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CLEI I
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Propósito
<p>Que el estudiante analice el cuadrante del dinero y su relación con las diferentes formas de generar ingresos.</p>
Motivación
<p><span style="font-family: Arial;"></span><span style="font-family: Georgia;"></span><img src="data:image/png;base64,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" alt="" style="width: 512px; height: 183px;" width="512" height="183"></p>
Explicación
<p>Para poder comprender el tema se aconseja, primero ver el video donde se presenta un resumen didáctico sobre el tema y posteriormente ver las diapositivas donde se presentan las características de cada uno de los cuadrantes.</p><p><a href="https://www.youtube.com/watch?v=Smw_UOcUDzA" target="_blank">Video explicativo Cuadrante del flujo de dinero</a></p><p><a href="https://www.youtube.com/watch?v=Smw_UOcUDzA" target="_blank"></a><a href="/web/uploads/16084/02d73d182f-cuadrante-del-flujo-del-dinero.pdf">Explicación del cuadrante del flujo del dinero</a></p>
Ejercicios
<p>Después de ver el video y leer la parte explicativa del tema, el estudiante debe contestar las siguientes preguntas y enviarlas en forma de archivo.</p><p>1. ¿Qué es emprender?</p><p><span></span>2. ¿Por qué es importante emprender o innovar un proyecto propio?</p><p>4. ¿En que cuadrante del dinero estas? ¿Por qué?</p><p>5. ¿Cuál de los cuadrante es el mejor? Explica tu respuesta</p><p>6. Piensa en una idea de negocio o proyecto emprendedor y escribe en que consiste y por qué lo elegiste.</p>
Evidencia
Evaluación
<p>Se tendrán en cuenta los siguientes aspectos al momento de evaluar la actividad:</p><ul><li>Análisis y coherencia en las respuestas </li><li>Respuestas completas y sustentadas </li><li>Presentación y puntualidad en la entrega de la actividad</li></ul>
Bibliografía
<p>Cartilla de emprendimiento BBVA</p><p><a href="https://www.youtube.com/watch?v=Smw_UOcUDzA" target="_blank">https://www.youtube.com/watch?v=Smw_UOcUDzA</a></p>
Foro
calificable?
Activo
Actualizar
