The generation of hyperbolas from the circle was discussed in the file HyperbolaGeneration2.html . Here we modify a little bit the recipe studied there and define the projectivity by starting with a screen-rectangle (sides vertical/horizontal) ABCD symmetric about the origin. Define the projectivity by prescribing its values at the vertices of the rectangle: f(A) = B, f(D) = C, f(B) = D and f(C) = A. This completely defines projectivity f with the properties: - It maps line [AD] to [BC] by acting as parallel translation (parallel to AB) at every point of line [AD]. - It maps line [BC] to [AD] acting by the symmetry at O at every point of line [BC]. - It maps the ellipse inscribed in the rectangle:
An easy calculation, using the recipe given in Projectivity.html , shows that the matrix describing the transformation (f) is:
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Hyperbola from ellipse through projectivity ![[0_0]](HyperbolaFromEllipse_files/HyperbolaFromEllipse_0_0_0.png)
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