Problem: Let a circle with center C be given, and let A and B he two points on the circle with ACB Q(t) of the circle arc by letting Q(t) be the point corresponding to P(t): Show?geometrically, without using anything that depends on the Parallel Postulates such as coordinates?that this parametrization of the circle arc is continuous, i.e., that
Show transcribed image textProblem: Let a circle with center C be given, and let A and B he two points on the circle with ACB Q(t) of the circle arc by letting Q(t) be the point corresponding to P(t): Show?geometrically, without using anything that depends on the Parallel Postulates such as coordinates?that this parametrization of the circle arc is continuous, i.e., that