La circunferencia es el lugar geométrico del conjunto de puntos equidistantes de un punto fijo, llamado centro [color=#1e84cc][b]C[/b][/color]. A la distancia fija de cualquier punto de la circunferencia al centro se le denomina radio[b][color=#ff7700]r[/color][/b].[br][br]Por tanto, para que el punto P(x, y) pertenezca a la circunferencia dist (P,[b]C[/b])=[color=#ff7700]r [/color]. Es decir:[br][img]data:image/png;base64,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[/img] si elevamos al cuadrado [br] [br][img]data:image/png;base64,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[/img]

[b]Página 173 . Ejercicios 1 a) ,2 ,3 y 4.[/b]