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This theorem is a generalization of Pappus's (hexagon) theorem, which is the special case of a degenerate conic of two lines with three points on each line.
Теорема Паскаля Теорема Паскаля
Теоре́ма Паска́ля — классическая теорема проективной геометрии. Википедия
Pascal's theorem is a very useful theorem in Olympiad geometry to prove the collinearity of three intersections among six points on a circle.
Pascal's Theorem is a result in projective geometry. It states that if a hexagon is inscribed in a conic section, then the points of intersection of the pairs ...
The theorem states that if a hexagon is inscribed in a conic, then the three points at which the pairs of opposite sides meet, lie on a straight line. The ...
It states that, given a (not necessarily regular, or even convex) hexagon inscribed in a conic section, the three pairs of the continuations of opposite sides ...
Pascal's theorem is a tool for collinearities and concurrences. A bunch of points, all lying on the same circle, with a bunch of intersections is a hint for ...
Pascal's favorite mathematical topic to study, geometry, led to the formulation of Pascal's theorem. This states that pairs of opposite sides of a hexagon ...
In plane projections, a series of points on one plane may be projected onto a second plane by choosing any focal point, or origin, and constructing lines from ...
A magical theorem - which states that if we draw a hexagon inscribed in a conic section then the three pairs of opposite sides of the hexagon intersect at ...
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