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CLEI I
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Propósito
<p>Comprender los números racionales como un subconjunto que engloba a otros sistemas numéricos, identificando cada uno de ellos de acuerdo a sus características.</p>
Motivación
<p><a href="https://www.cokitos.com/alimenta-al-monstruo-con-fracciones-circulares/play/" target="_blank"><img src="data:image/png;base64,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" alt="" "=""></a></p><p><a href="https://www.cokitos.com/alimenta-al-monstruo-con-fracciones-en-barras/play/" target="_blank"><img src="/web/uploads/13124/6be4bae1a2-imagen-numeros-racionales.png" alt="" "=""></a><br></p><p><span class="redactor-invisible-space"><a href="https://www.cokitos.com/alimenta-al-monstruo-con-fracciones-en-barras/play/" target="_blank"></a></span></p>
Explicación
<h4></h4><h2 style="font-family: Arial, Helvetica, Verdana, Tahoma, sans-serif; font-weight: bold; line-height: 1.3; color: rgb(0, 0, 0); margin: 0px 0px 0.7em; font-size: 24px; padding: 0px; background: none; text-rendering: optimizelegibility;">Paso 1:</h2><h4><img src="/web/uploads/13124/3bc8c4ea99-imagen-explicacion.png" width="190" height="154" alt="" style="width: 190px; height: 154px;"></h4><h4>DEL LIBRO PAGINA 10 y 11:Lectura –análisis y Resumen sintético en el cuaderno<br></h4><h2>TITULO: Números Racionales</h2><ul> <li>1.1 Fracciones equivalentes</li> <li>1.2 Números Racionales </li> <li>1.3 Orden en los Números Racionales</li></ul><p><span style="color: #e36c09;">Si no tienes el libro encontraras las páginas aquí: <a href="https://tecevolucion.files.wordpress.com/2018/02/matematicas-8-vamos-a-aprender1.pdf">https://tecevolucion.files.wordpress.com/2018/02/matematicas-8-vamos-a-aprender1.pdf</a></span></p><p><br></p><h2><img src="/web/uploads/13124/08590d1c39-observa.png" width="128" height="117"> <img src="/web/uploads/13124/36d13d86a0-esquema-racionales.png"><br></h2><h2>Paso 2: </h2><p><span style="color: #76923c;">CONCENTRATE</span></p><p><span></span><iframe width="500" height="281" src="//www.youtube.com/embed/QZTyePr_Snk" frameborder="0" allowfullscreen="" style="background-color: initial;"></iframe></p><p>Recuerda que en nuestro próximo encuentro sincrónico resolveremos dudas del tema</p>
Ejercicios
<p><span style="color: #e36c09;">EXPLORA EL SIGUIENTE JUEGO Y RECORRE TODOS LOS NIVELES</span><br></p><p><span style="color: #e36c09;"></span></p><p><a href="https://phet.colorado.edu/sims/html/build-a-fraction/latest/build-a-fraction_es.html" target="_blank"><img src="/web/uploads/13124/850dc5c239-connstruye-una-fraccion.png" alt="" "=""></a></p>
Evidencia
Evaluación
<h2></h2><h2 style="font-family: Arial, Helvetica, Verdana, Tahoma, sans-serif; font-weight: bold; line-height: 1.3; color: rgb(0, 0, 0); margin: 0px 0px 0.7em; font-size: 24px; padding: 0px; background: none; text-rendering: optimizelegibility;">En tu cuaderno:</h2><p style="margin-bottom: 15px; font-size: 14px; line-height: 1.6em; border: none; background: none; box-shadow: none; font-family: Arial, Helvetica, Verdana, Tahoma, sans-serif;">Desarrolla la actividad de aprendizaje de la pagina 11</p><p><img src="/web/uploads/13124/5ebba4c7bf-imagen-tarea.png"></p><p><span style="color: rgb(227, 108, 9);">Toma registro fotográfico del desarrollo de la actividad de Aprendizaje de la pagina 11 y compártelo en TAREA </span></p><p><span style="color: rgb(227, 108, 9);">No olvides convertir tu actividad en formato </span><strong><span style="color: rgb(227, 108, 9);">PDF</span></strong></p>
Bibliografía
<p>Vamos a aprender, Matemáticas grado 8, La educación es de todos, Mineducación</p><p><a href="https://tecevolucion.files.wordpress.com/2018/02/matematicas-8-vamos-a-aprender1.pdf">https://tecevolucion.files.wordpress.com/2018/02/matematicas-8-vamos-a-aprender1.pdf</a></p>
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