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CLEI I
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Propósito
<p>Reconoce el concepto de semejanza de figuras planas.</p><p><br></p>
Motivación
<p>Señala las figuras que son muy similares y explica qué tienen de similares:</p><p><img src="data:image/png;base64,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" alt="" style="width: 623px; height: 360px;" width="623" height="360"></p><span id="selection-marker-1" class="redactor-selection-marker"></span><p><br></p>
Explicación
<p>Dos figuras son semejantes cuando tienen la misma forma y los mismos ángulos, pero la medida de sus lados o su orientación es diferente.</p><p>Observa el siguiente video que explica la semejanza de figuras</p><p><a href="about:blank">https://www.youtube.com/watch?v=4MxChkgm370</a></p>
Ejercicios
<p>Realiza la actividad de la página 249:</p><p><img src="/web/uploads/13142/81ac1a163d-camscanner-07-13-2021-0829.jpg" style="width: 612px; height: 868px;" width="612" height="868"></p><br>
Evidencia
Evaluación
<p>Realiza la siguiente actividad interactiva y envía el resultado a tu profesor(a)</p><p><a href="about:blank">https://es.liveworksheets.com/worksheets/es/Matem%C3%A1ticas/Semejanza_de_figuras/Figuras_Semejantes_sp1684926ud</a></p>
Bibliografía
<p><a href="about:blank">http://recursostic.educacion.es/secundaria/edad/2esomatematicas/2quincena7/2quincena7_contenidos_2a.htm</a><o:p></o:p></p>
Foro
calificable?
Activo
Actualizar