Actualizar Secuencia Didactica: 11137

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LOS ANGULOS<img src="/web/uploads/583/a4ad1b6a62-partes-del-angulo.png">CLASIFICACIÓN DE LOS ÁNGULOS<img src="/web/uploads/583/e4990a6da2-clases-de-angulos.jpg"><img src="http://1.bp.blogspot.com/-bLCp5lBsJ_s/TZYxbvg8ydI/AAAAAAAAG9s/HolNuDTvIYs/w1200-h630-p-k-no-nu/angulos.jpg" alt="APRENDER ES DIVERTIDO: CLASES DE ÁNGULOS (MAPA CONCEPTUAL)"><img src="https://luisamariaarias.files.wordpress.com/2011/11/tipos-de-c3a1ngulos.jpg" alt="1.TIPOS DE ÁNGULOS | JUGANDO Y APRENDIENDO"><iframe width="500" height="281" src="//www.youtube.com/embed/z2o6mqgJhgs" frameborder="0" allowfullscreen=""></iframe> <iframe width="500" height="281" src="//www.youtube.com/embed/NtTOfe6vuQk" frameborder="0" allowfullscreen="" style="background-color: initial;"></iframe> <img src="/web/uploads/04102021/583/a234a21c58-medidas-de-angulos-del-transportador.jpg"><iframe width="500" height="281" src="//www.youtube.com/embed/liB23-xfJNs" frameborder="0" allowfullscreen=""></iframe> LOS GIROS: Un giro es un movimiento que se hace alrededor de un punto fijo. Un giro se puede realzar en diferentes sentidos: giro de un cuarto de vuelta a la izquierda, un cuarto de vuelta a la derecha, media vuelta o vuelta entera.<img src="/web/uploads/583/5f8b21d76f-giros-de-angulos.jpg" width="477" height="303" style="width: 477px; height: 303px;"> <iframe width="500" height="281" src="//www.youtube.com/embed/kXwJOefEjJs" frameborder="0" allowfullscreen=""></iframe><iframe width="500" height="281" src="//www.youtube.com/embed/QW602kH52Ec" frameborder="0" allowfullscreen=""></iframe> <img src="http://sinapsis.club/web/uploads/04102021/605/a9d8a0061d-rotacion-traslacion-simetria.jpg">TEMA 2FIGURAS GEOMETRICAS<img src="/web/uploads/04102021/583/49f1d00ceb-figuras-geometricas.jpg"> FIGURAS PLANAS Son aquellas figuras geométricas que no tienen relieve, es decir, que sólo tiene dos dimensiones. Este tipo de figuras se dividen en polígonos (unión de líneas rectas) y cónicas (unión de líneas curvas) <img src="/web/uploads/04102021/583/4760aa9ec9-figuras-planas.jpg">EMA 3SIMETIRA<iframe width="500" height="281" src="//www.youtube.com/embed/MtY-ZOwkROE" frameborder="0" allowfullscreen=""></iframe> SIMETRIACuando una figura se puede dividir en dos partes exactamente iguales es SIMETRIA. El eje de simetría es a recta que divide la figura en dos. <img src="https://www.smartick.es/blog/wp-content/uploads/2018/09/sym-1200x900.png" alt="Simetría: qué es en matemáticas y ejercicios | Smartick" width="234" height="178" style="width: 234px; height: 178px;"><img src="/web/uploads/04102021/583/2e117c7bd8-figuras-simetricas.jpg"><img src="/web/uploads/04102021/583/3c6a617195-figuras-no-simetricas.jpg"> <iframe width="500" height="281" src="//www.youtube.com/embed/QWdaSFBaOHs" frameborder="0" allowfullscreen=""></iframe> <img src="/web/uploads/04102021/583/815e6e4917-dibujo-de-simetria.jpg" width="255" height="358" style="width: 255px; height: 358px;">

Ejercicios

OS ANGULOSACTIVIDADES1.Clasifica estos ángulos según sean agudos, obtusos o rectos<img 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" alt=""><img src="/web/uploads/583/62c5e0cbcf-talle-de-angulo-unir.png" width="363" height="471" style="width: 363px; height: 471px;"> <img src="/web/uploads/583/3419d5f7a0-escibir-angulos.jpg"><img src="/web/uploads/583/f1d90eb3ff-capturaejejrcicio-con-el-tranportador.png"><img src="/web/uploads/583/4042d5187b-ejercicios-de-angulos.png" width="134" height="187" style="width: 134px; height: 187px;">TEMA 2FIGURAS GEOMETRICAS trabajar en clase el taller de figuras planas y lo suben sygescolTEMA 3 SIMETRIA<img src="/web/uploads/04102021/583/abae4265fd-figuara-de-simetria.png" "="" width="354" height="409" style="width: 354px; height: 409px;"><img src="/web/uploads/04102021/583/205dc27458-img002-3.jpg" width="460" height="642" style="width: 460px; height: 642px;"><img src="/web/uploads/04102021/583/7623955d79-tarea-de-simetria.png" style="width: 337px; height: 472px;" width="337" height="472">

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