Hofstadter points triangle geometry , a Hofstadter point is a special point associated with every plane triangle . In fact there are several Hofstadter points associated with a triangle. All of them are triangle centers . Two of them, the Hofstadter zero-point and Hofstadter one-point , are particularly interesting . They are two transcendental triangle centers . Hofstadter zero-point is the center designated as X and the Hofstafter one-point is the center denoted as X in Clark Kimberling's Encyclopedia of Triangle Centers . The Hofstadter zero-point was discovered by Douglas Hofstadter in 1992.Let ABC be a given triangle. Let r be a positive real constant .line segment BC about B through an angle rB towards A and let LBC be the line containing this line segment. Next rotate the line segment BC about C through an angle rC towards A . Let L'BC be the line containing this line segment. Let the lines LBC and L'BC intersect at A . In a similar way the points B and C are constructed. The triangle whose vertices are A , B , C is the Hofstadter r -triangle of triangle ABC .Special case The Hofstadter 1/3-triangle of triangle ABC is the first Morley's triangle of triangle ABC . Morley's triangle is always an equilateral triangle . The Hofstadter 1/2-triangle is simply the incentre of the triangle. trilinear coordinates of the vertices of the Hofstadter r -triangle are given below:Hofstadter points For a positive real constant r > 0, let A B C be the Hofstadter r -triangle of triangle ABC . Then the lines AA , BB , CC are concurrent. The point of concurrence is the Hofstdter r -point of triangle ABC .Trilinear coordinates of Hofstadter ''r''-point The trilinear coordinates of Hofstadter r -point are given below.Hofstadter zero- and one-points The trilinear coordinates of these points cannot be obtained by plugging in the values 0 and 1 for r in the expressions for the trilinear coordinates for the Hofstdter r -point.
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