria.php?a=4" target="_blank">Ematemática</a>s (menú a la izquierda) </li>
<li style="text-align: justify;">Juega en <a href="http://www.testeando.es/test.asp?idA=72&idT=wdpqdhoc&utm_source=tiching&utm_medium=referral" target="_blank">TESTEANDO</a></li>
<li style="text-align: justify;">Algunas escenas interesantes con<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2007/webs_interactivas_mates/trigono.htm" target="_blank"> geogebra</a>.</li>
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Ejercicios:<br />
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<li><a href="https://docs.google.com/file/d/0BznlQMPH9dOiTy12NXhZOU1MNE0/edit" target="_blank">Ejercicios con soluciones</a></li>
<li><a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/04_Resolucion_triangulos/Ejercicios_resueltos.pdf" target="_blank">Ejercicios resueltos IES Alcaste</a></li>
<li><a href="http://www.alcaste.com/departamentos/matematicas/bachillerato/PrimeromateI/04_Resolucion_triangulos/ejercicios_voluntarios.pdf" target="_blank">Ejercicios propuestos IES Alcaste </a></li>
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Maríahttp://www.blogger.com/profile/07761420016311673665noreply@blogger.com0