[b][i]Actividad 1:[/i][/b] [br][br]a. Traza en la circunferencia trigonométrica los siguientes ángulos positivos: 60°, 120°,210°,[br]330° y 360°. [br]b. Observa cómo varía el signo de la función seno en cada uno de los ángulos dados.

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[/img][br]Al trazar el ángulo de 30, la intersección del lado final con la circunferencia determina el punto B. Si realizamos su proyección sobre el eje de las x, queda determinado el [i]segmento BC[/i], este segmento representa el SENO del ángulo de 30 grados.[br][br]El mismo procedimiento se debe hacer con los demás ángulos.