[br][br]1. Selecciona el ícono [i]punto [img]data:image/png;base64,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[/img] [/i]y coloca el punto A [br][br]2. Selecciona el ícono [i]punto[/i] [img]data:image/png;base64,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[/img] y coloca el punto B [br][br]3. Selecciona el ícono [i]recta[/i] [img]data:image/png;base64,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[/img] y une los puntos A y B [br][br]4. Selecciona el ícono [i]punto [img]data:image/png;base64,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[/img][/i] y coloca el punto C [br][br]5. Selecciona el ícono [i]recta[/i] [img]data:image/png;base64,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[/img] y une los puntos B y C [br][br]6. Selecciona el ícono [i]paralela 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[/img][/i] y da click en la recta AB y en el[br]punto C para construir la recta paralela [br][br]7. Selecciona el ícono [i]paralela 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[/img][/i] y da click en la recta BC y en el[br]punto A para construir la recta paralela [br][br]8. Selecciona el ícono [i]intersección[/i] [img]data:image/png;base64,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[/img] y da click en las rectas CD y AD[br]para crear el punto D de intersección entre dos rectas [br][br][br]9. Selecciona el ícono [i]polígono [img]data:image/png;base64,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[/img] [/i]y da click en los puntos A, B, C,[br]D, A para crear el polígono[br][br][br]