Actualizar Secuencia Didactica: 3872

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Clase 1 Repaso lectura de números Niños los invito a ver el siguiente video para que repasemos los números del 1 al 100<a href="https://www.youtube.com/watch?v=LiLE_f9I6Co&amp;t=7s" target="_blank">https://www.youtube.com/watch?v=LiLE_f9I6Co&amp;t=</a> <img src="https://1.bp.blogspot.com/-lYLqIJlbVZ4/WciqUuenc1I/AAAAAAAADmw/GI6fTAv8gj0Bxv9YJav2Gomcg6N1ecwDwCLcBGAs/s1600/5.png" alt="Resultado de imagen para ejercicios de escritura de numeros de dos cifras en letra y numero" width="481" height="347" style="width: 481px; height: 347px;"> Clase 2 <a href="https://www.youtube.com/watch?v=3yyHrrKmzRE&amp;t=2s">https://www.youtube.com/watch?v=3yyHrrKmzRE&amp;t=2s</a> Secuencia numérica:La Sucesión Numérica son números que llevan una secuencia mientras se mantenga un orden por ejemplo: ( 1, 3; 5; 7; 9; …) Esta es una sucesión numérica lo siguiente de este problema debemos encontrar la ley de formación o seguimiento en la sucesión. <a href="https://www.youtube.com/watch?v=OsAPp5yAuic">https://www.youtube.com/watch?v=OsAPp5yAuic</a> <a href="https://www.youtube.com/watch?v=hrZY5nxyJ_U">https://www.youtube.com/watch?v=hrZY5nxyJ_U</a> Clase 3Valor posicional: El valor posicional es el valor que toma un dígito de acuerdo con la posición que ocupa dentro del número (unidades, decenas, centenas…). Es por ello que el cambio de posición de un dígito dentro de un número altera el valor total del mismo. <a href="https://aprende.colombiaaprende.edu.co/sites/default/files/naspublic/ContenidosAprender/G_2/M/M_G02_U01_L01/M_G02_U01_L01_01_01.html">https://aprende.colombiaaprende.edu.co/sites/defau...</a> <img src="https://i.pinimg.com/originals/c4/62/c4/c462c43a5b32ca4285c92451f04ea583.jpg" alt="Resultado de imagen para valor posicional para niños" width="498" height="335" style="width: 498px; height: 335px;"><a href="https://youtu.be/eNodAB9v6YM">https://youtu.be/eNodAB9v6YM</a> Sesión #3:Sumas de números de dos cifras:<a href="https://www.youtube.com/watch?v=C0sqxgJcnt8&amp;t=2s">https://www.youtube.com/watch?v=C0sqxgJcnt8&amp;t=2s</a>Restas de números de dos cifras:<a href="https://youtu.be/NkdCAwwZrm8">https://youtu.be/NkdCAwwZrm8</a> Sesión #4:<a href="https://youtu.be/FdCjI0xOrac">https://youtu.be/FdCjI0xOrac</a> <a href="https://www.youtube.com/watch?v=k46QCr1GofU">https://www.youtube.com/watch?v=k46QCr1GofU</a> <a href="https://www.youtube.com/watch?v=ow7DVEfBJyE">https://www.youtube.com/watch?v=ow7DVEfBJyE</a> Qué es sumar?<img src="data:image/jpeg;base64,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" alt="SUMA Y RESTA DE NÚMEROS NATURALES PARA NIÑOS DE 2do GRADO">Ejemplo:<img src="https://www.pequeocio.com/wp-content/uploads/2019/04/sumas-y-restas.jpg" alt="Sumas y restas para niños: explicación y ejercicios | Pequeocio" width="405" height="478" style="width: 405px; height: 478px;">Restas de números de dos cifras:<a href="https://youtu.be/NkdCAwwZrm8">https://youtu.be/NkdCAwwZrm8</a><img src="data:image/jpeg;base64,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" alt="Que Es La Resta Para Niños De Preescolar - Hay Niños">Ejemplo:CLASE 4. SESION UNONUMEROS DE TRES CIFRAS<a href="https://www.youtube.com/watch?v=7sXN3io-_nk">https://www.youtube.com/watch?v=7sXN3io-_nk</a> LECTURA Y ESCRITURA DE NUMEROS DE TRES CIFRAS. <img src="https://i0.wp.com/www.orientacionandujar.es/wp-content/uploads/2018/11/lectura-numeros-unir-002.jpg?fit=1920%2C1080&amp;ssl=1" alt="Aprendemos a leer números #matemáticas -Orientacion Andujar" width="523" height="294" style="width: 523px; height: 294px;">VALOR POSICIONAL DE NUMEROS DE TRES CIFRAS. Recordemos que el valor posicional es el valor que toma un dígito de acuerdo con la posición que ocupa dentro del número (unidades, decenas, centenas…). Es por ello que el cambio de posición de un dígito dentro de un número altera el valor total del mismo. <a href="https://www.youtube.com/watch?v=w_6P1c89f-4">https://www.youtube.com/watch?v=w_6P1c89f-4</a> VALOR POSICIONAL. <a href="https://www.youtube.com/watch?v=qEep-YICaZ4">https://www.youtube.com/watch?v=qEep-YICaZ4</a> RETROALIMENTACION SOBRE VALOR POSICIONAL Y COMPARACIÓN DE CANTIDADES. CLASE 4 SESION 2.SUMAS CON NÚMEROS DE TRES CIFRAS<a href="https://www.youtube.com/watch?v=_Cnh-JhzrXs">https://www.youtube.com/watch?v=_Cnh-JhzrXs</a> EXPLICACIÓN DE SUMAS DE TRES CIFRAS. CON LLEVADAS Y SIN LLEVADAS CLASE 4. SESION 3RESTAS CON NÚMEROS DE TRES CIFRAS.<a href="https://www.youtube.com/watch?v=pBZYKuB_bro">https://www.youtube.com/watch?v=pBZYKuB_bro</a> EXPLICACIÓN DE LA RESTA <a href="https://youtu.be/FdCjI0xOrac https://www.youtube.com/watch?v=k46QCr1GofU https://www.youtube.com/watch?v=ow7DVEfBJyE">https://youtu.be/FdCjI0xOrac https://www.youtube.com/watch?v=k46QCr1GofU https://www.youtube.com/watch?v=ow7DVEfBJyE</a>

Ejercicios

ACTIVIDAD clase 1 y 4<a href="/web/uploads/605/be928f21b9-matematicas-sigescol.pdf">be928f21b9-matematicas-sigescol.pdf</a> TALLER REAGRUPACIÓN DE UNIDADES Y DECENAS. Abrir link para observar lo que se debe subir a SIGESCOL. <img src="https://files.liveworksheets.com/def_files/2020/9/29/929183228700245/929183228700245001.jpg" alt="Resultado de imagen para actividades sobre escritura de números de dos cifras grado 2 primaria" width="337" height="388" style="width: 337px; height: 388px;"><img src="/web/uploads/605/be0e8079d9-lectura-de-numeros.jpg"> <a href="https://www.cerebriti.com/juegos-de-matematicas/unidades-y-decenas">https://www.cerebriti.com/juegos-de-matematicas/un...</a> Valor posicional Clase 4: Reagrupación de unidades y decenas<a href="https://www.mundoprimaria.com/juegos-educativos/juegos-matematicas/suma-horizontal">https://www.mundoprimaria.com/juegos-educativos/ju...</a> JUEGO INTERACTIVO PARA PRACTICAR ( NO SUBIR A SIGESCOL) PROBLEMAS APLICANDO LA SUMA CON REAGRUPACION DE UNIDADES.<a href="/web/uploads/605/9512db49e1-problemas-y-sumas-de-dos-numeros-sigescol.pdf">9512db49e1-problemas-y-sumas-de-dos-numeros-sigescol.pdf</a> SUBIR A SIGESCOL PLAZO MAXIMO 30 DE ABRIL <img src="/web/uploads/605/e6e102906c-5df61ef19b89f560124ce5ed2daef1ee-2.jpg" width="521" height="395" style="width: 521px; height: 395px;"> <a href="https://www.youtube.com/watch?v=hW_4uTSainI">https://www.youtube.com/watch?v=hW_4uTSainI</a> ejercicios de valor posicional con números de tres cifras. Escribir el ejercicio en el cuaderno y resolverlo para ejercitar el tema.

Evidencia

Evaluación

Escribirlos en el cuaderno y resolverlos.Clase 1<img 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" alt="" "=""> Clase 4 <img src="https://i.pinimg.com/originals/ce/33/17/ce3317ced2ac6550f8b83e3808ec45b9.jpg" alt="Resultado de imagen para ejercicios de escritura de numeros de dos cifras en letra y numero" width="294" height="420" style="width: 294px; height: 420px;"><img src="/web/uploads/605/b551752ca2-3622fb7339cef106548eb0bf4ac49618.jpg" width="323" height="460" style="width: 323px; height: 460px;" rel="width: 323px; height: 460px;"><img src="https://static.guiainfantil.com/pictures/3766-3-ejercicios-de-matematicas-series-de-restas.jpg" alt="Trucos para enseñar a los niños a sumar con llevadas">

Bibliografía

<a href="https://youtu.be/nGA15fcwAek">https://youtu.be/nGA15fcwAek</a><a href="https://www.youtube.com/watch?v=LiLE_f9I6Co&amp;t=7s" target="_blank">https://www.youtube.com/watch?v=LiLE_f9I6Co&amp;t=</a> <a href="https://www.youtube.com/watch?v=3yyHrrKmzRE&amp;t=2s">https://www.youtube.com/watch?v=3yyHrrKmzRE&amp;t=2s</a> <a href="https://www.youtube.com/watch?v=OsAPp5yAuic">https://www.youtube.com/watch?v=OsAPp5yAuic</a> <a href="https://www.youtube.com/watch?v=hrZY5nxyJ_U">https://www.youtube.com/watch?v=hrZY5nxyJ_U</a><a href="https://aprende.colombiaaprende.edu.co/sites/default/files/naspublic/ContenidosAprender/G_2/M/M_G02_U01_L01/M_G02_U01_L01_01_01.html">https://aprende.colombiaaprende.edu.co/sites/defau...</a><a href="https://aprende.colombiaaprende.edu.co/sites/default/files/naspublic/ContenidosAprender/G_2/M/M_G02_U01_L01/M_G02_U01_L01_01_01.html"></a><a href="https://youtu.be/eNodAB9v6YM">https://youtu.be/eNodAB9v6YM</a><a href="https://youtu.be/eNodAB9v6YM"></a><a href="https://www.youtube.com/watch?v=C0sqxgJcnt8&amp;t=2s">https://www.youtube.com/watch?v=C0sqxgJcnt8&amp;t=2s</a><a href="https://youtu.be/NkdCAwwZrm8">https://youtu.be/NkdCAwwZrm8</a><a href="https://youtu.be/FdCjI0xOrac">https://youtu.be/FdCjI0xOrac</a> <a href="https://www.youtube.com/watch?v=k46QCr1GofU">https://www.youtube.com/watch?v=k46QCr1GofU</a> <a href="https://youtu.be/NkdCAwwZrm8"></a><a href="https://www.youtube.com/watch?v=ow7DVEfBJyE">https://www.youtube.com/watch?v=ow7DVEfBJyE</a><a href="https://www.youtube.com/watch?v=ow7DVEfBJyE"></a><a href="https://www.cerebriti.com/juegos-de-matematicas/unidades-y-decenas">https://www.cerebriti.com/juegos-de-matematicas/un...</a><a href="http://sinapsisclub.sinapsisclub.co/web/uploads/605/f31d8759d8-matematicas-42-p1-convertido-1-1.pdf">f31d8759d8-matematicas-42-p1-convertido-1-1.pdf</a><a href="https://www.mundoprimaria.com/juegos-educativos/juegos-matematicas/suma-horizontal">https://www.mundoprimaria.com/juegos-educativos/ju...</a>

Foro

calificable?

Activo