Se llama circunferencia trigonométrica a todo circunferencia C(0, ρ), tal que:[br][list][*]Su centro o es el origen de un sistema de coordenadas.[/*][*]Su radio mide 1. Es decir ρ = 1[br][/*][/list]

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[/img][br]La circunferencia trazada recibe el nombre particular de[b][i] circunferencia trigonométrica.[/i][/b]