Actualizar Secuencia Didactica: 7002

Año

Periodo

Área

Grado

Tema

Fecha de inicio

Fecha de finalización

Propósito

Motivación

Explicación

Ejercicios

1.Ubica las siguientes parejas ordenadas en el plano cartesiano A = (7, 5)B = (8, 2)<img src="/web/uploads/13102/7f178f0cca-ejercicio-1-geo.png">2.Escribe las coordenadas de cada punto señalado<img src="data:image/png;base64,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" alt="">3.Dibuja las vistas del siguiente sólido:<img src="/web/uploads/13102/adf5241fc2-ejercicio-3-geo.png">4. Calcula el volumen de una piscina que tiene 7 metros de largo, 4 metros de ancho y 2 metros de profundo

Evidencia

Evaluación

Bibliografía

Foro

calificable?

Activo