tag:blogger.com,1999:blog-15406498205166510862024-02-22T20:28:19.275+01:00Matemáticas 6º de PrimariaAlfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.comBlogger129125tag:blogger.com,1999:blog-1540649820516651086.post-80768873728224243202014-04-24T10:10:00.000+02:002014-04-24T10:03:12.019+02:00REPASO DE LA UNIDAD<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgx_9ubzAvc0OYhCgmPZ3Tvu_4rboqNZeaEaWwLXEMQH0CA2ZobsBkkBUVMl0O5uOHI5ttyCD1y72KcBgRj0k5Kp6z6vXWTS3ZdDQZfldywlnwhINJfxrA0THhOPvoODcoaDRd5wgJYX7I/s1600/pllz2felrch5ld2b.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgx_9ubzAvc0OYhCgmPZ3Tvu_4rboqNZeaEaWwLXEMQH0CA2ZobsBkkBUVMl0O5uOHI5ttyCD1y72KcBgRj0k5Kp6z6vXWTS3ZdDQZfldywlnwhINJfxrA0THhOPvoODcoaDRd5wgJYX7I/s320/pllz2felrch5ld2b.jpg" height="222" width="320" /></a></div>
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<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a> (SM Ud. 14)<br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a> (SM Ud. 14)<br />
<a href="http://www.blogger.com/goog_757503602"><br />
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<a href="http://roble.pntic.mec.es/arum0010/temas/capacidad.htm">ENLACES VARIADOS PARA REPASAR LA UNIDAD</a>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com16tag:blogger.com,1999:blog-1540649820516651086.post-32554805322621049152014-04-24T10:07:00.000+02:002014-04-24T10:03:26.390+02:00UNIDADES DE VOLUMEN<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjBpooN8W5cJudWQpJzS_Z8K5fLMuTRr-Hpw93bm00ocgJ2CHBBb1mZWelulpaFy3tmvGz0gn0zKqMCf5kpPMpJklyOIm_h-Qupjb2UqY4xvT64SLxKyU_H3oHtmOdPl5SqC5Q5uQ7OqDw/s1600/volumen_capa7cad-0a24e.png" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjBpooN8W5cJudWQpJzS_Z8K5fLMuTRr-Hpw93bm00ocgJ2CHBBb1mZWelulpaFy3tmvGz0gn0zKqMCf5kpPMpJklyOIm_h-Qupjb2UqY4xvT64SLxKyU_H3oHtmOdPl5SqC5Q5uQ7OqDw/s320/volumen_capa7cad-0a24e.png" height="205" width="320" /></a><a href="http://www.aplicaciones.info/decimales/siste05.htm" target="_blank">MEDIDAS DE VOLUMEN</a><br />
<a href="http://conteni2.educarex.es/mats/11372/contenido/index2.html" target="_blank">VOLUMEN</a><br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">UNIDADES DE MEDIDA DE VOLUMEN</a> (SM Ud. 14)<br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">ACTIVIDAD: UNIDADES DE MEDIDA DE VOLUMEN</a> (SM Ud. 14) <a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/m2m3_pri/index.htm" target="_blank">METROS CUADRADOS, METROS CÚBICOS</a><br />
<a href="http://averroes.ced.junta-andalucia.es/ies_azahar/MATEMATICAS1/medidas/volumen/menu.html">VOLUMEN Y CAPACIDAD </a>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com15tag:blogger.com,1999:blog-1540649820516651086.post-39537568150731734802014-04-24T10:05:00.000+02:002014-04-24T10:03:36.613+02:00VOLUMEN Y CAPACIDAD<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjc6MIq0fwUiByN-pUCQJiOkrrsk5JZhjhrChaVg08Y6U94VzZj54W7_Z5xmphiUprrEgVx7QyJ4Qu4IDtWYtNR6rWCOR7P_OCMBsG-mUun4LoxIMF8YPsWb_rgvnGvlTCB8kUCn8_YoaU/s1600/VOLUMEN.png" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjc6MIq0fwUiByN-pUCQJiOkrrsk5JZhjhrChaVg08Y6U94VzZj54W7_Z5xmphiUprrEgVx7QyJ4Qu4IDtWYtNR6rWCOR7P_OCMBsG-mUun4LoxIMF8YPsWb_rgvnGvlTCB8kUCn8_YoaU/s320/VOLUMEN.png" height="184" width="320" /></a></div>
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<a href="http://www.wikisaber.es/Contenidos/LObjects/volume/index.html" target="_blank">INTRODUCCIÓN AL VOLUMEN</a> <br />
<a href="http://www.genmagic.net/fisica/completac.swf" target="_blank">¿CUÁNTOS FALTAN?</a><br />
<a href="http://www.edu.xunta.es/espazoAbalar/sites/espazoAbalar/files/datos/1285580048/contido/index.html" target="_blank">EL VOLUMEN</a><br />
<a href="http://www.omerique.net/polavide/rec_polavide0708/edilim/volumenes/volumenes.html" target="_blank">VOLÚMENES</a><br />
<a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/primaria/actividades/aritmetica/naturales_y_enteros/elevar_al_cubo/actividad.html" target="_blank"> </a><br />
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<a href="http://w3.cnice.mec.es/recursos/primaria/matematicas/volumen/menu.html" target="_blank">EL VOLUMEN. CAPACIDAD</a><br />
<a href="http://repositorio.educa.jccm.es/portal/odes/matematicas/primaria_areas_volumenes/index.html" target="_blank">ÁREAS Y VOLÚMENES</a><br />
<a href="http://www.wikisaber.es/Contenidos/LObjects/3D_shapes/index.html" target="_blank">EL VOLUMEN II</a><br />
<a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/Cuerpos_geometricos/00_index_cuerpos.html" target="_blank">FIGURAS EN EL ESPACIO. VOLUMEN</a><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-2uICoYlh3543rzr0KCejRSZ_5y7rPGLgHswQY8wcSomU2S3syN40W79zCPWwUxzK9O4i0_wHmfH8GwQ5jNA1Og-qSaUVBcIykYpXyG7rs9Zlsj94y-D3KKv0Jp2L3aT0p-RcuI5ihhA/s1600/capacidad.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-2uICoYlh3543rzr0KCejRSZ_5y7rPGLgHswQY8wcSomU2S3syN40W79zCPWwUxzK9O4i0_wHmfH8GwQ5jNA1Og-qSaUVBcIykYpXyG7rs9Zlsj94y-D3KKv0Jp2L3aT0p-RcuI5ihhA/s320/capacidad.png" height="109" width="320" /></a></div>
Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com21tag:blogger.com,1999:blog-1540649820516651086.post-18023095587830034372014-04-24T10:00:00.000+02:002014-04-24T10:03:50.104+02:00LOS CUERPOS GEOMÉTRICOS: VOLUMENTema 14, nueva experiencia y nuevos retos después de las vacaciones. Nos adentramos en el mundo del volumen, en el mundo de las 3 dimensiones.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhNmfqAwfPUrX9EpQUmSqTNLsgkd8oSt30w9jtlICXZ5JzOm_hRyWnbLk_X8Jr8QmyzavMFqLZfHTmzfw38Tk21n-8vAkwDzG7MbceFAPSAoIrBEP7OFCgWyPuWmij6wvL14_nLoDfsNj8/s1600/cuerpos+geometricos.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhNmfqAwfPUrX9EpQUmSqTNLsgkd8oSt30w9jtlICXZ5JzOm_hRyWnbLk_X8Jr8QmyzavMFqLZfHTmzfw38Tk21n-8vAkwDzG7MbceFAPSAoIrBEP7OFCgWyPuWmij6wvL14_nLoDfsNj8/s320/cuerpos+geometricos.png" height="247" width="320" /></a> </div>
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<a href="http://www.juntadeandalucia.es/averroes/html/adjuntos/2007/09/11/0012/indexflash.htm" target="_blank">LOS CUERPOS GEOMÉTRICOS</a></div>
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<a href="http://miclase.wordpress.com/2011/04/26/cuerpos-geometricos-2/">LOS CUERPOS GEOMÉTRICOS II </a></div>
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<a href="http://www.genmagic.org/mates1/prisr1c.swf" target="_blank">PRISMAS</a> </div>
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<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/20_prismas_piramides/" target="_blank">PRISMAS II</a> </div>
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<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/21_piramides/" target="_blank">PIRÁMIDES</a></div>
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<a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/primaria/actividades/geometria/cuerpos/piramides/actividad.html" target="_blank">PIRÁMIDES</a> (II)</div>
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<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/19_poliedros/" target="_blank">LOS POLIEDROS</a> </div>
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<a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/primaria/actividades/geometria/cuerpos/desarrollo_cubo/actividad.html" target="_blank">DESARROLLO DEL CUBO</a> </div>
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<a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/primaria/actividades/geometria/cuerpos/desarrollo_prisma/actividad.html" target="_blank">DESARROLLO DE UN PRISMA RECTO</a> </div>
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<a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/primaria/actividades/geometria/cuerpos/desarrollo_piramide/actividad.html" target="_blank">DESARROLLO DE LA PIRÁMIDE RECTA</a> </div>
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<a href="http://agrega.hezkuntza.net/visualizar/es/es-eu_2011022013_1230518/false" target="_blank">GEOMETRÍA DEL ESPACIO</a> </div>
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<a href="http://clic.xtec.net/db/jclicApplet.jsp?project=http://clic.xtec.net/projects/matsexto/jclic/matsexto.jclic.zip&lang=es" target="_blank">Geometría: poliedros, cuerpos redondos</a> (Jclic)</div>
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<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Matematicas/geomet2/index.htm" target="_blank">Los cuerpos geométricos I </a>(Jclic)</div>
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<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Matematicas/geomet2/index.htm" target="_blank">Los cuerpos geométricos </a>II (Jclic) </div>
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Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com19tag:blogger.com,1999:blog-1540649820516651086.post-86037289491114045952014-03-11T09:30:00.000+01:002014-03-11T09:41:21.143+01:00REPASO DE LA UNIDAD<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjjBO36SZeIcAMzGbNg5iW8CuWhd_su6HrxXnoYcJIi1eDGyBc9h_LtNCyihFuGt01OkqhzVf2TrfY8GAlnK1jQwlSPk7oZiuCwP8dUxCLSj-gPy6SNHqhzHC2CketCtwNdMtptoPwEVRE/s1600/unidadessuperficie.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="164" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjjBO36SZeIcAMzGbNg5iW8CuWhd_su6HrxXnoYcJIi1eDGyBc9h_LtNCyihFuGt01OkqhzVf2TrfY8GAlnK1jQwlSPk7oZiuCwP8dUxCLSj-gPy6SNHqhzHC2CketCtwNdMtptoPwEVRE/s320/unidadessuperficie.png" width="320" /></a></div>
<a href="http://www.educarchile.cl/UserFiles/P0001/File/objetos_digitales/odeas_matematicas/6/index.html" target="_blank">EQUIVALENCIA EN LAS UNIDADES DE MEDIDA</a><br />
<a href="http://escueladeverano.net/images/escueladeverano/areas/matematicas/interactivas/unidad_8/unidad_8.html" target="_blank">REPASO LA UNIDAD</a><br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a> (SM Ud. 9)Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com21tag:blogger.com,1999:blog-1540649820516651086.post-9381998099901541092014-03-11T09:25:00.000+01:002014-03-11T09:40:55.382+01:00MAS PROBLEMAS<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF_FBlcTEuhrrQ5gvRsz-WIRL1m6uUBGFrdXPuhzxxlJmyUCmjDvX52IzAP2bUH6-owhITrghAFMqS7fZmFp-bfHrqJYsy2wF2wOa3AtdNi4EBOROGaG1Sq9xqG7iewgwZTxoJLLJ7tbI/s1600/%C3%ADndice.jpeg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF_FBlcTEuhrrQ5gvRsz-WIRL1m6uUBGFrdXPuhzxxlJmyUCmjDvX52IzAP2bUH6-owhITrghAFMqS7fZmFp-bfHrqJYsy2wF2wOa3AtdNi4EBOROGaG1Sq9xqG7iewgwZTxoJLLJ7tbI/s1600/%C3%ADndice.jpeg" /></a><a href="http://w3.cnice.mec.es/recursos/primaria/matematicas/longitud/a3/menu.html" target="_blank">A ESCALA</a><br />
<a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/primaria/actividades/geometria/escalas_y_planos/excavadora/actividad.html" target="_blank">EXCAVADORA</a><br />
<a href="http://www.hdt.gob.mx/new_media/primaria_6/matematicas_b3/oda_1806_20650/recurso/" target="_blank">ESCALAS</a><br />
<a href="http://www.hdt.gob.mx/new_media/primaria_6/matematicas_b3/oda_1807_20651/recurso/" target="_blank">CUADRÍCULA. ESCALA</a><br />
<a href="http://www.genmagic.org/repositorio/albums/userpics/capsalla1c.swf" target="_blank">ESCALAS Y PROPORCIONES - 1</a><br />
<a href="http://www.genmagic.org/repositorio/albums/userpics/comprop1c.swf" target="_blank">ESCALAS Y PROPORCIONES - 2</a><br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2008/matematicas_primaria/menuppal.html" target="_blank">RESOLUCIÓN DE PROBLEMAS Y RETOS: ASOCIO (RELACIONO OPERACIÓN Y SIGNIFICADO)</a> <br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2008/matematicas_primaria/menuppal.html" target="_blank">RESOLUCIÓN DE PROBLEMAS Y RETOS: CANICAS (SIMULO Y RESUELVO)</a><br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2011/asi_calculamos/index.html" target="_blank">COMPRENDEMOS Y APLICAMOS LA EQUIVALENCIA: CONSTRUCCIÓN DE GRÁFICOS DE SECTORES</a><br />
<a href="http://www.escueladeverano.net/matematicas/ejercicios_interactivos_web/unidad_6/unidad6_porcentajes.html" target="_blank">REPASO LA UNIDAD</a><br />
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mate_cas_ud8_Autoevaluacion.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a><br />
<a href="http://www.testeando.es/test.asp?idA=68&idT=qgjtxrhf" target="_blank">TEST: PROPORCIONALIDAD Y PORCENTAJES</a><br />
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ACTIVIDADES DE REPASO <br />
<a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P152.html" target="_blank">1</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P153/es_carcasa.html" target="_blank">2</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P154/es_carcasa.html" target="_blank">3</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P155.html" target="_blank">4</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P156.html" target="_blank">5</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P157.html" target="_blank">6</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P158/es_carcasa.html" target="_blank">7</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P159/es_carcasa.html" target="_blank">8</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P160_1/es_carcasa.html" target="_blank">9</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P160_2/es_carcasa.html" target="_blank">10</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P160_3/es_carcasa.html" target="_blank">11</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P160_4/es_carcasa.html" target="_blank">12</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P160_5/es_carcasa.html" target="_blank">13</a> <a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U11/pages/recursos/143304_P162.html" target="_blank">14</a> <br />
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Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com10tag:blogger.com,1999:blog-1540649820516651086.post-60533989284326335382014-03-11T09:20:00.000+01:002014-03-11T09:40:24.620+01:00PROBLEMAS CON PORCENTAJES II<iframe frameborder="0" height="360" scrolling="no" src="http://practicopedia.lainformacion.com/videoservices/entuweb?id=416&id_video=187&width=669&height=360&time=&OAS_path=www.lainformacion.com/practicopedia/educacion/educacion-primaria-y-secundaria/articulos" width="669"></iframe>
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<a href="http://averroes.ced.junta-andalucia.es/loreto/sugerencias/omerique/omerique.net/twiki/pub/Recursos/PresupuestoFerretero/presupuesto_herrero.html" target="_blank">Miniquest: EL PRESUPUESTO DEL FERRETERO</a><br />
<a href="http://averroes.ced.junta-andalucia.es/loreto/sugerencias/omerique/omerique.net/twiki/pub/Recursos/ComprandoJuguetes/comprandojuguetes.html" target="_blank">Miniquest: TIENDA DE JUGUETES</a><br />
<a href="http://www.genmagic.org/mates3/perc1c.swf" target="_blank">PORCENTAJE</a><br />
<a href="http://odas.educarchile.cl/objetos_digitales/odas_matematicas/14/consolaOD.swf" target="_blank">PORCENTAJES VI</a><br />
<a href="http://web.educastur.princast.es/ies/pravia/carpetas/recursos/mates/anaya1/datos/09/1.Swf" target="_blank">PROPORCIONALIDAD Y PORCENTAJES I</a><br />
<a href="http://web.educastur.princast.es/ies/pravia/carpetas/recursos/mates/anaya1/datos/09/5.Swf" target="_blank">PROPORCIONALIDAD Y PORCENTAJES II</a> <br />
<a href="http://www.edu.xunta.es/espazoAbalar/sites/espazoAbalar/files/datos/1293623664/contido/index.html" target="_blank">PORCENTAJES, FRACCIONES Y DECIMALES</a><br />
<a href="http://odas.educarchile.cl/objetos_digitales/odas_matematicas/16_calculando_porcentajes/LearningObject/index.html" target="_blank">CALCULANDO PORCENTAJES</a><br />
<a href="http://www.librosvivos.net/smtc/homeTC.asp?TemaClave=1171" target="_blank">PROPORCIONALIDAD</a><br />
<a href="http://www.ceibal.edu.uy/UserFiles/P0001/ODEA/ORIGINAL/100413_porcentaje.elp/" target="_blank">PORCENTAJE II</a><br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2008/matematicas_primaria/menuppal.html" target="_blank">NÚMEROS Y OPERACIONES: FRACCIONES, DECIMALES Y PORCENTAJES</a><br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2011/asi_calculamos/index.html" target="_blank">PRACTICAMOS ESTRATEGIAS DE CÁLCULO MENTAL: PORCENTAJES</a><br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2011/asi_calculamos/index.html" target="_blank">COMPRENDEMOS Y APLICAMOS LA EQUIVALENCIA: FRACCIÓN - DECIMAL - PORCENTAJE </a><br />
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2009/problematic/menuppal.html" target="_blank">PROBLEMAS ARITMÉTICOS ESCOLARES: PROBLEMAS CON PORCENTAJES </a><br />
<a href="http://www.educarecuador.ec/recursos/rdd/matematicas/7mo_egb/porcentajes/index.html" target="_blank">PORCENTAJE E IMPUESTOS</a> Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com8tag:blogger.com,1999:blog-1540649820516651086.post-13028954605994660732014-03-11T09:10:00.000+01:002014-03-11T09:40:01.137+01:00PROBLEMAS DE PORCENTAJES I<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgMs0iNcTasYcWV26SP1C2K3M7hBwhU_gUXzBXHtXCXrWbQLs-27jaCpw8XRWDmgZMaD0op7Mv6W5IU9jKvauXPIzeK7sZaY8vpyskF9BoFjhGe94Rt6LiDr8BBfOjGT3LQgJnls_yZ8LI/s1600/PORCIENTO.png" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgMs0iNcTasYcWV26SP1C2K3M7hBwhU_gUXzBXHtXCXrWbQLs-27jaCpw8XRWDmgZMaD0op7Mv6W5IU9jKvauXPIzeK7sZaY8vpyskF9BoFjhGe94Rt6LiDr8BBfOjGT3LQgJnls_yZ8LI/s320/PORCIENTO.png" height="243" width="320" /></a><a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/proporcionalidad/proporc_p.html" target="_blank">PORCENTAJES I</a><br />
<a href="http://ntic.educacion.es/w3//recursos/primaria/matematicas/porcentajes/menu.html" target="_blank">PORCENTAJES II</a><br />
<a href="http://ntic.educacion.es/w3//eos/MaterialesEducativos/mem2008/visualizador_decimales/porcentajes.html" target="_blank">PORCENTAJES III</a><br />
<a href="http://www.omerique.net/twiki/pub/Recursos/PorcenTajes/porcentaje.html" target="_blank">PORCENTAJE DE UNA CANTIDAD I</a><br />
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mate_cas_ud8_Porcentaje_de_una_cantidad_2.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">PORCENTAJE DE UNA CANTIDAD II</a><br />
<a href="http://sauce.pntic.mec.es/%7Ejdiego/test/test17.swf" target="_blank">TEST MATEMÁTICO SOBRE PORCENTAJE Y PROPORCIONALIDAD </a><br />
<a href="http://ntic.educacion.es/w3//recursos/primaria/matematicas/porcentajes/menuu4.html" target="_blank">TANTO POR...</a><br />
<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Agrega/Matematicas/La%20calculadora/contenido/ma002_oa03_es/index.html" target="_blank">LA CALCULADORA: PORCENTAJES</a><br />
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mate_cas_ud8_Resuelve_problemas.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a> <br />
<br />
Actividad JClic:<br />
<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Matematicas/porcien/index.htm" target="_blank">Porcentaje y proporcionalidad</a>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com5tag:blogger.com,1999:blog-1540649820516651086.post-82535725961425683682014-03-11T09:00:00.000+01:002014-03-11T09:39:27.587+01:00PROPORCIONALIDAD Y PORCENTAJES<ol style="text-align: right;">
<li><a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/proporcionalidad/proporc_p.html" target="_blank">PROPORCIONALIDAD</a> </li>
<li><a href="http://odas.educarchile.cl/objetos_digitales/odas_matematicas/15_proporcionalidad_directa/LearningObject/index.html" target="_blank">RELACIONES DE PROPORCIONALIDAD</a></li>
<li><a href="http://odas.educarchile.cl/objetos_digitales/odas_matematicas/21_variables_proporcionales/LearningObject/index.html" target="_blank">INTERPRETANDO VARIABLES PROPORCIONALES EN GRÁFICOS</a></li>
<li><a href="http://agrega.hezkuntza.net/visualizar/es/es-eu_2011022013_1230514/false" target="_blank">LA PROPORIONALIDAD NUMÉRICA: TANTO POR CIENTO</a></li>
<li><a href="http://www.ceibal.edu.uy/UserFiles/P0001/ODEA/ORIGINAL/100405_razon_proporcion.elp/index.html" target="_blank">RAZÓN Y PROPORCIÓN</a></li>
<li><a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2011/asi_calculamos/index.html" target="_blank">REALIZAMOS UN CÁLCULO PENSADO Y MENTAL: RAZONAMIENTO PROPORCIONAL</a></li>
<li><a href="http://www.educarecuador.ec/recursos/rdd/matematicas/5to_egb/proporcionalidad/index.html" target="_blank">PROPORCIONALIDAD DIRECTA</a> </li>
</ol>
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<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/TpN7-EpK_Ek" width="560"></iframe>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com11tag:blogger.com,1999:blog-1540649820516651086.post-80991855456750107982014-02-06T16:52:00.000+01:002014-02-06T17:43:21.248+01:00LOS ÁNGULOSTodo era cuestión de tiempo. Hemos llegado al momento en el que volvemos atrás para retomar ese tema que nos dejamos sin ver: LOS ÁNGULOS.<br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPNYzgBRH9FBcTafbN15pvvS_vixrLA00lW1FbIkR2Oujyj4z7ajbyMsTejHQeQayWDg_MC0PtILyXviNWirmdsjqxUW2-lcDEO7uympau24oIi-HAOwCMpx-9PComxkH620bsTXGAh4Y/s1600/angulos.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPNYzgBRH9FBcTafbN15pvvS_vixrLA00lW1FbIkR2Oujyj4z7ajbyMsTejHQeQayWDg_MC0PtILyXviNWirmdsjqxUW2-lcDEO7uympau24oIi-HAOwCMpx-9PComxkH620bsTXGAh4Y/s320/angulos.jpg" height="223" width="320" /></a></div>
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<a href="http://www.cidse.itcr.ac.cr/revistamate/GeometriaInteractiva/IIICiclo/NivelVII/ClasificacionAngulosporMedida/ClasificacionAngulosporMedida.htm" target="_blank">TEORÍA Y EJERCICIOS RELACIONADOS CON EL TEMA </a><br />
<a href="http://www.genmagic.org/mates1/ra1c.swf" target="_blank">ÁNGULOS</a><br />
<a href="http://www.librosvivos.net/smtc/homeTC.asp?TemaClave=1036" target="_blank">RECTAS, SEMIRRECTAS...</a><br />
<a href="http://www.omerique.net/polavide/rec_polavide0708/edilim/angulos/angulos.html" target="_blank">CONCEPTO Y TIPOS</a><br />
<a href="http://genmagic.org/mates2/gs1c.swf" target="_blank">UNIDADES DE MEDIDA DE ÁNGULOS</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/grados/grados.swf" target="_blank">LOS ÁNGULOS Y SU MEDIDA</a><br />
<a class="Estilo2" href="http://genmagic.org/mates2/gs1c.swf" target="_blank">SISTEMA SEXAGESIMAL I</a><br />
<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Agrega/Matematicas/Sistema%20sexagesimal/contenido/index.html" target="_blank">SISTEMA SEXAGESIMAL II</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/transportador/transportador_p.html" target="_blank">EL TRANSPORTADOR DE ÁNGULOS</a><br />
<a href="http://www.euskalnet.net/ibiguri/" target="_blank">DIBUJO GEOMÉTRICO PASO A PASO</a><br />
<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/transportador/" target="_blank">MEDICIÓN DE ÁNGULOS CON EL TRANSPORTADOR</a><br />
<a href="http://e-learningforkids.org/Courses/ES/M1108/" target="_blank">MEDICIÓN DE ÁNGULOS</a> </div>
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<a href="http://odas.educarchile.cl/objetos_digitales_NE/ODAS_Matematica/Ed_Matematica/lineas_angulos/index.html" target="_blank">LÍNEAS Y ÁNGULOS</a></div>
</div>
Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com18tag:blogger.com,1999:blog-1540649820516651086.post-60209405032781126772014-02-06T13:40:00.000+01:002014-02-06T17:35:08.432+01:00ÁNGULOS COMPLEMENTARIOS Y SUPLEMENTARIOS + REPASO DE LA UNIDAD<br />
<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/3yvwYIVm-Ek" width="420"></iframe>
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<a href="http://contenidos.santillanaenred.com/jukebox/servlet/GetPlayer?p3v=true&xref=200602011047_PRE_0_-1274510673&mode=1&rtc=1001&locale=es_ES&cache=false" target="_blank">ÁNGULOS COMPLEMENTARIOS Y SUPLEMENTARIOS</a><br />
<a href="http://www.genmagic.org/repositorio/albums/userpics/angcsc.swf" target="_blank">ÁNGULOS COMPLEMENTARIOS Y SUPLEMENTARIOS -1-</a><br />
<a href="http://www.genmagic.org/repositorio/albums/userpics/trobang1c.swf" target="_blank">CALCULA LOS ÁNGULOS -1-</a><br />
<a href="http://cplosangeles.juntaextremadura.net/web/edilim/tercer_ciclo/matematicas6/angulos_6/angulos_6.html" target="_blank">ÁNGULOS</a><br />
<a href="http://agrega-2curso.pntic.mec.es/visualizar/es/es-cv_2009121412_7230041/false" target="_blank">ÁNGULOS COMPLEMENTARIOS</a><br />
<a href="http://agrega-2curso.pntic.mec.es/visualizar/es/es-cv_2009121412_7230042/false" target="_blank">ÁNGULOS SUPLEMENTARIOS</a><br />
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REPASO DE LA UNIDAD:<br />
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<a href="http://www.escueladeverano.net/matematicas/ejercicios_interactivos_web/unidad_9/unidad9_angulos.html" target="_blank">REPASO LA UNIDAD</a><br />
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mat_es_ud11_Resuelve_problemas.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a><br />
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mate_cas_ud11_Autoevaluacion.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a><br />
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ACTIVIDADES DE REPASO</div>
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<a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P60.html" target="_blank">1</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P61/es_carcasa.html" target="_blank">2</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P62/es_carcasa.html" target="_blank">3</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P63/es_carcasa.html" target="_blank">4</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P64.html" target="_blank">5</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P65/es_carcasa.html" target="_blank">6</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P66.html" target="_blank">7</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P67/es_carcasa.html" target="_blank">8</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P68/es_carcasa.html" target="_blank">9</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P69.html" target="_blank">10</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P70_1/es_carcasa.html" target="_blank">11</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P70_2/es_carcasa.html" target="_blank">12</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P70_3/es_carcasa.html" target="_blank">13</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P70_4/es_carcasa.html" target="_blank">14</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P70_5/es_carcasa.html" target="_blank">15</a><a href="http://www.e-vocacion.es/files/html/143304/recursos/la/U05/pages/recursos/143304_P72.html" target="_blank">16</a></div>
</div>
<br />Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com8tag:blogger.com,1999:blog-1540649820516651086.post-26277120520543323672014-02-06T09:38:00.000+01:002014-02-06T17:35:28.483+01:00SUMA Y RESTA DE ÁNGULOS<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mat_cas_ud11_Suma_de_angulos.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">SUMA DE ÁNGULOS</a><br />
<a href="http://web.educastur.princast.es/cp/fozaneld/Matesdiver/materiales/suma%20angulos.swf" target="_blank">SUMA DE ÁNGULOS II</a><br />
<a href="http://recursostic.educacion.es/descartes/web/materiales_didacticos/angulos/00_index_angulo.htm" target="_blank">ÁNGULOS</a><br />
<a href="http://www.ceibal.edu.uy/UserFiles/P0001/ODEA/ORIGINAL/091120_operacionesangulos.elp/" target="_blank">OPERACIONES CON ÁNGULOS</a><br />
<a href="http://recursostic.educacion.es/multidisciplinar/pizarrainteractiva/datos/matematicas/html/M_B3_Suma_angulos/" target="_blank">SUMA DE ÁNGULOS III</a> <br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/principal_p.html" target="_blank">SUMA Y RESTA DE ÁNGULOS I</a><br />
<a href="http://www.omerique.net/polavide/rec_polavide0708/edilim/SumaRestaAngulos/Sumayrestadeangulos.html" target="_blank">SUMA Y RESTA DE ÁNGULOS II</a><br />
<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/adicion_sustracion_angulos/" target="_blank">ADICIÓN Y SUSTRACCIÓN DE ÁNGULOS</a><br />
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<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/A7kWGPxL4RI" width="560"></iframe>
<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/ilIp3pRiWUo" width="560"></iframe>
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<a href="http://web.educastur.princast.es/cp/fozaneld/Matesdiver/materiales/resta%20angulos.swf" target="_blank">RESTA DE ÁNGULOS</a>
Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com12tag:blogger.com,1999:blog-1540649820516651086.post-25694728130931846862014-02-05T13:51:00.000+01:002014-02-06T17:35:46.794+01:00TEMA 9 (5 del libro): LOS ÁNGULOS<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgZodTXvL0sRnkcEGrkTJ1PWxcXgKK0abq4eWul2xpTyWoXZ78lynVIX5OrvZJC8EZMQ_ls0MaPODCw1JHg6yzByrGfYHvnwRNnwHVsBX67MYgZeChzGLTxK7XhFkGkEejsGF6qFZxYDTc/s1600/medida-de_angulos-copia.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgZodTXvL0sRnkcEGrkTJ1PWxcXgKK0abq4eWul2xpTyWoXZ78lynVIX5OrvZJC8EZMQ_ls0MaPODCw1JHg6yzByrGfYHvnwRNnwHVsBX67MYgZeChzGLTxK7XhFkGkEejsGF6qFZxYDTc/s320/medida-de_angulos-copia.jpg" height="320" width="223" /></a></div>
<a class="Estilo2" href="http://www.genmagic.org/mates1/ra1c.swf" target="_blank">ÁNGULOS</a><br />
<a href="http://www.librosvivos.net/smtc/homeTC.asp?TemaClave=1036" target="_blank">RECTAS, SEMIRRECTAS...</a><br />
<a href="http://www.omerique.net/polavide/rec_polavide0708/edilim/angulos/angulos.html" target="_blank">CONCEPTO Y TIPOS</a><br />
<a href="http://genmagic.org/mates2/gs1c.swf" target="_blank">UNIDADES DE MEDIDA DE ÁNGULOS</a><br />
<div style="text-align: left;">
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/grados/grados.swf" target="_blank">LOS ÁNGULOS Y SU MEDIDA</a> </div>
<div style="text-align: left;">
<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Agrega/Matematicas/Sistema%20sexagesimal/contenido/index.html" target="_blank">SISTEMA SEXAGESIMAL</a></div>
<div style="text-align: left;">
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/transportador/transportador_p.html" target="_blank">EL TRANSPORTADOR DE ÁNGULOS</a> </div>
<div style="text-align: left;">
<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/transportador/" target="_blank">MEDICIÓN DE ÁNGULOS CON EL TRANSPORTADOR</a> </div>
<div style="text-align: left;">
<a href="http://e-learningforkids.org/Courses/ES/M1108/" target="_blank">MEDICIÓN DE ÁNGULOS</a> </div>
<div style="text-align: left;">
<a href="http://olmo.pntic.mec.es/mdes0005/matematicas/html/M_B2_ClasificacionDeAngulos/" target="_blank">CLASIFICACIÓN DE ÁNGULOS</a> </div>
<div style="text-align: left;">
<a href="http://www.ceibal.edu.uy/UserFiles/P0001/ODEA/ORIGINAL/090512_angulos1.elp/index.html" target="_blank">¡ÁNGULOS POR AQUÍ, ÁNGULOS POR ALLÁ!</a> </div>
<div style="text-align: left;">
<a href="http://ntic.educacion.es/w3/eos/MaterialesEducativos/mem2008/matematicas_primaria/menuppal.html" target="_blank">MEDIDA: ÁNGULOS Y SU MEDIDA</a><br />
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<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/NHtol9sggYM" width="560"></iframe>
<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/48oQ9pgvCL8" width="560"></iframe>
<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/sG0c2PaUuBM" width="560"></iframe>
Si te quieres echar unas risas:
Busca este enlace en you tube: http://youtu.be/pVwuRNdYlyg
</div>
Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com9tag:blogger.com,1999:blog-1540649820516651086.post-71398281314471854742014-02-05T10:05:00.000+01:002014-02-06T17:40:00.474+01:00EL TRANSPORTADOR DE ÁNGULOS<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi6_a9_ZZ72Jw6TFkq8k-PpQupZCBnL7cml0lP5702tCB-7GWYRSTXYByJoAkHjLhQZRO-224pSO7I7wJSJg2emFeXkdCam54u_FglaVSGB4zEX-xLGQIKkyqe5m4yuiHDb-ayfoq6Tvvk/s1600/transportador.png" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi6_a9_ZZ72Jw6TFkq8k-PpQupZCBnL7cml0lP5702tCB-7GWYRSTXYByJoAkHjLhQZRO-224pSO7I7wJSJg2emFeXkdCam54u_FglaVSGB4zEX-xLGQIKkyqe5m4yuiHDb-ayfoq6Tvvk/s320/transportador.png" height="188" width="320" /></a>Es necesario manejar bien este instrumento que nos permite trazar y medir ángulos. Aquí os dejo algunos enlaces de ayuda.<br />
<br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/transportador/transportador_p.html" target="_blank">EL TRANSPORTADOR DE ÁNGULOS</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/grados/grados.swf" target="_blank">LOS ÁNGULOS Y SU MEDIDA</a><br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a> (SM Ud. 11)<br />
<br />
Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com17tag:blogger.com,1999:blog-1540649820516651086.post-4654361328986059942014-02-05T09:51:00.000+01:002014-02-06T17:36:20.902+01:00ÁNGULO COMPLEMENTARIOS Y SUPLEMENTARIOS + PROBLEMAS<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3AyziGfxy4OuV0BDigwE-5ZvCQGlmsbQPog60pdNK2v-qZLUTPKLUcs5BkzDMwkrWIltL4tVkrlwJ9qcKTJJLDDhZkAMwDpKGcuJRmtD24IyaDxWYShowMWJouQEsRGw7vem2U5SPnjw/s1600/anguloscomplemen.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3AyziGfxy4OuV0BDigwE-5ZvCQGlmsbQPog60pdNK2v-qZLUTPKLUcs5BkzDMwkrWIltL4tVkrlwJ9qcKTJJLDDhZkAMwDpKGcuJRmtD24IyaDxWYShowMWJouQEsRGw7vem2U5SPnjw/s320/anguloscomplemen.png" height="157" width="320" /></a></div>
<br />
<br />
<a href="http://contenidos.santillanaenred.com/jukebox/servlet/GetPlayer?p3v=true&xref=200602011047_PRE_0_-1274510673&mode=1&rtc=1001&locale=es_ES&cache=false" target="_blank">ÁNGULOS COMPLEMENTARIOS Y SUPLEMENTARIOS</a><br />
<a href="http://olmo.pntic.mec.es/mdes0005/matematicas/html/M_B2_ClasificacionDeAngulos/" target="_blank">CLASIFICACIÓN DE ÁNGULOS</a> <br />
<br />
<br />
PROBLEMAS:<br />
<br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a> (SM Ud. 11)<br />
<br />
<br />
REPASO DE ESTE TEMA:<br />
<a href="http://clic.xtec.net/db/jclicApplet.jsp?project=http://clic.xtec.net/projects/meditemp/jclic/meditemp.jclic.zip&lang=es" target="_blank">Medimos el tiempo <span style="color: black;">Actividad JCLIC</span></a><br />
<a href="http://www.juntadeandalucia.es/averroes/carambolo/WEB%20JCLIC2/Agrega/Matematicas/Sistema%20sexagesimal/contenido/index.html" target="_blank">SISTEMA SEXAGESIMAL</a><a href="http://escueladeverano.net/images/escueladeverano/areas/matematicas/interactivas/unidad_9/unidad9_angulos.html" target="_blank">REPASO LA UNIDAD</a><br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a> (SM Ud. 11)Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com15tag:blogger.com,1999:blog-1540649820516651086.post-63755026958667722262014-02-04T10:04:00.000+01:002014-02-06T17:42:26.585+01:00SUMAS Y RESTAS DE ÁNGULOS<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjWSiPBD_Xn_GtbYhDypQrq_WeUE4k7sXoGs0igTTuz65A6-sP8B-e4q-yOQG-b5R6UCWkO4g8E_0cSEvMOdGgLS1oKSJiDM0LFb_8RAQGp6r8OjH31IMq33wox5ekq_Z08IdQt5brwst4/s1600/suma_angulos.png" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjWSiPBD_Xn_GtbYhDypQrq_WeUE4k7sXoGs0igTTuz65A6-sP8B-e4q-yOQG-b5R6UCWkO4g8E_0cSEvMOdGgLS1oKSJiDM0LFb_8RAQGp6r8OjH31IMq33wox5ekq_Z08IdQt5brwst4/s320/suma_angulos.png" height="243" width="320" /></a><br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">SUMA DE ÁNGULOS</a> (SM Ud. 11)<br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/angulos/principal_p.html" target="_blank">SUMA Y RESTA DE ÁNGULOS I</a><br />
<a href="http://www.omerique.net/polavide/rec_polavide0708/edilim/SumaRestaAngulos/Sumayrestadeangulos.html" target="_blank">SUMA Y RESTA DE ÁNGULOS II</a><br />
<a href="https://repositorio.educa.jccm.es/portal/odes/matematicas/adicion_sustracion_angulos/" target="_blank">ADICIÓN Y SUSTRACCIÓN DE ÁNGULOS</a>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com17tag:blogger.com,1999:blog-1540649820516651086.post-75521345110450778612014-02-03T09:28:00.000+01:002014-02-06T17:42:46.923+01:00ESQUEMA DE LA UNIDADQuizás con un poco de retraso pero a petición vuestra aquí os lo dejo:<br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF7M82Lu7vf8lWO6aHdvFSK2olC7oVZOu5nKu_FtHfLAkiSGQGSpkNS5Cb0H7cCHWzQnaymBoa7g3GYWGZxNuFDSQ4bH6gs_ZpOF6bhecKL_77jT6U3GOfq4gTb0NBig8dsFxkQfdLOMk/s1600/esquema+angulos.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF7M82Lu7vf8lWO6aHdvFSK2olC7oVZOu5nKu_FtHfLAkiSGQGSpkNS5Cb0H7cCHWzQnaymBoa7g3GYWGZxNuFDSQ4bH6gs_ZpOF6bhecKL_77jT6U3GOfq4gTb0NBig8dsFxkQfdLOMk/s320/esquema+angulos.png" height="160" width="320" /></a></div>
Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com14tag:blogger.com,1999:blog-1540649820516651086.post-26092357642564116942014-01-23T10:10:00.000+01:002014-01-23T09:44:13.683+01:00PROBLEMAS CON DECIMALES<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a><br />
<a href="http://www.vitutor.com/di/d/d_e.html">PROBLEMAS CON DECIMALES.</a><br />
<a href="http://actividadesparaelcole.blogspot.com/2008/02/problemas-decimales-5.html">MÁS PROBLEMAS.</a><br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgPuF4jSF1IZv0g1Kfn3jw1G_lxN_yBoMApUrB_WfAEnRZUQcIDsI3ESvrOCo2tRHLJHwh6a0GGyq_5UM92FN-qSgpQHNGKvo_znSNZg9hkjddfC1Wr5jmHBnbJgAe54mXtuoQeTIRV4zU/s1600/PROBLEMAS.png" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgPuF4jSF1IZv0g1Kfn3jw1G_lxN_yBoMApUrB_WfAEnRZUQcIDsI3ESvrOCo2tRHLJHwh6a0GGyq_5UM92FN-qSgpQHNGKvo_znSNZg9hkjddfC1Wr5jmHBnbJgAe54mXtuoQeTIRV4zU/s320/PROBLEMAS.png" height="114" width="320" /></a></div>
<a href="http://www.scribd.com/doc/8008246/Matematicas-Problemas-con-numeros-decimales">DESCARGA ESTA FICHA Y HAZLA </a><br />
<br />
<br />
<br />
<br />
<br />
P<u><b>ara repasar este tema</b></u>:<br />
<br />
<a href="http://www.aplicaciones.info/decimales/decimax2.htm" target="_blank">EXAMEN DE DECIMALES</a><br />
<br />
<a href="http://escueladeverano.net/images/escueladeverano/areas/matematicas/interactivas/unidad_4/unidad4_operaciones_n__decimales.html" target="_blank">REPASO LA UNIDAD</a><br />
<br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a> (SM Ud. 3)Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com19tag:blogger.com,1999:blog-1540649820516651086.post-60745976385921080142014-01-21T17:45:00.000+01:002014-01-21T17:40:41.075+01:00DIVISIÓN DE NÚMEROS NATURALES ENTRE DECIMALES<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjoDZZYRh5fVzXnUQjow9BUGLVgsFBAYYBRdjQynvIKXBZQE4n56uTz_uDcRMt5a5bpCXzsHf_ylqlFrageoKAbpnpLfn3Mhl3Y_QX2EUDJXzx_7W6AyvS_MUMb6PjOOr_WgN9fojYUspU/s1600/dividecim.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjoDZZYRh5fVzXnUQjow9BUGLVgsFBAYYBRdjQynvIKXBZQE4n56uTz_uDcRMt5a5bpCXzsHf_ylqlFrageoKAbpnpLfn3Mhl3Y_QX2EUDJXzx_7W6AyvS_MUMb6PjOOr_WgN9fojYUspU/s320/dividecim.png" height="150" width="320" /></a></div>
<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/openumdec/divi_dec_d/divi_dec_d.html" target="_blank">DIVISIÓN DE UN NÚMERO NATURAL ENTRE UN NÚMERO DECIMAL</a><br />
<a href="http://www.isftic.mepsyd.es/w3/eos/MaterialesEducativos/mem2008/visualizador_decimales/divisiondecimalesdivisor.html" target="_blank">DIVISIÓN CON DECIMALES EN EL DIVISOR</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/ladivision_cd/ladivision_eed/div_eed_p.html" target="_blank">LA DIVISIÓN CON NÚMEROS DECIMALES</a>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com20tag:blogger.com,1999:blog-1540649820516651086.post-50078867028522537842014-01-21T17:41:00.000+01:002014-01-21T17:35:57.708+01:00DIVISIÓN DE UN DECIMAL ENTRE UN DECIMAL<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/openumdec/divi_dec_d2/divi_dec_d2.html" target="_blank">DIVISIÓN DE UN NÚMERO DECIMAL ENTRE UN NÚMERO DECIMAL</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/9/Usr/eltanque/ladivision_cd/division_cdw.html" target="_blank">DIVISIÓN CON DECIMALES</a><br />
<a href="http://ntic.educacion.es/w3/recursos/primaria/matematicas/decimales/menuu7.html" target="_blank">LA DIVISIÓN</a><br />
<a href="http://cplosangeles.juntaextremadura.net/web/edilim/tercer_ciclo/matematicas6/division_decimales_6/division_decimales_6.html" target="_blank">DIVISIÓN DE NÚMEROS DECIMALES</a><br />
<a href="http://www.edu.xunta.es/espazoAbalar/sites/espazoAbalar/files/datos/1327064121/contido/decimais_gruta/gruta-espanol-ingles/el_tesoro_de_la_gruta-operaciones_con_decimales.html" target="_blank">EL TESORO DE LA GRUTA</a><br />
<br />
<br />
<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/zpCNSvdSEz0" width="560"></iframe>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com13tag:blogger.com,1999:blog-1540649820516651086.post-32895673519665004012014-01-21T17:40:00.000+01:002014-01-21T17:34:41.478+01:00<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/openumdec/divi_dec/divi_dec.html" target="_blank">DIVISIÓN DE UN NÚMERO DECIMAL ENTRE UN NÚMERO NATURAL</a><br />
<a href="http://www.isftic.mepsyd.es/w3/eos/MaterialesEducativos/mem2008/visualizador_decimales/divisiondecimales.html" target="_blank">DIVISIÓN DE DECIMALES</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/divi_deci/divi_deci_p.html" target="_blank">DIVISIÓN POR LA UNIDAD SEGUIDA DE CEROS CON DECIMALES</a><br />
<div style="text-align: left;">
<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/usc/divideci/divi_usc_ed_p.html" target="_blank">PRACTICO LA DIVISIÓN POR LA UNIDAD SEGUIDA DE CEROS CON DECIMALES</a> </div>
<div style="text-align: left;">
<a href="http://ntic.educacion.es/w3//recursos/primaria/matematicas/decimales/menuu7.html" target="_blank">DIVISIÓN DE DECIMALES</a></div>
<div style="text-align: left;">
<a href="http://ntic.educacion.es/w3//eos/MaterialesEducativos/mem2011/unidad_seguida_ceros/La_unidad_seguida_ceros.html" target="_blank">LA UNIDAD SEGUIDA DE CEROS</a> </div>
<div style="text-align: left;">
<a href="http://www.omerique.net/polavide/rec_polavide0708/edilim/numeracion_calculo_3ciclo/OperacionesDivisionDecimales.html" target="_blank">DIVIDIR NÚMEROS DECIMALES</a> </div>
<div style="text-align: left;">
<a href="http://www.educarecuador.ec/recursos/rdd/matematicas/6to_egb/divisiones/index.html" target="_blank">DIVISIONES CON NÚMEROS DECIMALES</a> </div>
<div style="text-align: left;">
</div>
<div style="text-align: left;">
Actividad JClic:</div>
<div style="text-align: left;">
<a href="http://clic.xtec.net/db/jclicApplet.jsp?project=http://clic.xtec.net/projects/divdeci/jclic/divdeci.jclic.zip&lang=es" target="_blank">Divisiones con decimales</a> </div>
<div style="text-align: left;">
</div>
<div style="text-align: left;">
</div>
<iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/IMLcHLuHEXk" width="560"></iframe>Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com4tag:blogger.com,1999:blog-1540649820516651086.post-69400214283978882332014-01-21T17:33:00.000+01:002014-01-21T17:39:27.392+01:00DIVISION DE NÚMEROS DECIMALESNuevo tema pero parecido contenido. Continuamos con los números decimales y ahora tocará volver a repetir los contenidos del anterior más la incorporación de la división.<br />
<br />
<u><b>Comenzamos por la división más sencilla: Un número decimal entre un número natural. </b></u><br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgxWripdHEt8FcXtZErpaEzEJ4p_WAll8qj3x5eWmq6T0sgsSIektAp-ECbV5-dViXI3YJSB1_S4DGVNmZiRzgDsBgqWdVsdKvkjThWu3vR5NksV0UdOCL3_0mIGSmZh_jTxvCmRHndf2Q/s1600/12GRANDE.gif" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgxWripdHEt8FcXtZErpaEzEJ4p_WAll8qj3x5eWmq6T0sgsSIektAp-ECbV5-dViXI3YJSB1_S4DGVNmZiRzgDsBgqWdVsdKvkjThWu3vR5NksV0UdOCL3_0mIGSmZh_jTxvCmRHndf2Q/s320/12GRANDE.gif" height="186" width="320" /></a></div>
<span style="color: #990000;">Para dividir un número decimal entre un número natural, se hace la división como si fueran números naturales y, al bajar la primera cifra decimal del dividendo, se pone la coma en el cociente.</span><br />
<br />
<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/openumdec/divi_dec/divi_dec.html" target="_blank">DIVISIÓN DE UN NÚMERO DECIMAL ENTRE UN NÚMERO NATURAL</a><br />
<a href="http://www.isftic.mepsyd.es/w3/eos/MaterialesEducativos/mem2008/visualizador_decimales/divisiondecimales.html" target="_blank">DIVISIÓN DE DECIMALES</a><br />
<a href="http://www.google.com/url?q=http%3A//www.primaria.librosvivos.net/120329.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">DIVIDIR ENTRE NÚMEROS NATURALES</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/divi_deci/divi_deci_p.html" target="_blank">DIVISIÓN POR LA UNIDAD SEGUIDA DE CEROS CON DECIMALES</a><br />
<a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/usc/divideci/divi_usc_ed_p.html" target="_blank">PRACTICO LA DIVISIÓN POR LA UNIDAD SEGUIDA DE CEROS CON DECIMALES</a><br />
<a href="http://clic.xtec.net/db/jclicApplet.jsp?project=http://clic.xtec.net/projects/divdeci/jclic/divdeci.jclic.zip&lang=es" target="_blank">Divisiones con decimales</a> (JClic)Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com25tag:blogger.com,1999:blog-1540649820516651086.post-59075111542233140682014-01-21T17:30:00.000+01:002014-01-21T17:33:30.170+01:00DIVISIÓN DE UN NÚMERO NATURAL ENTRE UN DECIMAL<div style="text-align: left;">
<a 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" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://www.gobiernodecanarias.org/educacion/usr/eltanque/todo_mate/openumdec/divi_dec_d/divi_dec_d.html" target="_blank">DIVISIÓN DE UN NÚMERO NATURAL ENTRE UN NÚMERO DECIMAL</a> </div>
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Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com12tag:blogger.com,1999:blog-1540649820516651086.post-4779549811754964262014-01-13T14:00:00.000+01:002014-01-13T13:11:19.021+01:00REPASO Y ACTIVIDADES PARA PREPARAR EL CONTROL<div class="separator" style="clear: both; text-align: center;">
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" 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" /></a></div>
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mate_cas_ud2_Resuelve_problemas.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">RESUELVE PROBLEMAS</a><br />
<a href="http://odas.educarchile.cl/objetos_digitales/odas_matematicas/12/consolaOD.swf" target="_blank">NÚMEROS DECIMALES</a><br />
<a href="http://www.google.com/url?q=http://www.primaria.librosvivos.net/6EP_Mate_cas_ud2_Autoevaluacion.html&sa=D&sntz=1&usg=AFrqEzdWi3V-RYn4siWP1bEQqQezltC_xA" target="_blank">AUTOEVALUACIÓN DE LA UNIDAD</a><br />
<a href="http://www.testeando.es/test.asp?idA=68&idT=nmxpvxwb" target="_blank">TEST: NÚMEROS DECIMALES</a><br />
<div align="center">
ACTIVIDADES DE REPASO<br />
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Alfonso Donoso Barellahttp://www.blogger.com/profile/08531255428384217136noreply@blogger.com8tag:blogger.com,1999:blog-1540649820516651086.post-80869990429301372242014-01-13T13:31:00.000+01:002014-01-13T13:10:13.788+01:00APROXIMACIÓN NÚMEROS DECIMALES<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhKtA6Xy6KqmTf1NJq0E0iY-ocTz8i9LhRPVqVnEW2tfnR7B3nbt3r1Sk0yVLE5ljKJgG4hPXpGvf0vpHYIeRAC0SiNztm7j3DF4a_vLbU3p_JtXXYmbRd33qrfZ-klMJre62mIvEisBTY/s1600/APROXIMACI%25C3%2593N+DECIMALES.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhKtA6Xy6KqmTf1NJq0E0iY-ocTz8i9LhRPVqVnEW2tfnR7B3nbt3r1Sk0yVLE5ljKJgG4hPXpGvf0vpHYIeRAC0SiNztm7j3DF4a_vLbU3p_JtXXYmbRd33qrfZ-klMJre62mIvEisBTY/s1600/APROXIMACI%25C3%2593N+DECIMALES.jpg" /></a><br />
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