QA-Tf15: P-Circumscribed Conic Center

Given a random point P.

QA-Tf15 is the center of the circumscribed conic through P and the vertices of the Reference Quadrangle.

Some construction:

Let P1.P2.P3.P4 be the Reference Quadrangle.

Let P be some random point.

1. Construct the circumscribed circles of the P-Cevian Triangles of the 4 QA-Component Triangles P1.P2.P3, P2.P3.P4, P3.P4.P1, P4.P1.P2.

2. There are 6 radical axes of these 4 circles and they coincide in one point !

3. This point as QA-Tf15(P).

See [34], QFG-message #3032.

CT-Coordinates of QA-Tf15[(x:y:z)]:

( p (q – r)² (q + r) (2 p + q + r) (p² + p q + q² + p r + 3 q r + r²) :

q (p – r)² (p + r) (p + 2 q + r) (p² + p q + q² + 3 p r + q r + r²) :

r (p – q)² (p + q) (p + q + 2 r) (p² + 3 p q + q² + p r + q r + r²) )

Properties

• All points QA-Tf15(P) lie on the Nine-point Conic QA-Co1. See [34], QFG-message #3032.
• QA-Tf15(QA-P1) = QA-Tf15(QA-P16) = QA-Tf2(InfinityPoint of the line through the 3 QA-versions of QL-P18). See [34], QFG-message #3032.
• QA-Tf15(QA-P5) = QA-Tf15(QA-P10). See [34], QFG-message #3032.
• All points on QA-Co2 are mapped by QA-Tf15 into QA-P2. See [34], QFG-message #3038. Likewise all points on some QA-circumscribed Conic will be mapped into its Conic Center.

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