Las relaciones fundamentales definidas para ángulos agudos se verifican también para cualquier ángulo.[br][br][img]data:image/png;base64,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[/img][br][br]Tendremos que tener en cuenta el cuadrante en el que se encuentra el ángulo para obtener el signo y valor de las razones trigonométricas.

Sabiendo que cos[math]\alpha[/math]=0,6 ; [math]\alpha[/math][math]\epsilon[/math](270º,360º), calcula el resto de razones trigonométricas.